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Fundamentals of Biostatistics

Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

Fundamentals of Biostatistics Seventh Edition

Bernard Rosner Harvard University

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This book is dedicated to my wife, Cynthia, and my children, Sarah, David, and Laura

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Contents

Preface  /  xiii

C h a p t e r 1 

General Overview  /  1

C h a p t e r 2 

Descriptive Statistics  /  5 2.1 Introduction  /  5 2.2 Measures of Location  /  6 2.3 Some Properties of the Arithmetic Mean  /  13 2.4 Measures of Spread  /  15 2.5 Some Properties of the Variance and Standard Deviation  /  18 2.6 The Coefficient of Variation  /  20 2.7 Grouped Data  /  22 2.8 Graphic Methods  /  24

2.9

Case Study 1: Effects of Lead Exposure on Neurological and Psychological Function in Children  /  29 2.10 Case Study 2: Effects of Tobacco Use on Bone-Mineral Density in Middle-Aged Women  /  30 2.11 Obtaining Descriptive Statistics on the Computer  /  31 2.12 Summary  /  31 P R O B L E M S  /  33

*The new sections and the expanded sections for this edition are indicated by an asterisk.

vii Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

viii   Contents C h a p t e r 3 

Probability  /  38

3.1 3.2 3.3 3.4 3.5 3.6

Introduction  /  38 Definition of Probability  /  39 Some Useful Probabilistic Notation  /  40 The Multiplication Law of Probability  /  42 The Addition Law of Probability  /  44 Conditional Probability  /  46

3.7 3.8 3.9 3.10 3.11

Bayes’ Rule and Screening Tests  /  51 Bayesian Inference  /  56 ROC Curves  /  57 Prevalence and Incidence  /  59 Summary  /  60

P R O B L E M S  /  60

C h a p t e r 4 

Discrete Probability Distributions  /  71 4.1 Introduction  /  71 4.2 Random Variables  /  72 4.3 The Probability-Mass Function for a Discrete Random Variable  /  73 4.4 The Expected Value of a Discrete Random Variable  /  75 4.5 The Variance of a Discrete Random Variable  /  76 4.6 The Cumulative-Distribution Function of a Discrete Random Variable  /  78 4.7 Permutations and Combinations  /  79 4.8 The Binomial Distribution  /  83

4.9 Expected Value and Variance of the Binomial Distribution  /  88 4.10 The Poisson Distribution  /  90 4.11 Computation of Poisson Probabilities  /  93 4.12 Expected Value and Variance of the Poisson Distribution  /  95 4.13 Poisson Approximation to the Binomial Distribution  /  96 4.14 Summary  /  99 P R O B L E M S  /  99

C h a p t e r 5 

Continuous Probability Distributions  /  108

5.1 Introduction  /  108 5.2 General Concepts  /  108 5.3 The Normal Distribution  /  111 5.4 Properties of the Standard Normal Distribution  /  114 5.5 Conversion from an N(µ,σ2) Distribution to an N(0,1) Distribution  /  120 5.6 Linear Combinations of Random Variables  /  124

5.7 Normal Approximation to the Binomial Distribution  /  129 5.8 Normal Approximation to the Poisson Distribution  /  135 5.9 Summary  /  137 P R O B L E M S  /  138

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Contents   ix

C h a p t e r 6 

Estimation  /  149 6.1 Introduction  /  149 6.2 The Relationship Between Population and Sample  /  150 6.3 Random-Number Tables  /  152 6.4 Randomized Clinical Trials  /  156 6.5 Estimation of the Mean of a Distribution  /  160 6.6 Case Study: Effects of Tobacco Use on Bone-Mineral Density (BMD) in Middle-Aged Women  /  175

6.7 Estimation of the Variance of a Distribution  /  176 6.8 Estimation for the Binomial Distribution  /  181 6.9 Estimation for the Poisson Distribution  /  189 6.10 One-Sided CIs  /  193 6.11 Summary  /  195 P R O B L E M S  /  196

Chapter 7

Hypothesis Testing: One-Sample Inference  /  204 7.1 Introduction  /  204 7.2 General Concepts  /  204 7.3 One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives  /  207 7.4 One-Sample Test for the Mean of a Normal Distribution: Two-Sided Alternatives  /  215 7.5 The Power of a Test  /  221 7.6 Sample-Size Determination  /  228 7.7 The Relationship Between Hypothesis Testing and Confidence Intervals  /  235 7.8 Bayesian Inference  /  237

7.9 One-Sample χ2 Test for the Variance of a Normal Distribution  /  241 7.10 One-Sample Inference for the Binomial Distribution  /  244 7.11 One-Sample Inference for the Poisson Distribution  /  251 7.12 Case Study: Effects of Tobacco Use on Bone-Mineral Density in Middle-Aged Women  /  256 7.13 Summary  /  257 P R O B L E M S  /  259

Chapter 8

Hypothesis Testing: Two-Sample Inference  /  269 8.1 Introduction  /  269 8.2 The Paired t Test  /  271 8.3 Interval Estimation for the Comparison of Means from Two Paired Samples  /  275 8.4 Two-Sample t Test for Independent Samples with Equal Variances  /  276

8.5 Interval Estimation for the Comparison of Means from Two Independent Samples (Equal Variance Case)  /  280 8.6 Testing for the Equality of Two Variances  /  281 8.7 Two-Sample t Test for Independent Samples with Unequal Variances  /  287

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x   Contents 8.8 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children  /  293 8.9 The Treatment of Outliers  /  295 8.10 Estimation of Sample Size and Power for Comparing Two Means  /  301

8.11 Sample-Size Estimation for Longitudinal Studies  /  304 8.12 Summary  /  307 P R O B L E M S  /  309

Chapter 9

Nonparametric Methods  /  327

9.1 Introduction  /  327 9.2 The Sign Test  /  329 9.3 The Wilcoxon Signed-Rank Test  /  333 9.4 The Wilcoxon Rank-Sum Test  /  339

9.5 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children  /  344 9.6 Summary  /  344 P R O B L E M S  /  346

C h a p t e r 1 0 

Hypothesis Testing: Categorical Data  /  352 10.1 Introduction  /  352 10.2 Two-Sample Test for Binomial Proportions  /  353 10.3 Fisher’s Exact Test  /  367 10.4 Two-Sample Test for Binomial Proportions for Matched-Pair Data (McNemar’s Test)  /  373

10.5 Estimation of Sample Size and Power for Comparing Two Binomial Proportions  /  381 10.6 R × C Contingency Tables  /  390 10.7 Chi-Square Goodness-of-Fit Test  /  401 10.8 The Kappa Statistic  /  404 10.9 Summary  /  408 P R O B L E M S  /  409

Chapter 11

Regression and Correlation Methods  /  427 11.1 Introduction  /  427 11.2 General Concepts  /  428 11.3 Fitting Regression Lines— The Method of Least Squares  /  431 11.4 Inferences About Parameters from Regression Lines  /  435 11.5 Interval Estimation for Linear Regression  /  443 11.6 Assessing the Goodness of Fit of Regression Lines  /  448 11.7 The Correlation Coefficient  /  452

11.8 Statistical Inference for Correlation Coefficients  /  455 11.9 Multiple Regression  /  468 11.10 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children  /  484 11.11 Partial and Multiple Correlation  /  491 11.12 Rank Correlation  /  494 * 11.13 Interval Estimation for Rank Correlation Coefficients  /  499 11.14 Summary  /  504 P R O B L E M S  /  504

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Contents   xi

Chapter 12

Multisample Inference  /  516 12.1 Introduction to the One-Way Analysis of Variance  /  516 12.2 One-Way ANOVA—Fixed-Effects Model  /  516 12.3 Hypothesis Testing in One-Way ANOVA—Fixed-Effects Model  /  518 12.4 Comparisons of Specific Groups in One-Way ANOVA  /  522 12.5 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children  /  538

12.6 Two-Way ANOVA  /  548 12.7 The Kruskal-Wallis Test  /  555 12.8 One-Way ANOVA—The Random-Effects Model  /  562 12.9 The Intraclass Correlation Coefficient  /  568 * 12.10 Mixed Models  /  572 12.11 Summary  /  576 P R O B L E M S  /  577

C h a p t e r 1 3 

Design and Analysis Techniques for Epidemiologic Studies  /  588 13.1 13.2 13.3 * 13.4 13.5 13.6

13.7 13.8

Introduction  /  588 Study Design  /  588 Measures of Effect for Categorical Data  /  591 Attributable Risk  /  601 Confounding and Standardization  /  607 Methods of Inference for Stratified Categorical Data—The Mantel-Haenszel Test  /  612 Power and Sample-Size Estimation for Stratified Categorical Data  /  625 Multiple Logistic Regression  /  628

* 13.9 13.10 13.11 13.12 * 13.13 * 13.14 13.15 13.16 13.17

Extensions to Logistic Regression  /  649 Meta-Analysis  /  658 Equivalence Studies  /  663 The Cross-Over Design  /  666 Clustered Binary Data  /  674 Longitudinal Data Analysis  /  687 Measurement-Error Methods  /  696 Missing Data  /  706 Summary  /  711

P R O B L E M S  /  713

C h a p t e r 1 4 

Hypothesis Testing: Person-Time Data  /  725 14.1 Measure of Effect for Person-Time Data  /  725 14.2 One-Sample Inference for Incidence-Rate Data  /  727 14.3 Two-Sample Inference for Incidence-Rate Data  /  730 14.4 Power and Sample-Size Estimation for Person-Time Data  /  738 14.5 Inference for Stratified Person-Time Data  /  742

14.6 Power and Sample-Size Estimation for Stratified Person-Time Data  /  750 14.7 Testing for Trend: Incidence-Rate Data  /  755 14.8 Introduction to Survival Analysis  /  758 14.9 Estimation of Survival Curves: The Kaplan-Meier Estimator  /  760 14.10 The Log-Rank Test  /  767 14.11 The Proportional-Hazards Model  /  774

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xii   Contents * 14.14 Parametric Regression Models for Survival Data  /  795 14.15 Summary  /  802

14.12 Power and Sample-Size Estimation under the Proportional-Hazards Model  /  783 * 14.13 Parametric Survival Analysis  /  787

P R O B L E M S  /  802

APPE N D I X

Tables  /  811  n 1 Exact Binomial Probabilities Pr X = k =   pk q n−k   /  811 k

)

(

(

)

2 Exact Poisson Probabilities Pr X = k =

e− µ µk   /  815 k!

3 The Normal Distribution  /  818 4 Table of 1000 Random Digits  /  822 5

Percentage Points of the t Distribution (td,u )  /  823

6

Percentage Points of the Chi-Square Distribution (χ2d,u )  /  824

7a Exact Two-Sided 100% × (1 – α) Confidence Limits for Binomial Proportions (α = .05)  /  825 7b Exact Two-Sided 100% × (1 – α) Confidence Limits for Binomial Proportions (α = .01)  /  826 8

Confidence Limits for the Expectation of a Poisson Variable (µ)  /  827

9

Percentage Points of the F Distribution (Fd ,d ,p )  /  828

10

Critical Values for the ESD (Extreme Studentized Deviate) Outlier Statistic (ESDn,1–α, α = .05, .01)  /  830

1

2

11 Two-Tailed Critical Values for the Wilcoxon Signed-Rank Test  /  830 12 Two-Tailed Critical Values for the Wilcoxon Rank-Sum Test  /  831 13

Fisher’s z Transformation  /  833

14 Two-Tailed Upper Critical Values for the Spearman Rank-Correlation Coefficient (rs )  /  834 15

Critical Values for the Kruskal-Wallis Test Statistic (H) for Selected Sample Sizes for k = 3  /  835

16

Critical Values for the Studentized Range Statistic q*, α = .05  /  836

Answers to Selected Problems  /  837 Flowchart: Methods of Statistical Inference  /  841 Index of Data Sets  /  847 Index  /  849

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Preface

T

his introductory-level biostatistics text is designed for upper-level undergraduate or graduate students interested in medicine or other health-related areas. It requires no previous background in statistics, and its mathematical level assumes only a knowledge of algebra. Fundamentals of Biostatistics evolved from notes that I have used in a biostatistics course taught to Harvard University undergraduates and Harvard Medical School students over the past 30 years. I wrote this book to help motivate students to master the statistical methods that are most often used in the medical literature. From the student’s viewpoint, it is important that the example material used to develop these methods is representative of what actually exists in the literature. Therefore, most of the examples and exercises in this book are based either on actual articles from the medical literature or on actual medical research problems I have encountered during my consulting experience at the Harvard Medical School.

The Approach Most introductory statistics texts either use a completely nonmathematical, cookbook approach or develop the material in a rigorous, sophisticated mathematical framework. In this book, however, I follow an intermediate course, minimizing the amount of mathematical formulation but giving complete explanations of all the important concepts. Every new concept in this book is developed systematically through completely worked-out examples from current medical research problems. In addition, I introduce computer output where appropriate to illustrate these concepts. I initially wrote this text for the introductory biostatistics course. However, the field has changed rapidly over the past 10 years; because of the increased power of newer statistical packages, we can now perform more sophisticated data analyses than ever before. Therefore, a second goal of this text is to present these new techniques at an introductory level so that students can become familiar with them without having to wade through specialized (and, usually, more advanced) statistical texts. To differentiate these two goals more clearly, I included most of the content for the introductory course in the first 12 chapters. More advanced statistical techniques used in recent epidemiologic studies are covered in Chapter 13, “Design and Analysis Techniques for Epidemiologic Studies” and Chapter 14, “Hypothesis Testing: PersonTime Data.”

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xiv   Preface

Changes in the Seventh Edition For this edition, I have added seven new sections and added new content to one other section. Features new to this edition include the following: ■

The data sets are now available on the book’s Companion Website at www .cengage.com/statistics/rosner in an expanded set of formats, including Excel, Minitab®, SPSS, JMP, SAS, Stata, R, and ASCII formats.

Data and medical research findings in Examples have been updated.

New or expanded coverage of the following topics:

Interval estimates for rank correlation coefficients (Section 11.13)

Mixed effect models (Section 12.10)

Attributable risk (Section 13.4)

Extensions to logistic regression (Section 13.9)

Regression models for clustered binary data (Section 13.13)

Longitudinal data analysis (Section 13.14)

Parametric survival analysis (Section 14.13)

Parametric regression models for survival data (Section 14.14)

The new sections and the expanded sections for this edition have been indicated by an asterisk in the table of contents.

Exercises This edition contains 1438 exercises; 244 of these exercises are new. Data and medical research findings in the problems have been updated where appropriate. All problems based on the data sets are included. Problems marked by an asterisk (*) at the end of each chapter have corresponding brief solutions in the answer section at the back of the book. Based on requests from students for more completely solved problems, approximately 600 additional problems and complete solutions are presented in the Study Guide available on the Companion Website accompanying this text. In addition, approximately 100 of these problems are included in a Miscellaneous Problems section and are randomly ordered so that they are not tied to a specific chapter in the book. This gives the student additional practice in determining what method to use in what situation. Complete instructor solutions to all exercises are available in secure online format through Cengage’s Solution Builder service. Adopting instructors can sign up for access at www.cengage.com/solutionbuilder.

Computation Method The method of handling computations is similar to that used in the sixth edition. All intermediate results are carried to full precision (10+ significant digits), even though they are presented with fewer significant digits (usually 2 or 3) in the text. Thus, intermediate results may seem inconsistent with final results in some instances; this, however, is not the case.

Organization Fundamentals of Biostatistics, Seventh Edition, is organized as follows. Chapter 1 is an introductory chapter that contains an outline of the development of an actual medical study with which I was involved. It provides a unique sense of the role of biostatistics in medical research. Chapter 2 concerns descriptive statistics and presents all the major numeric and graphic tools used for displaying medical data. This chapter is especially important

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Preface   xv

for both consumers and producers of medical literature because much information is actually communicated via descriptive material. Chapters 3 through 5 discuss probability. The basic principles of probability are developed, and the most common probability distributions—such as the binomial and normal distributions—are introduced. These distributions are used extensively in later chapters of the book. The concepts of prior probability and posterior probability are also introduced. Chapters 6 through 10 cover some of the basic methods of statistical inference. Chapter 6 introduces the concept of drawing random samples from populations. The difficult notion of a sampling distribution is developed and includes an introduction to the most common sampling distributions, such as the t and chisquare distributions. The basic methods of estimation, including an extensive discussion of confidence intervals, are also presented. Chapters 7 and 8 contain the basic principles of hypothesis testing. The most elementary hypothesis tests for normally distributed data, such as the t test, are also fully discussed for one- and two-sample problems. The fundamentals of Bayesian inference are explored. Chapter 9 covers the basic principles of nonparametric statistics. The assumptions of normality are relaxed, and distribution-free analogues are developed for the tests in Chapters 7 and 8. Chapter 10 contains the basic concepts of hypothesis testing as applied to categorical data, including some of the most widely used statistical procedures, such as the chi-square test and Fisher’s exact test. Chapter 11 develops the principles of regression analysis. The case of simple linear regression is thoroughly covered, and extensions are provided for the multipleregression case. Important sections on goodness-of-fit of regression models are also included. Also, rank correlation is introduced. Interval estimates for rank correlation coefficients are covered for the first time. Methods for comparing correlation coefficients from dependent samples are also included. Chapter 12 introduces the basic principles of the analysis of variance (ANOVA). The one-way analysis of variance fixed- and random-effects models are discussed. In addition, two-way ANOVA, the analysis of covariance, and mixed effects models are covered. Finally, we discuss nonparametric approaches to one-way ANOVA. Multiple comparison methods including material on the false discovery rate are also provided. A section of mixed models is also included for the first time. Chapter 13 discusses methods of design and analysis for epidemiologic studies. The most important study designs, including the prospective study, the case–­control study, the cross-sectional study, and the cross-over design are introduced. The concept of a confounding variable—that is, a variable related to both the disease and the exposure variable—is introduced, and methods for controlling for confounding, which include the Mantel-Haenszel test and multiple-logistic regression, are discussed in detail. Extensions to logistic regression models, including conditional logistic regression, polytomous logistic regression, and ordinal logistic regression, are discussed for the first time. This discussion is followed by the exploration of topics of current interest in epidemiologic data analysis, including meta-analysis (the combination of results from more than one study); correlated binary data techniques (techniques that can be applied when replicate measures, such as data from multiple teeth from the same person, are available for an individual); measurement error methods (useful when there is substantial measurement error in the exposure data collected); equivalence studies (whose objective it is to establish bioequivalence between two treatment modalities rather than that one treatment is superior to the other); and missing-data methods for how to handle missing data in epidemiologic

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xvi   Preface studies. Longitudinal data analysis and generalized estimating equation (GEE) methods are also briefly discussed. Chapter 14 introduces methods of analysis for person-time data. The methods covered in this chapter include those for incidence-rate data, as well as several methods of survival analysis: the Kaplan-Meier survival curve estimator, the log-rank test, and the proportional-hazards model. Methods for testing the assumptions of the proportional-hazards model have also been included. Parametric survival analysis methods are covered for the first time. Throughout the text—particularly in Chapter 13—I discuss the elements of study designs, including the concepts of matching; cohort studies; case–control studies; retrospective studies; prospective studies; and the sensitivity, specificity, and predictive value of screening tests. These designs are presented in the context of actual samples. In addition, Chapters 7, 8, 10, 11, 13, and 14 contain specific sections on sample-size estimation for different statistical situations. A flowchart of appropriate methods of statistical inference (see pages 841–846) is a handy reference guide to the methods developed in this book. Page references for each major method presented in the text are also provided. In Chapters 7–8 and Chapters 10–14, I refer students to this flowchart to give them some perspective on how the methods discussed in a given chapter fit with all the other statistical methods introduced in this book. In addition, I have provided an index of applications, grouped by medical specialty, summarizing all the examples and problems this book covers.

Acknowledgments I am indebted to Debra Sheldon, the late Marie Sheehan, and Harry Taplin for their invaluable help typing the manuscript, to Dale Rinkel for invaluable help in typing problem solutions, and to Marion McPhee for helping to prepare the data sets on the Companion Website. I am also indebted to Brian Claggett for updating solutions to problems for this edition, and to Daad Abraham for typing the Index of Applications. In addition, I wish to thank the manuscript reviewers, among them: Emilia Bagiella, Columbia University; Ron Brookmeyer, Johns Hopkins University; Mark van der Laan, University of California, Berkeley; and John Wilson, University of Pittsburgh. I would also like to thank my ­colleagues Nancy Cook, who was instrumental in helping me develop the part of Section 12.4 on the false-discovery rate, and Robert Glynn, who was instrumental in developing Section 13.16 on missing data and Section 14.11 on testing the assumptions of the proportional-hazards model. In addition, I wish to thank Molly Taylor, Daniel Seibert, Shaylin Walsh, and Laura Wheel, who were instrumental in providing editorial advice and in preparing the manuscript. I am also indebted to my colleagues at the Channing Laboratory—most notably, the late Edward Kass, Frank Speizer, Charles Hennekens, the late Frank Polk, Ira Tager, Jerome Klein, James Taylor, Stephen Zinner, Scott Weiss, Frank Sacks, Walter Willett, Alvaro Munoz, Graham Colditz, and Susan Hankinson—and to my other colleagues at the Harvard Medical School, most notably, the late Frederick Mosteller, Eliot Berson, Robert Ackerman, Mark Abelson, Arthur Garvey, Leo Chylack, Eugene Braunwald, and Arthur Dempster, who inspired me to write this book. I also wish to acknowledge John Hopper and Philip Landrigan for providing the data for our case studies. Finally, I would like to acknowledge Leslie Miller, Andrea Wagner, Loren Fishman, and Frank Santopietro, without whose clinical help the current edition of this book would not have been possible. Bernard Rosner Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

About the Author

Photo courtesy of the Museum of Science, Boston

Bernard Rosner is Professor of Medicine (Biostatistics) at Harvard Medical School and Professor of Biostatistics in the Harvard School of Public Health. He ­received a B.A. in Mathematics from Columbia University in 1967, an M.S. in Statistics from Stanford University in 1968, and a Ph.D. in Statistics from Harvard University in 1971. He has more than 30 years of biostatistical consulting experience with other investigators at the Harvard Medical School. Special areas of interest include cardio­vascular disease, hypertension, breast cancer, and ophthalmology. Many of the examples and exercises used in the text reflect data collected from actual studies in conjunction with his consulting experience. In addition, he has developed new biostatistical methods, mainly in the areas of longitudinal data analysis, analysis of clustered data (such as data collected in families or from paired organ systems in the same person), measurement error methods, and outlier detection methods. You will see some of these methods introduced in this book at an elementary level. He was married in 1972 to his wife, Cynthia, and has three children, Sarah, David, and Laura, each of whom has contributed examples for this book.

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1

General Overview

Statistics is the science whereby inferences are made about specific random phenomena on the basis of relatively limited sample material. The field of statistics has two main areas: mathematical statistics and applied statistics. Mathematical statistics concerns the development of new methods of statistical inference and requires detailed knowledge of abstract mathematics for its implementation. Applied statistics involves applying the methods of mathematical statistics to specific subject areas, such as economics, psychology, and public health. Biostatistics is the branch of applied statistics that applies statistical methods to medical and biological problems. Of course, these areas of statistics overlap somewhat. For example, in some instances, given a certain biostatistical application, standard methods do not apply and must be modified. In this circumstance, biostatisticians are involved in developing new methods. A good way to learn about biostatistics and its role in the research process is to follow the flow of a research study from its inception at the planning stage to its completion, which usually occurs when a manuscript reporting the results of the study is published. As an example, I will describe one such study in which I participated. A friend called one morning and in the course of our conversation mentioned that he had recently used a new, automated blood-pressure measuring device of the type seen in many banks, hotels, and department stores. The machine had measured his average diastolic blood pressure on several occasions as 115 mm Hg; the highest reading was 130 mm Hg. I was very worried, because if these readings were accurate, my friend might be in imminent danger of having a stroke or developing some other serious cardiovascular disease. I referred him to a clinical colleague of mine who, using a standard blood-pressure cuff, measured my friend’s diastolic blood pressure as 90 mm Hg. The contrast in readings aroused my interest, and I began to jot down readings from the digital display every time I passed the machine at my local bank. I got the distinct impression that a large percentage of the reported readings were in the hypertensive range. Although one would expect hypertensive individuals to be more likely to use such a machine, I still believed that blood-pressure readings from the machine might not be comparable with those obtained using standard methods of blood-pressure measurement. I spoke with Dr. B. Frank Polk, a physician at Harvard Medical School with an interest in hypertension, about my suspicion and succeeded in interesting him in a small-scale evaluation of such machines. We decided to send a human observer, who was well trained in blood-pressure measurement techniques, to several of these machines. He would offer to pay participants 50¢ for the cost of using the machine if they would agree to fill out a short questionnaire and have their blood pressure measured by both a human observer and the machine.

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2 

  C H A P T E R 1  ■  General Overview

At this stage we had to make several important decisions, each of which proved vital to the success of the study. These decisions were based on the following questions: (1) How many machines should we test? (2) How many participants should we test at each machine? (3) In what order should we take the measurements? That is, should the human observer or the machine take the first measurement? Under ideal circumstances we would have taken both the human and machine readings simultaneously, but this was logistically impossible. (4) What data should we collect on the questionnaire that might influence the comparison between methods? (5) How should we record the data to facilitate computerization later? (6) How should we check the accuracy of the computerized data?

We resolved these problems as follows:

(1) and (2) Because we were not sure whether all blood-pressure machines were comparable in quality, we decided to test four of them. However, we wanted to sample enough subjects from each machine so as to obtain an accurate comparison of the standard and automated methods for each machine. We tried to predict how large a discrepancy there might be between the two methods. Using the methods of sample-size determination discussed in this book, we calculated that we would need 100 participants at each site to make an accurate comparison. (3) We then had to decide in what order to take the measurements for each person. According to some reports, one problem with obtaining repeated bloodpressure measurements is that people tense up during the initial measurement, yielding higher blood pressure readings during subsequent measurements. Thus we would not always want to use either the automated or manual method first, because the effect of the method would get confused with the order-of-measurement effect. A conventional technique we used here was to randomize the order in which the measurements were taken, so that for any person it was equally likely that the machine or the human observer would take the first measurement. This random pattern could be implemented by flipping a coin or, more likely, by using a table of random numbers similar to Table 4 of the Appendix. (4) We believed that the major extraneous factor that might influence the results would be body size (we might have more difficulty getting accurate readings from people with fatter arms than from those with leaner arms). We also wanted to get some idea of the type of people who use these machines. Thus we asked questions about age, sex, and previous hypertension history. (5) To record the data, we developed a coding form that could be filled out on site and from which data could be easily entered into a computer for subsequent analysis. Each person in the study was assigned a unique identification (ID) number by which the computer could identify that person. The data on the coding forms were then keyed and verified. That is, the same form was entered twice and the two records compared to make sure they were the same. If the records did not match, the form was re-entered. (6) Checking each item on each form was impossible because of the large amount of data involved. Instead, after data entry we ran some editing programs to ensure that the data were accurate. These programs checked that the values for

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General Overview    3

individual variables fell within specified ranges and printed out aberrant values for manual checking. For example, we checked that all blood-pressure readings were at least 50 mm Hg and no higher than 300 mm Hg, and we printed out all readings that fell outside this range. After completing the data-collection, data-entry, and data-editing phases, we were ready to look at the results of the study. The first step in this process is to get an impression of the data by summarizing the information in the form of several descriptive statistics. This descriptive material can be numeric or graphic. If numeric, it can be in the form of a few summary statistics, which can be presented in tabular form or, alternatively, in the form of a frequency distribution, which lists each value in the data and how frequently it occurs. If graphic, the data are summarized pictorially and can be presented in one or more figures. The appropriate type of descriptive material to use varies with the type of distribution considered. If the distribution is continuous—that is, if there are essentially an infinite number of possible values, as would be the case for blood pressure—then means and standard deviations may be the appropriate descriptive statistics. However, if the distribution is discrete—that is, if there are only a few possible values, as would be the case for sex—then percentages of people taking on each value are the appropriate descriptive measure. In some cases both types of descriptive statistics are used for continuous distributions by condensing the range of possible values into a few groups and giving the percentage of people that fall into each group (e.g., the percentages of people who have blood pressures between 120 and 129 mm Hg, between 130 and 139 mm Hg, and so on). In this study we decided first to look at mean blood pressure for each method at each of the four sites. Table 1.1 summarizes this information [1]. You may notice from this table that we did not obtain meaningful data from all 100 people interviewed at each site. This was because we could not obtain valid readings from the machine for many of the people. This problem of missing data is very common in biostatistics and should be anticipated at the planning stage when deciding on sample size (which was not done in this study). Our next step in the study was to determine whether the apparent differences in blood pressure between machine and human measurements at two of the locations (C, D) were “real” in some sense or were “due to chance.” This type of question falls into the area of inferential statistics. We realized that although there was a difference of 14 mm Hg in mean systolic blood pressure between the two methods for the 98 people we interviewed at location C, this difference might not hold up if we

Table 1.1

Mean blood pressures and differences between machine and human readings at four locations Systolic blood pressure (mm Hg) Machine Location

A B C D

Human

Difference

Number   of people

  Mean

Standard deviation

  Mean

Standard deviation

  Mean

Standard deviation

98 84 98 62

142.5 134.1 147.9 135.4

21.0 22.5 20.3 16.7

142.0 133.6 133.9 128.5

18.1 23.2 18.3 19.0

0.5 0.5 14.0 6.9

11.2 12.1 11.7 13.6

Source: By permission of the American Heart Association, Inc.

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4 

  C H A P T E R 1  ■  General Overview

interviewed 98 other people at this location at a different time, and we wanted to have some idea as to the error in the estimate of 14 mm Hg. In statistical jargon, this group of 98 people represents a sample from the population of all people who might use that machine. We were interested in the population, and we wanted to use the sample to help us learn something about the population. In particular, we wanted to know how different the estimated mean difference of 14 mm Hg in our sample was likely to be from the true mean difference in the population of all people who might use this machine. More specifically, we wanted to know if it was still possible that there was no underlying difference between the two methods and that our results were due to chance. The 14-mm Hg difference in our group of 98 people is referred to as an estimate of the true mean difference (d) in the population. The problem of inferring characteristics of a population from a sample is the central concern of statistical inference and is a major topic in this text. To accomplish this aim, we needed to develop a probability model, which would tell us how likely it is that we would obtain a 14-mm Hg difference between the two methods in a sample of 98 people if there were no real difference between the two methods over the entire population of users of the machine. If this probability were small enough, then we would begin to believe a real difference existed between the two methods. In this particular case, using a probability model based on the t distribution, we concluded this probability was less than 1 in 1000 for each of machines at locations C and D. This probability was sufficiently small for us to conclude there was a real difference between the automatic and manual methods of measuring blood pressure for two of the four machines tested. We used a statistical package to perform the preceding data analyses. A package is a collection of statistical programs that describe data and perform various statistical tests on the data. Currently the most widely used statistical packages are SAS, SPSS, Stata, MINITAB, and Excel. The final step in this study, after completing the data analysis, was to compile the results in a publishable manuscript. Inevitably, because of space considerations, we weeded out much of the material developed during the data-analysis phase and presented only the essential items for publication. This review of our blood-pressure study should give you some idea of what medical research is about and the role of biostatistics in this process. The material in this text parallels the description of the data-analysis phase of the study. Chapter 2 summarizes different types of descriptive statistics. Chapters 3 through 5 present some basic principles of probability and various probability models for use in later discussions of inferential statistics. Chapters 6 through 14 discuss the major topics of inferential statistics as used in biomedical practice. Issues of study design or data collection are brought up only as they relate to other topics discussed in the text.

Reference [1] Polk, B. F., Rosner, B., Feudo, R., & Vandenburgh, M. (1980). An evaluation of the Vita-Stat automatic blood pressure measuring device. Hypertension, 2(2), 221−227.

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2

Descriptive Statistics

2.1 Introduction The first step in looking at data is to describe the data at hand in some concise way. In smaller studies this step can be accomplished by listing each data point. In general, however, this procedure is tedious or impossible and, even if it were possible, would not give an overall picture of what the data look like.

Example 2.1

Cancer, Nutrition  Some investigators have proposed that consumption of vitamin A prevents cancer. To test this theory, a dietary questionnaire might be used to collect data on vitamin-A consumption among 200 hospitalized cancer patients (cases) and 200 controls. The controls would be matched with regard to age and sex with the cancer cases and would be in the hospital at the same time for an unrelated disease. What should be done with these data after they are collected? Before any formal attempt to answer this question can be made, the vitamin-A consumption among cases and controls must be described. Consider Figure 2.1. The bar graphs show that the controls consume more vitamin A than the cases do, particularly at consumption levels exceeding the Recommended Daily Allowance (RDA).

Example 2.2

Pulmonary Disease  Medical researchers have often suspected that passive smokers— people who themselves do not smoke but who live or work in an environment in which others smoke—might have impaired pulmonary function as a result. In 1980 a research group in San Diego published results indicating that passive smokers did indeed have significantly lower pulmonary function than comparable nonsmokers who did not work in smoky environments [1]. As supporting evidence, the authors measured the carbon-monoxide (CO) concentrations in the working environments of passive smokers and of nonsmokers whose companies did not permit smoking in the workplace to see if the relative CO concentration changed over the course of the day. These results are displayed as a scatter plot in Figure 2.2. Figure 2.2 clearly shows that the CO concentrations in the two working environments are about the same early in the day but diverge widely in the middle of the day and then converge again after the workday is over at 7 p.m. Graphic displays illustrate the important role of descriptive statistics, which is to quickly display data to give the researcher a clue as to the principal trends in the data and suggest hints as to where a more detailed look at the data, using the

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6   C H A P T E R 2 

  Descriptive Statistics

Figure 2.1

Daily vitamin-A consumption among cancer cases and controls

Percentage of cases

50 40 30 20 10 ≤ ½ RDA*

> ½, ≤ 1

> 1, ≤ 2

> 2, ≤ 5

Percentage of controls

50 40 30 20 10 > 1, ≤2 > 2, ≤5 ≤ ½ RDA* > ½, ≤ 1 Consumption of Vitamin A. *RDA = Recommended Daily Allowance.

methods of inferential statistics, might be worthwhile. Descriptive statistics are also crucially important in conveying the final results of studies in written publications. Unless it is one of their primary interests, most readers will not have time to critically evaluate the work of others but will be influenced mainly by the descriptive statistics presented. What makes a good graphic or numeric display? The main guideline is that the material should be as self-contained as possible and should be understandable without reading the text. These attributes require clear labeling. The captions, units, and axes on graphs should be clearly labeled, and the statistical terms used in tables and figures should be well defined. The quantity of material presented is equally important. If bar graphs are constructed, then care must be taken to display neither too many nor too few groups. The same is true of tabular material. Many methods are available for summarizing data in both numeric and graphic form. In this chapter these methods are summarized and their strengths and weaknesses noted.

2.2 Measures of Location The basic problem of statistics can be stated as follows: Consider a sample of data x1, . . . , xn, where x1 corresponds to the first sample point and xn corresponds to the

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2.2  ■  Measures of Location   7

Figure 2.2

Mean carbon-monoxide concentration (± standard error) by time of day as measured in the working environment of passive smokers and in nonsmokers who work in a nonsmoking environment 13.0

CO concentration (parts per million, mean ± standard error)

12.0 11.0 10.0 9.0 8.0 7.0 6.0 5.0 4.0 3.0 2.0 1.0 7

8

9

10

A.M.

11

12 1 Noon

2

3

4

5

6

7 P.M.

Passive smokers Nonsmokers who work in nonsmoking environment Source: Reproduced with permission of The New England Journal of Medicine, 302, 720–723, 1980.

nth sample point. Presuming that the sample is drawn from some population P, what inferences or conclusions can be made about P from the sample? Before this question can be answered, the data must be summarized as succinctly as possible; this is because the number of sample points is often large, and it is easy to lose track of the overall picture when looking at individual sample points. One type of measure useful for summarizing data defines the center, or middle, of the sample. This type of measure is a measure of location.

The Arithmetic Mean How to define the middle of a sample may seem obvious, but the more you think about it, the less obvious it becomes. Suppose the sample consists of the birthweights of all live-born infants born at a private hospital in San Diego, California, during a 1-week period. This sample is shown in Table 2.1. One measure of location for this sample is the arithmetic mean (colloquially called the average). The arithmetic mean (or mean or sample mean) is usually ­denoted by x.

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8   C H A P T E R 2 

  Descriptive Statistics

Table 2.1

Definition 2.1

Sample of birthweights (g) of live-born infants born at a private hospital in San Diego, California, during a 1-week period i

xi

i

xi

i

xi

i

xi

1 2 3 4 5

3265 3260 3245 3484 4146

6 7 8 9 10

3323 3649 3200 3031 2069

11 12 13 14 15

2581 2841 3609 2838 3541

16 17 18 19 20

2759 3248 3314 3101 2834

The arithmetic mean is the sum of all the observations divided by the number of observations. It is written in statistical terms as x=

1 n ∑x n i =1 i

The sign Σ (sigma) in Definition 2.1 is a summation sign. The expression n

∑ xi

i =1

is simply a short way of writing the quantity ( x1 + x2 + L + xn ). If a and b are integers, where a ≤ b, then

b

∑ xi

i =a

means xa + xa+1 + L + xb.

If a = b, then ∑ i = a xi = xa . One property of summation signs is that if each term in the summation is a multiple of the same constant c, then c can be factored out from the summation; that is, b

n

n

∑ cxi = c  ∑ xi i =1

Example 2.3

If

x1 = 2

find 3

Solution

i =1

x2 = 5

x3 = -4

3

3

3

3

i =1

i =2

i =1

i =1

∑ xi ∑ xi ∑ xi2 ∑ 2 xi 3

∑3 xi = 2 + 5 - 4 = 3 ∑3 xi = 5 - 4 = 1 =2 i =1 x = 2 + 5 - 4 = 3 i∑ xi = 5 - 4 = 1 ∑ 3 i 3 3 i =1 2 i =2 ∑3 xi = 4 + 25 + 16 = 45 ∑3 2 xi = 2∑3 xi = 6 i =1 i =1 i =1 2 xi = 4 + 25 + 16 = 45 ∑ 2 xi = 2 ∑ xi = 6 ∑ i =1

i =1

i =1

It is important to become familiar with summation signs because they are used extensively throughout the remainder of the text.

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2.2  ■  Measures of Location   9

Example 2.4

What is the arithmetic mean for the sample of birthweights in Table 2.1? x = (3265 + 3260 + L + 2834) 20 = 3166.9 g The arithmetic mean is, in general, a very natural measure of location. One of its main limitations, however, is that it is oversensitive to extreme values. In this instance, it may not be representative of the location of the great majority of sample points. For example, if the first infant in Table 2.1 happened to be a premature infant weighing 500 g rather than 3265 g, then the arithmetic mean of the sample would fall to 3028.7 g. In this instance, 7 of the birthweights would be lower than the arithmetic mean, and 13 would be higher than the arithmetic mean. It is possible in extreme cases for all but one of the sample points to be on one side of the arithmetic mean. In these types of samples, the arithmetic mean is a poor measure of central location because it does not reflect the center of the sample. Nevertheless, the arithmetic mean is by far the most widely used measure of central location.

The Median An alternative measure of location, perhaps second in popularity to the arithmetic mean, is the median or, more precisely, the sample median. Suppose there are n observations in a sample. If these observations are ordered from smallest to largest, then the median is defined as follows:

Definition 2.2

The sample median is  n + 1 (1) The  th largest observation if n is odd  2   n n  (2) The average of the   th and  + 1 th largest observations if n is even  2 2  The rationale for these definitions is to ensure an equal number of sample points on both sides of the sample median. The median is defined differently when n is even and odd because it is impossible to achieve this goal with one uniform definition. Samples with an odd sample size have a unique central point; for example, for samples of size 7, the fourth largest point is the central point in the sense that 3points are smaller than it and 3 points are larger. Samples with an even sample size have no unique central point, and the middle two values must be averaged. Thus, for samples of size 8 the fourth and fifth largest points would be averaged to obtain the median, because neither is the central point.

Example 2.5

Solution

Compute the sample median for the sample in Table 2.1. First, arrange the sample in ascending order: 069, 2581, 2759, 2834, 2838, 2841, 3031, 3101, 3200, 3245, 3248, 3260, 3265, 2 3314, 3323, 3484, 3541, 3609, 3649, 4146 Because n is even, Sample median = average of the 10th and 11th largest observations = (3245 + 3248)/2 = 3246.5 g

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10   C H A P T E R 2 

  Descriptive Statistics

Example 2.6

Table 2.2

Solution

Infectious Disease  Consider the data set in Table 2.2, which consists of white-blood counts taken on admission of all patients entering a small hospital in Allentown, Pennsylvania, on a given day. Compute the median white-blood count. Sample of admission white-blood counts (× 1000) for all patients entering a hospital in Allentown, PA, on a given day i

xi

i

xi

1 2 3 4 5

7 35 5 9 8

6 7 8 9

3 10 12 8

First, order the sample as follows: 3, 5, 7, 8, 8, 9, 10, 12, 35. Because n is odd, the sample median is given by the fifth largest point, which equals 8 or 8000 on the original scale. The main strength of the sample median is that it is insensitive to very large or very small values. In particular, if the second patient in Table 2.2 had a white count of 65,000 rather than 35,000, the sample median would remain unchanged, because the fifth largest value is still 8000. Conversely, the arithmetic mean would increase dramatically from 10,778 in the original sample to 14,111 in the new sample. The main weakness of the sample median is that it is determined mainly by the middle points in a sample and is less sensitive to the actual numeric values of the remaining data points.

Comparison of the Arithmetic Mean and the Median If a distribution is symmetric, then the relative position of the points on each side of the sample median is the same. An example of a distribution that is expected to be roughly symmetric is the distribution of systolic blood-pressure measurements taken on all 30- to 39-year-old factory workers in a given workplace (Figure 2.3a). If a distribution is positively skewed (skewed to the right), then points above the median tend to be farther from the median in absolute value than points below the median. An example of a positively skewed distribution is that of the number of years of oral contraceptive (OC) use among a group of women ages 20 to 29 years (Figure 2.3b). Similarly, if a distribution is negatively skewed (skewed to the left), then points below the median tend to be farther from the median in absolute value than points above the median. An example of a negatively skewed distribution is that of relative humidities observed in a humid climate at the same time of day over a number of days. In this case, most humidities are at or close to 100%, with a few very low humidities on dry days (Figure 2.3c). In many samples, the relationship between the arithmetic mean and the sample median can be used to assess the symmetry of a distribution. In particular, for symmetric distributions the arithmetic mean is approximately the same as the median. For positively skewed distributions, the arithmetic mean tends to be larger than the median; for negatively skewed distributions, the arithmetic mean tends to be smaller than the median.

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2.2  ■  Measures of Location   11

Figure 2.3

Graphic displays of (a) symmetric, (b) positively skewed, and (c) negatively skewed distributions

Number of women

Number of factory workers 0

90

100

110 120 130 140 150 Systolic blood pressure

160

(a)

1

2

3

4

5 6 7 Years of OC use

8

9

10

(b)

Number of days

40% 50% 60% 70% 80% 90% 100% Relative humidity

(c)

The Mode Another widely used measure of location is the mode.

Definition 2.3

The mode is the most frequently occurring value among all the observations in a sample.

Example 2.7

Gynecology  Consider the sample of time intervals between successive menstrual periods for a group of 500 college women age 18 to 21 years, shown in Table 2.3. The frequency column gives the number of women who reported each of the respective durations. The mode is 28 because it is the most frequently occurring value.

Table 2.3

Sample of time intervals between successive menstrual periods (days) in college-age women Value

24 25 26 27 28

Frequency

5 10 28 64 185

Value

Frequency

Value

Frequency

29 30 31 32 33

96 63 24 9 2

34 35 36 37 38

7 3 2 1 1

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12   C H A P T E R 2 

  Descriptive Statistics

Example 2.8

Solution

Compute the mode of the distribution in Table 2.2. The mode is 8000 because it occurs more frequently than any other white-blood count. Some distributions have more than one mode. In fact, one useful method of classifying distributions is by the number of modes present. A distribution with one mode is called unimodal; two modes, bimodal; three modes, trimodal; and so forth.

Example 2.9

Solution

Compute the mode of the distribution in Table 2.1. There is no mode, because all the values occur exactly once. Example 2.9 illustrates a common problem with the mode: It is not a useful measure of location if there is a large number of possible values, each of which occurs infrequently. In such cases the mode will be either far from the center of the sample or, in extreme cases, will not exist, as in Example 2.9. The mode is not used in this text because its mathematical properties are, in general, rather intractable, and in most common situations it is inferior to the arithmetic mean.

The Geometric Mean Many types of laboratory data, specifically data in the form of concentrations of one substance in another, as assessed by serial dilution techniques, can be expressed either as multiples of 2 or as a constant multiplied by a power of 2; that is, outcomes can only be of the form 2kc, k = 0, 1, . . . , for some constant c. For example, the data in Table 2.4 represent the minimum inhibitory concentration (MIC) of penicillin G in the urine for N. gonorrhoeae in 74 patients [2]. The arithmetic mean is not appropriate as a measure of location in this situation because the distribution is very skewed. However, the data do have a certain pattern because the only possible values are of the form 2k(0.03125) for k = 0, 1, 2, . . . . One solution is to work with the ­distribution of the logs of the concentrations. The log concentrations have the property that successive possible concentrations differ by a constant; that is, log(2k+1c) − log(2kc) = log(2k+1) + log c − log(2k) − log c = (k + 1) log 2 − k log 2 = log 2. Thus the log concentrations are equally spaced from each other, and the resulting distribution is now not as skewed as the concentrations themselves. The arithmetic mean can then be computed in the log scale; that is,

Text not available due to copyright restrictions

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2.3  ■  Some Properties of the Arithmetic Mean   13

log x =

1 n ∑ log xi n i =1

and used as a measure of location. However, it is usually preferable to work in the original scale by taking the antilogarithm of log x to form the geometric mean, which leads to the following definition:

Definition 2.4

The geometric mean is the antilogarithm of log x, where

log x =

1 n ∑ log xi n i =1

Any base can be used to compute logarithms for the geometric mean. The geometric mean is the same regardless of which base is used. The only requirement is that the logs and antilogs in Definition 2.4 should be in the same base. Bases often used in practice are base 10 and base e; logs and antilogs using these bases can be computed using many pocket calculators.

Example 2.10

Solution

Infectious Disease  Compute the geometric mean for the sample in Table 2.4.

(1) For convenience, use base 10 to compute the logs and antilogs in this example. (2) Compute 21 log( 0.03125) + 6 log( 0.0625) + 8 log( 0..125) log x =   74 = - 0.846  + 19 log( 0.250 ) + 17 log( 0.50 ) + 3 log(1.0 ) 

(3) The geometric mean = the antilogarithm of −0.846 = 10−0.846 = 0.143.

2.3 Some Properties of the Arithmetic Mean Consider a sample x1, . . . , xn, which will be referred to as the original sample. To ­create a translated sample x1 + c, . . . , xn + c, add a constant c to each data point. Let yi = xi + c, i = 1, . . . , n. Suppose we want to compute the arithmetic mean of the translated sample. We can show that the following relationship holds:

Equation 2.1

If 

  yi = xi + c,   i = 1, . . . , n

then  y = x + c Therefore, to find the arithmetic mean of the y’s, compute the arithmetic mean of the x’s and add the constant c. This principle is useful because it is sometimes convenient to change the ­“origin” of the sample data—that is, to compute the arithmetic mean after the translation and then transform back to the original origin.

Example 2.11

To compute the arithmetic mean of the time interval between menstrual periods in Table 2.3, it is more convenient to work with numbers that are near zero than with numbers near 28. Thus a translated sample might first be created by subtracting 28 days from each outcome in Table 2.3. The arithmetic mean of the translated sample could then be found and 28 added to get the actual arithmetic mean. The calculations are shown in Table 2.5.

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14   C H A P T E R 2 

  Descriptive Statistics

Table 2.5

Translated sample for the duration between successive menstrual periods in college-age women Value

−4 −3 −2 −1   0

Frequency

Value

Frequency

Value

Frequency

1 2 3 4 5

96 63 24 9 2

6 7 8 9 10

7 3 2 1 1

5 10 28 64 185

Note: y = [( -4)(5) + ( -3)(10) + K + (10)(1)] / 500 = 0.54

x = y + 28 = 0.54 + 28 = 28.54 days

Similarly, systolic blood-pressure scores are usually between 100 and 200. Therefore, to obtain the mean of the original sample it is easier to subtract 100 from each blood-pressure score, find the mean of the translated sample, and add 100. What happens to the arithmetic mean if the units or scale being worked with changes? A rescaled sample can be created: yi = cxi, i = 1, . . . , n

Equation 2.2

The following result holds:

If 

yi = cxi, i = 1, . . . , n

then  y = cx Therefore, to find the arithmetic mean of the y’s, compute the arithmetic mean of the x’s and multiply it by the constant c.

Example 2.12

Express the mean birthweight for the data in Table 2.1 in ounces rather than grams.

Solution

We know that 1 oz = 28.35 g and that x = 3166.9 g. Thus, if the data were expressed in terms of ounces,

c=

1 and 28.35

y=

1 (3166.9) = 111.71 oz 28.35

Sometimes we want to change both the origin and the scale of the data at the same time. To do this, apply Equations 2.1 and 2.2 as follows:

Equation 2.3

et x1, . . . , xn be the original sample of data and let yi = c1xi + c2, i = 1, . . . , n L represent a transformed sample obtained by multiplying each original sample point by a factor c1 and then shifting over by a constant c2. yi = c1xi + c2,

If 

then  y = c1x + c2

i = 1, . . . , n

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2.4  ■  Measures of Spread   15

Example 2.13

If we have a sample of temperatures in °C with an arithmetic mean of 11.75°C, then what is the arithmetic mean in °F?

Solution

Let yi denote the °F temperature that corresponds to a °C temperature of xi. The ­required transformation to convert the data to °F would be

9 xi + 32, i = 1, . . . , n 5 so the arithmetic mean would be yi =

y=

9 (11.75) + 32 = 53.15 ºF 5

2.4 Measures of Spread Consider Figure 2.4, which represents two samples of cholesterol measurements, each on the same person, but using different measurement techniques. The samples appear to have about the same center, and whatever measure of central location is used is probably about the same in the two samples. In fact, the arithmetic means are both 200 mg/dL. Visually, however, the two samples appear radically different. This difference lies in the greater variability, or spread, of the Autoanalyzer method relative to the Microenzymatic method. In this section, the notion of variability is quantified. Many samples can be well described by a combination of a measure of location and a measure of spread.

The Range Several different measures can be used to describe the variability of a sample. Perhaps the simplest measure is the range.

Definition 2.5

The range is the difference between the largest and smallest observations in a ­sample.

Figure 2.4

Two samples of cholesterol measurements on a given person using the Autoanalyzer and Microenzymatic measurement methods x = 200

177

193 195

192 197

209

202

209

226

Autoanalyzer method (mg/dL)

Microenzymatic method (mg/dL)

200

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16   C H A P T E R 2 

  Descriptive Statistics

Example 2.14

The range in the sample of birthweights in Table 2.1 is

4146 − 2069 = 2077 g

Example 2.15

Compute the ranges for the Autoanalyzer- and Microenzymatic-method data in ­Figure 2.4, and compare the variability of the two methods.

Solution

The range for the Autoanalyzer method = 226 − 177 = 49 mg/dL. The range for the Microenzymatic method = 209 - 192 = 17 mg/dL. The Autoanalyzer method clearly seems more variable. One advantage of the range is that it is very easy to compute once the sample points are ordered. One striking disadvantage is that it is very sensitive to extreme observations. Hence, if the lightest infant in Table 2.1 weighed 500 g rather than 2069 g, then the range would increase dramatically to 4146 - 500 = 3646 g. Another disadvantage of the range is that it depends on the sample size (n). That is, the larger n is, the larger the range tends to be. This complication makes it difficult to compare ranges from data sets of differing size.

Quantiles Another approach that addresses some of the shortcomings of the range in quantifying the spread in a data set is the use of quantiles or percentiles. Intuitively, the pth percentile is the value Vp such that p percent of the sample points are less than or equal to Vp. The median, being the 50th percentile, is a special case of a quantile. As was the case for the median, a different definition is needed for the pth percentile, depending on whether or not np/100 is an integer.

Definition 2.6

The pth percentile is defined by (1) The (k + 1)th largest sample point if np/100 is not an integer (where k is the ­largest integer less than np/100) (2) The average of the (np/100)th and (np/100 + 1)th largest observations if np/100 is an integer. Percentiles are also sometimes called quantiles. The spread of a distribution can be characterized by specifying several percentiles. For example, the 10th and 90th percentiles are often used to characterize spread. Percentiles have the advantage over the range of being less sensitive to outliers and of not being greatly affected by the sample size (n).

Example 2.16

Solution

Compute the 10th and 90th percentiles for the birthweight data in Table 2.1. Because 20 × .1 = 2 and 20 × .9 = 18 are integers, the 10th and 90th percentiles are defined by

10th percentile: average of the second and third largest values = (2581 + 2759)/2 = 2670 g

90th percentile: average of the 18th and 19th largest values = (3609 + 3649)/2 = 3629 g

We would estimate that 80% of birthweights will fall between 2670 g and 3629 g, which gives an overall impression of the spread of the distribution.

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2.4  ■  Measures of Spread   17

Example 2.17

Solution

Compute the 20th percentile for the white-blood-count data in Table 2.2. Because np/100 = 9 × .2 = 1.8 is not an integer, the 20th percentile is defined by the (1 + 1)th largest value = second largest value = 5000. To compute percentiles, the sample points must be ordered. This can be difficult if n is even moderately large. An easy way to accomplish this is to use a stem-andleaf plot (see Section 2.8) or a computer program. There is no limit to the number of percentiles that can be computed. The most useful percentiles are often determined by the sample size and by subject-matter considerations. Frequently used percentiles are quartiles (25th, 50th, and 75th percentiles), quintiles (20th, 40th, 60th, and 80th percentiles), and deciles (10th, 20th, . . . , 90th percentiles). It is almost always instructive to look at some of the quantiles to get an overall impression of the spread and the general shape of a distribution.

The Variance and Standard Deviation The main difference between the Autoanalyzer- and Microenzymatic-method data in Figure 2.4 is that the Microenzymatic-method values are closer to the center of the sample than the Autoanalyzer-method values. If the center of the sample is defined as the arithmetic mean, then a measure that can summarize the difference (or deviations) between the individual sample points and the arithmetic mean is needed; that is,

x1 - x , x2 - x , . . . , xn - x One simple measure that would seem to accomplish this goal is

∑ i =1( xi - x ) n

d=

n

Unfortunately, this measure will not work, because of the following principle:

Equation 2.4

Example 2.18

Solution

The sum of the deviations of the individual observations of a sample about the sample mean is always zero. Compute the sum of the deviations about the mean for the Autoanalyzer- and Microenzymatic-method data in Figure 2.4. For the Autoanalyzer-method data, d = (177 − 200) + (193 − 200) + (195 − 200) + (209 − 200) + (226 − 200) = −23 − 7 − 5 + 9 + 26 = 0

For the Microenzymatic-method data,

d = (192 − 200) + (197 − 200) + (200 − 200) + (202 − 200) + (209 − 200) = −8 − 3 + 0 + 2 + 9 = 0

Thus d does not help distinguish the difference in spreads between the two methods. A second possible measure is

n

∑ | xi - x | /n i =1

which is called the mean deviation. The mean deviation is a reasonable measure ofspread but does not characterize the spread as well as the standard deviation (see Definition 2.8) if the underlying distribution is bell-shaped.

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18   C H A P T E R 2 

  Descriptive Statistics

A third idea is to use the average of the squares of the deviations from the sample mean rather than the deviations themselves. The resulting measure of spread, denoted by s2, is

∑ i =1( xi - x )2 n

Definition 2.7

s2 =

n The more usual form for this measure is with n − 1 in the denominator rather than n. The resulting measure is called the sample variance (or variance). The sample variance, or variance, is defined as follows:

∑ i =1( xi - x )2 n

s2 =

n -1

A rationale for using n − 1 in the denominator rather than n is presented in the discussion of estimation in Chapter 6. Another commonly used measure of spread is the sample standard deviation.

Definition 2.8

The sample standard deviation, or standard deviation, is defined as follows:

∑ i =1( xi - x )2 n

s=

Example 2.19

Solution

n -1

= sample variance

Compute the variance and standard deviation for the Autoanalyzer- and Microenzymatic-method data in Figure 2.4. Autoanalyzer Method 2 2 2 2 2 s2 = (177 - 200 ) + (193 - 200 ) + (195 - 200 ) + ( 209 - 200 ) + ( 226 - 200 )  4   = ( 529 + 49 + 25 + 81 + 676 )/4 = 1360 /4 = 340

s = 340 = 18.4 Microenzymatic Method 2 2 2 2 2 s2 = (192 - 200 ) + (197 - 200 ) + ( 200 - 200 ) + ( 202 - 200 ) + ( 209 - 200 )  4   = (64 + 9 + 0 + 4 + 81)/4 = 158 /4 = 39.5

s = 39.5 = 6.3 Thus the Autoanalyzer method has a standard deviation roughly three times as large as that of the Microenzymatic method.

2.5 Some Properties of the Variance and Standard Deviation The same question can be asked of the variance and standard deviation as of the arithmetic mean: namely, how are they affected by a change in origin or a change in the units being worked with? Suppose there is a sample x1, . . . , xn and all data points in the sample are shifted by a constant c; that is, a new sample y1, . . . , yn is created such that yi = xi + c, i = 1, . . . , n. In Figure 2.5, we would clearly expect the variance and standard deviation to remain the same because the relationship of the points in the sample relative to one another remains the same. This property is stated as follows:

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2.5  ■  Some Properties of the Variance and Standard Deviation    19

Figure 2.5

Comparison of the variances of two samples, where one sample has an origin shifted relative to the other x

x

x

x

y

x sample

xx

y

y

y

y y

y sample

Suppose there are two samples

Equation 2.5

x1, . . . , xn   and   y1, . . . , yn

where yi = xi + c,  i = 1, . . . , n

If the respective sample variances of the two samples are denoted by sx2   and   sy2

then  sy2 = sx2

Example 2.20

Compare the variances and standard deviations for the menstrual-period data in Tables 2.3 and 2.5.

Solution

The variance and standard deviation of the two samples are the same because the second sample was obtained from the first by subtracting 28 days from each data value; that is, yi = xi − 28

Suppose the units are now changed so that a new sample y1, . . . , yn is created such that yi = cxi, i = 1, . . . , n. The following relationship holds between the variances of the two samples.

Suppose there are two samples

Equation 2.6

x1, . . . , xn   and   y1, . . . , yn

where  yi = cxi,  i = 1, . . . , n,  c > 0

Then  sy2 = c2sx2  sy = csx

This can be shown by noting that

∑ i =1 ( yi - y )2 = ∑ i =1 (cxi - cx )2 n

sy2 =

n

n -1

n -1

∑ i =1[c( xi - x )] n

= =

n -1

c

2

∑ i =1 ( xi - x ) n

n -1

∑ i =1 c 2 ( xi - x )2 n

2

=

n -1

2

= c 2 sx2

sy = c 2 sx2 = csx

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20   C H A P T E R 2 

  Descriptive Statistics

Example 2.21

Compute the variance and standard deviation of the birthweight data in Table 2.1 in both grams and ounces.

Solution

The original data are given in grams, so first compute the variance and standard deviation in these units. (3265 - 3166.9)2 + L + (2834 - 3166.9)2 19 = 3,768,147.8 /19 = 198, 323.6 g 2 s = 445.3 g

s2 =

To compute the variance and standard deviation in ounces, note that

1 oz = 28.35 g or

yi =

1 x 28.35 i

1 s2 ( g ) = 246.8 oz 2 28.352 1 s(oz ) = s( g ) = 15.7 oz 28.35

Thus s2 (oz ) =

Thus, if the sample points change in scale by a factor of c, the variance changes by a factor of c2 and the standard deviation changes by a factor of c. This relationship is the main reason why the standard deviation is more often used than the variance as a measure of spread: the standard deviation and the arithmetic mean are in the same units, whereas the variance and the arithmetic mean are not. Thus, as illustrated in Examples 2.12 and 2.21, both the mean and the standard deviation change by a factor of 1/28.35 in the birthweight data of Table 2.1 when the units are expressed in ounces rather than in grams. The mean and standard deviation are the most widely used measures of location and spread in the literature. One of the main reasons for this is that the normal (or bell-shaped) distribution is defined explicitly in terms of these two parameters, and this distribution has wide applicability in many biological and medical settings. The normal distribution is discussed extensively in Chapter 5.

2.6 The Coefficient of Variation It is useful to relate the arithmetic mean and the standard deviation to each other because, for example, a standard deviation of 10 means something different conceptually if the arithmetic mean is 10 than if it is 1000. A special measure, the coefficient of variation, is often used for this purpose.

Definition 2.9

The coefficient of variation (CV ) is defined by

100% × ( s/x )

This measure remains the same regardless of what units are used because if the units change by a factor c, then both the mean and standard deviation change by the factor c; the CV, which is the ratio between them, remains unchanged.

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2.6  ■  The Coefficient of Variation   21

Example 2.22

Table 2.6

Compute the coefficient of variation for the data in Table 2.1 when the birthweights are expressed in either grams or ounces. Reproducibility of cardiovascular risk factors in children, Bogalusa Heart Study, 1978–1979

Height (cm) Weight (kg) Triceps skin fold (mm) Systolic blood pressure (mm Hg) Diastolic blood pressure (mm Hg) Total cholesterol (mg/dL) HDL cholesterol (mg/dL)

Solution

n

Mean

sd

CV (%)

364 365 362 337 337 395 349

142.6 39.5 15.2 104.0 64.0 160.4 56.9

0.31 0.77 0.51 4.97 4.57 3.44 5.89

0.2 1.9 3.4 4.8 7.1 2.1 10.4

CV = 100% × ( s/x ) = 100% × (445.3 g/3166.9 g ) = 14.1%

If the data were expressed in ounces, then

CV = 100% × (15.7 oz/111.71 oz) = 14.1%

REVIEW QUESTIONS 2A

1

When is it appropriate to use the arithmetic mean as opposed to the median?

2

How does the geometric mean differ from the arithmetic mean? What type of data is the geometric mean used for?

3

What is the difference between the standard deviation and the CV? When is it a­ ppropriate to use each measure?

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REVIEW

The CV is most useful in comparing the variability of several different samples, each with different arithmetic means. This is because a higher variability is usually expected when the mean increases, and the CV is a measure that accounts for this variability. Thus, if we are conducting a study in which air pollution is measured at several sites and we wish to compare day-to-day variability at the different sites, we might expect a higher variability for the more highly polluted sites. A more accurate comparison could be made by comparing the CVs at different sites than by comparing the standard deviations. The CV is also useful for comparing the reproducibility of different variables. Consider, for example, data from the Bogalusa Heart Study, a large study of cardiovascular risk factors in children [3] that began in the 1970s and continues up to the present time. At approximately 3-year intervals, cardiovascular risk factors such as blood pressure, weight, and cholesterol levels were measured for each of the children in the study. In 1978, replicate measurements were obtained for a subset of the children a short time apart from regularly scheduled risk factor measurements. Table 2.6 presents reproducibility data on a selected subset of cardiovascular risk factors. We note that the CV ranges from 0.2% for height to 10.4% for HDL cholesterol. The standard deviations reported here are within-subject standard deviations based on repeated assessments on the same child. Details on how within- and between-subject variations are computed are covered in Chapter 12 in the discussion of the randomeffects analysis-of-variance model.

22   C H A P T E R 2 

  Descriptive Statistics

Table 2.7

Sample of birthweights (oz) from 100 consecutive deliveries at a Boston hospital   58 120 123 104 121 111   91 104 128 133

118 86 134 132 68 121 122 115 106 115

92 115 94 98 107 124 138 138 125 127

108 118 67 146 122 104 99 105 108 135

132 95 124 132 126 125 115 144 98 89

32 83 155 93 88 102 104 87 133 121

140 112 105 85 89 122 98 88 104 112

138 128 100 94 108 137 89 103 122 135

96 127 112 116 115 110 119 108 124 115

161 124 141 113 85 101 109 109 110 64

2.7 Grouped Data Sometimes the sample size is too large to display all the raw data. Also, data are frequently collected in grouped form because the required degree of accuracy to measure a quantity exactly is often lacking due either to measurement error or to imprecise patient recall. For example, systolic blood-pressure measurements taken with a standard cuff are usually specified to the nearest 2 mm Hg because assessing them with any more precision is difficult using this instrument. Thus, a stated measurement of 120 mm Hg may actually imply that the reading is some number ≥119 mm Hg and upper quartile + 3.0 × (upper quartile − lower quartile) or (2) x < lower quartile − 3.0 × (upper quartile − lower quartile) The box plot is then completed by (1) Drawing a vertical bar from the upper quartile to the largest nonoutlying value in the sample (2) Drawing a vertical bar from the lower quartile to the smallest nonoutlying value in the sample (3) Individually identifying the outlying and extreme outlying values in the sample by zeroes (0) and asterisks (*), respectively

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2.9  ■  Case Study 1   29

Example 2.24

Using the box plot in Figure 2.8, comment on the spread of the sample in Table 2.7 and the presence of outlying values.

Solution

It can be shown from Definition 2.6 that the upper and lower quartiles are 124.5 and 98.5 oz, respectively. Hence, an outlying value x must satisfy the following relations: x > 124.5 + 1.5 × (124.5 − 98.5) = 124.5 + 39.0 = 163.5 or x < 98.5 − 1.5 × (124.5 − 98.5) = 98.5 − 39.0 = 59.5 Similarly, an extreme outlying value x must satisfy the following relations: x > 124.5 + 3.0 × (124.5 − 98.5) = 124.5 + 78.0 = 202.5 or x < 98.5 − 3.0 × (124.5 − 98.5) = 98.5 − 78.0 = 20.5 Thus the values 32 and 58 oz are outlying values but not extreme outlying values. These values are identified by 0’s on the box plot. A vertical bar extends from 64 oz (the smallest nonoutlying value) to the lower quartile and from 161 oz (the ­largest nonoutlying value = the largest value in the sample) to the upper quartile. The ­accuracy of the two identified outlying values should probably be checked. The methods used to identify outlying values in Definitions 2.11 and 2.12 are descriptive and unfortunately are sensitive to sample size, with more outliers detected for larger sample sizes. Alternative methods for identifying outliers based on a hypothesis-testing framework are given in Chapter 8. Many more details on stem-and-leaf plots, box plots, and other exploratory data methods are given in Tukey [4].

1

What is a stem-and-leaf plot? How does it differ from a bar graph?

2

Consider the bar graph in Figure 2.1. Is it possible to construct a stem-and-leaf plot from the data presented? If so, construct the plot.

3

Consider the stem-and-leaf plot in Figure 2.6. Is it possible to construct a bar graph from the data presented? If so, construct the plot.

4

What is a box plot? What additional information does this type of display give that is not available from either a bar graph or stem-and-leaf plot?

2.9 Case Study 1: Effects of Lead Exposure on Neurological and Psychological Function in Children The effects of exposure to lead on the psychological and neurological well-being of children were studied [5]. Complete raw data for this study are in Data Set LEAD.DAT, and documentation for this file is in Data Set LEAD.DOC. Dr. Philip Landrigan, Mount Sinai Medical Center, New York City, provided this data set. All data sets are on the Companion Website. In summary, blood levels of lead were measured in a group of children who lived near a lead smelter in El Paso, Texas. Forty-six children with blood-lead levels ≥ 40 µg/mL were identified in 1972 (a few children were identified in 1973); this group is defined by the variable GROUP = 2. A control group of 78 children with blood-lead levels < 40 µg/mL were also identified in 1972 and 1973; this group is defined by the variable GROUP = 1. All children lived close to the lead smelter.

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REVIEW

REVIEW QUESTIONS 2B

30   C H A P T E R 2 

  Descriptive Statistics

100 90 80 70 60 50 40 30 20 10

Figure 2.10  Wechsler full-scale IQ scores for exposed and control groups, El Paso Lead Study

IQF

MAXFWT

Figure 2.9  Number of finger–wrist taps in the dominant hand for exposed and control groups, El Paso Lead Study

* 1

2 GROUP

1 = control 2 = exposed

140 130 120 110 100 90 80 70 60 50

* *

* *

*

1

2 GROUP

1 = control 2 = exposed

Two important outcome variables were studied: (1) the number of finger–wrist taps in the dominant hand (a measure of neurological function) and (2) the Wechsler full-scale IQ score. To explore the relationship of lead exposure to the outcome variables, we used MINITAB to obtain box plots for these two variables for children in the exposed and control groups. These box plots are shown in Figures 2.9 and 2.10, respectively. Because the dominant hand was not identified in the database, we used the larger of the finger–wrist tapping scores for the right and left hand as a proxy for the number of finger–wrist taps in the dominant hand. We note that although there is considerable spread within each group, both ­finger–wrist tapping scores (MAXFWT) and full-scale IQ scores (IQF) seem slightly lower in the exposed group than in the control group. We analyze these data in more detail in later chapters, using t tests, analysis of variance, and regression methods.

2.10 Case Study 2: Effects of Tobacco Use on Bone-Mineral Density in Middle-Aged Women A twin study was performed on the relationship between bone density and cigarette consumption [6]. Forty-one pairs of middle-aged female twins who were discordant for tobacco consumption (had different smoking histories) were enrolled in a study in Australia and invited to visit a hospital in Victoria, Australia, for a measurement of bone density. Additional information was also obtained from the participants via questionnaire, including details of tobacco use; alcohol, coffee, and tea consumption; intake of calcium from dairy products; menopausal, reproductive, and fracture history; use of oral contraceptives or estrogen replacement therapy; and assessment of physical activity. Dr. John Hopper, University of Melbourne, School of Population Health, Australia, provided the data set for this study, which is available on the Companion Website under the file name BONEDEN.DAT with documentation in BONEDEN.DOC. Tobacco consumption was expressed in terms of pack-years. One pack-year is ­defined as 1 pack of cigarettes per day (usually about 20 cigarettes per pack) consumed for 1 year. One advantage of using twins in a study such as this is that genetic influences on bone density are inherently controlled for. To analyze the data,

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2.12  ■  Summary   31

the investigators first identified the heavier- and lighter-smoking twins in terms of pack-years. The lighter-smoking twin usually had 0 pack-years (indicating she had never smoked) or occasionally either smoked very few cigarettes per day and/ or smoked for only a short time. The researchers then looked at the difference in bone-mineral density (BMD) (calculated by subtracting the BMD in the heaviersmoking twin from the BMD in the lighter-smoking twin, expressed as a percentage of the average bone density of the twins) as a function of the difference in tobacco use (calculated as pack-years for the heavier-smoking twin minus pack-years for the lighter-smoking twin). BMD was assessed separately at three sites: the lumbar spine (lower back), the femoral neck (hip), and the femoral shaft (hip). A scatter plot showing the relationship between the difference in BMD versus the difference in tobacco use is given in Figure 2.11. Note that for the lumbar spine an inverse relationship appears between the difference in BMD and the difference in tobacco use (a downward trend). Virtually all the differences in BMD are below 0, especially for twins with a large difference in tobacco use (≥30 pack-years), indicating that the heavier-smoking twin had a lower BMD than the lighter-smoking twin. A similar relationship holds for BMD in the femoral neck. Results are less clear for the femoral shaft. This is a classic example of a matched-pair study, which we discuss in detail beginning in Chapter 8. For such a study, the exposed (heavier-smoking twin) and control (lighter-smoking twin) are matched on other characteristics related to the outcome (BMD). In this case, the matching is based on having similar genes. We analyze this data set in more detail in later chapters, using methods based on the binomial distribution, t tests, and regression analysis.

2.11 Obtaining Descriptive Statistics on the Computer Numerous statistical packages can be used to obtain descriptive statistics as well as for other statistical functions used in probability, estimation, and hypothesis testing that are covered later in this book. The Companion Website for this book explains in detail how to use Microsoft Excel to perform these functions. Read the first chapter in the Companion Website for details on obtaining descriptive statistics using Excel. Functions available include Average (for the arithmetic mean), Median (for the median), Stdev (for the standard deviation), Var (for the variance), GeoMean (for the geometric mean), and Percentile (for obtaining arbitrary percentiles from a sample).

2.12 Summary This chapter presented several numeric and graphic methods for describing data. These techniques are used to (1) quickly summarize a data set (2) and/or present results to others In general, a data set can be described numerically in terms of a measure of location and a measure of spread. Several alternatives were introduced, including the arithmetic mean, median, mode, and geometric mean, as possible choices for measures of location, and the standard deviation, quantiles, and range as possible choices for measures of spread. Criteria were discussed for choosing the

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32   C H A P T E R 2 

Figure 2.11

Within-pair differences in bone density at the lumbar spine, femoral neck, and femoral shaft as a function of within-pair differences in pack-years of tobacco use in 41 pairs of female twins. Monozygotic (identical) twins are represented by solid circles and dizygotic (fraternal) twins by open circles. The difference in bone density between members of a pair is expressed as the percentage of the mean bone density for the pair. 40 Lumbar spine 20 0 –20 – 40 Difference in bone-mineral density (%)

  Descriptive Statistics

10

20

30

40

50

60

70

50 Femoral neck 25 0 –25 –50

40

10

20

30

40

50

60

70

Femoral shaft

20 0 –20 – 40

10 20 30 40 50 60 Difference in tobacco use (pack-years)

70

Source: From “The bone density of female twins discordant for tobacco use,” by J. H. Hopper and E. Seeman, 1994, The New England Journal of Medicine, 330, 387–392. Copyright © 1994 Massachusetts Medical Society. All rights reserved.

appropriate measures in particular circumstances. Several graphic techniques for summarizing data, including traditional methods, such as the bar graph, and more modern methods characteristic of exploratory data analysis (EDA), such as the stem-and-leaf plot and box plot, were introduced. How do the descriptive methods in this chapter fit in with the methods of statistical inference discussed later in this book? Specifically, if, based on some prespecified hypotheses, some interesting trends can be found using descriptive methods,

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Problems   33

then we need some criteria to judge how “significant” these trends are. For this purpose, several commonly used probability models are introduced in Chapters 3 through 5 and approaches for testing the validity of these models using the methods of statistical inference are explored in Chapters 6 through 14.

P rob l e m s

Infectious Disease The data in Table 2.11 are a sample from a larger data set collected on people discharged from a selected Pennsylvania hospital as part of a retrospective chart review of antibiotic usage in hospitals [7]. The data are also given in Data Set HOSPITAL.DAT with documentation in HOSPITAL.DOC on the Companion Website. Each data set on the Companion Website is available in six formats: ASCII, MINITAB-readable format, Excel-readable format, SASreadable format, SPSS-readable format, and Stata-readable format.

2.1  Compute the mean and median for the duration of hospitalization for the 25 patients. 2.2  Compute the standard deviation and range for the duration of hospitalization for the 25 patients. 2.3  It is of clinical interest to know if the duration of hospitalization is affected by whether a patient has received antibiotics. Answer this question descriptively using either numeric or graphic methods. Suppose the scale for a data set is changed by multiplying each observation by a positive constant.

Table 2.11   Hospital-stay data ID no.

Duration of hospital stay

Age

Sex 1 = M 2 = F

First temp. following admission

First WBC (× 103) following admission

Received antibiotic 1 = yes 2 = no

Received bacterial culture 1 = yes 2 = no

Service 1 = med. 2 = surg.

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25

5 10 6 11 5 14 30 11 17 3 9 3 8 8 5 5 7 4 3 7 9 11 11 9 4

30 73 40 47 25 82 60 56 43 50 59 4 22 33 20 32 36 69 47 22 11 19 67 43 41

2 2 2 2 2 1 1 2 2 1 2 1 2 2 2 1 1 1 1 1 1 1 2 2 2

99.0 98.0 99.0 98.2 98.5 96.8 99.5 98.6 98.0 98.0 97.6 97.8 99.5 98.4 98.4 99.0 99.2 98.0 97.0 98.2 98.2 98.6 97.6 98.6 98.0

8 5 12 4 11 6 8 7 7 12 7 3 11 14 11 9 6 6 5 6 10 14 4 5 5

2 2 2 2 2 1 1 2 2 2 2 2 1 1 2 2 1 2 1 2 2 1 2 2 2

2 1 2 2 2 2 1 2 2 1 1 2 2 1 1 2 2 2 2 2 2 2 2 2 2

1 1 2 2 2 2 1 1 1 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1

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34   C H A P T E R 2 

  Descriptive Statistics

*2.5  What is the effect on the mode?

Table 2.13  Serum-cholesterol levels (mg/dL) before and after adopting a vegetarian diet

*2.6  What is the effect on the geometric mean?

Subject

*2.4  What is the effect on the median?

*2.7  What is the effect on the range? *Asterisk indicates that the answer to the problem is given in the Answer Section at the back of the book.

Ophthalmology Table 2.12 comes from a paper giving the distribution of astigmatism in 1033 young men ranging in age from 18 to 22 who were accepted for military service in Great Britain [8]. Assume that astigmatism is rounded to the nearest 10th of a diopter and each subject in a group has the average astigmatism within that group (e.g., for the group 0.2–0.3 diopters, the actual range is from 0.15 to 0.35 diopters), and assume that each man in the group has an astigmatism of (0.15 + 0.35)/2 = 0.25 diopters. 2.8  Compute the arithmetic mean. 2.9  Compute the standard deviation. 2.10  Construct a bar graph to display the distribution of astigmatism. 2.11  Suppose we wish to construct an upper boundary for astigmatism so that no more than 5% of military recruits exceed this upper boundary. What is the smallest possible value for this upper boundary? Table 2.12  Distribution of astigmatism in 1033 young men age 18-22 Degree of astigmatism (diopters)

Frequency

0.0 or less than 0.2 0.2–0.3 0.4–0.5 0.6–1.0 1.1–2.0 2.1–3.0 3.1–4.0 4.1–5.0 5.1–6.0

458 268 151 79 44 19 9 3 2 1033

Source: Reprinted with permission of the Editor, the authors and the Journal from the British Medical Journal, May 7, 1394–1398, 1960.

Cardiovascular Disease The data in Table 2.13 are a sample of cholesterol levels taken from 24 hospital employees who were on a standard American diet and who agreed to adopt a vegetarian diet for 1 month. Serum-cholesterol measurements were made before adopting the diet and 1 month after. *2.12  Compute the mean change in cholesterol.

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24

Before

After

195 145 205 159 244 166 250 236 192 224 238 197 169 158 151 197 180 222 168 168 167 161 178 137

146 155 178 146 208 147 202 215 184 208 206 169 182 127 149 178 161 187 176 145 154 153 137 125

Difference*

49 −10 27 13 36 19 48 21 8 16 32 28 −13 31 2 19 19 35 −8 23 13 8 41 12

*Before – after.

*2.13  Compute the standard deviation of the change in cholesterol levels. 2.14  Construct a stem-and-leaf plot of the cholesterol changes. *2.15  Compute the median change in cholesterol. 2.16  Construct a box plot of the cholesterol changes to the right of the stem-and-leaf plot. 2.17  Comment on the symmetry of the distribution of change scores based on your answers to Problems 2.12 through 2.16. 2.18  Some investigators believe that the effects of diet on cholesterol are more evident in people with high rather than low cholesterol levels. If you split the data in Table 2.13 according to whether baseline cholesterol is above or below the median, can you comment descriptively on this issue?

Hypertension In an experiment that examined the effect of body position on blood pressure [9], 32 participants had their blood pressures

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Problems   35

measured while lying down with their arms at their sides and again standing with their arms supported at heart level. The data are given in Table 2.14.

2.21  Based on your answers to Problems 2.19 and 2.20, comment on the effect of body position on the levels of ­systolic and diastolic blood pressure.

2.19  Compute the arithmetic mean and median for the difference in systolic and diastolic blood pressure, respectively, taken in different positions (recumbent minus standing).

2.22  Orthostatic hypertension is sometimes defined based on an unusual change in blood pressure after changing position. Suppose we define a normal range for change in systolic blood pressure (SBP) based on change in SBP from the recumbent to the standing position in Table 2.14 that is between the upper and lower decile. What should the normal range be?

2.20  Construct stem-and-leaf and box plots for the difference scores for each type of blood pressure. Table 2.14  Effect of position on blood pressure Participant

B. R. A. J. A. B. F. L. B. V. P. B. M. F. B. E. H. B. G. C. M. M. C. T. J. F. R. R. F. C. R. F. E. W. G. T. F. H. E. J. H. H. B. H. R. T. K. W. E. L. R. L. L. H. S. M. V. J. M. R. H. P. R. C. R. J. A. R. A. K. R. T. H. S. O. E. S. R. E. S. E. C. T. J. H. T. F. P. V. P. F. W. W. J. W.

Blood pressure (mm Hg) Recumbent, arm at side

99a 126 108 122 104 108 116 106 118 92 110 138 120 142 118 134 118 126 108 136 110 120 108 132 102 118 116 118 110 122 106 146

  71b 74 72 68 64 60 70 74 82 58 78 80 70 88 58 76 72 78 78 86 78 74 74 92 68 70 76 80 74 72 62 90

Pulmonary Disease

Standing, arm at heart level

105a 124 102 114 96 96 106 106 120 88 102 124 118 136 92 126 108 114 94 144 100 106 94 128 96 102 88 100 96 118 94 138

79b 76 68 72 62 56 70 76 90 60 80 76 84 90 58 68 68 76 70 88 64 70 74 88 64 68 60 84 70 78 56 94

Systolic blood pressure Diastolic blood pressure Source: C. E. Kossman (1946), “Relative importance of certain variables in the clinical determination of blood pressure,” American Journal of ­Medicine, 1, 464–467. Reprinted with permission of the American ­Journal of ­Medicine. a

b

Forced expiratory volume (FEV) is an index of pulmonary function that measures the volume of air expelled after 1 second of constant effort. Data set FEV.DAT on the Companion Website contains determinations of FEV in 1980 on 654 children ages 3 through 19 who were seen in the Childhood Respiratory Disease (CRD) Study in East Boston, Massachusetts. These data are part of a longitudinal study to follow the change in pulmonary function over time in children [10]. The data in Table 2.15 are available for each child. Table 2.15  Format for FEV.DAT Column

Variable

Format or code

1–5 7–8 10–15 17–20 22 24

ID number Age (years) FEV (liters) Height (inches) Sex Smoking status

X.XXX XX.X 0 = female/1 = male 0 = noncurrent smoker/ 1 = current smoker

2.23  For each variable (other than ID), obtain appropriate descriptive statistics (both numeric and graphic). 2.24  Use both numeric and graphic measures to assess the relationship of FEV to age, height, and smoking status. (Do this separately for boys and girls.) 2.25  Compare the pattern of growth of FEV by age for boys and girls. Are there any similarities? Any differences?

Nutrition The food-frequency questionnaire (FFQ) is an instrument often used in dietary epidemiology to assess consumption of specific foods. A person is asked to write down the number of servings per day typically eaten in the past year of over 100 individual food items. A food-composition table is then used to compute nutrient intakes (protein, fat, etc.) based on aggregating responses for individual foods. The FFQ is inexpensive to administer but is considered less accurate than the diet record (DR) (the gold standard of dietary epidemiology). For the DR, a participant writes down

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36   C H A P T E R 2 

  Descriptive Statistics

the amount of each specific food eaten over the past week in a food diary and a nutritionist using a special computer program computes nutrient intakes from the food diaries. This is a much more expensive method of dietary recording. To validate the FFQ, 173 nurses participating in the Nurses’ Health Study completed 4 weeks of diet recording about equally spaced over a 12-month period and an FFQ at the end of diet recording [11]. Data are presented in data set VALID.DAT on the Companion Website for saturated fat, total fat, total alcohol consumption, and total caloric intake for both the DR and FFQ. For the DR, average nutrient intakes were computed over the 4 weeks of diet recording. Table 2.16 shows the format of this file.

stronger, weaker, or the same when total fat is expressed in terms of nutrient density as opposed to raw nutrient?

Environmental Health, Pediatrics In Section 2.9, we described Data Set LEAD.DAT (on the Companion Website) concerning the effect of lead ­exposure on neurological and psychological function in children. 2.31  Compare the exposed and control groups regarding age and gender, using appropriate numeric and graphic descriptive measures. 2.32  Compare the exposed and control groups regarding verbal and performance IQ, using appropriate numeric and graphic descriptive measures.

Table 2.16  Format for VALID.DAT Column

Variable

Format or code

1–6 8–15 17–24 26–33 35–42 44–51 53–60 62–70 72–80

ID number Saturated fat—DR (g) Saturated fat—FFQ (g) Total fat—DR (g) Total fat—FFQ (g) Alcohol consumption—DR (oz) Alcohol consumption—FFQ (oz) Total calories—DR Total calories—FFQ

XXXXX.XX XXXXX.XX XXXXX.XX XXXXX.XX XXXXX.XX XXXXX.XX XXXXX.XX XXXXXX.XX XXXXXX.XX

2.26  Compute appropriate descriptive statistics for each nutrient for both DR and FFQ, using both numeric and graphic measures. 2.27  Use descriptive statistics to relate nutrient intake for the DR and FFQ. Do you think the FFQ is a reasonably accurate approximation to the DR? Why or why not? 2.28  A frequently used method for quantifying dietary intake is in the form of quintiles. Compute quintiles for each nutrient and each method of recording, and relate the nutrient composition for DR and FFQ using the quintile scale. (That is, how does the quintile category based on DR relate to the quintile category based on FFQ for the same individual?) Do you get the same impression about the concordance between DR and FFQ using quintiles as in Problem 2.27, in which raw (ungrouped) nutrient intake is considered? In nutritional epidemiology, it is customary to assess nutrient intake in relation to total caloric intake. One measure used to accomplish this is nutrient density, which is defined as 100% × (caloric intake of a nutrient/total caloric intake). For fat consumption, 1 g of fat is equivalent to 9 calories. 2.29  Compute the nutrient density for total fat for the DR and FFQ, and obtain appropriate descriptive statistics for this variable. How do they compare? 2.30  Relate the nutrient density for total fat for the DR versus the FFQ using the quintile approach in Problem 2.28. Is the concordance between total fat for DR and FFQ

Cardiovascular Disease Activated-protein-C (APC) resistance is a serum marker that has been associated with thrombosis (the formation of blood clots often leading to heart attacks) among adults. A study assessed this risk factor among adolescents. To assess the reproducibility of the assay, a split-sample technique was used in which a blood sample was provided by 10 people; each sample was split into two aliquots (sub-samples), and each aliquot was assessed separately. Table 2.17 gives the results. Table 2.17  APC resistance split-samples data Sample number

1 2 3 4 5 6 7 8 9 10

A

B

A–B

2.22 3.42 3.68 2.64 2.68 3.29 3.85 2.24 3.25 3.30

1.88 3.59 3.01 2.37 2.26 3.04 3.57 2.29 3.39 3.16

0.34 −0.17 0.67 0.27 0.42 0.25 0.28 −0.05 −0.14 0.14

2.33  Suppose the variation between split samples is thought to be a function of the mean level, where more variation is expected as the mean level increases. What measure of reproducibility can be used under these circumstances? 2.34  Compute the measure in Problem 2.33 for each ­ articipant. Then obtain an average of this measure over the p 10 participants. If this average is less than 10%, it indicates excellent reproducibility. Is this true for APC resistance? (Hint: Consider using Excel to answer this question.)

Microbiology A study was conducted to demonstrate that soy beans inoculated with nitrogen-fixing bacteria yield more and grow

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References   37

adequately without expensive environmentally deleterious synthesized fertilizers. The trial was conducted under controlled conditions with uniform amounts of soil. The initial hypothesis was that inoculated plants would outperform their uninoculated counterparts. This assumption is based on the facts that plants need nitrogen to manufacture vital proteins and amino acids and that nitrogen-fixing bacteria would make more of this substance available to plants, increasing their size and yield. There were 8 inoculated plants (I) and 8 uninoculated plants (U). The plant yield as measured by pod weight for each plant is given in Table 2.18. 2.35  Compute appropriate descriptive statistics for I and U plants. Table 2.18  Pod weight (g) from inoculated (I) and uninoculated (U) plants I

U

1.76 1.45 1.03 1.53 2.34 1.96 1.79 1.21

0.49 0.85 1.00 1.54 1.01 0.75 2.11 0.92

Sample number

1 2 3 4 5 6 7 8

Note: The data for this problem were supplied by David Rosner.

2.36  Use graphic methods to compare the two groups. 2.37  What is your overall impression concerning the pod weight in the two groups?

Endocrinology In Section 2.10, we described Data Set BONEDEN.DAT (on the Companion Website) concerning the effect of tobacco use on BMD. 2.38  For each pair of twins, compute the following for the lumbar spine: A = BMD for the heavier-smoking twin – BMD for the lighter-smoking twin = x1 – x2 B = mean BMD for the twinship = (x1 + x2)/2 C = 100% × (A/B) Derive appropriate descriptive statistics for C over the ­entire study population. 2.39  Suppose we group the twin pairs according to the ­ ifference in tobacco use expressed in 10 pack-year d groups (0–9.9 pack-years/10–19.9 pack-years/20–29.9 pack-years/30–39.9 pack-years/40+ pack-years). Compute appropriate descriptive statistics, and provide a scatter plot for C grouped by the difference in tobacco use in pack-years. 2.40  What impression do you have of the relationship between BMD and tobacco use based on Problem 2.39? 2.41–2.43  Answer Problems 2.38–2.40 for BMD for the femoral neck. 2.44–2.46  Answer Problems 2.38–2.40 for BMD for the femoral shaft.

R eferen c es [1] White, J. R., & Froeb, H. E. (1980). Small-airways dysfunction in nonsmokers chronically exposed to tobacco smoke. New England Journal of Medicine, 302(33), 720–723. [2] Pedersen, A., Wiesner, P., Holmes, K., Johnson, C., & Turck, M. (1972). Spectinomycin and penicillin G in the treatment of gonorrhea. Journal of the American Medical Association, 220(2), 205–208. [3] Foster, T. A., & Berenson, G. (1987). Measurement error and reliability in four pediatric cross-sectional surveys of cardiovascular disease risk factor variables—the Bogalusa Heart Study. Journal of Chronic Diseases, 40(1), 13–21. [4] Tukey, J. (1977). Exploratory data analysis. Reading, MA: Addison-Wesley. [5] Landrigan, P. J., Whitworth, R. H., Baloh, R. W., Staehling, N. W., Barthel, W. F., & Rosenblum, B. F. (1975, March 29). Neuropsychological dysfunction in children with chronic low-level lead absorption. The Lancet, 1, 708–715. [6] Hopper, J. H., & Seeman, E. (1994). The bone density of female twins discordant for tobacco use. New England Journal of Medicine, 330, 387–392.

[7] Townsend, T. R., Shapiro, M., Rosner, B., & Kass, E. H. (1979). Use of antimicrobial drugs in general hospitals. I. ­Description of population and definition of methods. Journal of Infectious Diseases, 139(6), 688–697. [8] Sorsby, A., Sheridan, M., Leary, G. A., & Benjamin, B. (1960, May 7). Vision, visual acuity and ocular refraction of young men in a sample of 1033 subjects. British Medical Journal, 1(5183), 1394–1398. [9] Kossmann, C. E. (1946). Relative importance of certain variables in clinical determination of blood pressure. American Journal of Medicine, 1, 464–467. [10] Tager, I. B., Weiss, S. T., Rosner, B., & Speizer, F. E. (1979). Effect of parental cigarette smoking on pulmonary function in children. American Journal of Epidemiology, 110, 15–26. [11] Willett, W. C., Sampson, L., Stampfer, M. J., Rosner, B., Bain, C., Witschi, J., Hennekens, C. H., & Speizer, F. E. (1985). Reproducibility and validity of a semi-quantitative food frequency questionnaire. American Journal of Epidemiology, 122, 51–65.

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3

Probability

3.1 Introduction Chapter 2 outlined various techniques for concisely describing data. But we usually want to do more with data than just describe them. In particular, we might want to test certain specific inferences about the behavior of the data.

Example 3.1

Cancer  One theory concerning the etiology of breast cancer states that women in a given age group who give birth to their first child relatively late in life (after age 30) are at greater risk for eventually developing breast cancer over some time period t than are women who give birth to their first child early in life (before age 20). Because women in upper social classes tend to have children later, this theory has been used to explain why these women have a higher risk of developing breast cancer than women in lower social classes. To test this hypothesis, we might identify 2000 women from a particular census tract who are currently ages 45–54 and have never had breast cancer, of whom 1000 had their first child before the age of 20 (call this group A) and 1000 after the age of 30 (group B). These 2000 women might be followed for 5 years to assess whether they developed breast cancer during this period. Suppose there are four new cases of breast cancer in group A and five new cases in group B. Is this evidence enough to confirm a difference in risk between the two groups? Most people would feel uneasy about concluding that on the basis of such a limited amount of data. Suppose we had a more ambitious plan and sampled 10,000 women each from groups A and B and at follow-up found 40 new cases in group A and 50 new cases in group B and asked the same question. Although we might be more comfortable with the conclusion because of the larger sample size, we would still have to admit that this apparent difference in the rates could be due to chance. The problem is that we need a conceptual framework to make these decisions but have not explicitly stated what the framework is. This framework is provided by the underlying concept of probability. In this chapter, probability is defined and some rules for working with probabilities are introduced. Understanding probability is essential in calculating and interpreting p-values in the statistical tests of subsequent chapters. It also permits the discussion of sensitivity, specificity, and predictive values of screening tests in Section 3.7.

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3.2  ■  Definition of Probability   39

3.2 Definition of Probability

Example 3.2

Table 3.1

Obstetrics  Suppose we are interested in the probability of a male live childbirth (or livebirth) among all livebirths in the United States. Conventional wisdom tells us this probability should be close to .5. We can explore this subject by looking at some vital-statistics data, as presented in Table 3.1 [1]. The probability of a male livebirth based on 1965 data is .51247; based on 1965–1969 data, .51248; and based on 1965–1974 data, .51268. These empirical probabilities are based on a finite amount of data. In principle, the sample size could be expanded indefinitely and an increasingly more precise estimate of the probability obtained. Probability of a male livebirth during the period 1965–1974 Time period

1965 1965–1969 1965–1974

Number of male livebirths (a)

Total number of livebirths (b)

Empirical probability of a male livebirth (a/b)

1,927,054 9,219,202 17,857,857

3,760,358 17,989,361 34,832,051

.51247 .51248 .51268

This principle leads to the following definition of probability:

Definition 3.1

The sample space is the set of all possible outcomes. In referring to probabilities of events, an event is any set of outcomes of interest. The probability of an event is the relative frequency (see p. 22) of this set of outcomes over an indefinitely large (or infinite) number of trials.

Example 3.3

Pulmonary Disease  The tuberculin skin test is a routine screening test used to detect tuberculosis. The results of this test can be categorized as either positive, negative, or uncertain. If the probability of a positive test is .1, it means that if a large number of such tests were performed, about 10% would be positive. The actual percentage of positive tests will be increasingly close to .1 as the number of tests performed increases.

Example 3.4

Cancer  The probability of developing a breast cancer over 30 years in 40-year-old women who have never had breast cancer is approximately 1/11. This probability means that over a large sample of 40-year-old women who have never had breast cancer, approximately 1 in 11 will develop the disease by age 70, with this proportion becoming increasingly close to 1 in 11 as the number of women sampled increases. In real life, experiments cannot be performed an infinite number of times. Instead, probabilities of events are estimated from the empirical probabilities obtained from large samples (as in Examples 3.2–3.4). In other instances, theoreticalprobability models are constructed from which probabilities of many different kinds of events can be computed. An important issue in statistical inference is to compare empirical probabilities with theoretical probabilities—that is, to assess the goodness-of-fit of probability models. This topic is covered in Section 10.7.

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40   C H A P T E R 3 

  Probability

Example 3.5

Cancer  The probability of developing stomach cancer over a 1-year period in 45to 49-year-old women, based on SEER Tumor Registry data from 2002 to 2006, is 3.7 per 100,000 [2]. Suppose we have studied cancer rates in a small group of U.S. nurses over this period and want to compare how close the rates from this limited sample are to the tumor-registry figures. The value 3.7 per 100,000 would be the best estimate of the probability before collecting any data, and we would then see how closely our new sample data conformed with this probability. From Definition 3.1 and from the preceding examples, we can deduce that probabilities have the following basic properties:

Equation 3.1

(1) The probability of an event E, denoted by Pr(E), always satisfies 0 ≤ Pr(E) ≤ 1.

(2) If outcomes A and B are two events that cannot both happen at the same time, then Pr(A or B occurs) = Pr(A) + Pr(B).

Example 3.6

Hypertension  Let A be the event that a person has normotensive diastolic bloodpressure (DBP) readings (DBP < 90), and let B be the event that a person has borderline DBP readings (90 ≤ DBP < 95). Suppose that Pr(A) = .7, and Pr(B) = .1. Let Z be the event that a person has a DBP < 95. Then Pr ( Z ) = Pr ( A) + Pr ( B ) = .8 because the events A and B cannot occur at the same time.

Definition 3.2

Two events A and B are mutually exclusive if they cannot both happen at the same time. Thus the events A and B in Example 3.6 are mutually exclusive.

Example 3.7

Hypertension  Let X be DBP, C be the event X ≥ 90, and D be the event 75 ≤ X ≤ 100. Events C and D are not mutually exclusive, because they both occur when 90 ≤ X ≤ 100.

3.3 Some Useful Probabilistic Notation

Definition 3.3

The symbol { } is used as shorthand for the phrase “the event.”

Definition 3.4

A ∪ B is the event that either A or B occurs, or they both occur. Figure 3.1 diagrammatically depicts A ∪ B both for the case in which A and B are and are not mutually exclusive.

Example 3.8

Hypertension  Let events A and B be defined as in Example 3.6: A = {X < 90}, B = {90 ≤ X < 95}, where X = DBP. Then A ∪ B = {X < 95}.

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3.3  ■  Some Useful Probabilistic Notation   41

Figure 3.1

Diagrammatic representation of A ∪ B: (a) A, B mutually exclusive; (b) A, B not mutually exclusive

A B A � B shaded (a)

A

B A � B shaded (b)

Example 3.9

Hypertension  Let events C and D be defined as in Example 3.7: C = { X ≥ 90}

D = {75 ≤ X ≤ 100}

Then C ∪ D = {X ≥ 75}

Definition 3.5

A ∩ B is the event that both A and B occur simultaneously. A ∩ B is depicted diagrammatically in Figure 3.2.

Example 3.10

Hypertension  Let events C and D be defined as in Example 3.7; that is, C = { X ≥ 90}

D = {75 ≤ X ≤ 100}

Then C ∩ D = {90 ≤ X ≤ 100}

Figure 3.2

Diagrammatic representation of A ∩ B

A B

A � B shaded

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42   C H A P T E R 3 

  Probability

Figure 3.3

Diagrammatic representation of A

A A

Notice that A ∩ B is not well defined for events A and B in Example 3.6 because both A and B cannot occur simultaneously. This is true for any mutually exclusive events.

Definition 3.6

A is the event that A does not occur. It is called the complement of A. Notice that Pr ( A) = 1 − Pr ( A) , because A occurs only when A does not occur. Event A is diagrammed in Figure 3.3.

Example 3.11

Hypertension  Let events A and C be defined as in Examples 3.6 and 3.7; that is,

A = { X < 90} C = { X ≥ 90} Then C = A , because C can only occur when A does not occur. Notice that

)

Pr (C ) = Pr ( A = 1 − .7 = .3 Thus, if 70% of people have DBP < 90, then 30% of people must have DBP ≥ 90.

3.4 The Multiplication Law of Probability In the preceding section, events in general were described. In this section, certain specific types of events are discussed.

Example 3.12

Hypertension, Genetics  Suppose we are conducting a hypertension-screening program in the home. Consider all possible pairs of DBP measurements of the mother and father within a given family, assuming that the mother and father are not genetically related. This sample space consists of all pairs of numbers of the form (X, Y) where X > 0, Y > 0. Certain specific events might be of interest in this context. In particular, we might be interested in whether the mother or father is hypertensive, which is described, respectively, by events A = {mother’s DBP ≥ 95}, B = {father’s DBP ≥ 95}. These events are diagrammed in Figure 3.4. Suppose we know that Pr(A) = .1, Pr(B) = .2. What can we say about Pr(A ∩ B) = Pr(mother’s DBP ≥ 95 and father’s DBP ≥ 95) = Pr(both mother and father are hypertensive)? We can say nothing unless we are willing to make certain assumptions.

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3.4  ■  The Multiplication Law of Probability   43

Figure 3.4

Possible diastolic blood-pressure measurements of the mother and father within a given family Father’s DBP

95

95

Mother’s DBP

= event A = {mother’s DBP ≥ 95} = event B = {father’s DBP ≥ 95} = event A � B = {both DBP ≥ 95}

Definition 3.7

Two events A and B are called independent events if

Example 3.13

Solution

Pr ( A ∩ B ) = Pr ( A) × Pr ( B )

Hypertension, Genetics  Compute the probability that both mother and father are hypertensive if the events in Example 3.12 are independent. If A and B are independent events, then Pr ( A ∩ B ) = Pr ( A) × Pr ( B ) = .1 (.2 ) = .02 One way to interpret this example is to assume that the hypertensive status of the mother does not depend at all on the hypertensive status of the father. Thus, if these events are independent, then in 10% of all households where the father is hypertensive the mother is also hypertensive, and in 10% of all households where the father is not hypertensive the mother is hypertensive. We would expect these two events to be independent if the primary determinants of elevated blood pressure were genetic. However, if the primary determinants of elevated blood pressure were, to some extent, environmental, then we would expect the mother would be more likely to have elevated blood pressure (A true) if the father had elevated blood pressure (B true) than if the father did not have elevated blood pressure (B not true). In this latter case the events would not be independent. The implications of this lack of independence are discussed later in this chapter. If two events are not independent, then they are said to be dependent.

Definition 3.8

Two events A, B are dependent if Pr ( A ∩ B ) ≠ Pr ( A) × Pr ( B ) Example 3.14 is a classic example of dependent events.

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44   C H A P T E R 3 

  Probability

Example 3.14

Hypertension, Genetics  Consider all possible DBP measurements from a mother and her first-born child. Let A = {mother’s DBP ≥ 95} B = {first-born child’s DBP ≥ 80} Suppose   Pr(A ∩ B) = .05   Pr(A) = .1   Pr(B) = .2 Then   Pr(A ∩ B) = .05 > Pr(A) × Pr(B) = .02 and the events A, B would be dependent. This outcome would be expected because the mother and first-born child both share the same environment and are genetically related. In other words, the firstborn child is more likely to have elevated blood pressure in households where the mother is hypertensive than in households where the mother is not hypertensive.

Example 3.15

Solution

Sexually Transmitted Disease  Suppose two doctors, A and B, test all patients coming into a clinic for syphilis. Let events A+ = {doctor A makes a positive diagnosis} and B+ = {doctor B makes a positive diagnosis}. Suppose doctor A diagnoses 10% of all patients as positive, doctor B diagnoses 17% of all patients as positive, and both doctors diagnose 8% of all patients as positive. Are the events A+, B+ independent? We are given that Pr ( B + ) = .17 Pr ( A+ ∩ B + ) = .08 ( ) Thus Pr ( A+ ∩ B + ) = .08 > Pr ( A+ ) × Pr ( B + ) = .1 (.17) = .017 Pr A+ = .1

and the events are dependent. This result would be expected because there should be a similarity between how two doctors diagnose patients for syphilis. Definition 3.7 can be generalized to the case of k(>2) independent events. This is often called the multiplication law of probability.

Equation 3.2

Multiplication Law of Probability

If A1, . . . , Ak are mutually independent events,

then Pr A 1 ∩ A2 ∩ K ∩ A k = Pr A1 × Pr A 2 × K × Pr Ak

(

)

( )

( )

( )

3.5 The Addition Law of Probability We have seen from the definition of probability that if A and B are mutually exclusive events, then Pr(A ∪ B) = Pr(A) + Pr(B). A more general formula for Pr(A ∪ B) can be developed when events A and B are not necessarily mutually exclusive. This formula, the addition law of probability, is stated as follows:

Equation 3.3

Addition Law of Probability

If A and B are any events,

then Pr(A ∪ B) = Pr(A) + Pr(B) − Pr(A ∩ B) This principle is diagrammed in Figure 3.5. Thus, to compute Pr(A ∪ B), add the probabilities of A and B separately and then subtract the overlap, which is Pr(A ∩ B).

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3.5  ■  The Addition Law of Probability   45

Figure 3.5

Diagrammatic representation of the addition law of probability

A

B

A�B

=A =B =A�B

Example 3.16

Sexually Transmitted Disease  Consider the data in Example 3.15. Suppose a patient is referred for further lab tests if either doctor A or B makes a positive diagnosis. What is the probability that a patient will be referred for further lab tests?

Solution

The event that either doctor makes a positive diagnosis can be represented by A+ ∪ B+. We know that

( )

( )

Pr A+ = .1

Pr B + = .17

(

)

Pr A+ ∩ B + = .08

Therefore, from the addition law of probability,

(

)

( )

( )

(

)

Pr A+ ∪ B + = Pr A+ + Pr B + − Pr A+ ∩ B + = .1 + .17 − .08 8 = .19 Thus 19% of all patients will be referred for further lab tests. Special cases of the addition law are of interest. First, if events A and B are mutually exclusive, then Pr(A ∩ B) = 0 and the addition law reduces to Pr(A ∪ B) = Pr(A) + Pr(B). This property is given in Equation 3.1 for probabilities over any two mutually exclusive events. Second, if events A and B are independent, then by definition Pr(A ∩ B) = Pr(A) × Pr(B) and Pr(A ∪ B) can be rewritten as Pr(A) + (B) − Pr(A) × Pr(B). This leads to the following important special case of the addition law.

Equation 3.4

Addition Law of Probability for Independent Events If two events A and B are independent, then

Pr ( A ∪ B ) = Pr ( A) + Pr ( B ) × [1 − Pr ( A)] This special case of the addition law can be interpreted as follows: The event A ∪ B can be separated into two mutually exclusive events: {A occurs} and {B occurs and A does not occur}. Furthermore, because of the independence of A and B, the probability of the latter event can be written as Pr(B) × [1 − Pr(A)]. This probability is diagrammed in Figure 3.6. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

46   C H A P T E R 3 

  Probability

Figure 3.6

Diagrammatic representation of the addition law of probability for independent events

A

B�A

=A = {B occurs and A does not occur} = B � A

Example 3.17

Solution

Hypertension  Look at Example 3.12, where A = {mother’s DBP ≥ 95} and

B = {father’s DBP ≥ 95}

Pr(A) = .1, Pr(B) = .2, and assume A and B are independent events. Suppose a “hypertensive household” is defined as one in which either the mother or the father is hypertensive, with hypertension defined for the mother and father, respectively, in terms of events A and B. What is the probability of a hypertensive household? Pr(hypertensive household) is Pr ( A ∪ B ) = Pr ( A) + Pr ( B ) × [1 − Pr ( A)] = .1 + .2 (.9) = .28 Thus 28% of all households will be hypertensive. It is possible to extend the addition law to more than two events. In particular, if there are three events A, B, and C, then Pr ( A ∪ B ∪ C ) = Pr ( A) + Pr ( B ) + Pr (C ) − Pr ( A ∩ B ) − Pr ( A ∩ C ) − Pr ( B ∩ C ) + Pr ( A ∩ B ∩ C ) This result can be generalized to an arbitrary number of events, although that is beyond the scope of this text (see [3]).

3.6 Conditional Probability Suppose we want to compute the probability of several events occurring simultaneously. If the events are independent, then we can use the multiplication law of probability to do so. If some of the events are dependent, then a quantitative measure of dependence is needed to extend the multiplication law to the case of dependent events. Consider the following example:

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3.6  ■  Conditional Probability   47

Example 3.18

Cancer  Physicians recommend that all women over age 50 be screened for breast cancer. The definitive test for identifying breast tumors is a breast biopsy. However, this procedure is too expensive and invasive to recommend for all women over the age of 50. Instead, women in this age group are encouraged to have a mammogram every 1 to 2 years. Women with positive mammograms are then tested further with a biopsy. Ideally, the probability of breast cancer among women who are mammogram positive would be 1 and the probability of breast cancer among women who are mammogram negative would be 0. The two events {mammogram positive} and {breast cancer} would then be completely dependent; the results of the screening test would automatically determine the disease state. The opposite extreme is achieved when the events {mammogram positive} and {breast cancer} are completely independent. In this case, the probability of breast cancer would be the same regardless of whether the mammogram is positive or negative, and the mammogram would not be useful in screening for breast cancer and should not be used. These concepts can be quantified in the following way. Let A = {mammogram+}, B = {breast cancer}, and suppose we are interested in the probability of breast cancer (B) given that the mammogram is positive (A). This probability can be written Pr(A ∩ B)/Pr(A).

Definition 3.9

The quantity Pr(A ∩ B)/Pr(A) is defined as the conditional probability of B given A, which is written Pr(B|A). However, from Section 3.4 we know that, by definition of the multiplication law of probability, if two events are independent, then Pr(A ∩ B) = Pr(A) × Pr(B). If both sides are divided by Pr(A), then Pr(B) = Pr(A ∩ B)/Pr(A) = Pr(B | A). Similarly, we can show that if A and B are independent events, then Pr ( B | A) = Pr ( B | A) = Pr ( B). This relationship leads to the following alternative interpretation of independence in terms of conditional probabilities.

(2) If two events A, B are dependent, then Pr(A ∩ B) ≠ Pr(A) × Pr(B).

Definition 3.10

) Pr ( B | A) ≠ Pr ( B ) ≠ Pr ( B | A)

(1) If A and B are independent events, then Pr ( B | A) = Pr ( B ) = Pr ( B | A .

Equation 3.5

and

The relative risk (RR) of B given A is

Pr ( B | A) Pr ( B | A

)

Notice that if two events A, B are independent, then the RR is 1. If two events A, B are dependent, then the RR is different from 1. Heuristically, the more the dependence between events increases, the further the RR will be from 1.

Example 3.19

Cancer  Suppose that among 100,000 women with negative mammograms 20 will be diagnosed with breast cancer within 2 years, or Pr ( B | A) = 20 / 10 5 = .0002 , whereas 1 woman in 10 with positive mammograms will be diagnosed with breast cancer within 2 years, or Pr(B|A) = .1. The two events A and B would be highly dependent, because

( ) Pr ( BA) = .1 /.0002 = 500

RR = Pr BA

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48   C H A P T E R 3 

  Probability

In other words, women with positive mammograms are 500 times more likely to develop breast cancer over the next 2 years than are women with negative mammograms. This is the rationale for using the mammogram as a screening test for breast cancer. If events A and B were independent, then the RR would be 1; women with positive or negative mammograms would be equally likely to have breast cancer, and the mammogram would not be useful as a screening test for breast cancer.

Example 3.20

Solution

Sexually Transmitted Disease  Using the data in Example 3.15, find the conditional probability that doctor B makes a positive diagnosis of syphilis given that doctor A makes a positive diagnosis. What is the conditional probability that doctor B makes a positive diagnosis of syphilis given that doctor A makes a negative diagnosis? What is the RR of B+ given A+?

(

)

(

) Pr ( A ) = .08 / .1 = .8 +

) Pr ( A ) = Pr ( B −

+

)

∩ A− .9

We must compute Pr(B ∩ A ). We know that if doctor B diagnoses a patient as positive, then doctor A either does or does not confirm the diagnosis. Thus +

( )

)

(

(

Pr B + = Pr B + ∩ A+ + Pr B + ∩ A−

)

because the events B ∩ A and B ∩ A are mutually exclusive. If we subtract Pr(B+ ∩ A+) from both sides of the equation, then +

(

)

+

( )

+

)

(

Pr B + ∩ A− = Pr B + − Pr B + ∩ A+ = .17 − .08 = .09

(

Pr B +A− = Pr B + ∩ A−

)

Thus doctor B will confirm doctor A’s positive diagnoses 80% of the time. Similarly,

(

Pr B +A+ = Pr B + ∩ A+

(

+

Therefore, Pr B  A

) = .09 .9 = .1

Thus, when doctor A diagnoses a patient as negative, doctor B will contradict the diagnosis 10% of the time. The RR of the event B+ given A+ is

(

) (

)

Pr B +A+ / Pr B +A− = .8 / .1 = 8

REVIEW

This indicates that doctor B is 8 times as likely to diagnose a patient as positive when doctor A diagnoses the patient as positive than when doctor A diagnoses the patient as negative. These results quantify the dependence between the two doctors’ diagnoses. REVIEW QUESTIONS 3A

1

What is the frequency definition of probability?

2

What is the difference between independent and dependent events?

3

What are mutually exclusive events?

4

What is the addition law of probability?

5

What is conditional probability? How does it differ from unconditional probability?

6

What is relative risk? How do you interpret it?

Total-Probability Rule

)

The conditional ( Pr ( B | A), Pr ( B | A) and unconditional ( Pr ( B )) probabilities mentioned previously are related in the following way:

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3.6  ■  Conditional Probability   49

Equation 3.6

For any events A and B,

)

Pr ( B ) = Pr ( B | A) × Pr ( A) + Pr ( B | A × Pr ( A

)

This formula tells us that the unconditional probability of B is the sum of the conditional probability of B given A times the unconditional probability of A plus the conditional probability of B given A not occurring times the unconditional probability of A not occurring. To derive this, we note that if the event B occurs, it must occur either with A or without A. Therefore, Pr ( B ) = Pr ( B ∩ A) + Pr ( B ∩ A

)

From the definition of conditional probability, we see that

( )

Pr ( B ∩ A) = Pr ( A) × Pr BA

and

)

)

( )

Pr ( B ∩ A = Pr ( A × Pr BA

By substitution, it follows that

Example 3.21

Solution

( )

( )

Pr ( B ) = Pr BA Pr ( A) + Pr BA Pr ( A

)

Cancer  Let A and B be defined as in Example 3.19, and suppose that 7% of the general population of women will have a positive mammogram. What is the probability of developing breast cancer over the next 2 years among women in the general population? Pr ( B ) = Pr ( breast cancer )

(

)

(

= Pr breast cancer mammogram + × Pr mammogram +

(

+ Pr breast cancer mammogram

)

) × Pr (mammogram ) −

= .1 (.07) + .0002 (.93) = .00719 = 719 / 10 5 Thus the unconditional probability of developing breast cancer over the next 2 years in the general population (719/105) is a weighted average of the conditional probability of developing breast cancer over the next 2 years among women with a positive mammogram (.1) and the conditional probability of developing breast cancer over the next 2 years among women with a negative mammogram (20/105). In Equation 3.6 the probability of event B is expressed in terms of two mutually exclusive events A and A. In many instances the probability of an event B will need to be expressed in terms of more than two mutually exclusive events, denoted by A1, A2, . . . , Ak.

Definition 3.11

A set of events A1, . . . , Ak is exhaustive if at least one of the events must occur. Assume that events A1, . . . , Ak are mutually exclusive and exhaustive; that is, at least one of the events A1, . . . , Ak must occur and no two events can occur simultaneously. Thus, exactly one of the events A1, . . . , Ak must occur.

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50   C H A P T E R 3 

  Probability

Equation 3.7

Total-Probability Rule

Let A1, . . . , Ak be mutually exclusive and exhaustive events. The unconditional probability of B ( Pr ( B )) can then be written as a weighted average of the conditional probabilities of B given Ai  Pr( BAi) as follows: k

)

(

)

(

Pr ( B ) = ∑ Pr BAi × Pr ( Ai ) i =1

To show this, we note that if B occurs, then it must occur together with one and only one of the events, A1, . . . , Ak. Therefore, k

Pr ( B ) = ∑ Pr ( B ∩ Ai ) i =1

Also, from the definition of conditional probability,

(

Pr ( B ∩ Ai ) = Pr ( Ai ) × Pr BAi

)

By substitution, we obtain Equation 3.7. An application of the total-probability rule is given in the following example:

Example 3.22

Ophthalmology  We are planning a 5-year study of cataract in a population of 5000 people 60 years of age and older. We know from census data that 45% of this population is 60–64 years of age, 28% are 65–69 years of age, 20% are 70–74 years of age, and 7% are 75 or older. We also know from the Framingham Eye Study that 2.4%, 4.6%, 8.8%, and 15.3% of the people in these respective age groups will develop cataract over the next 5 years [4]. What percentage of the population in our study will develop cataract over the next 5 years, and how many people with cataract does this percentage represent?

Solution

Let A1 = {ages 60–64}, A2 = {ages 65–69}, A3 = {ages 70–74}, A4 = {ages 75+}. These events are mutually exclusive and exhaustive because each person in our popula­ tion must be in one and only one age group. Furthermore, from the conditions of the problem we know that Pr(A1) = .45, Pr(A2) = .28, Pr(A3) = .20, Pr(A4) = .07, Pr(B|A1) = .024, Pr(B|A2) = .046, Pr(B|A3) =.088, and Pr(B|A4) =.153, where B = {develop cataract in the next 5 years}. Finally, using the total-probability rule,

(

)

(

)

Pr ( B ) = Pr BA1 × Pr ( A1 ) + Pr BA2 × Pr ( A2 )

(

)

(

)

+ Pr BA3 × Pr ( A3 ) + Pr BA4 × Pr ( A4 ) = .024 (.45) + .046 (.2 28) + .088 (.20 ) + .153 (.07) = .052 Thus 5.2% of this population will develop cataract over the next 5 years, which represents a total of 5000 × .052 = 260 people with cataract. The definition of conditional probability allows the multiplication law of probability to be extended to the case of dependent events.

Equation 3.8

Generalized Multiplication Law of Probability If A1, . . . , Ak are an arbitrary set of events, then Pr ( A1 ∩ A2 ∩ L ∩ Ak )

(

)

(

)

(

= Pr ( A1 ) × Pr A2A1 × Pr A3A2 ∩ A1 × L × Pr AkAk −1 ∩ L ∩ A2 ∩ A1

)

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3.7  ■  Bayes’ Rule and Screening Tests   51

REVIEW QUESTIONS 3B

1

What is the total-probability rule?

2

Suppose the rate of type II diabetes mellitus (DM) in 40- to 59-year-olds is 7% among Caucasians, 10% among African-Americans, 12% among Hispanics, and 5% among Asian-Americans. Suppose the ethnic distribution in Houston, Texas, among 40- to 59-year-olds is 30% Caucasian, 25% African-American, 40% Hispanic, and 5% Asian-American. What is the overall probability of type II DM among 40- to 59-year-olds in Houston?

3.7 Bayes’ Rule and Screening Tests The mammography test data given in Example 3.18 illustrate the general concept of the predictive value of a screening test, which can be defined as follows:

Definition 3.12

The predictive value positive (PV+) of a screening test is the probability that a person has a disease given that the test is positive.

Pr(disease|test+)

The predictive value negative (PV− ) of a screening test is the probability that a person does not have a disease given that the test is negative.

Pr(no disease | test−)

Cancer  Find PV+ and PV− for mammography given the data in Example 3.19.

Example 3.23

Solution

whereas PV− = Pr(breast cancer | mammogram−)

Thus, if the mammogram is negative, the woman is virtually certain not to develop breast cancer over the next 2 years (PV− ≈ 1); whereas if the mammogram is positive, the woman has a 10% chance of developing breast cancer (PV+ = .10).

We see that PV+ = Pr(breast cancer | mammogram+) = .1

= 1 − Pr(breast cancer | mammogram−) = 1 − .0002 = .9998

A symptom or a set of symptoms can also be regarded as a screening test for disease. The higher the PV of the screening test or symptoms, the more valuable the test will be. Ideally, we would like to find a set of symptoms such that both PV+ and PV− are 1. Then we could accurately diagnose disease for each patient. However, this is usually impossible. Clinicians often cannot directly measure the PV of a set of symptoms. However, they can measure how often specific symptoms occur in diseased and normal people. These measures are defined as follows:

Definition 3.13

The sensitivity of a symptom (or set of symptoms or screening test) is the probability that the symptom is present given that the person has a disease.

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REVIEW

If the events are independent, then the conditional probabilities on the righthand side of Equation 3.8 reduce to unconditional probabilities and the generalized multiplication law reduces to the multiplication law for independent events given in Equation 3.2. Equation 3.8 also generalizes the relationship Pr(A ∩ B) = Pr(A) × Pr (B|A) given in Definition 3.9 for two events to the case of more than two events.

52   C H A P T E R 3 

  Probability

Definition 3.14

The specificity of a symptom (or set of symptoms or screening test) is the probability that the symptom is not present given that the person does not have a disease.

Definition 3.15

A false negative is defined as a negative test result when the disease or condition being tested for is actually present. A false positive is defined as a positive test result when the disease or condition being tested for is not actually present. For a symptom to be effective in predicting disease, it is important that both the sensitivity and specificity be high.

Example 3.24

Cancer  Suppose the disease is lung cancer and the symptom is cigarette smoking. If we assume that 90% of people with lung cancer and 30% of people without lung cancer (essentially the entire general population) are smokers, then the sensitivity and specificity of smoking as a screening test for lung cancer are .9 and .7, respectively. Obviously, cigarette smoking cannot be used by itself as a screening criterion for predicting lung cancer because there will be too many false positives (people without cancer who are smokers).

Example 3.25

Cancer  Suppose the disease is breast cancer in women and the symptom is having a family history of breast cancer (either a mother or a sister with breast cancer). If we assume 5% of women with breast cancer have a family history of breast cancer but only 2% of women without breast cancer have such a history, then the sensitivity of a family history of breast cancer as a predictor of breast cancer is .05 and the specificity is .98 = (1 − .02). A family history of breast cancer cannot be used by itself to diagnose breast cancer because there will be too many false negatives (women with breast cancer who do not have a family history).

REVIEW

REVIEW QUESTIONS 3C

Table 3.2

1

What is the sensitivity and specificity of a screening test?

2

What are the PV+ and PV− of a screening test? How does PV differ from sensitivity and specificity?

3

The level of prostate-specific antigen (PSA) in the blood is frequently used as a screening test for prostate cancer. Punglia et al. [5] reported the following data regarding the relationship between a positive PSA test (≥4.1 ng/dL) and prostate cancer.

Association between PSA and prostate cancer PSA test result

Prostate cancer

Frequency

+ + − −

+ − + −

92 27 46 72

(a)  What are the sensitivity and specificity of the test?

(b)  What are the PV + and PV − of the test?

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3.7  ■  Bayes’ Rule and Screening Tests   53

Bayes’ Rule Review Question 3C.3 assumes that each PSA+ and PSA− participant (or at least a representative sample of PSA+ and PSA− participants) is evaluated for the presence of prostate cancer. Thus one can directly evaluate PV+ and PV− from the data provided. Instead, in many screening studies, a random sample of cases and controls is obtained. One can estimate sensitivity and specificity from such a design. However, because cases are usually oversampled relative to the general population (e.g., if there are an equal number of cases and controls), one cannot directly estimate PV+ and PV− from the frequency counts available in a typical screening study. Instead, an indirect method known as Bayes’ rule is used for this purpose. The general question then becomes how can the sensitivity and specificity of a symptom (or set of symptoms or diagnostic test), which are quantities a physician can estimate, be used to compute PVs, which are quantities a physician needs to make appropriate diagnoses? Let A = symptom and B = disease. From Definitions 3.12, 3.13, and 3.14, we have

( ) = Pr ( BA)

Predictive value positive = PV + = Pr BA Predictive value negative = PV

( ) Specificity = Pr ( AB )

Sensitivity = Pr AB

Let Pr(B) = probability of disease in the reference population. We wish to compute Pr (B|A) and Pr ( B | A) in terms of the other quantities. This relationship is known as Bayes’ rule.

Bayes’ Rule

Equation 3.9

Let A = symptom and B = disease.

( )

PV + = Pr BA =

( )

( )

Pr AB × Pr ( B )

( )

Pr AB × Pr ( B ) + Pr AB B × Pr ( B

)

In words, this can be written as PV + =

Sensitivity × x Sensitivity × x + (1 − Specificity ) × (1 − x )

where x = Pr(B) = prevalence of disease in the reference population. Similarly,

PV − =

Specificity × (1 − x ) Specificity × (1 − x ) + (1 − Sensitivity ) × x

To derive this, we have, from the definition of conditional probability,

( )

PV + = Pr BA =

Pr ( B ∩ A) Pr ( A)

Also, from the definition of conditional probability,

( )

Pr ( B ∩ A) = Pr AB × Pr ( B )

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54   C H A P T E R 3 

  Probability

Finally, from the total-probability rule,

( )

( )

Pr ( A) = Pr AB × Pr ( B ) + Pr AB × Pr ( B

)

If the expressions for Pr(B ∩ A) and Pr(A) are substituted into the equation for PV+, we obtain

( )

PV + = Pr BA =

( )

( )

Pr AB × Pr ( B )

( )

Pr AB × Pr ( B ) + Pr AB B × Pr ( B

)

That is, PV can be expressed as a function of sensitivity, specificity, and the probability of disease in the reference population. A similar derivation can be used to obtain PV−. +

Example 3.26

Hypertension  Suppose 84% of hypertensives and 23% of normotensives are classified as hypertensive by an automated blood-pressure machine. What are the PV+ and PV− of the machine, assuming 20% of the adult population is hypertensive?

Solution

The sensitivity = .84 and specificity = 1 − .23 = .77. Thus, from Bayes’ rule it follows that PV + = (.84 ) (.2 ) / [(.84 ) (.2 ) + (.23) (.8)] = .168 / .35 52 = .48 Similarly, PV− = (.77)(.8)/[(.77)(.8)+(.16)(.2)] =.616/.648 = .95

Thus a negative result from the machine is reasonably predictive because we are 95% sure a person with a negative result from the machine is normotensive. However, a positive result is not very predictive because we are only 48% sure a person with a positive result from the machine is hypertensive. Example 3.26 considered only two possible disease states: hypertensive and normotensive. In clinical medicine there are often more than two possible disease states. We would like to be able to predict the most likely disease state given a specific symptom (or set of symptoms). Let’s assume that the probability of having these symptoms among people in a given disease state is known from clinical experience, as is the probability of each disease state in the reference population. This leads us to the generalized Bayes’ rule:

Equation 3.10

Generalized Bayes’ Rule

Let B1 B2, . . . , Bk be a set of mutually exclusive and exhaustive disease states; that is, at least one disease state must occur and no two disease states can occur at the same time. Let A represent the presence of a symptom or set of symptoms. Then

(

)

(

)

( ) ∑ Pr ( AB ) × Pr ( B )

Pr BiA = Pr ABi × Pr Bi

k

 j =1

j

j

This result is obtained similarly to the result of Bayes’ rule for two disease states in Equation 3.9. Specifically, from the definition of conditional probability, note that

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3.7  ■  Bayes’ Rule and Screening Tests   55

(

)

Pr BiA =

Pr ( Bi ∩ A) Pr ( A)

Also, from the definition of conditional probability,

)

(

Pr ( Bi ∩ A) = Pr ABi × Pr ( Bi ) From the total-probability rule,

)

(

Pr ( A) = Pr AB1 × Pr ( B1 ) + L + Pr ( A | Bk ) × Pr ( Bk ) If the expressions for Pr(Bi ∩ A) and Pr(A) are substituted, we obtain

Example 3.27

(

)

Pr BiA =

∑ j =1 Pr ( ABj ) × Pr ( Bj )

Pulmonary Disease  Suppose a 60-year-old man who has never smoked cigarettes presents to a physician with symptoms of a chronic cough and occasional breathlessness. The physician becomes concerned and orders the patient admitted to the hospital for a lung biopsy. Suppose the results of the lung biopsy are consistent either with lung cancer or with sarcoidosis, a fairly common, nonfatal lung disease. In this case

)

(

Pr ABi × Pr ( Bi )

k

(

A = {chronic cough, results of lung biopsy}

Disease state B1 = normal B2 = lung cancer B3 = sarcoidosis

Suppose that  Pr(A|B1) = .001  Pr(A|B2) = .9  Pr(A|B3) = .9

and that in 60-year-old, never-smoking men

Solution

Pr ( B1 ) = .99

Pr ( B2 ) = .001

Pr ( B3 ) = .009

The first set of probabilities Pr(A|Bi) could be obtained from clinical experience with the previous diseases, whereas the latter set of probabilities Pr(Bi) would have to be obtained from age-, sex-, and smoking-specific prevalence rates for the diseases in question. The interesting question now becomes what are the probabilities Pr(Bi|A) of the three disease states given the previous symptoms? Bayes’ rule can be used to answer this question. Specifically, 3  Pr B1A = Pr AB1 × Pr ( B1 )  ∑ Pr ABj × Pr Bj   j =1  09)] = .001 (.99) [.001 (.99) + .9 (.001) + .9 (.00

( (

)

)

(

)

(

)

( )

= .00099 / .00999 = .099

Pr B2A = .9 (.001) [.001 (.99) + .9 (.001) + .9 (.009)]

(

)

= .00090 / .00999 = .090

Pr B3A = .9 (.009) [.001 (.99) + .9 (.001) + .9 (.009)]

= .00810 / .00999 = .811

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56   C H A P T E R 3 

  Probability

Thus, although the unconditional probability of sarcoidosis is very low (.009), the conditional probability of the disease given these symptoms and this age-sex-smoking group is .811. Also, although the symptoms and diagnostic tests are consistent with both lung cancer and sarcoidosis, the latter is much more likely among patients in this age-sex-smoking group.

Example 3.28

Solution

Pulmonary Disease  Now suppose the patient in Example 3.27 smoked two packs of cigarettes per day for 40 years. Then assume Pr(B1) = .98, Pr(B2) = .015, and Pr(B3) = .005 in this type of person. What are the probabilities of the three disease states for this type of patient, given these symptoms?

)

(

Pr B1A = .001 (.98) [.001 (.98) + .9 (.015) + .9 (.005)] = .00098 / .01898 = .052

( ) Pr ( B A) = .9 (.005) / .01898 = .237

Pr B2A = .9 (.015) / .01898 = .01350 / .01898 = .711 3

Thus in this type of patient lung cancer is the most likely diagnosis.

REVIEW

REVIEW QUESTIONS 3D

1

What is Bayes’ rule? How is it used?

2

What is the generalized Bayes’ rule?

3

Refer to Review Question 3B.2. Suppose a 40- to 59-year-old person in Houston has type II DM. What is the probability that this person is African-American? Hispanic? Caucasian? Asian-American? (Hint: Use the generalized Bayes’ rule.)

4

Answer Review Question 3D.3 for a nondiabetic 40- to 59-year-old person in Houston.

3.8 Bayesian Inference The definition of probability given in Definition 3.1 is sometimes called the frequency definition of probability. This definition forms the basis for the frequentist method of inference, which is the main approach to statistical inference featured in this book and used in statistical practice. However, Bayesian inference is an alternative definition of probability and inference, espoused by a vocal minority of statisticians. The Bayesian school of inference rejects the idea of the frequency definition of probability, considering that it is a theoretical concept that can never be realized in practice. Instead, Bayesians conceive of two types of probability: a prior probability and a posterior probability.

Definition 3.16

Example 3.29

Solution

The prior probability of an event is the best guess by the observer of an event’s likelihood in the absence of data. This prior probability may be a single number, or it may be a range of likely values for the probability, perhaps with weights attached to each possible value.

Hypertension  What is the prior probability of hypertension in Example 3.26? The prior probability of hypertension in the absence of additional data is .20 because 20% of the adult population is hypertensive.

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3.9  ■  ROC Curves   57

Definition 3.17

The posterior probability of an event is the likelihood that an event will occur after collecting some empirical data. It is obtained by integrating information from the prior probability with additional data related to the event in question.

Example 3.30

Hypertension  What is the posterior probability of hypertension given that an automated blood-pressure machine has classified a person as hypertensive?

Solution

If we refer to Example 3.26 and let the event {true hypertensive} be denoted by B and the event {classified as hypertensive by an automated blood-pressure machine} be denoted by A, we see that the posterior probability is given by PV+ = Pr(B|A) = .48.

Example 3.31

Hypertension  What is the posterior probability of hypertension given that an automated blood-pressure machine has classified a person as normotensive?

Solution

The posterior probability = Pr ( BA) = 1 − Pr ( BA) = 1 − PV − = .05. Thus the initial prior probability of 20% has been integrated with the automated blood-pressure machine data to yield posterior probabilities of .48 and .05, for people who are classified as hypertensive and normotensive by the automated blood-pressure machine, respectively. The main problem with Bayesian inference lies in specifying the prior probability. Two different people may provide different prior probabilities for an event and may reach different conclusions (obtain different posterior probabilities), even with the same data. However, in some cases the prior probability is well defined. Also, having sufficient data diminishes the impact of the prior probability on the posterior inference. Although most of the methodologies used in this book are based on the frequentist approach to inference, we use Bayesian inference in several additional examples in later chapters to provide further insight into data analysis.

3.9 ROC Curves In some instances, a test provides several categories of response rather than simply providing positive or negative results. In some instances, the results of the test are reported as a continuous variable. In either case, designation of a cutoff point for distinguishing a test result as positive versus negative is arbitrary.

Example 3.32

Table 3.3

Radiology  The following data, provided by Hanley and McNeil [6], are ratings of computed tomography (CT) images by a single radiologist in a sample of 109 subjects with possible neurological problems. The true disease status is also known for

Ratings of 109 CT images by a single radiologist vs. true disease status True disease status

CT rating Definitely normal (1)

Probably normal (2)

Questionable (3)

Probably abnormal (4)

Definitely abnormal (5)

Total

Normal Abnormal

33 3

6 2

6 2

11 11

2 33

58 51

Total

36

8

8

22

35

109

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58   C H A P T E R 3 

  Probability

each of these subjects. The data are presented in Table 3.3. How can we quantify the diagnostic accuracy of the test? Unlike previous examples, this one has no obvious cutoff point to use for designating a subject as positive for disease based on the CT scan. For example, if we designate a subject as test-positive if he or she is either probably abnormal or definitely abnormal (a rating of 4 or 5, or 4+), then the sensitivity of the test is (11 + 33)/51 = 44/51 = .86, whereas the specificity is (33 + 6 + 6)/58 = 45/58 = .78. In Table 3.4, we compute the sensitivity and specificity of the radiologist’s ratings according to different criteria for test-positive.

Table 3.4

Sensitivity and specificity of the radiologist’s ratings according to different test-positive criteria based on the data in Table 3.3 Test-positive criteria

Sensitivity

Specificity

1 + 2 + 3 + 4 + 5 + 6 +

1.0 .94 .90 .86 .65 0

0 .57 .67 .78 .97 1.0

To display these data, we construct a receiver operating characteristic (ROC) curve.

Definition 3.18

Example 3.33

Solution

A receiver operating characteristic (ROC) curve is a plot of the sensitivity versus (1 – specificity) of a screening test, where the different points on the curve correspond to different cutoff points used to designate test-positive. Radiology  Construct an ROC curve based on the data in Table 3.4. We plot sensitivity on the y-axis versus (1 – specificity) on the x-axis using the data in Table 3.4. The plot is shown in Figure 3.7. The area under the ROC curve is a reasonable summary of the overall diagnostic accuracy of the test. It can be shown [6] that this area, when calculated by the

Figure 3.7

ROC curve for the data in Table 3.4* 1.0 .9

Sensitivity

.8 .7 .6 .5 .4 .3 .2 .1 0

(.43, .94)

(1.0, 1.0)

(.33, .90) (.22, .86) (.03, .65)

0 .1 .2 .3 .4 .5 .6 .8 .9 1.0 1 – Specificity

*Each point represents (1 – specificity, sensitivity) for different test-positive criteria.

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3.10  ■  Prevalence and Incidence   59

trapezoidal rule, corresponds to the probability that for a randomly selected pair of normal and abnormal subjects, the radiologist will correctly identify the normal subject given the CT ratings. It is assumed that for untied ratings the radiologist designates the subject with the lower test score as normal and the subject with the higher test score as abnormal. For tied ratings, it is assumed that the radiologist randomly chooses one patient as normal and the other as abnormal.

Example 3.34

Solution

Radiology  Calculate the area under the ROC curve in Figure 3.7, and interpret what it means. The area under the ROC curve, when evaluated by the trapezoidal rule, is given by .5 (.94 + 1.0 ) (.57) + .5 (.90 + .94 ) (.10 ) + .5 (.86 + .90 ) (.11) + .5 (.65 + .86 ) (.19)

+ .5 ( 0 + .65) (.03) = .89 9

This means the radiologist has an 89% probability of correctly distinguishing a normal from an abnormal subject based on the relative ordering of their CT ratings. For normal and abnormal subjects with the same ratings, it is assumed the radiologist selects one of the two subjects at random. In general, of two screening tests for the same disease, the test with the higher area under its ROC curve is considered the better test, unless some particular level of sensitivity or specificity is especially important in comparing the two tests.

3.10 Prevalence and Incidence In clinical medicine, the terms prevalence and incidence denote probabilities in a special context and are used frequently in this text.

Definition 3.19

The prevalence of a disease is the probability of currently having the disease regardless of the duration of time one has had the disease. Prevalence is obtained by dividing the number of people who currently have the disease by the number of people in the study population.

Example 3.35

Hypertension  The prevalence of hypertension among adults (age 17 and older) was reported to be 20.3%, as assessed by the NHANES study conducted in 1999–2000 [7]. It was computed by dividing the number of people who had reported taking a prescription for hypertension and were 17 years of age and older (1225) by the total number of people 17 years of age and older in the study population (6044).

Definition 3.20

The cumulative incidence of a disease is the probability that a person with no prior disease will develop a new case of the disease over some specified time period. In Chapter 14 we distinguish between cumulative incidence, which is defined over a long period of time, and incidence density, which is defined over a very short (or instantaneous) period of time. For simplicity, before Chapter 14 we use the abbreviated term incidence to denote cumulative incidence.

Example 3.36

Cancer  The cumulative-incidence rate of breast cancer in 40- to 44-year-old U.S. women over the time period 2002–2006 was approximately 118.4 per 100,000 [2]. This means that on January 1, 2002, about 118 in 100,000 women 40 to 44 years of age who had never had breast cancer would develop breast cancer by December 31, 2002.

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60   C H A P T E R 3 

  Probability

REVIEW

REVIEW QUESTIONS 3E

1

Suppose that of 25 students in a class, 5 are currently suffering from hay fever. Is the proportion 5 of 25 (20%) a measure of prevalence, incidence, or neither?

2

Suppose 50 HIV-positive men are identified, 5 of whom develop AIDS over the next 2 years. Is the proportion 5 of 50 (10%) a measure of prevalence, incidence, or neither?

3.11 Summary In this chapter, probabilities and how to work with them using the addition and multiplication laws were discussed. An important distinction was made between independent events, which are unrelated to each other, and dependent events, which are related to each other. The general concepts of conditional probability and RR were introduced to quantify the dependence between two events. These ideas were then applied to the special area of screening populations for disease. In particular, the notions of sensitivity, specificity, and PV, which are used to define the accuracy of screening tests, were developed as applications of conditional probability. We also used an ROC curve to extend the concepts of sensitivity and specificity when the designation of the cutoff point for test-positive versus test-negative is arbitrary. On some occasions, only sensitivities and specificities are available and we wish to compute the PV of screening tests. This task can be accomplished using Bayes’ rule. The use of Bayes’ rule in the context of screening tests is a special case of Bayesian inference. In Bayesian inference, we specify a prior probability for an event, which, after data are collected, is then modified to a posterior probability. Finally, prevalence and incidence, which are probabilistic parameters that are often used to describe the magnitude of disease in a population, were defined. In the next two chapters, these general principles of probability are applied to derive some of the important probabilistic models often used in biomedical research, including the binomial, Poisson, and normal models. These models will eventually be used to test hypotheses about data. P rob l e m s

Consider a family with a mother, father, and two children. Let A1 = {mother has influenza}, A2 = {father has influenza}, A3 = {first child has influenza}, A4 = {second child has influ­ enza}, B = {at least one child has influenza}, C = {at least one parent has influenza}, and D = {at least one person in the family has influenza}. *3.1  What does A1 ∪ A2 mean? *3.2  What does A1 ∩ A2 mean? *3.3  Are A3 and A4 mutually exclusive? *3.4  What does A3 ∪ B mean? *3.5  What does A3 ∩ B mean? *3.6  Express C in terms of A1, A2, A3, and A4. *3.7  Express D in terms of B and C. *3.8  What does A1 mean? *3.9  What does A2 mean?

*3.10  Represent C in terms of A1, A2, A3, and A4. *3.11  Represent D in terms of B and C. Suppose an influenza epidemic strikes a city. In 10% of families the mother has influenza; in 10% of families the father has influenza; and in 2% of families both the mother and father have influenza. 3.12  Are the events A1 = {mother has influenza} and A2 = {father has influenza} independent? Suppose there is a 20% chance each child will get influenza, whereas in 10% of two-child families both children get the disease. 3.13  What is the probability that at least one child will get influenza? 3.14  Based on Problem 3.12, what is the conditional probability that the father has influenza given that the mother has influenza?

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Problems   61

Table 3.5  Prevalence of Alzheimer’s disease (cases per 100 population)

Table 3.6  Age–sex distribution of retirement community

Age group

Males

Females

Age group

65–69 70–74 75–79 80–84 85 +

1.6 0.0 4.9 8.6 35.0

0.0 2.2 2.3 7.8 27.9

Male (%)a

Female (%)a

5 9 11 8 4

10 17 18 12 6

65–69 70–74 75–79 80–84 85 + Percentage of total population.

a

3.15  Based on Problem 3.12, what is the conditional probability that the father has influenza given that the mother does not have influenza?

Mental Health Estimates of the prevalence of Alzheimer’s disease have recently been provided by Pfeffer et al. [8]. The estimates are given in Table 3.5. Suppose an unrelated 77-year-old man, 76-year-old woman, and 82-year-old woman are selected from a community. 3.16  What is the probability that all three of these individuals have Alzheimer’s disease? 3.17  What is the probability that at least one of the women has Alzheimer’s disease? 3.18  What is the probability that at least one of the three people has Alzheimer’s disease? 3.19  What is the probability that exactly one of the three people has Alzheimer’s disease? 3.20  Suppose we know one of the three people has Alzheimer’s disease, but we don’t know which one. What is the conditional probability that the affected person is a woman? 3.21  Suppose we know two of the three people have Alzheimer’s disease. What is the conditional probability that they are both women? 3.22  Suppose we know two of the three people have Alzheimer’s disease. What is the conditional probability that they are both younger than 80 years of age? Suppose the probability that both members of a married couple, each of whom is 75–79 years of age, will have Alzheimer’s disease is .0015. 3.23  What is the conditional probability that the man will be affected given that the woman is affected? How does this value compare with the prevalence in Table 3.5? Why should it be the same (or different)? 3.24  What is the conditional probability that the woman will be affected given that the man is affected? How does this value compare with the prevalence in Table 3.5? Why should it be the same (or different)? 3.25  What is the probability that at least one member of the couple is affected?

Suppose a study of Alzheimer’s disease is proposed in a retirement community with people 65+ years of age, where the age–sex distribution is as shown in Table 3.6. 3.26  What is the expected overall prevalence of Alzheimer’s disease in the community if the prevalence estimates in Table 3.5 for specific age–sex groups hold? 3.27  If 1000 people 65+ years of age are in the community, then what is the expected number of cases of Alzheimer’s disease in the community?

Occupational Health A study is conducted among men 50–69 years of age working in a chemical plant. We are interested in comparing the mortality experience of the workers in the plant with national mortality rates. Suppose that of the 500 plant workers in this age group, 35% are 50–54 years of age, 30% are 55–59, 20% are 60–64, and 15% are 65–69. *3.28  If the annual national mortality rates are 0.9% in 50- to 54-year-old men, 1.4% in 55- to 59-year-old men, 2.2% in 60- to 64-year-old men, and 3.3% in 65- to 69-year-old men, then what is the projected annual mortality rate in the plant as a whole? The standardized mortality ratio (SMR) is often used in occupational studies as a measure of risk. It is defined as 100% times the observed number of events in the exposed group divided by the expected number of events in the exposed group (based on some reference population). *3.29  If 15 deaths are observed over 1 year among the 500 workers, what is the SMR?

Genetics Suppose that a disease is inherited via a dominant mode of inheritance and that only one of the two parents is affected with the disease. The implications of this mode of inheritance are that the probability is 1 in 2 that any particular offspring will get the disease. 3.30  What is the probability that in a family with two children, both siblings are affected? 3.31  What is the probability that exactly one sibling is affected?

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62   C H A P T E R 3 

  Probability

3.32  What is the probability that neither sibling is affected?

Obstetrics

3.33  Suppose the older child is affected. What is the probability that the younger child is affected?

The following data are derived from the Monthly Vital Statistics Report (October 1999) issued by the National Center for Health Statistics [9]. These data are pertinent to livebirths only.

3.34  If A, B are two events such that A = {older child is affected}, B = {younger child is affected}, then are the events A, B independent? Suppose that a disease is inherited via an autosomal recessive mode of inheritance. The implications of this mode of inheritance are that the children in a family each have a probability of 1 in 4 of inheriting the disease.

Suppose that infants are classified as low birthweight if they have a birthweight 200 but < 250 mg/dL?

Hypertension People are classified as hypertensive if their systolic blood pressure (SBP) is higher than a specified level for their age group, according to the algorithm in Table 5.1. Assume SBP is normally distributed with mean and standard deviation given in Table 5.1 for age groups 1−14 and 15−44, respectively. Define a family as a group of two people in age group 1−14 and two people in age group 15−44. A family is classified as hypertensive if at least one adult and at least one child are hypertensive. *5.17  What proportion of 1- to 14-year-olds are hypertensive? *5.18  What proportion of 15- to 44-year-olds are hypertensive?

Table 5.1  Mean and standard deviation of SBP (mm Hg) in specific age groups Age group

  1−14 15−44

Mean

Standard deviation

Specified hypertension level

105.0 125.0

5.0 10.0

115.0 140.0

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Problems   139

*5.19  What proportion of families are hypertensive? (Assume that the hypertensive status of different members of a family are independent random variables.)

*5.28  How many lymphocytes would have to appear in the differential before you would feel the “normal” pattern was violated?

*5.20  Suppose a community has 1000 families living in it. What is the probability that between one and five families are hypertensive?

*5.29  An excess of neutrophils is consistent with several types of bacterial infection. Suppose an adult has x neutrophils. How large would x have to be for the probability of a normal adult having x or more neutrophils to be ≤5%?

Pulmonary Disease Forced expiratory volume (FEV) is an index of pulmonary function that measures the volume of air expelled after 1 second of constant effort. FEV is influenced by age, sex, and cigarette smoking. Assume that in 45- to 54-year-old nonsmoking men FEV is normally distributed with mean = 4.0 L and standard deviation = 0.5 L. In comparably aged currently smoking men FEV is normally distributed, with mean = 3.5 L and standard deviation = 0.6 L. 5.21  If an FEV of less than 2.5 L is regarded as showing some functional impairment (occasional breathlessness, inability to climb stairs, etc.), then what is the probability that a currently smoking man has functional impairment? 5.22  Answer Problem 5.21 for a nonsmoking man. Some people are not functionally impaired now, but their pulmonary function usually declines with age and they eventually will be functionally impaired. Assume that the decline in FEV over n years is normally distributed, with mean = 0.03n L and standard deviation = 0.02n L. 5.23  What is the probability that a 45-year-old man with an FEV of 4.0 L will be functionally impaired by age 75? 5.24  Answer Problem 5.23 for a 25-year-old man with an FEV of 4.0 L.

Infectious Disease The differential is a standard measurement made during a blood test. It consists of classifying white blood cells into the following five categories: (1) basophils, (2) eosinophils, (3) monocytes, (4) lymphocytes, and (5) neutrophils. The usual practice is to look at 100 randomly selected cells under a microscope and to count the number of cells within each of the five categories. Assume that a normal adult will have the following proportions of cells in each category: basophils, 0.5%; eosinophils, 1.5%; monocytes, 4%; lymphocytes, 34%; and neutrophils, 60%. *5.25  An excess of eosinophils is sometimes consistent with a violent allergic reaction. What is the exact probability that a normal adult will have 5 or more eosinophils? *5.26  An excess of lymphocytes is consistent with various forms of viral infection, such as hepatitis. What is the probability that a normal adult will have 40 or more lymphocytes? *5.27  What is the probability a normal adult will have 50 or more lymphocytes?

*5.30  How large would x have to be for the probability of a normal adult having x or more neutrophils to be ≤1%?

Blood Chemistry In pharmacologic research a variety of clinical chemistry measurements are routinely monitored closely for evidence of side effects of the medication under study. Suppose typical blood-glucose levels are normally distributed, with mean = 90 mg/dL and standard deviation = 38 mg/dL. 5.31  If the normal range is 65−120 mg/dL, then what percentage of values will fall in the normal range? 5.32  In some studies only values at least 1.5 times as high as the upper limit of normal are identified as abnormal. What percentage of values would fall in this range? 5.33  Answer Problem 5.32 for values 2.0 times the upper limit of normal. 5.34  Frequently, tests that yield abnormal results are repeated for confirmation. What is the probability that for a normal person a test will be at least 1.5 times as high as the upper limit of normal on two separate occasions? 5.35  Suppose that in a pharmacologic study involving 6000 patients, 75 patients have blood-glucose levels at least 1.5 times the upper limit of normal on one occasion. What is the probability that this result could be due to chance?

Cancer A treatment trial is proposed to test the efficacy of vitamin E as a preventive agent for cancer. One problem with such a study is how to assess compliance among participants. A small pilot study is undertaken to establish criteria for compliance with the proposed study agents. In this study, 10 patients are given 400 IU/day of vitamin E and 10 patients are given similar-sized tablets of placebo over a 3-month period. Their serum vitamin-E levels are measured before and after the 3-month period, and the change (3-month – baseline) is shown in Table 5.2. Table 5.2  Change in serum vitamin E (mg/dL) in pilot study Group

Mean

sd

n

Vitamin E Placebo

0.80 0.05

0.48 0.16

10 10

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140   C H A P T E R 5 

  Continuous Probability Distributions

*5.36  Suppose a change of 0.30 mg/dL in serum levels is proposed as a test criterion for compliance; that is, a patient who shows a change of ≥ 0.30 mg/dL is considered a compliant vitamin-E taker. If normality is assumed, what percentage of the vitamin-E group would be expected to show a change of at least 0.30 mg/dL? *5.37  Is the measure in Problem 5.36 a measure of sensitivity, specificity, or predictive value? *5.38  What percentage of the placebo group would be expected to show a change of not more than 0.30 mg/dL? *5.39  Is the measure in Problem 5.38 a measure of sensitivity, specificity, or predictive value? *5.40  Suppose a new threshold of change, Δ mg/dL, is proposed for establishing compliance. We wish to use a level of Δ such that the compliance measures in Problems 5.36 and 5.38 for the patients in the vitamin-E and placebo groups are the same. What should Δ be? What would be the compliance in the vitamin-E and placebo groups using this threshold level? 5.41  Suppose we consider the serum vitamin-E assay as a screening test for compliance with vitamin-E supplementation. Participants whose change in serum vitamin E is ≥ Δ mg/dL will be considered vitamin-E takers, and participants whose change is < Δ mg/dL will be considered placebo takers. Choose several possible values for Δ, and construct the receiver operating characteristic (ROC) curve for this test. What is the area under the ROC curve? (Hint: The area under the ROC curve can be computed analytically from the properties of linear combinations of normal distributions.)

Pulmonary Disease Refer to the pulmonary-function data in the Data Set FEV.DAT on the Companion Website (see Problem 2.23, p. 35). We are interested in whether smoking status is related to level of pulmonary function. However, FEV is affected by age and sex; also, smoking children tend to be older than nonsmoking children. For these reasons, FEV should be standardized for age and sex. To accomplish this, use the z-score approach outlined in Problem 5.1, where the z-scores here are defined by age−sex groups. 5.42  Plot the distribution of z-scores for smokers and nonsmokers separately. Do these distributions look normal? Do smoking and pulmonary function seem in any way related in these data? 5.43  Repeat the analyses in Problem 5.42 for the subgroup of children 10+ years of age (because smoking is very rare before this age). Do you reach similar conclusions? 5.44  Repeat the analyses in Problem 5.43 separately for boys and girls. Are your conclusions the same in the two groups? (Note: Formal methods for comparing mean FEVs between smokers and nonsmokers are discussed in the material on statistical inference in Chapter 8.)

Cardiovascular Disease A clinical trial was conducted to test the efficacy of nifedipine, a new drug for reducing chest pain in patients with angina severe enough to require hospitalization. The duration of the study was 14 days in the hospital unless the patient was withdrawn prematurely from therapy, was discharged from the hospital, or died prior to this time. Patients were randomly assigned to either nifedipine or propranolol and were given the same dosage of each drug in identical capsules at level 1 of therapy. If pain did not cease at this level of therapy or if pain recurred after a period of pain cessation, then the patient progressed to level 2, whereby the dosage of each drug was increased according to a prespecified schedule. Similarly, if pain continued or recurred at level 2, then the patient progressed to level 3, whereby the dosage of the anginal drug was increased again. Patients randomized to either group received nitrates in any amount deemed clinically appropriate to help control pain. The main objective of the study was to compare the degree of pain relief with nifedipine vs. propranolol. A secondary objective was to better understand the effects of these agents on other physiologic parameters, including heart rate and blood pressure. Data on these latter parameters are given in Data Set NIFED.DAT (on the Companion Website); the format of this file is shown in Table 5.3. 5.45  Describe the effect of each treatment regimen on changes in heart rate and blood pressure. Does the distribution of changes in these parameters look normal or not? 5.46  Compare graphically the effects of the treatment regimens on heart rate and blood pressure. Do you notice any difference between treatments? Table 5.3  Format of NIFED.DAT Column

Variable

Code

1–2 4 6–8 10–12 14–16 18–20 22–24 26–28 30–32 34–36

ID Treatment group Baseline heart ratea Level 1 heart rateb Level 2 heart rate Level 3 heart rate Baseline SBPa Level 1 SBPb Level 2 SBP Level 3 SBP

N = nifedipine/ P = propanolol beats/min beats/min beats/min beats/min mm Hg mm Hg mm Hg mm Hg

Heart rate and SBP immediately before randomization. Highest heart rate and SBP at each level of therapy. Note: Missing values indicate one of the following: (1) The patient withdrew from the study before entering this level of therapy. (2)  The patient achieved pain relief before reaching this level of therapy. (3) The patient encountered this level of therapy, but this particular piece of data was missing. a

b

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Problems   141

(Note: Formal tests for comparing changes in heart rate and blood pressure in the two treatment groups are covered in Chapter 8.)

Hypertension Well-known racial differences in blood pressure exist between white and black adults. These differences generally do not exist between white and black children. Because aldosterone levels have been related to blood-pressure levels in adults in previous research, an investigation was performed to look at aldosterone levels among black children and white children [1].

Figure 5.23  Plasma-aldosterone concentrations in 53 white and 46 black children. Values within the shaded area were undetectable (< 50 pmol/L). The solid horizontal lines indicate the mean values, and the broken horizontal lines indicate the mean ± se. The concept of standard error (se) is discussed in Chapter 6. 1200 1100

1000

*5.47  If the mean plasma-aldosterone level in black children was 230 pmol/L with a standard deviation of 203 pmol/L, then what percentage of black children have levels ≤ 300 pmol/L if normality is assumed?

*5.49  The distribution of plasma-aldosterone concentration in 53 white and 46 black children is shown in Figure 5.23. Does the assumption of normality seem reasonable? Why or why not? (Hint: Qualitatively compare the observed number of children who have levels ≤ 300 pmol/L with the expected number in each group under the assumption of normality.)

Hepatic Disease Suppose we observe 84 alcoholics with cirrhosis of the liver, of whom 29 have hepatomas—that is, liver-cell carcinoma. Suppose we know, based on a large sample, that the risk of hepatoma among alcoholics without cirrhosis of the liver is 24%. 5.50  What is the probability that we observe exactly 29 alcoholics with cirrhosis of the liver who have hepatomas if the true rate of hepatoma among alcoholics (with or without cirrhosis of the liver) is .24?

Plasma-aldosterone concentration (pmol/liter)

*5.48  If the mean plasma-aldosterone level in white children is 400 pmol/L with standard deviation of 218 pmol/L, then what percentage of white children have levels ≤ 300 pmol/L if normality is assumed?

900

800

700

600

500

400

300

200

5.51  What is the probability of observing at least 29 hepatomas among the 84 alcoholics with cirrhosis of the liver under the assumptions in Problem 5.50?

100

5.52  What is the smallest number of hepatomas that would have to be observed among the alcoholics with cirrhosis of the liver for the hepatoma experience in this group to differ from the hepatoma experience among alcoholics without cirrhosis of the liver? (Hint: Use a 5% probability of getting a result at least as extreme to denote differences between the hepatoma experiences of the two groups.)

Hypertension The Fourth Task Force Report on Blood Pressure Control in Children [2] reports blood-pressure norms for children by

p < 0.001

Whites

Blacks

age and sex group. The estimated mean ± standard deviation for 17-year-old boys for DBP is 67.9 ± 11.6 mm Hg, based on a large sample. 5.53  One approach for defining elevated blood pressure is to use 90 mm Hg—the standard for elevated adult DBP—as the cutoff. What percentage of 17-year-old boys would be found to have elevated blood pressure, using this approach?

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142   C H A P T E R 5 

  Continuous Probability Distributions

5.54  Suppose 2000 17-year-old boys are in the 11th grade, of whom 50 have elevated blood pressure by the criteria in Problem 5.53. Is this an unusually low number of boys with elevated blood pressure? Why or why not?

Environmental Health 5.55  A study was conducted relating particulate air pollution and daily mortality in Steubenville, Ohio [3]. On average over the past 10 years there have been 3 deaths per day in Steubenville. Suppose that on 90 high-pollution days—days in which the total suspended particulates are in the highest quartile among all days—the death rate is 3.2 deaths per day, or 288 deaths observed over the 90 high-pollution days. Are there an unusual number of deaths on highpollution days?

Nutrition Refer to Data Set VALID.DAT (on the Companion Website) described in Table 2.16 (p. 36). 5.56  Consider the nutrients saturated fat, total fat, and total calories. Plot the distribution of each nutrient for both the diet record and the food-frequency questionnaire. Do you think a normal distribution is appropriate for these nutrients? (Hint: Compute the observed proportion of women who fall within 1.0, 1.5, 2.0, and 2.5 standard deviations of the mean. Compare the observed proportions with the expected proportions based on the assumption of normality.) 5.57  Answer Problem 5.56 using the ln(nutrient) transformation for each nutrient value. Is the normality assumption more appropriate for log-transformed or untransformed values, or neither? 5.58  A special problem arises for the nutrient alcohol consumption. There are often a large number of nondrinkers (alcohol consumption = 0) and another large group of drinkers (alcohol consumption > 0). The overall distribution of alcohol consumption appears bimodal. Plot the distribution of alcohol consumption for both the diet record and the food frequency questionnaire. Do the distributions appear unimodal or bimodal? Do you think the normality assumption is appropriate for this nutrient?

Cancer, Neurology A study concerned the risk of cancer among patients with cystic fibrosis [4]. Given registries of patients with cystic fibrosis in the United States and Canada, cancer incidence among cystic-fibrosis patients between January 1, 1985 and December 31, 1992 was compared with expected cancer-incidence rates based on the Surveillance Epidemiology and End Results program from the National Cancer Institute from 1984 to 1988. 5.59  Among cystic-fibrosis patients, 37 cancers were observed, whereas 45.6 cancers were expected. What

distribution can be used to model the distribution of the number of cancers among cystic-fibrosis patients? 5.60  Is there an unusually low number of cancers among cystic-fibrosis patients? 5.61  In the same study 13 cancers of the digestive tract were observed, whereas only 2 cancers were expected. Is there an unusually high number of digestive cancers among cystic-fibrosis patients?

Hypertension A doctor diagnoses a patient as hypertensive and prescribes an antihypertensive medication. To assess the clinical status of the patient, the doctor takes n replicate blood-pressure measurements before the patient starts the drug (baseline) and n replicate blood-pressure measurements 4 weeks after starting the drug (follow-up). She uses the average of the n replicates at baseline minus the average of the n replicates at follow-up to assess the clinical status of the patient. She knows, from previous clinical experience with the drug, that the mean diastolic blood pressure (DBP) change over a 4-week period over a large number of patients after starting the drug is 5.0 mm Hg with variance 33/n, where n is the number of replicate measures obtained at both baseline and follow-up. 5.62  If we assume the change in mean DBP is normally distributed, then what is the probability that a subject will decline by at least 5 mm Hg if 1 replicate measure is obtained at baseline and follow-up? 5.63  The physician also knows that if a patient is untreated (or does not take the prescribed medication), then the mean DBP over 4 weeks will decline by 2 mm Hg with variance 33/n. What is the probability that an untreated subject will decline by at least 5 mm Hg if 1 replicate measure is obtained at both baseline and follow-up? 5.64  Suppose the physician is not sure whether the patient is actually taking the prescribed medication. She wants to take enough replicate measurements at baseline and follow-up so that the probability in Problem 5.62 is at least five times the probability in Problem 5.63. How many replicate measurements should she take?

Endocrinology A study compared different treatments for preventing bone loss among postmenopausal women younger than 60 years of age [5]. The mean change in bone-mineral density of the lumbar spine over a 2-year period for women in the placebo group was −1.8% (a mean decrease), with a standard deviation of 4.3%. Assume the change in bone-mineral density is normally distributed. 5.65  If a decline of 2% in bone-mineral density is considered clinically significant, then what percentage of women in the placebo group can be expected to show a decline of at least this much?

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Problems   143

The change in bone-mineral density of the lumbar spine over a 2-year period among women in the alendronate 5-mg group was +3.5% (a mean increase), with a standard deviation of 4.2%.

distribution of SBP remained normal, then what would be the expected proportion of hypertensive women under the assumption in Problem 5.69? 5.71  What percentage of hypertension at age 50 is attributable to the weight gain from age 18 to 50?

5.66  What percentage of women in the alendronate 5-mg group can be expected to have a clinically significant decline in bone-mineral density as defined in Problem 5.65?

S I M U L AT I O N

5.67  Suppose 10% of the women assigned to the alendronate 5-mg group are actually not taking their pills (noncompliers). If noncompliers are assumed to have a similar response as women in the placebo group, what percentage of women complying with the alendronate 5-mg treatment would be expected to have a clinically significant decline? (Hint: Use the total-probability rule.)

5.72  Draw 100 random samples from a binomial distribution with parameters n = 10 and p = .4. Consider an approximation to this distribution by a normal distribution with mean = np = 4 and variance = npq = 2.4. Draw 100 random samples from the normal approximation. Plot the two frequency distributions on the same graph, and compare the results. Do you think the normal approximation is adequate here?

Cardiovascular Disease

5.73  Answer the question in Problem 5.72 for a binomial distribution with parameters n = 20 and p = .4 and the corresponding normal approximation.

Obesity is an important determinant of cardiovascular disease because it directly affects several established cardiovascular risk factors, including hypertension and diabetes. It is estimated that the average weight for an 18-year-old woman is 123 lb and increases to 142 lb at 50 years of age. Also, let us assume that the average SBP for a 50-year-old woman is 125 mm Hg, with a standard deviation of 15 mm Hg, and that SBP is normally distributed.

5.74  Answer the question in Problem 5.72 for a binomial distribution with parameters n = 50 and p = .4 and the corresponding normal approximation.

S I M U L AT I O N

5.68  What proportion of 50-year-old women is hypertensive, if hypertension is defined as SBP ≥ 140 mm Hg?

An apparatus displaces a collection of balls to the top of a stack by suction. At the top level (Level 1) each ball is shifted 1 unit to the left or 1 unit to the right at random with equal probability (see Figure 5.24). The ball then drops down to Level 2. At Level 2, each ball is again shifted 1unit to the left or 1 unit to the right at random. The process continues for 15 levels; the balls remain at the bottom for a short time and are then forced by suction to the top. (Note: A similar apparatus, located in the Museum of Science, Boston, Massachusetts, is displayed in Figure 5.25.)

From previous clinical trials, it is estimated that for every 10 lb of weight loss there is, on average, a corresponding reduction in mean SBP of 3 mm Hg. 5.69  Suppose an average woman did not gain any weight from age 18 to 50. What average SBP for 50-year-old women would be expected under these assumptions? 5.70  If the standard deviation of SBP under the assumption in Problem 5.69 remained the same (15 mm Hg), and the

Figure 5.24  Apparatus for random displacement of balls Level 1 2 3 etc. etc. 15 etc.

–3

–2

–1

1

2

3

etc.

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144   C H A P T E R 5 

  Continuous Probability Distributions

Figure 5.25  Probability apparatus at the Museum of Science, Boston

The FAIR test is based on nerve-conduction velocity and is expressed as a difference score (nerve-conduction velocity in an aggravating posture minus nerve-conduction velocity in a neutral posture). It is felt that the larger the FAIR test score, the more likely a participant will be to have PS. Data are given in the Data Set PIRIFORM.DAT for 142 participants without PS (piriform = 1) and 489 participants with PS (piriform = 2) for whom the diagnosis of PS was based on clinical criteria. The FAIR test value is called MAXCHG and is in milliseconds (ms). A cutoff point of ≥ 1.86 ms on the FAIR test is proposed to define a positive test. 5.78  What is the sensitivity of the test for this cutoff point? Photo taken by David Rosner; courtesy of the Museum of Science, Boston.

5.79  What is the specificity of the test for this cutoff point?

5.75  What is the exact probability distribution of the position of the balls at the bottom with respect to the entry position (arbitrarily denoted by 0)? 5.76  Can you think of an approximation to the distribution derived in Problem 5.75?

S I M U L AT I O N 5.77  Perform a simulation of this process (e.g., using MINITAB or Excel) with 100 balls, and plot the frequency distribution of the position of the balls at the bottom with respect to the entry position. Does the distribution appear to conform to the distributions derived in Problems 5.75 and 5.76?

Orthopedics A study was conducted of a diagnostic test (the FAIR test, i.e., hip flexion, adduction, and internal rotation) used to identify people with piriformis syndrome (PS), a pelvic condition that involves malfunction of the piriformis muscle (a deep buttock muscle), which often causes lumbar and buttock pain with sciatica (pain radiating down the leg) [6].

5.80  Suppose that 70% of the participants who are referred to an orthopedist who specializes in PS will actually have the condition. If a test score of ≥ 1.86 ms is obtained for a participant, then what is the probability that the person has PS? 5.81  The criterion of ≥ 1.86 ms to define a positive test is arbitrary. Using different cutoff points to define positivity, obtain the ROC curve for the FAIR test. What is the area under the ROC curve? What does it mean in this context? 5.82  Do you think the distribution of FAIR test scores within a group is normally distributed? Why or why not?

Ophthalmology Retinitis pigmentosa (RP) is a genetic ocular disease that results in substantial visual loss and in many cases leads to blindness. One measure commonly used to assess the visual function of these patients is the Humphrey 30−2 visualfield total point score. The score is a measure of central vision and is computed as a sum of visual sensitivities over 76 locations, with a higher score indicating better central vision. Normals have an average total point score of 2500 db (decibels), and the average 37-year-old RP patient has a total point score of 900 db. A total point score of < 250 db is often associated with legal blindness. Longitudinal studies have indicated that the change in total point score over N years of the average RP patient is normally distributed with mean change = 45N and variance of change = 1225N. (Assume the total point score is measured without error; hence, no continuity correction is needed.) 5.83  What is the probability that a patient will change by ≥ 200 db over 5 years? 5.84  If a 37-year-old RP patient has an initial total point score of 900 db, what is the probability that the patient will become legally blind (that is, have a total point score of < 250 db) by age 50? Suppose a new treatment is discovered based on ocular implants. The treatment immediately lowers total point score by 50 db. However, the long-term effect is to reduce the mean rate of decline to 25 db per year (from the previous 45 db per year), while maintaining the same variance of

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Problems   145

change as previously (that is, variance of change over N years = 1225N). 5.85  If a 37-year-old RP patient has an initial total point score of 900 db and receives the implant treatment, what is the probability that the patient will become legally blind by age 50?

Diabetes Physicians recommend that children with type-I (insulindependent) diabetes keep up with their insulin shots to minimize the chance of long-term complications. In addition, some diabetes researchers have observed that growth rate of weight during adolescence among diabetic patients is affected by level of compliance with insulin therapy. Suppose 12-year-old type-I diabetic boys who comply with their insulin shots have a weight gain over 1 year that is normally distributed, with mean = 12 lb and variance = 12 lb. 5.86  What is the probability that compliant type-I diabetic 12-year-old boys will gain at least 15 lb over 1 year? Conversely, 12-year-old type-I diabetic boys who do not take their insulin shots have a weight gain over 1 year that is normally distributed with mean = 8 lb and variance = 12 lb. 5.87  Answer the question in Problem 5.86 for noncompliant type-I diabetic 12-year-old boys. It is generally assumed that 75% of type-I diabetics comply with their insulin regimen. Suppose that a 12-year-old type-I diabetic boy comes to clinic and shows a 5-lb weight gain over 1 year (actually, because of measurement error, assume this is an actual weight gain from 4.5 to 5.5 lb). The boy claims to be taking his insulin medication. 5.88  What is the probability that he is telling the truth?

Environmental Health Some previous studies have shown that mortality rates are higher on days with high pollution levels. In a follow-up on this observation, a group of 50 nonfatal heart attack cases were ascertained over a 1-year period. For each case, the level of pollution (total suspended particulates) was measured on the day of the heart attack (index date) and also 1 month before the heart attack (control date). The results shown in Table 5.4 were obtained: Table 5.4  Comparison of pollution levels on index date vs. control date

Pollution level on index date > pollution level on control date Pollution level on control date > pollution level on index date Pollution level the same on both days Total

n

30 15 5 50

5.89  Suppose the level of pollution has nothing to do with the incidence of heart attack. How many heart attacks would be expected to occur where the pollution level on the index date is higher than the pollution level on the control date? (Ignore cases where the pollution level on the index and control dates are the same.) 5.90  Given the preceding data, assess whether pollution level acts as a trigger effect in causing heart attack. (Hint: Use the normal approximation to the binomial distribution.) Researchers also analyzed cases occurring in the winter months. They found that on 10 days the pollution level on the index date was higher than on the control date, whereas on 4 days the pollution level on the control date was higher than on the index date. For 2 cases, the pollution level was the same on both days. 5.91  Answer Problem 5.90 based on cases in winter.

Ophthalmology A previous study found that people consuming large quantities of vegetables containing lutein (mainly spinach) were less likely to develop macular degeneration, a common eye disease among older people (age 65+) that causes a substantial loss in visual acuity and in some cases can lead to total blindness. To follow up on this observation, a clinical trial is planned in which participants 65+ years of age without macular degeneration will be assigned to either a high-dose lutein supplement tablet or a placebo tablet taken once per day. To estimate the possible therapeutic effect, a pilot study was conducted in which 9 people 65+ years of age were randomized to placebo and 9 people 65+ years of age were randomized to lutein tablets (active treatment). Their serum lutein level was measured at baseline and again after 4 months of follow-up. From previous studies, people with serum lutein ≥ 10 mg/dL are expected to get some protection from macular degeneration. However, the level of serum lutein will vary depending on genetic factors, dietary factors, and study supplements. 5.92  Suppose that among people randomized to placebo, at a 4-month follow-up mean serum lutein level = 6.4 mg/dL with standard deviation = 3 mg/dL. If we presume a normal distribution for serum lutein, then what percentage of placebo subjects will have serum lutein in the therapeutic range (≥ 10 mg/dL)? (For the following problems, assume that lutein can be measured exactly, so that no continuity correction is necessary.) 5.93  Suppose that among people randomized to lutein tablets, at a 4-month follow-up the mean serum lutein level = 21 mg/dL with standard deviation = 8 mg/dL. If we presume a normal distribution for serum-lutein values among lutein-treated participants, then what percentage of people randomized to lutein tablets will have serum lutein in the therapeutic range? Suppose for the sake of simplicity that the incidence of macular degeneration is 1% per year among people

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146   C H A P T E R 5 

  Continuous Probability Distributions

65+ years of age in the therapeutic range (≥10 mg/dL) and 2% per year among people 65+ years of age with lower levels of lutein (< 10 mg/dL). 5.94  What is the expected incidence rate of macular degeneration among lutein-treated participants? (Hint: Use the total-probability rule.) 5.95  What is the expected relative risk of macular degeneration for lutein-treated participants versus placebo-treated participants in the proposed study?

Pediatrics A study was recently published in Western Australia on the relationship between method of conception and prevalence of major birth defects (Hansen et al. [7]). The prevalence of at least one major birth defect among infants conceived naturally was 4.2%, based on a large sample of infants. Among 837 infants born as a result of in-vitro fertilization (IVF), 75 had at least one major birth defect. 5.96  How many infants with at least one birth defect would we expect among the 837 IVF infants if the true prevalence of at least one birth defect in the IVF group were the same as for infants conceived naturally? 5.97  Do an unusual number of infants have at least one birth defect in the IVF group? Why or why not? (Hint: Use an approximation to the binomial distribution.) In addition, data were also provided regarding specific birth defects. There were 6 chromosomal birth defects among the IVF infants. Also, the prevalence of chromosomal birth defects among infants conceived naturally is 9/4000. 5.98  Are there an unusual number of chromosomal birth defects in the IVF group? (Hint: Use an approximation to the binomial distribution.)

Accident Epidemiology Automobile accidents are a frequent occurrence and one of the leading causes of morbidity and mortality among persons 18−30 years of age. The National Highway & Traffic Safety Administration (NHTSA) has estimated that the average driver in this age group has a 6.5% probability of having at least one police-reported automobile accident over the past year. Suppose we study a group of medical interns who are on a typical hospital work schedule in which they have to work through the night for at least one of every three nights. Among 20 interns, 5 report having had an automobile accident over the past year while driving to or from work. Suppose the interns have the same risk of having an automobile accident as a typical person ages 18−30. 5.99  What is a reasonable probability model for the number of interns with at least one automobile accident over the past year? What are the parameters of this model? 5.100  Apply the model in Problem 5.99 to assess whether there are an excessive number of automobile accidents

among interns compared with the average 18- to 30-year old. Explain your answer. The study is expanded to include 50 medical interns, of whom 11 report having had an automobile accident over the past year. One issue in the above study is that not all people report automobile accidents to the police. The NHTSA estimates that only half of all auto accidents are actually reported. Assume this rate applies to interns. 5.101  What is an exact probability model for the number of automobile accidents over the past year for the 50 medical interns? (Note: The 11 reported accidents include both police-reported and non-police-reported accidents). 5.102  Assess whether there are an excessive number of automobile accidents among interns under these altered assumptions. Explain your answer. (Hint: An approximation may be helpful.) 5.103  What is the 40th percentile of a normal distribution with mean = 5 and variance = 9? 5.104  What is the sum of the 40th and 60th percentiles of a normal distribution with a mean = 8.2 and variance = 9.5? 5.105  What is z.90?

Obstetrics A study was performed of different predictors of low birthweight deliveries among 32,520 women in the Nurses’ Health Study [8]. The data in Table 5.5 were presented concerning the distribution of birthweight in the study: Table 5.5  Distribution of birthweight in the Nurses’ Health Study Category

Birthweight (g)

N

%

A B C D E

< 2500 2500–2999 3000–3499 3500–3999 4000+

1850 6289 13,537 8572 2272

5.7 19.3 41.6 26.4 7.0

32,520

100.0

Total

5.106  If 20 women are randomly chosen from the study, what is the probability that exactly 2 will have a low birthweight delivery (defined as < 2500 g)? 5.107  What is the probability that at least 2 women will have a low birthweight delivery? An important risk factor for low birthweight delivery is maternal smoking during pregnancy (MSMOK). The data in Table 5.6 were presented relating MSMOK to birthweight.

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Problems   147

Table 5.6  Association between maternal smoking and birthweight category in the Nurses’ Health Study

What is the expected number of breast cancer cases in this group by the year 2025? (Assume no deaths over this period.) 5.113  What is the difference between a prevalence rate of breast cancer and an incidence rate of breast cancer?

Category

Birthweight (g)

% MSMOK = yes

A B C D E

< 2500 2500–2999 3000–3499 3500–3999 4000+

40 34 25 19 15

5.108  If 50 women are selected from the < 2500 g group, then what is the probability that at least half of them will have smoked during pregnancy? 5.109  What is the probability that a woman has a low birthweight delivery if she smokes during pregnancy? (Hint: Use Bayes’ rule.)

Cancer The Shanghai Women’s Health Study (SWHS) was undertaken to determine risk factor for different cancers among Asian women. The women were recruited from urban communities in 1997−2000 and were interviewed every 2 years to obtain health-related information. One issue is whether risk prediction models derived from American populations are also applicable to Asian women. 5.110  Suppose the expected number of breast cancer cases among a large number of 45- to 49-year-old women in this study who were followed for 7 years is 149, while the observed number of cases is 107. Is there an unusually small number of cases among Asian women? Why or why not? Another aspect of the study is to use the SWHS data to predict the long-term incidence of breast cancer in Chinese women. Those incidence data are presented in Table 5.7. 5.111  What is the predicted cumulative incidence of breast cancer from age 40 to 64 (i.e., over a 25-year period) among Chinese women? (Assume no deaths over this period.) 5.112  Suppose that in the year 2000 there are 10,000,000 Chinese women age 40 years with no prior breast cancer. Table 5.7  Incidence rate of breast cancer by age in the SWHS Age

40–44 45–49 50–54 55–59 60–64

Annual incidence per 105 women

63.8 86.6 92.6 107.0 120.9

Diabetes The Diabetes Prevention Trial (DPT) involved a weight loss trial in which half the subjects received an active intervention and the other half a control intervention. For subjects in the active intervention group, the average reduction in body mass index (BMI, i.e., weight in kg/height2 in m2) over 24 months was 1.9 kg/m2. The standard deviation of change in BMI was 6.7 kg/m2. 5.114  If the distribution of BMI change is approximately normal, then what is the probability that a subject in the active group would lose at least 1 BMI unit over 24 months? In the control group of the Diabetes Prevention Trial, the mean change in BMI was 0 units with a standard deviation of 6 kg/m2. 5.115  What is the probability that a random control group participant would lose at least 1 BMI unit over 24 months? It was known that only 70% of the subjects in the active group actually complied with the intervention; that is, 30% of subjects either dropped out or did not attend the required group and individual counseling meetings. We will refer to this latter 30% of subjects as dropouts. 5.116  If we assume that dropouts had the same distribution of change as the subjects in the control group, then what is the probability that an active subject who complied with the intervention lost at least 1 kg/m2?

Ophthalmology, Genetics Age-related macular degeneration (AMD) is a common eye disease among the elderly that can lead to partial or total loss of vision. It is well known that smoking and excessive weight tend to be associated with higher incidence rates of AMD. More recently, however, several genes have been found to be associated with AMD as well. One gene that has been considered is the Y402H gene. There are three genotypes for the Y402H gene—TT, TC, and CC. The relationship between AMD and the Y402H genotype is as follows: Table 5.8  Association between Y402H genotype and prevalence of AMD in a high-risk population Y402H

AMD = yes

AMD = no

TT (wild type) TC CC

41 119 121

380 527 278

Total

281

1185

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148   C H A P T E R 5 

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5.117  What is the relative risk for AMD for the CC genotype compared with the TT genotype? One issue is whether the Y402H gene is in Hardy- Weinberg equilibrium (HWE). For a gene to be in HWE, its two alleles must assort independently. 5.118  Under HWE, what is the expected frequency of the TC genotype among the 1185 subjects in the AMD = no group? 5.119  Are the data consistent with HWE? Specifically, is the number of heterozygotes (TC) significantly lower than expected under HWE?

Hypertension Blood pressure readings are known to be highly variable. Suppose we have mean SBP for one individual over n visits with k readings per visit Xn,k . The variability of Xn,k depends on n and k and is given by the formula σw2 = σA2/n + σ2/(nk), where σA2 = between visit variability and σ2 = within visit variability. For 30- to 49-year-old white females, σA2 = 42.9 and σ2 = 12.8. For one individual, we also assume that Xn,k is normally distributed about their true long-term mean = µ with variance = σw2.

(

)

(

)

5.120  Suppose a woman is measured at two visits with two readings per visit. If her true long-term SBP = 130 mm Hg, then what is the probability that her observed mean SBP is ≥140? (Ignore any continuity correction.) (Note: By true mean SBP we mean the average SBP over a large number of visits for that subject.) 5.121  Suppose we want to observe the woman over n visits, where n is sufficiently large so that there is less than a 5% chance that her observed mean SBP will not differ from her true mean SBP by more than 5 mm Hg. What is the smallest value of n to achieve this goal? (Note: Assume two readings per visit.) It is also known that over a large number of 30- to 49-year-old white women, their true mean SBP is normally distributed with mean = 120 mm Hg and standard deviation = 14 mm Hg. Also, over a large number of black 30- to 49-year-old women, their true mean SBP is normal with mean = 130 mm Hg and standard deviation = 20 mm Hg. 5.122  Suppose we select a random 30- to 49-year-old white woman and a random 30- to 49-year-old black woman. What is the probability that the black woman has a higher true SBP?

R eferences [1] Pratt, J. H., Jones, J. J., Miller, J. Z., Wagner, M. A., & Fineberg, N. S. (1989, October). Racial differences in aldosterone excretion and plasma aldosterone concentrations in children. New England Journal of Medicine, 321(17), 1152−1157. [2] National High Blood Pressure Group Working on High Blood Pressure in Children and Adolescents. (2004). The fourth report on the diagnosis, evaluations, and treatment of high blood pressure in children and adolescents. Pediatrics, 114, 555−576. [3] Schwartz, J., & Dockery, D. W. (1992, January). Particulate air pollution and daily mortality in Steubenville, Ohio. American Journal of Epidemiology, 135(1), 12−19. [4] Neglia, J. F., Fitzsimmons, S. C., Maisonneauve, P., Schoni, M. H., Schoni-Affolter, F., Corey, M., Lowenfels, A. B., & the Cystic Fibrosis and Cancer Study Group. (1995). The risk of cancer among patients with cystic fibrosis. New England Journal of Medicine, 332, 494−499.

[5] Hosking, D., Chilvers, C. E. D., Christiansen, C., Ravn, P., Wasnich, R., Ross, P., McClung, M., Belske, A., Thompson, D., Daley, M. T., & Yates, A. J. (1998). Prevention of bone loss with alendronate in postmenopausal women under 60 years of age. New England Journal of Medicine, 338, 485−492. [6] Fishman, L. M., Dombi, G. W., Michaelsen, C., Ringel, S., Rozbruch, J., Rosner, B., & Weber, C. (2002). Piriformis syndrome: Diagnosis, treatment, and outcome—a 10-year study. Archives of Physical Medicine, 83, 295−301. [7] Hansen, M., Kurinczuk, J. J., Bower, C., & Webb, S. (2002). The risk of major birth defects after intracytoplasmic sperm injection and in vitro fertilization. New England Journal of Medicine, 346(10), 725−730. [8] Xue, F., Willett, W. C, Rosner, B. A., Forman, M. R., & Michels, K. B. (2008). Parental characteristics as predictors of birthweight. Human Reproduction, 23(1), 168–177.

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6

Estimation

6.1 Introduction Chapters 3 through 5 explored the properties of different probability models. In doing so, we always assumed the specific probability distributions were known.

Example 6.1

Infectious Disease  We assumed the number of neutrophils in a sample of 100 white blood cells was binomially distributed, with parameter p = .6.

Example 6.2

Bacteriology  We assumed the number of bacterial colonies on a 100-cm2 agar plate was Poisson distributed, with parameter µ = 2.

Example 6.3

Hypertension  We assumed the distribution of diastolic blood-pressure (DBP) measurements in 35- to 44-year-old men was normal, with mean µ = 80 mm Hg and standard deviation σ = 12 mm Hg. In general, we have been assuming that the properties of the underlying distributions from which our data are drawn are known and that the only question left is what we can predict about the behavior of the data given an understanding of these properties.

Example 6.4

Hypertension  Using the model in Example 6.3, we could predict that about 95% of all DBP measurements from 35- to 44-year-old men should fall between 56 and 104 mm Hg. The problem addressed in the rest of this text, and the more basic statistical problem, is that we have a data set and we want to infer the properties of the underlying distribution from this data set. This inference usually involves inductive reasoning rather than deductive reasoning; that is, in principle, a variety of different probability models must at least be explored to see which model best “fits” the data. Statistical inference can be further subdivided into the two main areas of estimation and hypothesis testing. Estimation is concerned with estimating the values of specific population parameters; hypothesis testing is concerned with testing whether the value of a population parameter is equal to some specific

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150   C H A P T E R 6 

  Estimation

value. Problems of estimation are covered in this chapter, and problems of hypothesis testing are discussed in Chapters 7 through 10. Some typical problems that involve estimation follow.

Example 6.5

Hypertension  Suppose we measure the systolic blood pressure (SBP) of a group of Samoan villagers and we believe the underlying distribution is normal. How can the parameters of this distribution (µ, σ2) be estimated? How precise are our estimates?

Example 6.6

Infectious Disease  Suppose we look at people living within a low-income census tract in an urban area and we wish to estimate the prevalence of human immunodeficiency virus (HIV) in the community. We assume the number of cases among n people sampled is binomially distributed, with some parameter p. How is the para­ meter p estimated? How precise is this estimate? In Examples 6.5 and 6.6, we were interested in obtaining specific values as estimates of our parameters. These values are often referred to as point estimates. Sometimes we want to specify a range within which the parameter values are likely to fall. If this range is narrow, then we may feel our point estimate is good. This type of problem involves interval estimation.

Example 6.7

Ophthalmology  An investigator proposes to screen a group of 1000 people ages 65 or older to identify those with visual impairment—that is, a visual acuity of 20/50 or worse in both eyes, even with the aid of glasses. Suppose we assume the number of people with visual impairment ascertained in this manner is binomially distributed, with parameters n = 1000 and unknown p. We would like to obtain a point estimate of p and provide an interval about this point estimate to see how precise our point estimate is. For example, we would feel more confidence in a point estimate of 5% if this interval were .04−.06 than if it were .01–.10.

6.2 The Relationship Between Population and Sample Example 6.8

Obstetrics  Suppose we want to characterize the distribution of birthweights of all liveborn infants born in the United States in 2008. Assume the underlying distribution of birthweight has an expected value (or mean) µ and variance σ2. Ideally, we wish to estimate µ and σ2 exactly, based on the entire population of U.S. liveborn infants in 2008. But this task is difficult with such a large group. Instead, we decide to select a random sample of n infants who are representative of this large group and use the birthweights x1 , . . . , xn from this sample to help us estimate µ and σ2. What is a random sample?

Definition 6.1 A random sample is a selection of some members of the population such that each member is independently chosen and has a known nonzero probability of being selected.

Definition 6.2 A simple random sample is a random sample in which each group member has the same probability of being selected.

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6.2  ■  The Relationship Between Population and Sample   151

Definition 6.3 The reference, target, or study population is the group we want to study. The random sample is selected from the study population.

For ease of discussion, we use the abbreviated term “random sample” to denote a simple random sample. Although many samples in practice are random samples, this is not the only type of sample used in practice. A popular alternative design is cluster sampling.

Example 6.9

Cardiovascular Disease  The Minnesota Heart Study seeks to accurately assess the prevalence and incidence of different types of cardiovascular morbidity (such as heart attack and stroke) in the greater Minneapolis–St. Paul metropolitan area, as well as trends in these rates over time. It is impossible to survey every person in the area. It is also impractical to survey, in person, a random sample of people in the area because that would entail dispersing a large number of interviewers throughout the area. Instead, the metropolitan area is divided into geographically compact regions, or clusters. A random sample of clusters is then chosen for study, and several interviewers go to each cluster selected. The primary goal is to enumerate all households in a cluster and then survey all members of these households, with the secondary goal being to identify all adults age 21 years and older. The interviewers then invite age-eligible individuals to be examined in more detail at a centrally located health site within the cluster. The total sample of all interviewed subjects throughout the metropolitan area is called a cluster sample. Similar strategies are also used in many national health surveys. Cluster samples require statistical methods that are beyond the scope of this book. See Cochran [1] for more discussion of cluster sampling. In this book, we assume that all samples are random samples from a reference population.

Example 6.10

Epidemiology  The Nurses’ Health Study is a large epidemiologic study involving more than 100,000 female nurses residing in 11 large states in the United States. The nurses were first contacted by mail in 1976 and since then have been followed every 2 years by mail. Suppose we want to select a sample of 100 nurses to test a new procedure for obtaining blood samples by mail. One way of selecting the sample is to assign each nurse an ID number and then select the nurses with the lowest 100 ID numbers. This is definitely not a random sample because each nurse is not equally likely to be chosen. Indeed, because the first two digits of the ID number are assigned according to state, the 100 nurses with the lowest ID numbers would all come from the same state. An alternative method of selecting the sample is to have a computer generate a set of 100 random numbers (from among the numbers 1 to over 100,000), with one number assigned to each nurse in the study. Thus each nurse is equally likely to be included in the sample. This would be a truly random sample. (More details on random numbers are given in Section 6.3.) In practice, there is rarely an opportunity to enumerate each member of the reference population so as to select a random sample, so the researcher must assume that the sample selected has all the properties of a random sample without formally being a random sample.

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152   C H A P T E R 6 

  Estimation

In Example 6.8 the reference population is finite and well defined and can be enumerated. In many instances, however, the reference population is effectively infinite and not well defined.

Example 6.11

Cancer  Suppose we want to estimate the 5-year survival rate of women who are initially diagnosed as having breast cancer at the ages of 45−54 and who undergo radical mastectomy at this time. Our reference population is all women who have ever had a first diagnosis of breast cancer when they were 45−54 years old, or whoever will have such a diagnosis in the future when they are 45−54 years old, and who receive radical mastectomies. This population is effectively infinite. It cannot be formally enumerated, so a truly random sample cannot be selected from it. However, we again assume the sample we have selected behaves as if it were a random sample. In this text we assume all reference populations discussed are effectively infinite, although, as in Examples 6.8 and 6.10, many are actually very large but finite. Sampling theory is the special branch of statistics that treats statistical inference for finite populations; it is beyond the scope of this text. See Cochran [1] for a good treatment of this subject.

6.3 Random-Number Tables In this section, practical methods for selecting random samples are discussed.

Example 6.12

Hypertension  Suppose we want to study how effective a hypertension treatment program is in controlling the blood pressure of its participants. We have a roster of all 1000 participants in the program but because of limited resources only 20 can be surveyed. We would like the 20 people chosen to be a random sample from the population of all participants in the program. How should we select this random sample? A computer-generated list of random numbers would probably be used to select this sample.

Definition 6.4

A random number (or random digit) is a random variable X that takes on the values 0, 1, 2, . . . , 9 with equal probability. Thus

Definition 6.5

Pr ( X = 0 ) = Pr ( X = 1) = L = Pr ( X = 9) =

1 10

Computer-generated random numbers are collections of digits that satisfy the following two properties: (1) Each digit 0, 1, 2, . . . , 9 is equally likely to occur. (2) The value of any particular digit is independent of the value of any other digit selected.

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6.3  ■  Random-Number Tables   153

Table 4 in the Appendix lists 1000 random digits generated by a computer algorithm.

Example 6.13

Suppose 5 is a particular random digit selected. Does this mean 5’s are more likely to occur in the next few digits selected?

Solution

No. Each digit either after or before the 5 is still equally likely to be any of the digits 0, 1, 2, . . . , 9 selected. Computer programs generate large sequences of random digits that approximately satisfy the conditions in Definition 6.5. Thus such numbers are sometimes referred to as pseudorandom numbers because they are simulated to approximately satisfy the properties in Definition 6.5.

Example 6.14

Hypertension  How can the random digits in Table 4 be used to select 20 random participants in the hypertension treatment program in Example 6.12?

Solution

A roster of the 1000 participants must be compiled, and each participant must then be assigned a number from 000 to 999. Perhaps an alphabetical list of the participants already exists, which would make this task easy. Twenty groups of three digits would then be selected, starting at any position in the random-number table. For example, if we start at the first row of Table 4 we have the numbers listed in Table 6.1.

Table 6.1

Twenty random participants chosen from 1000 participants in the hypertension treatment program First 3 rows of random-number table

Actual random numbers chosen

32924

22324

18125

09077

329

242

232

418

125

54632

90374

94143

49295

090

775

463

290

374

88720

43035

97081

83373

941

434

929

588

720

430

359

708

183

373

Therefore, our random sample would consist of the people numbered 329, 242, . . . , 373 in the alphabetical list. In this particular case there were no repeats in the 20 three-digit numbers selected. If there had been repeats, then more three-digit numbers would have been selected until 20 unique numbers were selected. This process is called random selection.

Example 6.15

Diabetes  Suppose we want to conduct a clinical trial to compare the effectiveness of an oral hypoglycemic agent for diabetes with standard insulin therapy. A small study of this type will be conducted on 10 patients: 5 patients will be randomly assigned to the oral agent and 5 to insulin therapy. How can the table of random numbers be used to make the assignments?

Solution

The prospective patients are numbered from 0 to 9, and five unique random digits are selected from some arbitrary position in the random-number table (e.g., from the

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154   C H A P T E R 6 

  Estimation

28th row). The first five unique digits are 6, 9, 4, 3, 7. Thus the patients numbered 3, 4, 6, 7, 9 are assigned to the oral hypoglycemic agent and the remaining patients (numbered 0, 1, 2, 5, 8) to standard insulin therapy. In some studies the prospective patients are not known in advance and are recruited over time. In this case, if 00 is identified with the 1st patient recruited, 01 with the 2nd patient recruited, . . . , and 09 with the 10th patient recruited, then the oral hypoglycemic agent would be assigned to the 4th (3 + 1), 5th (4 + 1), 7th (6 + 1), 8th (7 + 1), and 10th (9 + 1) patients recruited and the standard therapy to the 1st (0 + 1), 2nd (1 + 1), 3rd (2 + 1), 6th (5 + 1), and 9th (8 + 1) patients recruited. This process is called random assignment. It differs from random selection (Example 6.14) in that, typically, the number, in this case of patients, to be assigned to each type of treatment (5) is fixed in advance. The random-number table helps select the 5 patients who are to receive one of the two treatments (oral hypoglycemic agent). By default, the patients not selected for the oral agent are assigned to the alternative treatment (standard insulin therapy). No additional random numbers need be chosen for the second group of 5 patients. If random selection were used instead, then one approach might be to draw a random digit for each patient. If the random digit is from 0 to 4, then the patient is assigned to the oral agent; if the random digit is from 5 to 9, then the patient is assigned to insulin therapy. One problem with this approach is that in a finite sample, equal numbers of patients are not necessarily assigned to each therapy, which is usually the most efficient design. Indeed, referring to the first 10 digits in the 28th row of the random-number table (69644 37198), we see that 4 patients would be assigned to oral therapy (patients 4, 5, 6, and 8) and 6 patients would be assigned to insulin therapy (patients 1, 2, 3, 7, 9, 10) if the method of random selection were used. Random assignment is preferable in this instance because it ensures an equal number of patients assigned to each treatment group.

Example 6.16

Obstetrics  The birthweights from 1000 consecutive infants delivered at Boston City Hospital (serving a low-income population) are enumerated in Table 6.2. For this example, consider this population as effectively infinite. Suppose we wish to draw 5 random samples of size 10 from this population using a computer. How can these samples be selected?

Solution

MINITAB has a function that allows sampling from columns. The user must specify the number of rows to be sampled (the size of the random sample to be selected). Thus, if the 1000 birthweights are stored in a single column (e.g., C1), and we specify 10 rows to be sampled, then we will obtain a random sample of size 10 from this population. This random sample of size 10 can be stored in a different column (e.g., C2). This process can be repeated 5 times and results stored in 5 separate columns. It is also possible to calculate the mean x and standard deviation (s) for each random sample. The results are shown in Table 6.3. One issue in obtaining random samples on the computer is whether the samples are obtained with or without replacement. The default option is sampling without replacement, whereby the same data point from the population cannot be selected more than once in a specific sample. In sampling with replacement, repetitions are permissible. Table 6.3 uses sampling without replacement.

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6.3  ■  Random-Number Tables   155

Table 6.2  Sample of birthweights (oz) obtained from 1000 consecutive deliveries at Boston City Hospital ID Numbers

000–019 020–039 040–059 060–079 080–099 100–119 120–139 140–159 160–179 180–199 200–219 220–239 240–259 260–279 280–299 300–319 320–339 340–359 360–379 380–399 400–419 420–439 440–459 460–479 480–499 500–519 520–539 540–559 560–579 580–599 600–619 620–639 640–659 660–679 680–699 700–719 720–739 740–759 760–779 780–799 800–819 820–839 840–859 860–879 880–899 900–919 920–939 940–959 960–979 980–999

1

2

3

4

5

6

7

8

9

10

11

12

13

14

15

16

17

18

19

116 114 98 106 108 109 141 120 113 115 99 90 142 106 118 93 98 110 142 98 117 120 110 101 100 128 92 109 90 102 109 158 95 117 117 67 127 111 130 118 86 101 110 78 114 99 85 102 101 114

124 114 105 115 152 108 96 128 135 135 118 113 92 111 114 103 98 124 121 97 100 117 95 111 105 102 56 78 129 122 119 127 146 78 80 121 136 114 123 107 116 119 113 128 109 170 115 116 93 99

119 121 106 100 127 103 146 119 117 112 104 132 132 120 112 121 141 122 125 129 108 94 111 129 104 124 17 117 89 144 89 121 126 105 145 116 103 115 125 117 101 97 136 126 144 97 108 108 93 123

100 107 52 107 118 88 115 108 129 121 102 122 128 198 133 118 131 104 111 114 101 116 144 128 113 110 135 165 125 114 98 75 58 99 128 126 97 112 124 123 124 86 140 93 119 135 89 107 88 97

127 120 123 131 110 87 124 113 120 89 94 89 97 123 139 110 92 133 97 102 144 119 130 108 106 129 141 127 131 120 104 112 64 123 140 106 130 146 135 138 126 105 129 148 127 115 88 121 72 79

103 123 101 114 115 144 113 93 117 135 113 111 132 152 113 89 141 98 127 128 104 108 83 90 88 102 105 122 118 136 115 121 137 86 97 116 129 100 119 130 94 140 117 121 116 89 126 132 142 81

140 83 111 121 109 105 98 144 92 127 124 118 99 135 77 127 110 108 117 107 110 109 93 113 102 101 133 108 72 144 99 140 69 126 126 77 128 106 78 100 93 89 117 95 103 120 122 105 118 146

82 96 130 110 133 138 110 124 118 115 118 108 131 83 109 100 134 125 122 119 146 106 81 99 125 119 118 109 121 98 138 80 90 121 109 119 119 137 125 78 132 139 129 121 144 106 107 114 157 92

107 116 129 115 116 115 153 89 80 133 104 148 120 107 142 156 90 106 120 84 117 134 116 103 132 101 117 119 91 108 122 125 104 109 113 119 22 48 103 146 126 74 143 127 117 141 68 107 121 126

132 110 94 93 129 104 165 126 132 64 124 103 106 55 144 106 88 128 80 117 107 121 115 41 123 119 112 98 113 130 91 73 124 97 125 122 109 110 55 137 107 131 88 80 131 137 121 121 58 122

100 71 124 116 118 129 140 87 121 91 133 112 115 131 114 122 111 132 114 119 126 125 131 129 160 141 87 120 91 119 161 115 120 131 157 109 145 97 69 114 98 118 105 109 74 107 113 101 92 72

92 86 127 76 126 108 132 120 119 126 80 128 101 108 117 105 137 95 126 128 120 105 135 104 100 112 92 101 137 97 96 120 62 133 97 117 129 103 83 61 102 91 110 105 109 132 116 110 114 153

76 136 128 138 137 92 79 99 57 78 117 86 130 100 97 92 67 114 103 121 104 177 116 144 128 100 104 96 110 142 138 85 83 121 119 127 96 104 106 132 135 98 123 136 117 132 94 137 104 97

129 118 112 126 110 100 101 60 126 85 112 111 120 104 96 128 95 67 98 113 129 109 97 124 131 105 104 76 137 115 140 104 96 125 103 114 128 107 130 109 59 121 87 141 100 58 85 122 119 89

138 120 83 143 32 145 127 115 126 106 112 140 130 112 93 124 102 134 108 128 147 109 108 70 49 155 132 143 111 129 32 95 126 120 102 102 122 123 98 133 137 102 97 103 103 113 93 102 91 100

128 110 95 93 139 93 137 86 77 94 112 126 89 121 120 125 75 136 100 111 111 109 103 106 102 124 121 83 135 125 132 106 155 97 128 75 115 87 81 132 120 115 99 95 123 102 132 125 52 104

115 107 118 121 132 115 129 143 135 122 102 143 107 102 149 118 108 138 106 112 106 79 134 118 110 67 118 100 105 109 108 100 133 101 116 88 102 140 92 120 119 115 128 140 93 120 146 104 110 124

133 157 115 135 110 85 144 97 130 111 118 120 152 114 107 113 118 122 98 120 138 118 140 99 106 94 126 128 88 103 92 87 115 92 96 117 127 89 110 116 106 135 128 115 107 98 98 124 116 83

70 89 86 81 140 124 126 106 102 109 107 124 90 102 107 110 99 103 116 122 97 92 72 85 96 134 114 124 112 114 118 99 97 111 109 99 109 112 112 133 125 100 110 118 113 104 132 121 100 81

121 71 120 135 119 123 155 148 107 89 104 110 116 101 117 149 79 113 109 91 90 103 112 93 116 123 90 137 104 106 58 113 105 119 112 136 120 123 104 133 122 90 132 117 144 108 104 111 147 129

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156   C H A P T E R 6 

  Estimation

Table 6.3

Five random samples of size 10 from the population of infants whose birthweights (oz) appear in Table 6.2

Sample

Individual

1 2 3 4 5 6 7 8 9 10

– x s

1

2

3

4

5

97 117 140 78 99 148 108 135 126 121

177 198 107 99 104 121 148 133 126 115

97 125 62 120 132 135 118 137 126 118

101 114 79 120 115 117 106 86 110 119

137 118 78 129 87 110 106 116 140 98

116.90 21.70

132.80 32.62

117.00 22.44

106.70 14.13

111.90 20.46

6.4 Randomized Clinical Trials An important advance in clinical research is the acceptance of the randomized clinical trial (RCT) as the optimal study design.

Definition 6.6

A randomized clinical trial is a type of research design used for comparing different treatments, in which patients are assigned to a particular treatment by some random mechanism. The process of assigning treatments to patients is called randomization. Randomization means the types of patients assigned to different treatment modalities will be similar if the sample sizes are large. However, if the sample sizes are small, then patient characteristics of treatment groups may not be comparable. Thus it is customary to present a table of characteristics of different treatment groups in RCTs to check that the randomization process is working well.

Example 6.17

Hypertension  The SHEP (Systolic Hypertension in the Elderly Program) was designed to assess the ability of antihypertensive drug treatment to reduce risk of stroke among people age 60 years or older with isolated systolic hypertension. Isolated systolic hypertension is defined as elevated SBP (≥160 mm Hg) but normal DBP ( .5, td,1−α is always

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170   C H A P T E R 6 

Figure 6.6

Comparison of Student’s t distribution with 5 degrees of freedom with an N(0, 1) distribution

Frequency

  Estimation

z1–�

t5, 1–�

Value = N(0, 1) distribution = t5 distribution

larger than the corresponding percentile for an N(0, 1) distribution (z1−α). This relationship is shown in Figure 6.6. However, as d becomes large, the t distribution converges to an N(0, 1) distribution. An explanation for this principle is that for finite samples the sample variance (s2) is an approximation to the population variance (σ2). This approximation gives the statistic ( X − µ S n more variability than the corresponding statistic ( X − µ σ n . As n becomes large, this approximation gets better and S2 will converge to σ2. The two distributions thus get more and more alike as n increases in size. The upper 2.5th percentile of the t distribution for various degrees of freedom and the corresponding percentile for the normal distribution are given in Table 6.5.

)(

Table 6.5

)

)(

)

Comparison of the 97.5th percentile of the t distribution and the normal distribution   d

td,.975

z.975

d

td,.975

z.975

  4   9 29

2.776 2.262 2.045

1.960 1.960 1.960

60 ∞

2.000 1.960

1.960 1.960

The difference between the t distribution and the normal distribution is greatest for small values of n (n < 30). Table 5 in the Appendix gives the percentage points of the t distribution for various degrees of freedom. The degrees of freedom are given in the first column of the table, and the percentiles are given across the first row. The uth percentile of a t distribution with d degrees of freedom is found by reading across the row marked d and reading down the column marked u.

Example 6.30

Solution

Find the upper 5th percentile of a t distribution with 23 df. Find t23, .95, which is given in row 23 and column .95 of Appendix Table 5 and is 1.714. Statistical packages such as MINITAB, Excel, SAS, or Stata will also compute exact probabilities associated with the t distribution. This is particularly useful for values of the degrees of freedom (d) that are not given in Table 5.

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6.5  ■  Estimation of the Mean of a Distribution   171

If σ is unknown, we can replace σ by S in Equation 6.4 and correspondingly replace the z statistic by a t statistic given by

X−µ S n

t=

The t statistic should follow a t distribution with n − 1 df. Hence, 95% of the t statistics in repeated samples of size n should fall between the 2.5th and 97.5th percentiles of a tn−1 distribution, or

)

(

Pr t n −1,.025 < t < t n −1,.975 = 95% More generally, 100% × (1 − α) of the t statistics should fall between the lower and upper α/2 percentile of a tn−1 distribution in repeated samples of size n or

)

(

Pr t n −1,α / 2 < t < t n −1,1− α / 2 = 1 − α This inequality can be written in the form of two inequalities:

t n −1,α / 2 <

X−µ S n

and

X−µ < t n −1,1− α / 2 S n

(

If we multiply both sides of each inequality by S obtain

µ + t n −1,a / 2 S

n 200. In addition, Equation 6.7 can also be used for n ≤ 200 if the standard deviation (σ) is known, by replacing s with σ. You may be puzzled at this point as to what a CI is. The parameter µ is a fixed unknown constant. How can we state that the probability that it lies within some specific interval is, for example, 95%? The important point to understand is that the boundaries of the interval depend on the sample mean and sample variance and vary from sample to sample. Furthermore, 95% of such intervals that could be constructed from repeated random samples of size n contain the parameter µ.

Example 6.32

Obstetrics  Consider the five samples of size 10 from the population of birthweights as shown in Table 6.3 (p. 156). Because t9,.975 = 2.262, the 95% CI is given by

( x − t9,.975 s

n, x + t 9,.975 s

)

2.262 s 2.262 s   n = x − ,x +   10 10  = ( x − 0.715s, x + 0.715s )

The interval is different for each sample and is given in Figure 6.7. A dashed line has been added to represent an imaginary value for µ. The idea is that over a large number of hypothetical samples of size 10, 95% of such intervals contain the parameter µ. Any one interval from a particular sample may or may not contain the parameter µ. In Figure 6.7, by chance all five intervals contain the parameter µ. However, with additional random samples this need not be the case. Therefore, we cannot say there is a 95% chance that the parameter µ will fall within a particular 95% CI. However, we can say the following:

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6.5  ■  Estimation of the Mean of a Distribution   173

Figure 6.7

A collection of 95% CIs for the mean µ as computed from repeated samples of size 10 (see Table 6.3) from the population of birthweights given in Table 6.2 The midpoint of each interval is xi

116.9

101.4 (116.9 – 15.5)

132.4 (116.9 + 15.5)

109.5 (132.8 – 23.3)

132.8

101.0 (117.0 – 16.0) 96.6 (106.7 – 10.1)

97.3 (111.9 – 14.6)

117.0

106.7

156.1 (132.8 + 23.3)

133.0 (117.0 + 16.0)

116.8 (106.7 + 10.1)

111.9

126.5 (111.9 + 14.6)

Equation 6.8

ver the collection of all 95% CIs that could be constructed from repeated O random samples of size n, 95% will contain the parameter µ. The length of the CI gives some idea of the precision of the point estimate x. In this particular case, the length of each CI ranges from 20 to 47 oz, which makes the precision of the point estimate x doubtful and implies that a larger sample size is needed to get a more precise estimate of µ.

Example 6.33

Solution

Gynecology  Compute a 95% CI for the underlying mean basal body temperature using the data in Example 6.24 (p. 165). The 95% CI is given by x ± t 9,.975 s

n = 97.2° ± 2.262 ( 0.189)

10 = 97.2° ± 0.13°

= ( 97.07°, 97.33° )

We can also consider CIs with a level of confidence other than 95%.

Example 6.34

Solution

Suppose the first sample in Table 6.3 has been drawn. Compute a 99% CI for the underlying mean birthweight. The 99% CI is given by

(116.9 − t9,.995 (21.70 )

10,116.9 + t 9,.995 ( 21.70 )

10

)

From Table 5 of the Appendix we see that t9,.995 = 3.250, and therefore the 99% CI is

(116.9 − 3.250 (21.70 )

10,116.9 + 3.250 ( 21.70 )

)

10 = ( 94.6,139.2 )

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174   C H A P T E R 6 

  Estimation

Notice that the 99% CI (94.6, 139.2) computed in Example 6.34 is wider than the corresponding 95% CI (101.4, 132.4) computed in Example 6.31. The rationale for this difference is that the higher the level of confidence desired that µ lies within an interval, the wider the CI must be. Indeed, for 95% CIs the length was 2(2.262 ) s n; for 99% CIs, the length was 2(3.250 ) s n. In general, the length of the 100% × (1 − α) CI is given by 2t n−1,1− α / 2 s

n

Therefore, we can see the length of a CI is governed by three variables: n, s, and α.

Equation 6.9

Factors Affecting the Length of a CI he length of a 100% × (1 − α) CI for µ equals 2t n−1,1− α / 2 s T by n, s, and α.

n and is determined

n

As the sample size (n) increases, the length of the CI decreases.

s

As the standard deviation (s), which reflects the variability of the distribution of individual observations, increases, the length of the CI increases.

α

As the confidence desired increases (α decreases), the length of the CI increases.

Example 6.35

Solution

Gynecology  Compute a 95% CI for the underlying mean basal body temperature using the data in Example 6.24, assuming that the number of days sampled is 100 rather than 10. The 95% CI is given by 97.2° ± t 99,.975 ( 0.189)

100 = 97.2° ± 1.984 ( 0.189) 10 = 97.2° ± 0.04° = ( 97.16°, 97.24° )

where we use the TINV function of Excel to estimate t99,.975 by 1.984. Notice that this interval is much narrower than the corresponding interval (97.07°, 97.33°) based on a sample of 10 days given in Example 6.33.

Example 6.36

Solution

Compute a 95% CI for the underlying mean basal temperature using the data in Example 6.24, assuming that the standard deviation of basal body temperature is 0.4° rather than 0.189° with a sample size of 10. The 95% CI is given by 97.2° ± 2.262 ( 0.4 )

10 = 97.2° ± 0.29° = ( 96.91°, 97.49° )

Notice that this interval is much wider than the corresponding interval (97.07°, 97.33°) based on a standard deviation of 0.189° with a sample size of 10. Usually only n and α can be controlled. s is a function of the type of variable being studied, although s itself can sometimes be decreased if changes in technique can reduce the amount of measurement error, day-to-day variability, and so forth. An important way in which s can be reduced is by obtaining replicate measurements for each individual and using the average of several replicates for an individual, rather than a single measurement. Up to this point, CIs have been used as descriptive tools for characterizing the precision with which the parameters of a distribution can be estimated. Another use for CIs is in making decisions on the basis of data.

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6.6  ■  Case Study: Effects of Tobacco Use on Bone-Mineral Density (BMD) in Middle-Aged Women   175

Example 6.37

Cardiovascular Disease, Pediatrics  Suppose we know from large studies that the mean cholesterol level in children ages 2–14 is 175 mg/dL. We wish to see if there is a familial aggregation of cholesterol levels. Specifically, we identify a group of fathers who have had a heart attack and have elevated cholesterol levels (≥250 mg/dL) and measure the cholesterol levels of their 2- to 14-year-old offspring. Suppose we find that the mean cholesterol level in a group of 100 such children is 207.3 mg/dL with standard deviation = 30 mg/dL. Is this value far enough from 175 mg/dL for us to believe that the underlying mean cholesterol level in the population of all children selected in this way is different from 175 mg/dL?

Solution

One approach would be to construct a 95% CI for µ on the basis of our sample data. We then could use the following decision rule: If the interval contains 175 mg/dL, then we cannot say the underlying mean for this group is any different from the mean for all children (175), because 175 is among the plausible values for µ provided by the 95% CI. We would decide there is no demonstrated familial aggregation of cholesterol levels. If the CI does not contain 175, then we would conclude the true underlying mean for this group is different from 175. If the lower bound of the CI is above 175, then there is a demonstrated familial aggregation of cholesterol levels. The basis for this decision rule is discussed in the chapters on hypothesis testing. The CI in this case is given by 207.3 ± t 99,.975 ( 30 )

100 = 207.3 ± 6.0 = ( 201.3, 213.3)

REVIEW QUESTIONS 6C

1

What does a 95% CI mean?

2

(a)  Derive a 95% CI for the underlying mean HgbA1c in Review Question 6B.4.

(b) Suppose that diabetic patients with an underlying mean HgbA1c 0.5) percentiles are given for the chi-square distribution, whereas only upper percentiles are

Figure 6.8

General shape of various χ2 distributions with d df

1.0

Frequency

.5

5 Value

10

= 1 df = 2 df = 5 df

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6.7  ■  Estimation of the Variance of a Distribution   179

Figure 6.9

Graphic display of the percentiles of a χ52 distribution

Frequency

.15

.10 Area = u .05

10 Value

�2

5, u

20

given for the t distribution. The t distribution is symmetric about 0, so any lower percentile can be obtained as the negative of the corresponding upper percentile. Because the chi-square distribution is, in general, a skewed distribution, there is no simple relationship between the upper and lower percentiles.

Example 6.40

Solution

Find the upper and lower 2.5th percentiles of a chi-square distribution with 10 df. According to Appendix Table 6, the upper and lower percentiles are given, respectively, by 2 χ10 ,.975 = 20.48

2 and χ10 ,.025 = 3.25

For values of d not given in Table 6, a computer program, such as MINITAB or Excel or Stata, can be used to obtain percentiles.

Interval Estimation To obtain an interval estimate of σ2, we need to find the sampling distribution of S2. Suppose we assume that X1, . . . , Xn ~ N(µ,σ2). Then it can be shown that

Equation 6.11

S2 ∼

σ 2 χ2n −1 n −1

To see this, we recall from Section 5.5 that if X ~ N(µ,σ2), then if we standardize X (that is, we subtract µ and divide by σ), thus creating a new random variable Z = (X − µ)/σ, then Z will be normally distributed with mean 0 and variance 1. Thus from Definition 6.14 we see that

Equation 6.12

n

n

i =1

i =1

∑ Zi2 = ∑ ( Xi − µ )2

σ 2 ∼ χ2n = chi-square distributio on with n df

Because we usually don’t know µ, we estimate µ by x. However, it can be shown that if we substitute X for µ in Equation 6.12, then we lose 1 df [3], resulting in the relationship

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180   C H A P T E R 6 

  Estimation

Equation 6.13

n

∑ ( Xi − X )

2

σ 2 ∼ χ2n −1

i =1

However, we recall from the definition of a sample variance that S 2 = 2 ∑ i =1 ( Xi − X (n − 1). Thus, multiplying both sides by (n − 1) yields the relationship

)

n

n

(n − 1) S 2 = ∑ ( Xi − X )

2

i =1

Substituting into Equation 6.13, we obtain

Equation 6.14

(n − 1)S 2 ∼ χn2 −1 σ2 If we multiply both sides of Equation 6.14 by σ2/(n − 1), we obtain Equation 6.11,

S2 ∼

σ2 2 χ n −1 n −1

Thus, from Equation 6.11 we see that S2 follows a chi-square distribution with n − 1 df multiplied by the constant σ2/(n − 1). Manipulations similar to those given in Section 6.5 can now be used to obtain a 100% × (1 − α) CI for σ2. In particular, from Equation 6.11 it follows that

 σ 2 χn2 −1,α / 2 σ 2 χn2 −1,1− α / 2  < S2 < Pr   =1−α n −1  n −1  This inequality can be represented as two separate inequalities: σ 2 χn2 −1,α / 2

< S2

n −1

and

S2 <

σ 2 χn2 −1,1− α / 2 n −1

If both sides of the first inequality are multiplied by (n − 1) χ2n −1,α / 2 and both sides of the second inequality are multiplied by (n − 1) χ2n −1,1− α / 2 , then we have

σ2 <

(n − 1) S 2 χ2n −1,α / 2

and

(n − 1) S 2

χ2n −1,1− α / 2

< σ2

or, on combining these two inequalities,

(n − 1) S 2

χn2 −1,1− α / 2

< σ2 <

(n − 1) S 2 χn2 −1,α / 2

It follows that

 (n − 1 ) S 2 (n − 1) S 2  = 1 − α Pr  2 < σ2 < 2  χn −1,α / 2   χn −1,1− α / 2 2 2 2 2 Thus the interval (n − 1)s χn −1,1− α / 2 ,(n − 1) s χn −1,α / 2  is a 100% × (1 − α) CI for σ2.

Equation 6.15

A 100% × (1 − α) CI for σ2 is given by

( n − 1) s2 χ2n −1,1− α / 2 , ( n − 1) s2 χ2n −1,α / 2   

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6.8  ■  Estimation for the Binomial Distribution   181

Example 6.41

Solution

Hypertension  We now return to the specific data set in Example 6.39. Suppose we want to construct a 95% CI for the interobserver variability as defined by σ2. Because there are 10 people and s2 = 8.178, the required interval is given by

( 9 s2

)

χ29,.975, 9 s2 χ29,.025 = 9 ( 8.178) 19.02 , 9 ( 8.178) 2.70  = ( 3.87, 27.26 )

(

)

Similarly, a 95% CI for σ is given by 3.87 , 27.26 = (1.97, 5.22 ) . Notice that the CI for σ2 is not symmetric about s2 = 8.178, in contrast to the CI for µ, which was symmetric about x. This characteristic is common in CIs for the variance. We could use the CI for σ2 to make decisions concerning the variability of the Arteriosonde machine if we had a good estimate of the interobserver variability of blood-pressure readings from a standard cuff. For example, suppose we know from previous work that if two people are listening to blood-pressure recordings from a standard cuff, then the interobserver variability as measured by the variance of the set of differences between the readings of two observers is 35. This value is outside the range of the 95% CI for σ2(3.87, 27.26), and we thus conclude that the interobserver variability is reduced by using an Arteriosonde machine. Alternatively, if this prior variance were 15, then we could not say that the variances obtained from using the two methods are different. Note that the CI for σ2 in Equation 6.15 is only valid for normally distributed samples. If the underlying distribution is not normal, then the level of confidence for this interval may not be 1 − α even if the sample size is large. This is different from the CI for µ given in Equation 6.6, which will be valid for large n based on the central-limit theorem, even if the underlying distribution is not normal.

1

What is the difference between a t distribution and a chi-square distribution? When do we use each?

2

Suppose we have a normal distribution with mean = 0 and variance = 5. We draw a sample of size 8 from this distribution and compute the sample variance, s2. What is the probability that s2 > 10?

6.8 Estimation for the Binomial Distribution Point Estimation Point estimation for the parameter p of a binomial distribution is discussed in this section.

Example 6.42

Cancer  Consider the problem of estimating the prevalence of malignant melanoma in 45- to 54-year-old women in the United States. Suppose a random sample of 5000 women is selected from this age group, of whom 28 are found to have the disease. Let the random variable Xi represent the disease status for the ith woman, where Xi = 1 if the ith woman has the disease and 0 if she does not; i = 1, . . . , 5000. The random variable Xi was also defined as a Bernoulli trial in Definition 5.14. Suppose the prevalence of the disease in this age group = p. How can p be estimated? n

We let X = ∑ Xi = the number of women with malignant melanoma among the i =1

n women. From Example 5.32, we have E(X) = np and Var(X) = npq. Note that X can

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REVIEW

REVIEW QUESTIONS 6D

182   C H A P T E R 6 

  Estimation

also be looked at as a binomial random variable with parameters n and p because X represents the number of events in n independent trials. Finally, consider the random variable pˆ = sample proportion of events. In our example, pˆ = proportion of women with malignant melanoma. Thus 1 n pˆ = ∑ Xi = X n n i =1

Because pˆ is a sample mean, the results of Equation 6.1 apply and we see that E( pˆ ) = E( Xi ) ≡ µ = p. Furthermore, from Equation 6.2 it follows that Var ( pˆ ) = σ 2 n = pq n

se( pˆ ) =

and

pq n

Thus, for any sample of size n the sample proportion pˆ is an unbiased estimator of the population proportion p. The standard error of this proportion is given exactly by pq n and is estimated by pq ˆ ˆ n . These principles can be summarized as follows:

Equation 6.16

oint Estimation of the Binomial Parameter p  P Let X be a binomial random variable with parameters n and p. An unbiased estimator of p is given by the sample proportion of events pˆ . Its standard error is ˆ ˆ n. given exactly by pq n and is estimated by pq

Example 6.43

Estimate the prevalence of malignant melanoma in Example 6.42, and provide its standard error.

Solution

Our best estimate of the prevalence rate of malignant melanoma among 45- to 54-year-old women is 28/5000 = .0056. Its estimated standard error is .0056(.9944) 5000 = .0011

Maximum-Likelihood Estimation A better justification for the use of pˆ to estimate the binomial parameter p is that pˆ is a maximum-likelihood estimator of p. To understand this concept, we need to define a likelihood.

Definition 6.16

Suppose the probability-mass function of a discrete random variable X is a function of k parameters p1, . . . , pk, denoted by p. If x1, . . . , xn is a sample of n independent % the sample x , . . . , x given p is denoted by observations from X, then the likelihood of 1 n % L(x|p) and represents the probability of obtaining our sample given specified values ˜   % for the parameters p1, . . . , pk. It is given by

(

)

(

)

(

)

n

(

L x | p = Pr x1 | p × L × Pr xn | p = ∏ Pr xi | p % % % % % i =1

)

Example 6.44

Diabetes  Suppose we have a sample of 100 men, of whom 30 have diabetes and 70 do not. If the prevalence of diabetes = p, then what is the likelihood of the sample given p?

Solution

Each observation is a binary random variable where xi = 1 if a man has diabetes and = 0 otherwise. In this example p is a single parameter p. Furthermore, Pr(X = 1) = p and % Pr(X = 0) = 1 − p. Thus, the likelihood of the sample is p30(1 − p)70 = L(x | p). If X is a con˜  tinuous random variable, then because Pr(X = x) = 0 for specific values of x, a slightly different definition of likelihood is used, where the probability of a specific observation given p is replaced by the probability density of that observation given p. % %

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6.8  ■  Estimation for the Binomial Distribution   183

Definition 6.17

Suppose the probability-density function (f) of a continuous random-variable X is a function of k parameters p1 , . . . , pk ≡ p. If x1, . . . , xn is a sample of n independent observations, and x = ( x1 , . . . , xn ), then n

L( x | p) = f ( x1 | p) × L × f ( xn | p) = ∏ f ( xi | p) % % % % % i =1

Example 6.45

Solution

Suppose we have n independent observations x1, . . . , xn from a normal distribution with mean = µ and variance = σ2. What is the likelihood of the sample? In this case, p = (µ, σ 2 ). From the definition of a normal density, we have % f ( xi ) = 1

(

)

2 πσ  exp  −(1 / 2 )( xi − µ )2 

Thus the likelihood of the sample is n

{ (

L( x | µ, σ 2 ) = ∏ 1 % i =1

)

2 πσ  exp  − (1 2 ) ( xi − µ )2 

}

n   n /2 = 1 ( 2 π ) σ n  exp ( −1 2 ) ∑ ( xi − µ )2 σ 2  i =1  

We have the following definition of a maximum-likelihood estimator.

Definition 6.18

Example 6.46

Solution

Suppose we have a probability-mass function or a probability-density function that is a function of k parameters p1, . . . , pk. The maximum-likelihood estimator (MLE) of the parameters p1, . . . , pk are the values p1,ML, . . . , pk,ML, which maximize the likelihood. Heuristically, the MLE can be thought of as the values of the parameters (p) % that maximize the probability of the observed data given p. % Diabetes  Find the MLE of the diabetes prevalence p in Example 6.44. The likelihood L = p30 (1 − p)70. It is usually easier to maximize the log likelihood rather than the likelihood itself. Hence, log L = 30 log p + 70 log (1 − p ) To maximize log L, we take the derivative of log L with respect to p and set the expression to 0. We have

d log L dp = 30 p −70 (1 − p ) = 0 or 30/p = 70/(1 − p) or 30(1 − p) = 70p or 30 = 100 p, or pˆ ML = 30 100 = .3 Thus, .3 is the MLE of p. In general, if we have a binomial distribution with n observations of which k are successes and n − k are failures, then

L( x | p ) = p k (1 − p )n − k and the MLE of p = pˆ ML = k n = pˆ % The rationale for using the MLE is that in general, for a wide class of distributions, as the sample size gets large the MLE is unbiased and has the smallest variance among all unbiased estimators. Thus it is a useful general method of parameter estimation.

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184   C H A P T E R 6 

  Estimation

Example 6.47

Solution

Consider Example 6.45. Find the MLE of µ. From Example 6.45, we have n   n /2 L( x | µ, σ 2 ) ≡ L = 1 ( 2 π ) σ n  exp ( −1 2 ) ∑ ( xi − µ )2 σ 2    i =1  

n

or  log L = ( − n 2 ) log ( 2 π ) − n log ( σ ) − (1 2 ) ∑ ( xi − µ )

2

σ2

i =1

We take the derivative log L with respect to µ and set the expression to 0 as follows: n

d log L d µ = ∑ ( xi − µ ) σ 2 = 0

i =1

or, because σ > 0, we have 2

n

∑ ( xi − µ ) = 0

i =1

or n

∑ xi − n µ = 0

i =1

or n

ˆ ML = ∑ xi n = x µ i =1

Thus the MLE of µ is x.

Interval Estimation—Normal-Theory Methods Point estimation of the parameter p of a binomial distribution was covered in the previous two sections. How can an interval estimate of the parameter p be obtained?

Example 6.48

Cancer  Suppose we are interested in estimating the prevalence rate of breast cancer among 50- to 54-year-old women whose mothers have had breast cancer. Suppose that in a random sample of 10,000 such women, 400 are found to have had breast cancer at some point in their lives. We have shown that the best point estimate of the prevalence rate p is given by the sample proportion pˆ = 400 10, 000 = .040 . How can an interval estimate of the parameter p be obtained? (See the solution in Example 6.49.) Let’s assume the normal approximation to the binomial distribution is valid— whereby from Equation 5.14 the number of events X observed out of n women will be approximately normally distributed with mean np and variance npq or, correspondingly, the proportion of women with events = pˆ = X n is normally distributed with mean p and variance pq/n. The normal approximation can actually be justified on the basis of the centrallimit theorem. Indeed, in the previous section we showed that pˆ could be represented as an average of n Bernoulli trials, each of which has mean p and variance pq. Thus for large n, from the central-limit theorem, we can see that pˆ = X is normally distributed with mean µ = p and variance σ2/n = pq/n, or

Equation 6.17

. pˆ ∼ N ( p, pq n )

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6.8  ■  Estimation for the Binomial Distribution   185

Alternatively, because the number of successes in n Bernoulli trials = X = npˆ (which is the same as a binomial random variable with parameters n and p), if Equation 6.17 is multiplied by n,

Equation 6.18

.

X ∼ N (np, npq ) This formulation is indeed the same as that for the normal approximation to the binomial distribution, which was given in Equation 5.14. How large should n be before this approximation can be used? In Chapter 5 we said the normal approximation to the binomial distribution is valid if npq ≥ 5. However, in Chapter 5 we assumed p was known, whereas here we assume it is unknown. Thus we estimate p by pˆ and q by qˆ = 1 − pˆ and apply the normal approximation to the binomial if ˆ ˆ ≥ 5. Therefore, the results of this section should only be used if npq ˆ ˆ ≥ 5. An apnpq proximate 100% × (1 − α) CI for p can now be derived from Equation 6.17 using methods similar to those given in Section 6.5. In particular, from Equation 6.17 we see that

)

(

Pr p − z1− α / 2 pq n < pˆ < p + z1− α / 2 pq n = 1 − α

This inequality can be written in the form of two inequalities: p − z1− α / 2 pq n < pˆ

and

pˆ < p + z1− α / 2 pq n

To explicitly derive a CI based on these inequalities requires solving a quadratic equation for p in terms of pˆ . To avoid this, it is customary to approximate pq n by ˆ ˆ n and to rewrite the inequalities in the form pq ˆ ˆ n < pˆ p − z1− α / 2 pq

and

ˆˆ n pˆ < p + z1− α / 2 pq

ˆ ˆ n to both sides of the first inequality and subtract this quanWe now add z1−α/ 2 pq tity from both sides of the second inequality, obtaining ˆˆ n p < pˆ + z1− α / 2 pq

and

ˆˆ n < p pˆ − z1− α / 2 pq

Combining these two inequalities, we get ˆ ˆ n < p < pˆ + z1− α / 2 pq ˆˆ n pˆ − z1− α / 2 pq

)

(

ˆ ˆ n < p < pˆ + z1− α / 2 pq ˆˆ n = 1 − α or  Pr pˆ − z1− α / 2 pq The approximate 100% × (1 − α) CI for p is given by

( pˆ − z

Equation 6.19

1− α / 2

ˆˆ n ˆ ˆ n , pˆ + z1− α / 2 pq pq

)

Normal-Theory Method for Obtaining a CI for the Binomial Parameter p (Wald Method)  An approximate 100% × (1 − α) CI for the binomial parameter p based on the normal approximation to the binomial distribution is given by ˆˆ n pˆ ± z1− α / 2 pq

ˆ ˆ ≥ 5. This method of interval estimation should only be used if npq

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186   C H A P T E R 6 

  Estimation

Example 6.49

Solution

Cancer  Using the data in Example 6.48, derive a 95% CI for the prevalence rate of breast cancer among 50- to 54-year-old women whose mothers have had breast cancer. pˆ = .040

α = .05 z1− α / 2 = 1.96

n = 10, 000

Therefore, an approximate 95% CI is given by .040 − 1.96 .04(.96) 10, 000 ,.040 + 1.96 .04(.96) 10, 000    = (.040 − .004, .040 + .004) = (.036, .044)

Suppose we know the prevalence rate of breast cancer among all 50- to 54-yearold American women is 2%. Because 2% is less than .036 (the lower confidence limit), we can be quite confident that the underlying rate for the group of women whose mothers have had breast cancer is higher than the rate in the general population.

Interval Estimation—Exact Methods The question remains: How is a CI for the binomial parameter p obtained when either the normal approximation to the binomial distribution is not valid or a more exact CI is desired?

Example 6.50

Cancer, Nutrition  Suppose we want to estimate the rate of bladder cancer in rats that have been fed a diet high in saccharin. We feed this diet to 20 rats and find that 2 2 develop bladder cancer. In this case, our best point estimate of p is pˆ = = .1. 20 However, because ˆ ˆ = 20 ( 2 20 ) (18 20 ) = 1.8 < 5 npq the normal approximation to the binomial distribution cannot be used and thus normal-theory methods for obtaining CIs are not valid. How can an interval estimate be obtained in this case? A small-sample method for obtaining confidence limits will be presented.

Equation 6.20

Exact Method for Obtaining a CI for the Binomial Parameter p (Clopper-Pearson Method)  An exact 100% × (1 − α) CI for the binomial parameter p that is always valid is given by (p1, p2), where p1, p2 satisfy the equations Pr ( X ≥ x | p = p1 ) =

n  n α = ∑   p1k (1 − p1 )n − k 2 k=x  k

Pr ( X ≤ x | p = p2 ) =

x  n α = ∑   p2k (1 − p2 )n − k 2 k =0  k

A rationale for this CI is given in our discussion of hypothesis testing for the binomial distribution in Section 7.10 on page 247. The main problem with using this method is the difficulty in computing expressions such as

x

 n

∑  k  p k (1 − p)n − k

k =0

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6.8  ■  Estimation for the Binomial Distribution   187

Fortunately, special tables exist for the evaluation of such expressions, one of which is given in Table 7 in the Appendix. This table can be used as follows:

Equation 6.21

Exact Confidence Limits for Binomial Proportions

(1) The sample size (n) is given along each curve. There are two curves corresponding to each given sample size. One curve is used to obtain the lower confidence limit and the other to obtain the upper confidence limit.

(2) If 0 ≤ pˆ ≤ .5, then

(a)  Refer to the lower horizontal axis, and find the point corresponding to pˆ .

(b) Draw a line perpendicular to the horizontal axis, and find the two points where this line intersects the two curves identified in (1).

(c) Read across to the left vertical axis; the smaller value corresponds to the lower confidence limit and the larger value to the upper confidence limit.

(3) If .5 < pˆ ≤ 1.0, then

(a)  Refer to the upper horizontal axis, and find the point corresponding to pˆ .

(b) Draw a line perpendicular to the horizontal axis, and find the two points where this line intersects the two curves identified in (1).

(c) Read across to the right vertical axis; the smaller value corresponds to the lower confidence limit and the larger value to the upper confidence limit.

Example 6.51

Cancer  Derive an exact 95% CI for the probability of developing bladder cancer, using the data given in Example 6.50.

Solution

We refer to Table 7a in the Appendix (α = .05) and identify the two curves with n = 20. Because pˆ = .1 ≤ .5, we refer to the lower horizontal axis and draw a vertical line at .10 until it intersects the two curves marked n = 20. We then read across to the left vertical axis and find the confidence limits of .01 and .32. Thus the exact 95% CI = (.01, .32). Notice that this CI is not symmetric about pˆ = .10 . Another approach to solving this problem is to use the BINOMDIST function of Excel. From Equation 6.20, we need to find values of p1 and p2 such that

Pr ( X ≥ 2 | p = p1 ) = .025

and

Pr ( X ≤ 2 | p = p2 ) = .025

However, Pr(X ≥ 2 |  p = p1) = 1 − Pr(X ≤ 1|  p = p1) = 1 − BINOMDIST(1, 20, p1, TRUE) and Pr(X ≤ 2 |  p = p2) = BINOMDIST(2, 20, p2, TRUE). Hence we set up a spreadsheet in which the first column has values of p1 from .01 to 1.0 in increments of .01; the second column has 1 − BINOMDIST(1, 20, p1, TRUE); the third column has values of p2 from .01 to 1.0 in increments of .01; and the fourth column has BINOMDIST (2, 20, p2, TRUE). An excerpt from the spreadsheet is shown in Table 6.7. Usually with exact confidence limits accurate to a fixed number of decimal places, we cannot exactly satisfy Equation 6.20. Instead, we use a more conservative approach. We find the largest value of p1 so that Pr(X ≥ x |  p = p1) ≤ α/2 and the smallest value of p2 so that Pr(X ≤ x |  p = p2) ≤ α/2. Based on Table 6.7 with α = .05, the values of p1 and p2 that satisfy these inequalities are p1 = .01 and p2 = .32. Hence, the 95% CI for p is (.01, .32).

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188   C H A P T E R 6 

  Estimation

Table 6.7

Example 6.52

Solution

Evaluation of exact binomial confidence limits using Excel, based on the data in Example 6.50

p1

1 − BINOMDIST(1,20,p1,TRUE)

p2

BINOMDIST(2,20,p2,TRUE)

0.01 0.02 0.03 0.04 0.05 0.06 0.07 0.08 0.09 0.1

0.017 0.060 0.120 0.190 0.264 0.340 0.413 0.483 0.548 0.608

0.25 0.26 0.27 0.28 0.29 0.30 0.31 0.32 0.33 0.34

0.091 0.076 0.064 0.053 0.043 0.035 0.029 0.023 0.019 0.015

Health Promotion  Suppose that as part of a program for counseling patients with many risk factors for heart disease, 100 smokers are identified. Of this group, 10 give up smoking for at least 1 month. After a 1-year follow-up, 6 of the 10 patients are found to have taken up smoking again. The proportion of ex-smokers who start smoking again is called the recidivism rate. Derive a 99% CI for the recidivism rate. Exact binomial confidence limits must be used, because ˆ ˆ = 10(.6)(.4) = 2.4 < 5 npq We refer to the upper horizontal axis of the chart marked α = .01 in Appendix Table 7b and note the point pˆ = .60. We then draw a vertical line at .60 until it intersects the two curves marked n = 10. We then read across to the right vertical axis and find the confidence limits of .19 and .92. Thus the exact 99% CI = (.19, .92). More extensive and precise exact binomial confidence limits are available in Geigy Scientific Tables [4]. Also, calculation of exact binomial confidence limits are available directly in some statistical packages, including Stata and indirectly using Excel as previously discussed. For example, we can also use the Stata command cii to obtain exact 99% confidence limits for p. The general form of this command is .cii n x, level(%). where % is the level of confidence, n is the number of trials and x is the number of successes. The results for the recidivism data are as follows:

REVIEW

.cii 10 6, level(99) -- Binomial Exact -Variable | Obs Mean Std. Err. [99% Conf. Interval] --------------------+---------------------------------------------------------------------------------------------| 10 .6 .1549193 .1909163 .9232318 We see that the 99% exact binomial confidence interval is (.19, .92), which is the same as we obtained with Table 7b.

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REVIEW QUESTIONS 6E

1

Suppose an experimental weight-loss program is provided for 40 overweight participants. A participant is considered partially successful if he or she has lost 5 lb or more after 6 months. Suppose that 10 of the 40 participants are partially successful in losing weight.

(a) What is an estimate of the partial-success rate?

(b) Derive a 95% CI for the proportion of partial successes.

2

A participant is considered completely successful if he or she has lost 20 lb or more after 6 months. Suppose that 4 of the 40 participants are completely successful at losing weight.

(a) What is an estimate of the complete success rate?

(b) Derive a 95% CI for the proportion of participants who were completely successful at losing weight.

6.9 Estimation for the Poisson Distribution Point Estimation In this section, we discuss point estimation for the parameter λ of a Poisson distribution.

Example 6.53

Cancer, Environmental Health  A study in Woburn, Massachusetts, in the 1970s looked at possible excess cancer risk in children, with a particular focus on leukemia. This study was later portrayed in the book and movie titled A Civil Action. An important environmental issue in the investigation concerned the possible contamination of the town’s water supply. Specifically, 12 children ( 8 − 3.45 = 4.55. This is true for all exact CIs based on the Poisson distribution unless x is very large.

Example 6.57

Cancer, Environmental Health  Compute a 95% CI for both the expected number of childhood leukemias (µ) and the incidence rate of childhood leukemia per 105 person-years (λ) in Woburn based on the data provided in Example 6.53.

Solution

We observed 12 cases of childhood leukemia over 10 years. Thus, from Table 8, referring to x = 12 and level of confidence 95%, we find that the 95% CI for µ = (6.20, 20.96). Because there were 120,000 person-years = T, a 95% CI for the incidence 20.96   6.20 20.96  6.20  rate =  events per person-year or  , × 10 5 , × 10 5   120, 000 120, 000   120, 000  120, 000

events per 105 person-years = (5.2, 17.5) events per 105 person-years = 95% CI for λ. We can also use the Stata cii command to obtain an exact 95% CI for the incidence rate (λ). The general syntax is .cii py x, poisson where py = number of person-years and x = number of events. The results for the leukemia data are as follows: .cii 120000 12, poisson -- Poisson Exact -Variable | Exposure Mean Std. Err. [95% Conf. Interval] -------------------+----------------------------------------------------------------------------------------------| 120000 .0001 .0000289 .0000517 .0001747 We see that the 95% CI for λ = (5.2/105, 17.5/105), which agrees with our results from Table 8. Stata cannot be used if we just have available a number of events, without a corresponding number of person-years as in Example 6.56.

Example 6.58

Cancer, Environmental Health  Interpret the results in Example 6.57. Specifically, do you feel there was an excess childhood leukemia risk in Woburn, Massachusetts, relative to expected U.S. incidence rates?

Solution

Referring to Example 6.53, we note that the incidence rate of childhood leukemia in the United States during the 1970s was 5 events per 105 person-years. We denote this rate by λ0. Referring to Example 6.57, we see that the 95% CI for λ in Woburn = (5.2, 17.5) events per 105 person-years. The lower bound of the 95% CI exceeds λ0 (= 5),

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192   C H A P T E R 6 

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so we can conclude there was a significant excess of childhood leukemia in Woburn during the 1970s. Another way to express these results is in terms of the standardized morbidity ratio (SMR) defined by SMR =

incidence rate in Woburn for childhood leukemia 10 10 5 = =2 U.S. incidence rate for childhood leukemia 5 10 5

If the U.S. incidence rate is assumed to be known, then a 95% CI for SMR is given by  5.2 17.5  ,   = (1.04, 3.50 ). Because the lower bound of the CI for SMR is > 1, we conclude 5 5  there is a significant excess risk in Woburn. We pursue a different approach in Chapter 7, addressing this issue in terms of hypothesis testing and p-values. Another approach for obtaining exact CIs for the Poisson parameter µ is to use the POISSON function of Excel in a similar manner as we used for BINOMDIST in Section 6.8 on page 187. This approach is useful if the observed number of events (x) and/or if the desired level of confidence (1 − α) does not appear in Table 8. Specifically, Equation 6.23 can be written in the form 1 − POISSON(x − 1, µ1, TRUE) = α/2

and

POISSON (x, µ2, TRUE) = α/2

To solve these equations, we create columns of possible values for µ1 and µ2 and find the largest value of µ1 and the smallest value of µ2 (perhaps to 2 decimal places of accuracy) such that 1 − POISSON(x − 1, µ1, TRUE) ≤ α/2

and

POISSON (x, µ2, TRUE) ≤ α/2

The two-sided 100% × (1 − α) CI for µ is then (µ1, µ2). In some instances, a random variable representing a rare event over time is assumed to follow a Poisson distribution but the actual amount of person-time is either unknown or is not reported in an article from the literature. In this instance, it is still possible to use Appendix Table 8 to obtain a CI for µ, although it is impossible to obtain a CI for λ.

Example 6.59

Occupational Health  In Example 4.38, a study was described concerning the possible excess cancer risk among employees with high exposure to ethylene dibromide in two plants in Texas and Michigan. Seven deaths from cancer were reported over the period 1940−1975, whereas only 5.8 cancer deaths were expected based on mortality rates for U.S. white men. Find a 95% CI for the expected number of deaths among the exposed workers, and assess whether their risk differs from that of the general population.

Solution

In this case, the actual number of person-years used in computing the expected number of deaths was not reported in the original article. Indeed, the computation of the expected number of deaths is complex because

(1)

Each worker is of a different age at the start of follow-up.

(2)

The age of a worker changes over time.

(3)

Mortality rates for men of the same age change over time.

However, we can use Appendix Table 8 to obtain a 95% CI for µ. Because x = 7 events, we have a 95% CI for µ = (2.81, 14.42). The expected number of deaths based on U.S. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

6.10  ■  One-Sided CIs   193

mortality rates for white males = 5.8, which falls within the preceding interval. Thus we conclude the risk among exposed workers does not differ from the general population. Table 8 can also be used for applications of the Poisson distribution other than those based specifically on rare events over time.

Example 6.60

Bacteriology  Suppose we observe 15 bacteria in a Petri dish and assume the number of bacteria is Poisson-distributed with parameter µ. Find a 90% CI for µ.

Solution

We refer to the 15 row and the 0.90 column in Table 8 to obtain the 90% CI (9.25, 23.10).

6.10 One-Sided CIs In the previous discussion of interval estimation, what are known as two-sided CIs have been described. Frequently, the following type of problem occurs.

Example 6.61

Cancer  A standard treatment exists for a certain type of cancer, and the patients receiving the treatment have a 5-year survival rate of 30%. A new treatment is proposed that has some unknown survival rate p. We would only be interested in using the new treatment if it were better than the standard treatment. Suppose that 40 out of 100 patients who receive the new treatment survive for 5 years. Can we say the new treatment is better than the standard treatment? One way to analyze these data is to construct a one-sided CI, where we are interested in only one bound of the interval, in this case the lower bound. If 30% is below the lower bound, then it is an unlikely estimate of the 5-year survival rate for patients getting the new treatment. We could reasonably conclude from this that the new treatment is better than the standard treatment in this case.

Equation 6.24

Upper One-Sided CI for the Binomial Parameter p — Normal-Theory Method  An upper one-sided 100% × (1 − α) CI is of the form p > p1 such that

Pr( p > p1 ) = 1 − α

If we assume that the normal approximation to the binomial holds true, then we can show that this CI is given approximately by

ˆˆ / n p > pˆ − z1− α pq

ˆ ˆ ≥ 5. This interval estimator should only be used if npq To see this, note that if the normal approximation to the binomial distribution holds, then pˆ ∼ N ( p, pq n). Therefore, by definition

(

)

Pr pˆ < p + z1− α pq n = 1 − α ˆ ˆ n from both sides of the ˆ ˆ n and subtract z1−α pq pq

We approximate pq n by equation, yielding

ˆˆ n < p pˆ − z1− α pq

(

)

ˆˆ n = 1 − α ˆ ˆ n and Pr p > pˆ − z1− α pq or p > pˆ − z1− α pq

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194   C H A P T E R 6 

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Therefore, if the normal approximation to the binomial distribution holds, then ˆ ˆ n is an approximate upper 100% × (1 − α) one-sided CI for p. p > pˆ − z1− α pq Notice that z1−α is used in constructing one-sided intervals, whereas z1−α/2 was used in constructing two-sided intervals.

Example 6.62

Suppose a 95% CI for a binomial parameter p is desired. What percentile of the normal distribution should be used for a one-sided interval? For a two-sided interval?

Solution

For α = .05, we use z1−.05 = z.95 = 1.645 for a one-sided interval and z1−.05 2 = z.975 = 1.96 for a two-sided interval.

Example 6.63

Cancer  Construct an upper one-sided 95% CI for the survival rate based on the cancer-treatment data in Example 6.61.

Solution

ˆ ˆ = 100(.4)(.6) = 24 ≥ 5. The CI is then given by First check that npq Pr  p > .40 − z.95 .4(.6) 100  = .95 Pr [ p > .40 − 1.645(.049)] = .95 Pr( p > .319) = .95

Because .30 is not within the given interval [that is, (.319, 1.0)], we conclude the new treatment is better than the standard treatment. If we were interested in 5-year death rates rather than survival rates, then a onesided interval of the form Pr(p < p2) = 1 − α would be appropriate because we would only be interested in the new treatment if its death rate were lower than that of the standard treatment.

Equation 6.25

ower One-Sided CI for the Binomial Parameter p — Normal-Theory Method L The interval p < p2 such that

Pr(p < p2) = 1 − α

is referred to as a lower one-sided 100% × (1 − α) CI and is given approximately by

ˆˆ n p < pˆ + z1− α pq

This expression can be derived in the same manner as in Equation 6.24 by starting with the relationship

(

If we approximate we get

Example 6.64

Solution

)

Pr pˆ > p − z1− α pq n = 1 − α

(

pq n by

ˆ ˆ n and add z1−α pq ˆ ˆ n to both sides of the equation, pq

)

ˆˆ n = 1 − α Pr p < pˆ + z1− α pq Cancer  Compute a lower one-sided 95% CI for the death rate using the cancertreatment data in Example 6.61. We have pˆ = .6. Thus the 95% CI is given by

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6.11  ■  Summary   195

Pr  p < .6 + 1.645 .6(.4) 100  = .95 Pr [ p < .6 + 1.645(.049)] = .95 Pr( p < . 681) = .95

Because 70% is not within this interval [that is, (0, .681)], we can conclude the new treatment has a lower death rate than the old treatment. Similar methods can be used to obtain one-sided CIs for the mean and variance of a normal distribution, for the binomial parameter p using exact methods, and for the Poisson expectation µ using exact methods.

6.11 Summary This chapter introduced the concept of a sampling distribution. This concept is crucial to understanding the principles of statistical inference. The fundamental idea is to forget about our sample as a unique entity and instead regard it as a random sample from all possible samples of size n that could have been drawn from the population under study. Using this concept, X was shown to be an unbiased estimator of the population mean µ; that is, the average of all sample means over all possible random samples of size n that could have been drawn will equal the population mean. Furthermore, if our population follows a normal distribution, then X has minimum variance among all possible unbiased estimators and is thus called a minimum-variance unbiased estimator of µ. Another justification for the use of X to estimate µ is that X is the maximum-likelihood estimator (MLE) of µ. An MLE is ˆ , which maximizes the Pr(obtaining our sample | µ ˆ ). A similar definition the value µ holds for obtaining MLEs of parameters in other estimation problems. Finally, if our population follows a normal distribution, then X also follows a normal distribution. However, even if our population is not normal, the sample mean still approximately follows a normal distribution for a sufficiently large sample size. This very important idea, which justifies many of the hypothesis tests we study in the rest of this book, is called the central-limit theorem. The idea of an interval estimate (or CI) was then introduced. Specifically, a 95% CI is defined as an interval that will contain the true parameter for 95% of all random samples that could have been obtained from the reference population. The preceding principles of point and interval estimation were applied to the following: (1) Estimating the mean µ of a normal distribution (2) Estimating the variance σ2 of a normal distribution (3) Estimating the parameter p of a binomial distribution (4) Estimating the parameter λ of a Poisson distribution (5) Estimating the expected value µ of a Poisson distribution The t and chi-square distributions were introduced to obtain interval estimates for (1) and (2), respectively. In Chapters 7 through 14, the discussion of statistical inference continues, focusing primarily on testing hypotheses rather than on parameter estimation. In this regard, some parallels between inference from the points of view of hypothesis testing and CIs are discussed.

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196   C H A P T E R 6 

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P rob l e m s

Gastroenterology Suppose we are asked to construct a list of treatment assignments for patients entering a study comparing different treatments for duodenal ulcer. 6.1  Anticipating that 20 patients will be entered in the study and two treatments will be used, construct a list of random-treatment assignments starting in the 28th row of the random-number table (Table 4 in the Appendix). 6.2  Count the number of people assigned to each treatment group. How does this number compare with the expected number in each group? 6.3  Suppose we change our minds and decide to enroll 40 patients and use four treatment groups. Use a computer program (such as MINITAB or Excel) to construct the list of random-treatment assignments referred to in Problem 6.1. 6.4  Answer Problem 6.2 for the list of treatment assignments derived in Problem 6.3.

Pulmonary Disease The data in Table 6.8 concern the mean triceps skin-fold thickness in a group of normal men and a group of men with chronic airflow limitation [5].

Table 6.8  Triceps skin-fold thickness in normal men and men with chronic airflow limitation Group

Mean

sd

n

Normal Chronic airflow limitation

1.35 0.92

0.5 0.4

40 32

6.12  Compute a 95% CI for the mean white blood count following admission. 6.13  Answer Problem 6.12 for a 90% CI. 6.14  What is the relationship between your answers to Problems 6.12 and 6.13? *6.15  What is the best point estimate of the percentage of males among patients discharged from Pennsylvania hospitals? *6.16  What is the standard error of the estimate obtained in Problem 6.15? *6.17  Provide a 95% CI for the percentage of males among patients discharged from Pennsylvania hospitals.

Microbiology A nine-laboratory cooperative study was performed to evaluate quality control for susceptibility tests with 30-µg netilmicin disks [6]. Each laboratory tested three standard control strains on a different lot of Mueller-Hinton agar, with 150 tests performed per laboratory. For protocol control, each laboratory also performed 15 additional tests on each of the control strains using the same lot of Mueller-Hinton agar across laboratories. The mean zone diameters for each of the nine laboratories are given in Table 6.9. *6.18  Provide a point and interval estimate (95% CI) for the mean zone diameter across laboratories for each type of control strain, if each laboratory uses different media to perform the susceptibility tests. *6.19  Answer Problem 6.18 if each laboratory uses a common medium to perform the susceptibility tests.

Source: Reprinted with permission of Chest, 85(6), 58S−59S, 1984.

*6.20  Provide a point and interval estimate (95% CI) for the interlaboratory standard deviation of mean zone diameters for each type of control strain, if each laboratory uses different media to perform the susceptibility tests.

*6.5  What is the standard error of the mean for each group?

*6.21  Answer Problem 6.20 if each laboratory uses a common medium to perform the susceptibility tests.

6.6  Assume that the central-limit theorem is applicable. What does it mean in this context? 6.7  Find the upper 1st percentile of a t distribution with 16 df. 6.8  Find the lower 10th percentile of a t distribution with 28 df. 6.9  Find the upper 2.5th percentile of a t distribution with 7 df.

6.22  Are there any advantages to using a common medium versus using different media for performing the susceptibility tests with regard to standardization of results across laboratories?

Renal Disease

Refer to the data in Table 2.11. Regard this hospital as typical of Pennsylvania hospitals.

A study of psychological and physiological health in a cohort of dialysis patients with end-stage renal disease was conducted [7]. Psychological and physiological parameters were initially determined at baseline in 102 patients; these parameters were determined again in 69 of the 102 patients at an 18-month follow-up visit. The data in Table 6.10 were reported.

6.11  Compute a 95% CI for the mean duration of hospitalization.

6.23  Provide a point and interval estimate (95% CI) for the mean of each parameter at baseline and follow-up.

6.10  What are the upper and lower 2.5th percentiles for a chi-square distribution with 2 df? What notation is used to denote these percentiles?

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Problems   197

Table 6.9  Mean zone diameters with 30-µg netilmicin disks tested in nine separate laboratories

Type of control strain

E. coli

Laboratory

A B C D E F G H I

S. aureus

P. aeruginosa

Different media

Common medium

Different media

Common medium

Different media

Common medium

27.5 24.6 25.3 28.7 23.0 26.8 24.7 24.3 24.9

23.8 21.1 25.4 25.4 24.8 25.7 26.8 26.2 26.3

25.4 24.8 24.6 29.8 27.5 28.1 31.2 24.3 25.4

23.9 24.2 25.0 26.7 25.3 25.2 27.1 26.5 25.1

20.1 18.4 16.8 21.7 20.1 20.3 22.8 19.9 19.3

16.7 17.0 17.1 18.2 16.7 19.2 18.8 18.1 19.2

Table 6.10  Psychological and physiological parameters in patients with end-stage renal disease Baseline (n  = 102)

18-month follow-up (n = 69)

Variable

Mean

sd

Mean

sd

Serum creatinine (mmol/L) Serum potassium (mmol/L) Serum phosphate (mmol/L) Psychological Adjustment to Illness (PAIS) scale

0.97 4.43 1.68 36.50

0.22 0.64 0.47 16.08

1.00 4.49 1.57 23.27

0.19 0.71 0.40 13.79

6.24  Do you have any opinion on the physiological and psychological changes in this group of patients? Explain. (Note: A lower score on the PAIS scale indicates worse adjustment to illness.)

Ophthalmology, Hypertension A study is conducted to test the hypothesis that people with glaucoma have higher-than-average blood pressure. The study includes 200 people with glaucoma whose mean SBP is 140 mm Hg with a standard deviation of 25 mm Hg. 6.25  Construct a 95% CI for the true mean SBP among people with glaucoma. 6.26  If the average SBP for people of comparable age is 130 mm Hg, is there an association between glaucoma and blood pressure?

*6.27  What is the best point estimate for p, the probability of a failure with the drug? *6.28  What is a 95% CI for p? *6.29  Suppose we know penicillin G at a daily dose of 4.8 megaunits has a 10% failure rate. What can be said in comparing the two drugs?

Pharmacology Suppose we want to estimate the concentration (µg/mL) of a specific dose of ampicillin in the urine after various periods of time. We recruit 25 volunteers who have received ampicillin and find they have a mean concentration of 7.0 µg/mL with a standard deviation of 2.0 µg/mL. Assume the underlying population distribution of concentrations is normally distributed. *6.30  Find a 95% CI for the population mean concentration.

Sexually Transmitted Disease Suppose a clinical trial is conducted to test the efficacy of a new drug, spectinomycin, for treating gonorrhea in females. Forty-six patients are given a 4-g daily dose of the drug and are seen 1 week later, at which time 6 of the patients still have gonorrhea.

*6.31  Find a 99% CI for the population variance of the concentrations. *6.32  How large a sample would be needed to ensure that the length of the CI in Problem 6.30 is 0.5 µg/mL if we assume the sample standard deviation remains at 2.0 µg/mL?

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198   C H A P T E R 6 

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Environmental Health Much discussion has taken place concerning possible health hazards from exposure to anesthetic gases. In one study conducted in 1972, 525 Michigan nurse anesthetists were surveyed by mail questionnaires and telephone interviews to determine the incidence rate of cancer [8]. Of this group, 7 women reported having a new malignancy other than skin cancer during 1971. 6.33  What is the best estimate of the 1971 incidence rate from these data? 6.34  Provide a 95% CI for the true incidence rate. A comparison was made between the Michigan report and the 1969 cancer-incidence rates from the Connecticut tumor registry, where the expected incidence rate, based on the age distribution of the Michigan nurses, was determined to be 402.8 per 100,000 person-years. 6.35  Comment on the comparison between the observed incidence rate and the Connecticut tumor-registry data.

Obstetrics, Serology A new assay is developed to obtain the concentration of M. hominis mycoplasma in the serum of pregnant women. The developers of this assay want to make a statement on the variability of their laboratory technique. For this purpose, 10 subsamples of 1 mL each are drawn from a large serum sample for one woman, and the assay is performed on each subsample. The concentrations are as follows: 24, 23, 25, 24, 25 24 23, 24, 24, 25. *6.36  If the distribution of concentrations in the log scale to the base 2 is assumed to be normal, then obtain the best estimate of the variance of the concentrations from these data. *6.37  Compute a 95% CI for the variance of the concentrations. *6.38  Assuming the point estimate in Problem 6.36 is the true population parameter, what is the probability that a particular assay, when expressed in the log scale to the base 2, is no more than 1.5 log units off from its true mean value for a particular woman? *6.39  Answer Problem 6.38 for 2.5 log units.

Hypertension Suppose 100 hypertensive people are given an antihypertensive drug and the drug is effective in 20 of them. By effective, we mean their DBP is lowered by at least 10 mm Hg as judged from a repeat blood-pressure measurement 1month after taking the drug.

by 10 mm Hg after 1 month. Can we carry out some procedure to be sure we are not simply observing the placebo effect? 6.42  What assumptions have you made to carry out the procedure in Problem 6.41? Suppose we decide a better measure of the effectiveness of the drug is the mean decrease in blood pressure rather than the measure of effectiveness used previously. Let di = xi − yi , i = 1, . . . , 100, where xi = DBP for the ith person before taking the drug and yi = DBP for the ith person 1 month after taking the drug. Suppose the sample mean of the di is +5.3 and the sample variance is 144.0. 6.43  What is the standard error of d ? 6.44  What is a 95% CI for the population mean of d? 6.45  Can we make a statement about the effectiveness of the drug? 6.46  What does a 95% CI mean, in words, in this case?

S I M U L AT I O N Draw six random samples of size 5 from the data in Table 6.2. 6.47  Compute the mean birthweight for each of the six samples. 6.48  Compute the standard deviation based on the sample of six means. What is another name for this quantity? 6.49  Select the third point from each of the six samples, and compute the sample sd from the collection of six third points. 6.50  What theoretical relationship should there be between the standard deviation in Problem 6.48 and the standard deviation in Problem 6.49? 6.51  How do the actual sample results in Problems 6.48 and 6.49 compare?

Obstetrics Figure 6.4b plotted the sampling distribution of the mean from 200 samples of size 5 from the population of 1000 birthweights given in Table 6.2. The mean of the 1000 birthweights in Table 6.2 is 112.0 oz with standard deviation 20.6 oz. *6.52  If the central-limit theorem holds, what proportion of the sample means should fall within 0.5 lb of the population mean (112.0 oz)? *6.53  Answer Problem 6.52 for 1 lb rather than 0.5 lb.

6.40  What is the best point estimate of the probability p of the drug being effective?

*6.54  Compare your results in Problems 6.52 and 6.53 with the actual proportion of sample means that fall in these ranges.

6.41  Suppose we know that 10% of all hypertensive patients who are given a placebo will have their DBP lowered

*6.55  Do you feel the central-limit theorem is applicable for samples of size 5 from this population? Explain.

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Problems   199

Hypertension, Pediatrics The etiology of high blood pressure remains a subject of active investigation. One widely accepted hypothesis is that excessive sodium intake adversely affects blood-pressure outcomes. To explore this hypothesis, an experiment was set up to measure responsiveness to the taste of salt and to relate the responsiveness to blood-pressure level. The protocol used involved giving 3-day-old infants in the newborn nursery a drop of various solutions, thus eliciting the sucking response and noting the vigor with which they sucked—denoted by MSB (mean number of sucks per burst of sucking). The content of the solution was changed over 10 consecutive periods: (1) water, (2) water, (3) 0.1 molar salt + water, (4) 0.1 molar salt + water, (5) water, (6) water, (7) 0.3 molar salt + water, (8) 0.3 molar salt + water, (9) water, (10) water. In addition, as a control, the response of the baby to the taste of sugar was also measured after the salt-taste protocol was completed. In this experiment, the sucking response was measured over five different periods with the following stimuli: (1) nonnutritive sucking, that is, a pure sucking response was elicited without using any external substance; (2) water; (3) 5% sucrose + water; (4) 15% sucrose + water; (5) nonnutritive sucking. The data for the first 100 infants in the study are given in Data Set INFANTBP.DAT, on the Companion Website. The format of the data is given in Data Set INFANTBP.DOC, on the Companion Website. Construct a variable measuring the response to salt. For example, one possibility is to compute the average MSB for trials 3 and 4 − average MSB for trials 1 and 2 = average MSB when the solution was 0.1 molar salt + water − average MSB when the solution was water. A similar index could be computed comparing trials 7 and 8 with trials 5 and 6. 6.56  Obtain descriptive statistics and graphic displays for these salt-taste indices. Do the indices appear to be normally distributed? Why or why not? Compute the sample mean for this index, and obtain 95% CIs about the point estimate. 6.57  Construct indices measuring responsiveness to sugar taste, and provide descriptive statistics and graphical displays for these indices. Do the indices appear normally distributed? Why or why not? Compute the sample mean and associated 95% CIs for these indices. 6.58  We want to relate the indices to blood-pressure level. Provide a scatter plot relating mean SBP and mean DBP, respectively, to each of the salt-taste and sugar-taste indices. Does there appear to be a relation between the indices and blood-pressure level? We discuss this in more detail in our work on regression analysis in Chapter 11.

Genetics Data Set SEXRAT.DAT, on the Companion Website, lists the sexes of children born in over 50,000 families with more than one child.

6.59  Use interval-estimation methods to determine if the sex of successive births is predictable from the sex of previous births.

S I M U L AT I O N

Nutrition Data Set VALID.DAT, on the Companion Website, provides estimated daily consumption of total fat, saturated fat, and alcohol as well as total caloric intake using two different methods of dietary assessment for 173 subjects. 6.60  Use a computer to draw repeated random samples of size 5 from this population. Does the central-limit theorem seem to hold for these dietary attributes based on samples of size 5? 6.61  Answer Problem 6.60 for random samples of size 10. 6.62  Answer Problem 6.60 for random samples of size 20. 6.63  How do the sampling distributions compare based on samples of size 5, 10, and 20? Use graphic and numeric methods to answer this question.

Infectious Disease A cohort of hemophiliacs is followed to elicit information on the distribution of time to onset of AIDS following seroconversion (referred to as latency time). All patients who seroconvert become symptomatic within 10 years, according to the distribution in Table 6.11. Table 6.11  Latency time to AIDS among hemophiliacs who become HIV positive Latency time (years)

0 1 2 3 4 5 6 7 8 9 10

Number of patients

2 6 9 33 49 66 52 37 18 11 4

6.64  Assuming an underlying normal distribution, compute 95% CIs for the mean and variance of the latency times. 6.65  Still assuming normality, estimate the probability p that a patient’s latency time will be at least 8 years. 6.66  Now suppose we are unwilling to assume a normal distribution for latency time. Re-estimate the probability p that a patient’s latency time will be at least 8 years, and provide a 95% CI for p.

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200   C H A P T E R 6 

  Estimation

Environmental Health We have previously described Data Set LEAD.DAT (on the Companion Website), in which children were classified according to blood-lead level in 1972 and 1973 by the variable lead_group, where 1 = blood-lead level < 40 µg/100 mL in both 1972 and 1973, 2 = blood-lead level ≥ 40 µg/100 mL in 1973, 3 = blood-lead level > 40 µg/100 mL in 1972 but < 40 µg/100 mL in 1973. 6.67  Compute the mean, standard deviation, standard error, and 95% CI for the mean verbal IQ for children with specific values of the variable GROUP. Provide a box plot comparing the distribution of verbal IQ for subjects with lead_group = 1, 2, and 3. Summarize your findings concisely. 6.68  Answer Problem 6.67 for performance IQ. 6.69  Answer Problem 6.67 for full-scale IQ.

Cardiology Data Set NIFED.DAT (on the Companion Website) was described earlier. We wish to look at the effect of each treatment separately on heart rate and systolic blood pressure (SBP). 6.70  Provide separate point estimates and 95% CIs for the changes in heart rate and SBP (level 1 to baseline) for the subjects randomized to nifedipine and propranolol, respectively. Also provide box plots of the change scores in the two treatment groups. 6.71  Answer Problem 6.70 for level 2 to baseline. 6.72  Answer Problem 6.70 for level 3 to baseline. 6.73  Answer Problem 6.70 for the last available level to baseline. 6.74  Answer Problem 6.70 for the average heart rate (or blood pressure) over all available levels to baseline.

Occupational Health *6.75  Refer to Problem 4.23. Provide a 95% CI for the expected number of deaths from bladder cancer over 20 years among tire workers. Is the number of cases of bladder cancer in this group excessive? *6.76  Refer to Problem 4.24. Provide a 95% CI for the expected number of deaths from stomach cancer over 20 years among tire workers. Is the number of cases of stomach cancer in this group excessive?

The study reported that of a total of 1996 tests given to 40- to 49-year-old women, 156 yielded false-positive results. 6.77  What does a false-positive test result mean, in words, in this context? 6.78  Some physicians feel a mammogram is not costeffective unless one can be reasonably certain (e.g., 95% certain) that the false-positive rate is less than 10%. Can you address this issue based on the preceding data? (Hint: Use a CI approach.) 6.79  Suppose a woman is given a mammogram every 2 years starting at age 40. What is the probability that she will have at least one false-positive test result among 5 screening tests during her forties? (Assume the repeated screening tests are independent.) 6.80  Provide a two-sided 95% CI for the probability estimate in Problem 6.79.

S I M U L AT I O N

Nutrition On the computer, we draw 500 random samples of size 5 from the distribution of 173 values of ln(alcohol DR [diet record] + 1) in the Data Set VALID.DAT, where Alcoh_dr is the amount of alcohol consumed as reported by diet record by a group of 173 American nurses who recorded each food eaten on a real-time basis, over four 1-week periods spaced approximately 3 months apart over the course of 1 year. For each sample of size 5, we compute the sample mean – x , the sample standard deviation s, and the test statistic t given by t=

x − µ0 s n

where n = 5 and µ0 = overall mean of ln(alcohol DR + 1) over the 173 nurses = 1.7973. 6.81  What distribution should the t-values follow if the central-limit theorem holds? Assume µ0 is the population mean for ln(Alcoh_dr + 1). 6.82  If the central-limit theorem holds, then what percentage of t-values should exceed 2.776 in absolute value? 6.83  The actual number of t-values that exceed 2.776 in absolute value is 38. Do you feel the central-limit theorem is applicable to these data for samples of size 5?

Cardiovascular Disease Cancer The value of mammography as a screening test for breast cancer has been controversial, particularly among young women. A study was recently performed looking at the rate of false positives for repeated screening mammograms among approximately 10,000 women who were members of Harvard Pilgrim Health Care, a large health-maintenance organization in New England [9].

A study was performed to investigate the variability of cholesterol and other lipid measures in children. The reported within-subject standard deviation for cholesterol in children was 7.8 mg/dL [10]. 6.84  Suppose two total cholesterol determinations are obtained from one child, yielding an average value of 200 mg/dL. What is a two-sided 90% CI for the true mean total cholesterol for that child? (Hint: Assume the sample

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Problems   201

standard deviation of cholesterol for the child is known to be 7.8 mg/dL.) 6.85  Suppose an average of two total cholesterol determinations is to be used as a screening tool to identify children with high cholesterol. The investigators wish to find a value c, such that all children whose mean cholesterol values over two determinations are ≥c will be called back for further screening, whereas children whose mean cholesterol values are 175 mg/dL. Why is hypothesis testing so important? Hypothesis testing provides an objective framework for making decisions using probabilistic methods, rather than relying on subjective impressions. People can form different opinions by looking at data, but a hypothesis test provides a uniform decision-making criterion that is consistent for all people. In this chapter, some of the basic concepts of hypothesis testing are developed and applied to one-sample problems of statistical inference. In a one-sample problem, hypotheses are specified about a single distribution; in a two-sample problem, two different distributions are compared.

204

7.2 General Concepts Example 7.2

Obstetrics  Suppose we want to test the hypothesis that mothers with low socioeconomic status (SES) deliver babies whose birthweights are lower than “normal.” To test this hypothesis, a list is obtained of birthweights from 100 consecutive, fullterm, live-born deliveries from the maternity ward of a hospital in a low-SES area. The mean birthweight (x) is found to be 115 oz with a sample standard deviation (s) of 24 oz. Suppose we know from nationwide surveys based on millions of deliveries

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7.2  ■  General Concepts   205

that the mean birthweight in the United States is 120 oz. Can we actually say the underlying mean birthweight from this hospital is lower than the national average? Assume the 100 birthweights from this hospital come from an underlying normal distribution with unknown mean µ. The methods in Section 6.10 could be used to construct a 95% lower one-sided confidence interval (CI) for µ based on the sample data—that is, an interval of the form µ < c. If this interval contains 120 oz (that is, c ≥ 120), then the hypothesis that the mean birthweight in this hospital is the same as the national average would be accepted. If the interval does not contain 120 oz (c < 120), then the hypothesis that the mean birthweight in this hospital is lower than the national average would be accepted. Another way of looking at this problem is in terms of hypothesis testing. In particular, the hypotheses being considered can be formulated in terms of null and alternative hypotheses, which can be defined as follows:

Definition 7.1

The null hypothesis, denoted by H0, is the hypothesis that is to be tested. The alternative hypothesis, denoted by H1 is the hypothesis that in some sense contradicts the null hypothesis.

Example 7.3

Obstetrics  In Example 7.2, the null hypothesis (H0) is that the mean birthweight in the low-SES-area hospital (µ) is equal to the mean birthweight in the United States (µ0). This is the hypothesis we want to test. The alternative hypothesis (H1) is that the mean birthweight in this hospital (µ) is lower than the mean birthweight in the United States (µ0). We want to compare the relative probabilities of obtaining the sample data under each of these two hypotheses. We also assume the underlying distribution is normal under either hypothesis. These hypotheses can be written more succinctly in the following form:

H 0: µ = µ0

Equation 7.1

vs.

H1: µ < µ 0

Suppose the only possible decisions are whether H0 is true or H1 is true. Actually, for ease of notation, all outcomes in a hypothesis-testing situation generally refer to the null hypothesis. Hence, if we decide H0 is true, then we say we accept H0. If we decide H1 is true, then we state that H0 is not true or, equivalently, that we reject H0. Thus four possible outcomes can occur: (1) We accept H0, and H0 is in fact true. (2) We accept H0, and H1 is in fact true. (3) We reject H0, and H0 is in fact true. (4) We reject H0, and H1 is in fact true. These four possibilities are shown in Table 7.1.

Table 7.1

Four possible outcomes in hypothesis testing

Decision

Truth H0

H1

Accept H0

H0 is true and H0 is accepted

H1 is true and H0 is accepted

Reject H0

H0 is true and H0 is rejected

H1 is true and H0 is rejected

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206   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

In actual practice, it is impossible, using hypothesis-testing methods, to prove that the null hypothesis is true. Thus, in particular, if we accept H0, then we have actually failed to reject H0. If H0 is true and H0 is accepted, or if H1 is true and H0 is rejected, then the correct decision has been made. If H0 is true and H0 is rejected, or if H1 is true and H0 is accepted, then an error has been made. The two types of errors are generally treated differently.

Definition 7.2

The probability of a type I error is the probability of rejecting the null hypothesis when H0 is true.

Definition 7.3

The probability of a type II error is the probability of accepting the null hypothesis when H1 is true. This probability is a function of µ as well as other factors.

Example 7.4

Obstetrics  In the context of the birthweight data in Example 7.2, a type I error would be the probability of deciding that the mean birthweight in the hospital was lower than 120 oz when in fact it was 120 oz. A type II error would be the probability of deciding that the mean birthweight was 120 oz when in fact it was lower than 120 oz.

Example 7.5

Cardiovascular Disease, Pediatrics  What are the type I and type II errors for the cholesterol data in Example 7.1?

Solution

The type I error is the probability of deciding that offspring of men who died from heart disease have an average cholesterol level higher than 175 mg/dL when in fact their average cholesterol level is 175 mg/dL. The type II error is the probability of deciding that the offspring have normal cholesterol levels when in fact their cholesterol levels are above average. Type I and type II errors often result in monetary and nonmonetary costs.

Example 7.6

Obstetrics  The birthweight data in Example 7.2 might be used to decide whether a special-care nursery for low-birthweight babies is needed in this hospital. If H1 were true—that is, if the birthweights in this hospital did tend to be lower than the national average—then the hospital might be justified in having its own special-care nursery. If H0 were true and the mean birthweight was no different from the U.S. average, then the hospital probably does not need such a nursery. If a type I error is made, then a special-care nursery will be recommended, with all the related extra costs, when in fact it is not needed. If a type II error is made, a special-care nursery will not be funded, when in fact it is needed. The nonmonetary cost of this decision is that some low-birthweight babies may not survive without the unique equipment found in a special-care nursery.

Definition 7.4

The probability of a type I error is usually denoted by α and is commonly referred to as the significance level of a test.

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7.3  ■  One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives   207

Definition 7.5

The probability of a type II error is usually denoted by β.

Definition 7.6

The power of a test is defined as

1 − β = 1 − probability of a type II error = Pr(rejecting H0|H1 true)

Example 7.7

Rheumatology  Suppose a new drug for pain relief is to be tested among patients with osteoarthritis (OA). The measure of pain relief will be the percent change in pain level as reported by the patient after taking the medication for 1 month. Fifty OA patients will participate in the study. What hypotheses are to be tested? What do type I error, type II error, and power mean in this situation?

Solution

The hypotheses to be tested are H 0: µ = 0 vs. H1: µ > 0, where µ = mean % change in level of pain over a 1-month period. It is assumed that a positive value for µ indicates improvement, whereas a negative value indicates decline. A type I error is the probability of deciding that the drug is an effective pain reliever based on data from 50 patients, given that the true state of nature is that the drug has no effect on pain relief. The true state of nature here means the effect of the drug when tested on a large (infinite) number of patients. A type II error is the probability of deciding the drug has no effect on pain relief based on data from 50 patients given that the true state of nature is that the drug is an effective pain reliever. The power of the test is the probability of deciding that the drug is effective as a pain reliever based on data from 50 patients when the true state of nature is that it is effective. It is important to note that the power is not a single number but depends on the true degree of pain relief offered by the drug as measured by the true mean change in pain-relief score (δ). The higher δ is, the higher the power will be. In Section 7.5, we present methods for calculating power in more detail. The general aim in hypothesis testing is to use statistical tests that make α and β as small as possible. This goal requires compromise because making α small involves rejecting the null hypothesis less often, whereas making β small involves accepting the null hypothesis less often. These actions are contradictory; that is, as α decreases, β increases, and as α increases, β decreases. Our general strategy is to fix α at some specific level (for example, .10, .05, .01, . . .) and to use the test that minimizes β or, equivalently, maximizes the power.

7.3 One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives Now let’s develop the appropriate hypothesis test for the birthweight data in Example 7.2. The statistical model in this case is that the birthweights come from a normal distribution with mean µ and unknown variance σ2. We wish to test the null hypothesis, H0, that µ = 120 oz vs. the alternative hypothesis, H1, that µ < 120 oz. Suppose a more specific alternative, namely H1: µ = µ1 = 110 oz, is selected.

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208   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

We will show that the nature of the best test does not depend on the value chosen for µ1 provided that µ1 is less than 120 oz. We will also fix the α level at .05 for concreteness.

Example 7.8

A very simple test could be used by referring to the table of random digits in Table 4 in the Appendix. Suppose two digits are selected from this table. The null hypothesis is rejected if these two digits are between 00 and 04 inclusive and is accepted if these two digits are between 05 and 99. Clearly, from the properties of the randomnumber table, the type I error of this test = α = Pr(rejecting the null hypothesis | 5 H0 true) = Pr(drawing two random digits between 00 and 04) = = .05. Thus the 100 proposed test satisfies the α-level criterion given previously. The problem with this test is that it has very low power. Indeed, the power of the test = Pr(rejecting the null 5 = .05. hypothesis | H1 true) = Pr(drawing two random digits between 00 and 04) = 100 Note that the outcome of the test has nothing to do with the sample birthweights drawn. H0 will be rejected just as often when the sample mean birthweight (x) is 110 oz as when it is 120 oz. Thus this test must be very poor because we would expect to reject H0 with near certainty if x is small enough and would expect never to reject H0 if x is large enough. It can be shown that the best (most powerful) test in this situation is based on the sample mean (x). If x is sufficiently smaller than µ0, then H0 is rejected; otherwise, H0 is accepted. This test is reasonable because if H0 is true, then the most likely values of x tend to cluster around µ0, whereas if H1 is true, the most likely values of x tend to cluster around µ1. By “most powerful,” we mean that the test based on the sample mean has the highest power among all tests with a given type I error of α.

Definition 7.7

The acceptance region is the range of values of x for which H0 is accepted.

Definition 7.8

The rejection region is the range of values of x for which H0 is rejected. For the birthweight data in Example 7.2, the rejection region consists of small values of x because the underlying mean under the alternative hypothesis (µ1) is less than the underlying mean under the null hypothesis. This type of test is called a one-tailed test.

Definition 7.9

A one-tailed test is a test in which the values of the parameter being studied (in this case µ) under the alternative hypothesis are allowed to be either greater than or less than the values of the parameter under the null hypothesis (µ0), but not both.

Example 7.9

Cardiovascular Disease, Pediatrics  The hypotheses for the cholesterol data in Example 7.1 are H 0: µ = µ 0 vs. H1: µ > µ 0 , where µ is the true mean cholesterol level for children of men who have died from heart disease. This test is one-tailed because the alternative mean is only allowed to be greater than the null mean. In the birthweight example, how small should x be for H0 to be rejected? This issue can be settled by recalling that the significance level of the test is set atα.

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7.3  ■  One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives   209

Suppose H0 is rejected for all values of x < c and accepted otherwise. The value c should be selected so that the type I error = α. It is more convenient to define test criteria in terms of standardized values rather than in terms of x. Specifically, if we subtract µ0 and divide by S n , we obtain the random variable t = ( X − µ 0 ) ( S n ), which, based on Equation 6.5, follows a tn−1 distribution under H0. We note that under H0, based on the definition the percentiles of a t distribution, Pr(t < t n −1,α ) = α. This leads us to the following test procedure.

One-Samplet t Test for the Mean of a Normal Distribution with Unknown Variance (Alternative Mean < Null Mean) 

Equation 7.2

To test the hypothesis H 0: µ = µ 0 , σ unknown vs. H1: µ < µ 0 , σ unknown with a significance level of α, we compute t =

x − µ0 s n

If t < t n −1,α , then we reject H0. If t ≥ t n −1,α , then we accept H0.

Definition 7.10

The value t in Equation 7.2 is called a test statistic because the test procedure is based on this statistic.

Definition 7.11

The value t n−1,α in Equation 7.2 is called a critical value because the outcome of the test depends on whether the test statistic t < t n −1,α = critical value, whereby we reject H0 or t ≥ t n −1,α , whereby we accept H0.

Definition 7.12

The general approach in which we compute a test statistic and determine the outcome of a test by comparing the test statistic with a critical value determined by the type I error is called the critical-value method of hypothesis testing.

Example 7.10

Obstetrics  Use the one-sample t test to test the hypothesis H0: µ = 120 vs. H1: µ < 120 based on the birthweight data given in Example 7.2 and using a significance level of .05.

Solution

We compute the test statistic x − µ0 s n 115 − 120 = 24 100 −5 = = −2.08 2.4

t=

Using the TINV function of Excel, we see the critical value = t99, .05 = −TINV(.05,99) = −1.66. Because t = −2.08 < −1.66, it follows that we can reject H0 at a significance level of .05.

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210   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Example 7.11

Obstetrics  Use the one-sample t test to test the hypothesis given in Example 7.10 using a significance level of .01.

Solution

Using Excel, the critical value is t99, .01 = −TINV(.01,99) = −2.36. Because t = −2.08 > −2.36, it follows that we accept H0 at significance level = .01. If we use the critical-value method, how do we know what level of α to use? The actual α level used should depend on the relative importance of type I and type II errors because the smaller α is made for a fixed sample size (n), the larger β becomes. Most people feel uncomfortable with α levels much greater than .05. Traditionally, an α level of exactly .05 is used most frequently. In general, a number of significance tests could be performed at different α levels, as was done in Examples 7.10 and 7.11, and whether H0 would be accepted or rejected in each instance could be noted. This can be somewhat tedious and is unnecessary because, instead, significance tests can be effectively performed at all α levels by obtaining the p-value for the test.

Definition 7.13

The p-value for any hypothesis test is the α level at which we would be indifferent between accepting or rejecting H0 given the sample data at hand. That is, the p-value is the α level at which the given value of the test statistic (such as t) is on the borderline between the acceptance and rejection regions. According to the test criterion in Equation 7.2, if a significance level of p is used, then H0 would be rejected if t < t n −1, p and accepted if t ≥ t n −1, p . We would be indifferent to the choice between accepting or rejecting H0 if t = t n −1, p. We can solve for p as a function of t by

p = Pr(t n −1 ≤ t )

Equation 7.3

Thus p is the area to the left of t under a tn−1 distribution. The p-value can be displayed as shown in Figure 7.1.

Figure 7.1

Graphic display of a p-value 0.4

0.3 Frequency

t n–1 distribution

0.2

0.1

0.0

p-value

t

0 Value

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7.3  ■  One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives   211

Example 7.12

Solution

Obstetrics  Compute the p-value for the birthweight data in Example 7.2. From Equation 7.3, the p-value is Pr (t 99 ≤ −2.08) Using the TDIST function of Excel, we find this probability is given by TDIST (2.08,99,1) = .020, which is the p-value. Note that the TDIST function can only be used to obtain right-hand tail areas for positive values of t. However, from the symmetry of the t distribution, Pr (t 99 ≤ −2.08) = Pr (t 99 ≥ 2.08) = TDIST (2.08,99,1). The third argument (1) indicates that the p-value for a one-tailed test is desired. An alternative definition of a p-value that is useful in other hypothesis-testing problems is as follows:

Definition 7.14

The p-value can also be thought of as the probability of obtaining a test statistic as extreme as or more extreme than the actual test statistic obtained, given that the null hypothesis is true. We know that under the null hypothesis, the t statistic follows a tn−1 distribution. Hence, the probability of obtaining a t statistic that is no larger than t under the null hypothesis is Pr(t n−1 ≤ t ) = p-value, as shown in Figure 7.1.

Example 7.13

Cardiology  A topic of recent clinical interest is the possibility of using drugs to reduce infarct size in patients who have had a myocardial infarction within the past 24 hours. Suppose we know that in untreated patients the mean infarct size is 25 (ck − g − EQ/m2). Furthermore, in 8 patients treated with a drug the mean infarct size is 16 with a standard deviation of 10. Is the drug effective in reducing infarct size?

Solution

The hypotheses are H 0: µ = 25 vs. H1: µ < 25. The p-value is computed using Equation 7.3. First we compute the t statistic given by

t=

16 − 25 = −2.55 10 8

The p-value is then given by p = Pr(t7 < −2.55). Referring to Table 5 in the Appendix, we see that t7, .975 = 2.365, and t7, .99 = 2.998. Because 2.365 < 2.55 < 2.998, it follows that 1 − .99 < p < 1 − .975 or .01 < p < .025. Using Excel, the exact p-value is given by TDIST (2.55,7,1) = .019. Thus H0 is rejected and we conclude that the drug significantly reduces infarct size (all other things being equal). This can also be interpreted as the probability that mean infarct size among a random sample of 8 patients will be no larger than 16, if the null hypothesis is true. In this example, the null hypothesis is that the drug is ineffective, or in other words, that true mean infarct size for the population of all patients with myocardial infarction who are treated with drug = true mean infarct size for untreated patients = 25. The p-value is important because it tells us exactly how significant our results are without performing repeated significance tests at different α levels. A question typically asked is: How small should the p-value be for results to be considered statistically significant? Although this question has no one answer, some commonly used criteria follow.

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212   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Equation 7.4

Guidelines for Judging the Significance of a p-Value If .01 ≤ p < .05, then the results are significant. If .001 ≤ p < .01, then the results are highly significant. If p < .001, then the results are very highly significant. If p > .05, then the results are considered not statistically significant (sometimes denoted by NS). However, if .05 ≤ p < .10, then a trend toward statistical significance is sometimes noted. Authors frequently do not specify the exact p-value beyond giving ranges of the type shown here because whether the p-value is .024 or .016 is thought to be unimportant. Other authors give an exact p-value even for results that are not statistically significant so that the reader can appreciate how close to statistical significance the results have come. With the advent of statistical packages such as Excel, MINITAB, and Stata, exact p-values are easy to obtain. These different approaches lead to the following general principle.

Equation 7.5

Determination of Statistical Significance for Results from Hypothesis Tests Either of the following methods can be used to establish whether results from hypothesis tests are statistically significant: (1) The test statistic t can be computed and compared with the critical value tn−1, α at an α level of .05. Specifically, if H 0: µ = µ 0 vs. H1: µ < µ 0 is being tested and t < t n −1,.05 , then H0 is rejected and the results are declared statistically significant (p < .05). Otherwise, H0 is accepted and the results are declared not statistically significant (p ≥ .05). We have called this approach the critical-value method (see Definition 7.12). (2) The exact p-value can be computed and, if p < .05, then H0 is rejected and the results are declared statistically significant. Otherwise, if p ≥ .05, then H0 is accepted and the results are declared not statistically significant. We will refer to this approach as the p-value method.

These two approaches are equivalent regarding the determination of statistical significance (whether p < .05 or p ≥ .05). The p-value method is somewhat more precise in that it yields an exact p-value. The two approaches in Equation 7.5 can also be used to determine statistical significance in other hypothesis-testing problems.

Example 7.14

Solution

Example 7.15

Solution

Obstetrics  Assess the statistical significance of the birthweight data in Example 7.12. Because the p-value is .020, the results would be considered statistically significant and we would conclude that the true mean birthweight is significantly lower in this hospital than in the general population. Cardiology  Assess the significance of the infarct-size data in Example 7.13. The p-value = Pr(t7 < −2.55). Using the TDIST function of Excel, we found that p = .019. Thus the results are significant. In writing up the results of a study, a distinction between scientific and statistical significance should be made because the two terms do not necessarily coincide.

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7.3  ■  One-Sample Test for the Mean of a Normal Distribution: One-Sided Alternatives   213

The results of a study can be statistically significant but can still not be scientifically important. This situation would occur if a small difference was found to be statistically significant because of a large sample size. Conversely, some statistically nonsignificant results can be scientifically important, encouraging researchers to perform larger studies to confirm the direction of the findings and possibly reject H0 with a larger sample size. This statement is true not only for the one-sample t test but for virtually any hypothesis test.

Example 7.16

Solution

Obstetrics  Suppose the mean birthweight in Example 7.2 was 119 oz, based on a sample of size 10,000. Assess the results of the study. The test statistic would be given by t=

119 − 120 = −4.17 24 10, 000

Thus the p-value is given by Pr(t9999 < −4.17). Because a t distribution with 9999 degrees of freedom (df ) is virtually the same as an N(0,1) distribution, we can approximate the p-value by Φ( −4.17) < .001. The results are thus very highly significant but are clearly not very important because of the small difference in mean birthweight (1 oz) between this hospital and the national average.

Example 7.17

Solution

Obstetrics  Suppose the mean birthweight in Example 7.2 was 110 oz, based on a sample size of 10. Assess the results of the study. The test statistic would be given by t=

110 − 120 = −1.32 24 10

The p-value is given by Pr(t9 < −1.32). From Appendix Table 5, because t9,.85 = 1.100 and t9,.90 = 1.383 and 1.100 < 1.32 < 1.383, it follows that 1 − .90 < p < 1 − .85 or .10 < p < .15. Using Excel, the p-value = TDIST (1.32,9,1) = .110. These results are not statistically significant but could be important if the same trends were also apparent in a larger study. The test criterion in Equation 7.2 was based on an alternative hypothesis that µ < µ0. In many situations we wish to use an alternative hypothesis that µ > µ0. In this case H0 would be rejected if x, or correspondingly our test statistic t, were large (> c) and accepted if t were small (≤ c), where c is derived next. To ensure a type I error of α, find c such that

)

α = Pr (t > c H 0 = Pr (t > c µ = µ 0 )

= 1 − Pr (t ≤ c µ = µ 0

)

Because t follows a tn−1 distribution under H0, we have

α = 1 − Pr (t n −1 ≤ c )

or

1 − α = Pr (t n −1 ≤ c )

Because Pr(t n −1 < t n −1,1− α ) = 1 − α, we have c = t n −1,1− α. Thus at level α, H0 is rejected if t > t n −1,1− α and accepted otherwise. The p-value is the probability of observing a test

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214   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

statistic at least as large as t under the null hypothesis. Thus, because t follows a tn−1 distribution under H0, we have p = Pr (t n −1 ≥ t ) = 1 − Pr (t n −1 ≤ t )

The test procedure is summarized as follows.

One-Sample t Test for the Mean of a Normal Distribution with Unknown Variance (Alternative Mean > Null Mean) 

Equation 7.6

To test the hypothesis H 0: µ = µ 0 vs. H1: µ > µ 0 with a significance level of α, the best test is based on t, where t=

x − µ0 s n

If t > t n −1,1− α , then H0 is rejected

If t ≤ t n −1,1− α , then H0 is accepted

The p-value for this test is given by p = Pr (t n −1 > t )

The p-value for this test is depicted in Figure 7.2.

Example 7.18

Solution

Cardiovascular Disease, Pediatrics  Suppose the mean cholesterol level of 10 children whose fathers died from heart disease in Example 7.1 is 200 mg/dL and the sample standard deviation is 50 mg/dL. Test the hypothesis that the mean cholesterol level is higher in this group than in the general population. The hypothesis H 0: µ = 175

vs.

H1: µ > 175

is tested using an α level of .05. H0 is rejected if Figure 7.2

p-value for the one-sample t test when the alternative mean (µ1) > null mean (µ0) 0.4

0.3 Frequency

t > t n −1,1− α = t 9,.95

tn–1 distribution

0.2

p-value

0.1

0.0

0 Value

t

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7.4  ■  One-Sample Test for the Mean of a Normal Distribution: Two-Sided Alternatives   215

In this case, 200 − 175 50 10 25 = = 1.58 15.81

t=

From Table 5, we see that t9,.95 = 1.833. Because 1.833 > 1.58, it follows that we accept H0 at the 5% level of significance. If we use the p-value method, the exact p-value is given by

p = Pr(t9 > 1.58)

REVIEW QUESTIONS 7A

1

What is the difference between a type I and type II error?

2

What is the difference between the critical-value method and the p-value method of hypothesis testing?

3

Several studies have shown that women with many children are less likely to get ovarian cancer. In a new study, data are collected from 25 women ages 40−49 with ovarian cancer. The mean parity (number of children) of these women is 1.8 with standard deviation 1.2. Suppose the mean number of children among women in the general population in this age group is 2.5.

(a) What test can be used to test the hypothesis that women with ovarian cancer have fewer children than women in the general population in the same age group?

(b) Perform the test in Review Question 7A.3a using the critical-value method.

(c) What is the p-value based on the test in Review Question 7A.3a?

(d) What do you conclude from this study?

7.4 One-Sample Test for the Mean of a Normal Distribution: Two-Sided Alternatives In the previous section the alternative hypothesis was assumed to be in a specific direction relative to the null hypothesis.

Example 7.19

Obstetrics  Example 7.2 assumed that the mean birthweight of infants from a lowSES-area hospital was either the same as or lower than average. Example 7.1 assumed that the mean cholesterol level of children of men who died from heart disease was either the same as or higher than average. In most instances this prior knowledge is unavailable. If the null hypothesis is not true, then we have no idea in which direction the alternative mean will fall.

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REVIEW

Using Appendix Table 5, we find t9,.90 = 1.383 and t9,.95 = 1.833. Thus, because 1.383 < 1.58 < 1.833, it follows that .05 < p < .10. Alternatively, using the TDIST function of Excel, we can get the exact p-value = Pr(t9 > 1.58) = TDIST (1.58,9,1) = .074. Because p > .05, we conclude that our results are not statistically significant, and the null hypothesis is accepted. Thus the mean cholesterol level of these children does not differ significantly from that of an average child.

216   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Example 7.20

Cardiovascular Disease  Suppose we want to compare fasting serum-cholesterol levels among recent Asian immigrants to the United States with typical levels found in the general U.S. population. Suppose we assume cholesterol levels in women ages 21−40 in the United States are approximately normally distributed with mean 190 mg/dL. It is unknown whether cholesterol levels among recent Asian immigrants are higher or lower than those in the general U.S. population. Let’s assume that levels among recent female Asian immigrants are normally distributed with unknown mean µ. Hence we wish to test the null hypothesis H 0: µ = µ 0 = 190 vs. the alternative hypothesis H1: µ ≠ µ 0 . Blood tests are performed on 100 female Asian immigrants ages 21−40, and the mean level (x) is 181.52 mg/dL with standard deviation = 40 mg/dL. What can we conclude on the basis of this evidence? The type of alternative given in Example 7.20 is known as a two-sided alternative because the alternative mean can be either less than or greater than the null mean.

Definition 7.15

A two-tailed test is a test in which the values of the parameter being studied (in this case µ) under the alternative hypothesis are allowed to be either greater than or less than the values of the parameter under the null hypothesis (µ0). The best test here depends on the sample mean x or, equivalently, on the test statistic t, as it did in the one-sided situation developed in Section 7.3. We showed in Equation 7.2 that to test the hypothesis H 0: µ = µ 0 versus H1: µ < µ 0 , the best test was of the form: Reject H0 if t < t n −1,α and accept H0 if t ≥ t n −1,α . This test is clearly only appropriate for alternatives on one side of the null mean, namely µ < µ0. We also showed in Equation 7.6 that to test the hypothesis

H 0 : µ = µ 0 vs. H1: µ > µ 0 the best test was correspondingly of the following form: Reject H0 if t > t n −1,1− α and accept H0 if t ≤ t n −1,1− α.

Equation 7.7

A reasonable decision rule to test for alternatives on either side of the null mean is to reject H0 if t is either too small or too large. Another way of stating the rule is that H0 will be rejected if t is either < c1 or > c2 for some constants c1, c2 and H0 will be accepted if c1 ≤ t ≤ c2.

The question remains: What are appropriate values for c1 and c2? These values are again determined by the type I error (α). The constants c1, c2 should be chosen such that

Equation 7.8

)

Pr ( reject H 0 H 0 true = Pr (t < c1 or t > c2 H 0 true

)

) )

= Pr (t < c1 H 0 true + Pr (t > c2 H 0 true = α Half of the type I error is assigned arbitrarily to each of the probabilities on the left side of the second line of Equation 7.8. Thus, we wish to find c1, c2 so that

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7.4  ■  One-Sample Test for the Mean of a Normal Distribution: Two-Sided Alternatives   217

)

Pr (t < c1 H 0 true = Pr (t > c2 H 0 true = α 2

Equation 7.9

)

We know t follows a tn−1 distribution under H0. Because t n−1,α 2 and t n−1,1− α 2 are the lower and upper 100% × α/2 percentiles of a tn−1 distribution, it follows that

(

)

)

(

Pr t < t n −1,α 2 = Pr t > t n −1,1− α 2 = α 2

Therefore,

c1 = t n −1,α 2 = −t n −1,1− α 2

c2 = t n −1,1− α 2

and

This test procedure can be summarized as follows:

Equation 7.10

One-Sample t Test for the Mean of a Normal Distribution with Unknown Variance (Two-Sided Alternative) 

To test the hypothesis H0: µ = µ0 vs. H1: µ ≠ µ 0 , with a significance level of α, the best test is based on t = ( x − µ 0 ) ( s

n ).

If t > t n −1,1− α 2 then H0 is rejected. If t ≤ t n −1,1− α 2 then H0 is accepted. The acceptance and rejection regions for this test are shown in Figure 7.3.

Figure 7.3

One-sample t test for the mean of a normal distribution (two-sided alternative)

Frequency

tn–1 distribution = distribution of t under H0

Rejection region Acceptance region

Example 7.21

Solution

Rejection region

tn–1, �/2

0 Value

tn–1, 1–�/2

Cardiovascular Disease  Test the hypothesis that the mean cholesterol level of recent female Asian immigrants is different from the mean in the general U.S. population, using the data in Example 7.20. We compute the test statistic x − µ0 s n 181.52 − 190 = 40 100 −8.48 = = −2.12 4

t=

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218   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

For a two-sided test with α = .05, the critical values are c1 = t 99,.025 , c2 = t 99,.975 . From Table 5 in the Appendix, because t 99,.975 < t 60 ,.975 = 2.000 , it follows that c2 < 2.000. Also, because c1 = −c2 it follows that c1 > −2.000. Because t = −2.12 < −2.000 < c1, it follows that we can reject H0 at the 5% level of significance. We conclude that the mean cholesterol level of recent Asian immigrants is significantly different from that of the general U.S. population. Alternatively, we might want to compute a p-value as we did in the one-sided case. The p-value is computed in two different ways, depending on whether t is less than or greater than 0.

Equation 7.11

p-Value for the One-Sample t Test for the Mean of a Normal Distribution (Two-Sided Alternative) Let  t =

x − µ0 s n

2 × Pr (t n −1 ≤ t ) , if t ≤ 0 p= 2 × 1 − Pr (t n −1 ≤ t ) , iff t > 0 Thus, in words, if t ≤ 0, then p = 2 times the area under a tn−l distribution to the left of t; if t > 0, then p = 2 times the area under a tn−l distribution to the right of t. One way to interpret the p-value is as follows.

Equation 7.12

The p-value is the probability under the null hypothesis of obtaining a test statistic as extreme as or more extreme than the observed test statistic, where, because a two-sided alternative hypothesis is being used, extremeness is measured by the absolute value of the test statistic. Hence if t > 0, the p-value is the area to the right of t plus the area to the left of −t under a tn−l distribution. However, this area simply amounts to twice the right-hand tail area because the t distribution is symmetric around 0. A similar interpretation holds if t < 0. These areas are illustrated in Figure 7.4.

Example 7.22

Solution

Cardiovascular Disease  Compute the p-value for the hypothesis test in Example 7.20. Because t = −2.12, the p-value for the test is twice the left-hand tail area, or p = 2 × Pr (t 99 < −2.12 ) = TDIST (2.12, 99, 2 ) = .037 Hence, the results are statistically significant with a p-value of .037. Note that if the third argument of TDIST is 2, then a two-sided p-value is obtained. Finally, if n is large (say, >200), then the percentiles of the t distribution (t > t n −1,1− α 2 ) used in determining the critical values in Equation 7.10 can be approximated by the corresponding percentiles of an N(0,1) distribution (z1−α/2). Similarly, in computing p-values in Equation 7.11, if n > 200, then Pr(t n−1 ≤ t ) can be

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7.4  ■  One-Sample Test for the Mean of a Normal Distribution: Two-Sided Alternatives   219

Figure 7.4 0.4

Illustration of the p-value for a one-sample t test for the mean of a normal distribution (two-sided alternative)

If t ≤ 0, p-value = twice the left-hand tail area

tn–1 distribution

tn–1 distribution 0.3 Frequency

Frequency

0.3

0.2

0.1

0.0

If t > 0, p-value = twice the right-hand tail area

0.4

0.2

0.1

p/2

t

0 Value

0.0

p/2

t

Value

approximated by Pr[N(0,1) < t] = Φ(t). We used similar approximations in our work on CIs for the mean of a normal distribution with unknown variance in Section 6.5 on page 172 in Chapter 6. When is a one-sided test more appropriate than a two-sided test? Generally, the sample mean falls in the expected direction from µ0 and it is easier to reject H0 using a one-sided test than using a two-sided test. However, this is not necessarily always the case. Suppose we guess from a previous review of the literature that the cholesterol level of Asian immigrants is likely to be lower than that of the general U.S. population because of better dietary habits. In this case, we would use a one-sided test of the form H 0: µ = 190 vs. H1: µ < 190 . From Equation 7.3, the one-sided p-value = 1 Pr(t 99 < −2.12 ) = TDIST(2.12, 99,1) = .018 = (two-sided p-value). Alternatively, sup2 pose we guess from a previous literature review that the cholesterol level of Asian immigrants is likely to be higher than that of the general U.S. population because of more stressful living conditions. In this case, we would use a one-sided test of the form H 0 : µ = 190 vs. H1: µ > 190. From Equation 7.6, the p-value = Pr(t99 > −2.12) = .982. Thus we would accept H0 if we use a one-sided test and the sample mean is on the opposite side of the null mean from the alternative hypothesis. Generally, a two-sided test is always appropriate because there can be no question about the conclusions. Also, as just illustrated, a two-sided test can be more conservative because you need not guess the appropriate side of the null hypothesis for the alternative hypothesis. However, in certain situations only alternatives on one side of the null mean are of interest or are possible, and in this case a one-sided test is better because it has more power (that is, it is easier to reject H0 based on a finite sample if H1 is actually true) than its two-sided counterpart. In all instances, it is important to decide whether to use a one-sided or a two-sided test before data analysis (or preferably before data collection) begins so as not to bias conclusions based on results of hypothesis testing. In particular, do not change from a two-sided to a one-sided test after looking at the data.

Example 7.23

Hypertension  Suppose we are testing the efficacy of a drug to reduce blood pressure. Assume the change in blood pressure (baseline blood pressure minus follow-up blood pressure) is normally distributed with mean µ and variance σ2. An appropriate hypothesis test might be H 0: µ = 0 vs. H1: µ > 0 because the drug is of interest only if it reduces blood pressure, not if it raises blood pressure.

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220   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

In the rest of this text, we focus primarily on two-sided tests because they are much more widely used in the literature. In this section and in Section 7.3, we have presented the one-sample t test, which is used for testing hypotheses concerning the mean of a normal distribution when the variance is unknown. This test is featured in the flowchart in Figure 7.18 (p. 258) where we display techniques for determining appropriate methods of statistical inference. Beginning at the “Start” box, we arrive at the one-sample t test box by answering yes to each of the following four questions: (1) one variable of interest? (2) one-sample problem? (3) underlying distribution normal or can central-limit theorem be assumed to hold? and (4) inference concerning µ? and no to question (5) σ known?

One-Sample z Test In Equations 7.10 and 7.11, the critical values and p-values for the one-sample t test have been specified in terms of percentiles of the t distribution, assuming the underlying variance is unknown. In some applications, the variance may be assumed known from prior studies. In this case, the test statistic t can be replaced by the test statistic z = ( x − µ 0 ) ( σ n ). Also, the critical values based on the t distribution can be replaced by the corresponding critical values of a standard normal distribution. This leads to the following test procedure:

Equation 7.13

One-Sample z Test for the Mean of a Normal Distribution with Known Variance (Two-Sided Alternative)  To test the hypothesis H 0: µ = µ 0 vs. H1: µ ≠ µ 0 with a significance level of α, where the underlying standard deviation σ is known, the best test is based on z = (x − µ 0 ) ( σ n ) If z < zα 2 or z > z1− α 2 then H0 is rejected. If zα 2 ≤ z ≤ z1− α 2 then H0 is accepted. To compute a two-sided p-value, we have p = 2 Φ( z )

Example 7.24

Solution

= 2 [1 − Φ( z )]

if z ≤ 0 if z > 0

Cardiovascular Disease  Consider the cholesterol data in Example 7.21. Assume that the standard deviation is known to be 40 and the sample size is 200 instead of 100. Assess the significance of the results. The test statistic is 181.52 − 190 40 200 −8.48 = −3.00 = 2.828

z=

We first use the critical-value method with α = 0.05. Based on Equation 7.13, the critical values are −1.96 and 1.96. Because z = −3.00 < −1.96, we can reject H0 at a 5% level of significance. The two-sided p-value is given by 2 × Φ(−3.00) = .003.

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7.5  ■  The Power of a Test   221

Similarly, we can consider the one-sample z test for a one-sided alternative as follows.

Equation 7.14

One-Sample z Test for the Mean of a Normal Distribution with Known Variance (One-Sided Alternative) ( µ1 < µ0)  To test the hypothesis H0: µ = µ0 vs. H1: µ < µ0 with a significance level of α, where the underlying standard deviation σ is known, the best test is based on z = ( x − µ 0 ) (σ

n)

If z < zα, then H0 is rejected; if z ≥ zα, then H0 is accepted. The p-value is given by p = Φ(z).

Equation 7.15

One-Sample z Test for the Mean of a Normal Distribution with Known Variance (One-Sided Alternative) ( µ1 > µ0)  To test the hypothesis H0: µ = µ0 vs. H1: µ > µ0 with a significance level of α, where the underlying standard deviation σ is known, the best test is based on z = ( x − µ 0 ) (σ

n)

If z > z1−α, then H0 is rejected; if z ≤ z1−α, then H0 is accepted. The p-value is given by p = 1 − Φ(z). In this section we presented the one-sample z test, which is used for testing hypotheses concerning the mean of a normal distribution when the variance is known. Beginning at the “Start” box of the flowchart (Figure 7.18, p. 258), we arrive at the one-sample z test box by answering yes to each of the following five questions: (1) one variable of interest? (2) one-sample problem? (3) underlying distribution normal or can centrallimit theorem be assumed to hold? (4) inference concerning µ? and (5) σ known?

7.5 The Power of a Test The calculation of power is used to plan a study, usually before any data have been obtained, except possibly from a small preliminary study called a pilot study. Also, we usually make a projection concerning the standard deviation without actually having any data to estimate it. Therefore, we assume the standard deviation is known and base power calculations on the one-sample z test as given in Equations 7.13, 7.14, and 7.15.

One-Sided Alternatives

Example 7.25

Ophthalmology  A new drug is proposed to prevent the development of glaucoma in people with high intraocular pressure (IOP). A pilot study is conducted with the drug among 10 patients. After 1 month of using the drug, their mean IOP decreases by 5 mm Hg with a standard deviation of 10 mm Hg. The investigators propose to study 100 participants in the main study. Is this a sufficient sample size for the study?

Solution

To determine whether 100 participants are enough, we need to do a power calculation. The power of the study is the probability that we will be able to declare a significant difference with a sample of size 100 if the true mean decline in IOP is 5 mm Hg

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222   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

with a standard deviation of 10 mm Hg. Usually we want a power of at least 80% to perform a study. In this section we examine formulas for computing power and ­addressing the question just asked. In Section 7.4 (Equation 7.14) the appropriate hypothesis test was derived to test

H 0: µ = µ 0 vs. H1: µ < µ 0 where the underlying distribution was assumed to be normal and the population variance was assumed to be known. The best test was based on the test statistic z. In particular, from Equation 7.14 for a type I error of α, H0 is rejected if z < zα and H0 is accepted if z ≥ zα. The form of the best test does not depend on the alternative mean chosen (µ1) as long as the alternative mean is less than the null mean µ0. Hence, in Example 7.2, where µ0 = 120 oz, if we were interested in an alternative mean of µ1 = 115 oz rather than µ1 = 110 oz, then the same test procedure would still be used. However, what differs for the two alternative means is the power of the test = 1 − Pr(type II error). Recall from Definition 7.6 that

)

Power = Pr ( reject H 0 H 0 false = Pr ( Z < zα µ = µ1 )

 X − µ0  = Pr  < zα µ = µ1   σ n 

(

= Pr X < µ 0 + zα σ

n µ = µ1

)

2

We know that under H1 , X ~ N (µ1 , σ n). Hence, on standardization of limits,

(

Power = Φ  µ 0 + zα σ

n − µ1

) (σ

(µ − µ1 )   n  = Φ  zα + 0 n σ  

)

This power is depicted graphically in Figure 7.5. Note that the area to the left of µ 0 + zα σ n under the H0 distribution is the significance level α, whereas the area to the left of µ 0 + zα σ n under the H1 distribution is the power = 1 − β. Figure 7.5

Illustration of power for the one-sample test for the mean of a normal distribution with known variance (µ1 < µ0) Distribution of X under H1 N(�1, � 2/n)

Distribution of X under H0 N(�0, � 2/n)

Power = 1–�

Frequency

Acceptance region Rejection region

Area = �

�1

�0

Value

� 0 + z� �/ n

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7.5  ■  The Power of a Test   223

Why should power concern us? The power of a test tells us how likely it is that a statistically significant difference will be detected based on a finite sample size n, if the alternative hypothesis is true—that is, if the true mean µ differs from the mean under the null hypothesis (µ0). If the power is too low, then there is little chance of finding a significant difference and nonsignificant results are likely even if real differences exist between the true mean µ of the group being studied and the null mean µ0. An inadequate sample size is usually the cause of low power to detect a scientifically meaningful difference.

Example 7.26

Solution

Obstetrics  Compute the power of the test for the birthweight data in Example 7.2 (p. 204) with an alternative mean of 115 oz and α = .05, assuming the true standard deviation = 24 oz. We have µ0 = 120 oz, µ1 = 115 oz, α = .05, σ = 24, n = 100. Thus Power = Φ  z.05 + (120 − 115) 100 24  = Φ [ −1.645 + 5(10)) 24 ] = Φ( 0.438) = .669 Therefore, there is about a 67% chance of detecting a significant difference using a 5% significance level with this sample size. We have focused on the situation where µ1 < µ 0 . We are also interested in power when testing the hypothesis

H 0: µ = µ 0 vs. H1: µ = µ1 > µ 0 as was the case with the cholesterol data in Example 7.1. The best test for this situation was presented in Equation 7.15, where H0 is rejected if z > z1−α and accepted if z ≤ z1− α . Notice that if z > z1−α, then

Equation 7.16

x − µ0 > z1− α σ n If we multiply both sides of Equation 7.16 by σ the rejection criteria in terms of x, as follows:

Equation 7.17

x > µ 0 + z1− α σ

n , and add µ0, we can re-express

n

Similarly, the acceptance criteria, z ≤ z1− α , can also be expressed as

Equation 7.18

x ≤ µ 0 + z1− α σ

n

Hence the power of the test is given by

(

Power = Pr X > µ 0 + z1− α σ

)

(

n µ = µ1 = 1 − Pr X < µ 0 + z1− α σ

n µ = µ1

)

  µ 0 + z1− α σ n − µ1  (µ − µ1 ) n  =1− Φ = 1 − Φ  z1− α + 0   σ   σ n   Using the relationships Φ(−x) = 1 − Φ(x) and zα = − z1− α , this expression can be rewritten as

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224   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Figure 7.6

Illustration of power for the one-sample test for the mean of a normal distribution with known variance ( µ1 > µ0) Distribution of X under H1 N(�1, �2/n)

Distribution of X under H0 N(�0, �2/n)

Frequency

Power = 1 – �

Rejection region

Acceptance region

Area = � �0

�1

Value

�0 + z1–��/ n

 (µ − µ 0 ) n  = Φ  z + (µ1 − µ 0 ) n  if µ > µ Φ  − z1− α + 1   α  1 0 σ σ     This power is displayed in Figure 7.6.

Example 7.27

Solution

Cardiovascular Disease, Pediatrics  Using a 5% level of significance and a sample of size 10, compute the power of the test for the cholesterol data in Example 7.18, with an alternative mean of 190 mg/dL, a null mean of 175 mg/dL, and a standard deviation (σ) of 50 mg/dL. We have µ0 = 175, µ1 = 190, α = .05, σ = 50, n = 10. Thus Power = Φ  −1.645 + (190 − 175) 10 50 

)

(

= Φ −1.645 + 15 10 50 = Φ( −0.696)

= 1 − Φ( 0.696) = 1 − .757 = .243 Therefore, the chance of finding a significant difference in this case is only 24%. Thus it is not surprising that a significant difference was not found in Example 7.18 because the sample size was too small. The power formulas presented in this section can be summarized as follows:

Equation 7.19

Power for the One-Sample z Test for the Mean of a Normal Distribution with Known Variance (One-Sided Alternative)  The power of the test for the hypothesis

H 0 : µ = µ 0 vs. H1 : µ = µ1 where the underlying distribution is normal and the population variance (σ2) is assumed known is given by

(

)

(

Φ zα + µ 0 − µ1 n σ = Φ − z1− α + µ 0 − µ1 n σ

)

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7.5  ■  The Power of a Test   225

Notice from Equation 7.19 that the power depends on four factors: α, |µ0 − µ1|, n, and σ.

Equation 7.20

Factors Affecting the Power (1) If the significance level is made smaller (α decreases), zα increases and hence the power decreases. (2) If the alternative mean is shifted farther away from the null mean (|µ0 − µ1| increases), then the power increases. (3) If the standard deviation of the distribution of individual observations increases (σ increases), then the power decreases. (4) If the sample size increases (n increases), then the power increases.

Example 7.28

Solution

Cardiovascular Disease, Pediatrics  Compute the power of the test for the cholesterol data in Example 7.27 with a significance level of .01 vs. an alternative mean of 190 mg/dL. If α = .01, then the power is given by

(

Φ  z.01 + (190 − 175) 10 50  = Φ −2.326 + 15 10 50

)

= Φ( −1.377) = 1 − Φ(1.377) = 1 − .9158 ≈ 8 %

which is lower than the power of 24% for α = .05, computed in Example 7.27. What does this mean? It means that if the α level is lowered from .05 to .01, the β errorwill be higher or, equivalently, the power, which decreases from .24 to .08, will be lower.

Example 7.29

Solution

Obstetrics  Compute the power of the test for the birthweight data in Example 7.26 with µ1 = 110 oz rather than 115 oz. If µ1 = 110 oz, then the power is given by Φ [ −1.645 + (120 − 110 )10 24 ] = Φ(2.522 ) = .994 ≈ 99% which is higher than the power of 67%, as computed in Example 7.26 for µ1 = 115 oz. What does this mean? It means that if the alternative mean changes from 115 oz to 110 oz, then the chance of finding a significant difference increases from 67% to 99%.

Example 7.30

Solution

Cardiology  Compute the power of the test for the infarct-size data in Example 7.13 with σ = 10 and σ = 15 using an alternative mean of 20 (ck − g − EQ/m2) and α = .05. In Example 7.13, µ0 = 25 and n = 8. Thus, if σ = 10, then Power = Φ  −1.645 + (25 − 20 ) 8 10  = Φ( −0.23)

= 1 − Φ( 0.23) = 1 − .591 = .409 ≈ 41% whereas if σ = 15, then

Power = Φ  −1.645 + (25 − 20 ) 8 15 = Φ( −0.702 ) = 1 − .759 = .241 ≈ 24%

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226   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

What does this mean? It means the chance of finding a significant difference declines from 41% to 24% if σ increases from 10 to 15.

Example 7.31

Solution

Obstetrics  Assuming a sample size of 10 rather than 100, compute the power for the birthweight data in Example 7.26 with an alternative mean of 115 oz and α = .05. We have µ0 = 120 oz, µ1 =115 oz, α = .05, σ = 24, and n = 10. Thus

(

Power = Φ  z.05 + (120 − 115) 10 24  = Φ −1.645 + 5 10 24

)

= Φ( −0.986) = 1 − .838 = .162 What does this mean? It means there is only a 16% chance of finding a significant difference with a sample size of 10, whereas there was a 67% chance with a sample size of 100 (see Example 7.26). These results imply that if 10 infants were sampled, we would have virtually no chance of finding a significant difference and would almost surely report a false-negative result. For given levels of α (.05), σ (24 oz), n (100), and µ0 (120 oz), a power curve can be drawn for the power of the test for various alternatives µ1. Such a power curve is shown in Figure 7.7 for the birthweight data in Example 7.2. The power ranges from 99% for µ = 110 oz to about 20% when µ = 118 oz.

Two-Sided Alternatives The power formula in Equation 7.19 is appropriate for a one-sided significance test at level α for the mean of a normal distribution with known variance. Using a two-sided test with hypotheses H 0: µ = µ 0 vs. H1: µ ≠ µ 0, the following power formula is used.

Equation 7.21

Power for the One-Sample z Test for the Mean of a Normal Distribution (Two-Sided Alternative)  The power of the two-sided test H0: µ = µ0 vs. H1: µ ≠ µ0 for the specific alternative µ = µ1, where the underlying distribution is normal and the population variance (σ2) is assumed known, is given exactly by  (µ − µ1 ) n  + Φ  − z (µ1 − µ 0 ) n  Φ  − z1− α / 2 + 0    1− α / 2 + σ σ    

Figure 7.7

Power curve for the birthweight data in Example 7.2 1.0 Power = Pr(reject H0 � = �1)

.9 .8 .7

Power curve for the one-sided significance test given in Equation 7.14 for the birthweight data in Example 7.2

.6 .5 .4 .3 .2 .1 106

108

110

112

114

116

118

120

Birthweight

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7.5  ■  The Power of a Test   227

and approximately by

 µ − µ1 n  Φ  − z1− α / 2 + 0  σ  

To see this, note that from Equation 7.13 we reject H0 if

z=

x − µ0 < zα / 2 σ n

or

z=

x − µ0 > z1− α / 2 σ n

If we multiply each inequality by σ criteria in terms of x, as follows:

Equation 7.22

x < µ 0 + zα / 2 σ

n and add µ0, we can re-express the rejection

n or x > µ 0 + z1− α / 2 σ

n

The power of the test vs. the specific alternative µ = µ1 is given by

Equation 7.23

(

Power = Pr X < µ 0 + zα / 2 σ

)

(

n µ = µ1 + Pr X > µ 0 + z1− α / 2 σ

n µ = µ1

)

 µ + zα / 2 σ n − µ1   µ + z1− α / 2 σ n − µ1  = Φ 0 +1− Φ 0   σ n σ n       (µ − µ1 ) n  (µ 0 − µ1 ) n  = Φ  zα / 2 + 0   + 1 − Φ  z1− α / 2 + σ σ    

Using the relationship 1 − Φ(x) = Φ(−x), the last two terms can be combined as follows:

Equation 7.24

  (µ − µ1 ) n  (µ1 − µ 0 ) n  Power = Φ  zα / 2 + 0  + Φ  − z1− α / 2 +  σ σ    

Finally, recalling the relationship zα/2 = −z1− α/2, we have

Equation 7.25

  (µ − µ1 ) n  (µ1 − µ 0 ) n  Power = Φ  − z1− α / 2 + 0  + Φ  − z1− α / 2 +  σ σ     Equation 7.25 is more tedious to use than is usually necessary. Specifically, if µ1 < µ0, then the second term is usually negligible relative to the first term. However, if µ1 > µ0, then the first term is usually negligible relative to the second term. Therefore, the approximate power formula in Equation 7.21 is usually used for a two-sided test because it represents the first term in Equation 7.25 if µ0 > µ1 and the second term in Equation 7.25 if µ1 > µ0. The power is displayed in Figure 7.8. Note that the approximate power formula for the two-sided test in Equation 7.21 is the same as the formula for the one-sided test in Equation 7.19, with α replaced by α/2.

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228   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Figure 7.8

Illustration of power for a two-sided test for the mean of a normal distribution with known variance

Frequency

Power = 1 – �

Frequency

Power = 1 – �

Area = �/2

Area = �/2

Area = �/2

�1

�0

�0 + z�/2�/ n

Value

�0

�0 + z1–�/2�/ n

�0 + z�/2�/ n

(a) �1 < �0

�1

�0 + z1–�/2�/ n

Area = �/2 Value

(b) �1 > �0

Example 7.32

Solution

Cardiology  A new drug in the class of calcium-channel blockers is to be tested for the treatment of patients with unstable angina, a severe form of angina. The effect this drug will have on heart rate is unknown. Suppose 20 patients are to be studied and the change in heart rate after 48 hours is known to have a standard deviation of 10 beats per minute. What power would such a study have of detecting a significant difference in heart rate over 48 hours if it is hypothesized that the true mean change in heart rate from baseline to 48 hours could be either a mean increase or a decrease of 5 beats per minute? Use Equation 7.21 with σ = 10, | µ0 − µ1| = 5, α = .05, n = 20. We have

(

)

Power = Φ − z1−.05/ 2 + 5 20 10 = Φ( −1.96 + 2.236) = Φ( 0.276) = .609 ≈ .61 Thus the study would have a 61% chance of detecting a significant difference.

7.6 Sample-Size Determination One-Sided Alternatives For planning purposes, we frequently need some idea of an appropriate sample size for investigation before a study actually begins. One possible result of making these calculations is finding out that the appropriate sample size is far beyond the financial means of the investigator(s) and thus abandoning the proposed investigation. Obviously, reaching this conclusion before a study starts is much better than after it is in progress. What does “an appropriate sample size for investigation” actually mean? Consider the birthweight data in Example 7.2. We are testing the null hypothesis H0: µ = µ0 vs. the alternative hypothesis H1: µ = µ1, assuming that the distribution of birthweights is normal in both cases and that the standard deviation σ is known. We are presumably going to conduct a test with significance level α and have some idea of what the magnitude of the alternative mean µ1 is likely to be. If the test procedure in Equation 7.14 is used, then H0 would be rejected if z < zα or equivalently

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7.6  ■  Sample-Size Determination   229

Figure 7.9

Requirements for appropriate sample size H1 distribution N(�1, � 2/n)

H0 distribution N(�0, � 2/n)

Frequency

Area = 1 – � Acceptance region Rejection region

Area = �

�1

�0

Value

� 0 + z� �/ n

if x < µ 0 + zα σ n and accepted if z ≥ zα or equivalently if x ≥ µ 0 + zα σ n . Suppose the alternative hypothesis is actually true. The investigator should have some idea as to what he or she would like the probability of rejecting H0 to be in this instance. This probability is, of course, nothing other than the power, or 1 − β. Typical values for the desired power are 80%, 90%, …, and so forth. The problem of determining sample size can be summarized as follows: Given that a one-sided significance test will be conducted at level α and that the true alternative mean is expected to be µ1, what sample size is needed to be able to detect a significant difference with probability 1 − β? The situation is displayed in Figure 7.9. In Figure 7.9, the underlying sampling distribution of X is shown under the null and alternative hypotheses, respectively, and the critical value µ 0 + zα σ n has been identified. H0 will be rejected if  x < µ 0 + zα σ n . Hence the area to the left of µ 0 + zα σ n under the rightmost curve is α. However, we also want the area to the left of µ 0 + zα σ n under the leftmost curve, which represents the power, to be 1 − β. These requirements will be met if n is made sufficiently large, because the variance of each curve (σ2/n) will decrease as n increases and thus the curves will separate. From the power formula in Equation 7.19,

)

(

Power = Φ zα + µ 0 − µ1 n σ = 1 − β We want to solve for n in terms of α, β, |µ0 − µ1|, and σ. To accomplish this, recall that Φ(z1−β) = 1 − β and, therefore, zα + µ 0 − µ1 n σ = z1− β Subtract zα from both sides of the equation and multiply by σ/|µ0 − µ1| to obtain

n=

( −zα + z1−β ) σ µ 0 − µ1

Replace −zα by z1−α and square both sides of the equation to obtain

( z1−α + z1−β ) n=

2

σ2

(µ 0 − µ1 )

2

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230   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Similarly, if we were to test the hypothesis

H0 : µ = µ0

vs.

H1 : µ = µ1 > µ 0

as was the case with the cholesterol data in Example 7.1, using a significance level of α and a power of 1 − β, then, from Equation 7.19, the same sample-size formula would hold. This procedure can be summarized as follows.

Equation 7.26

Sample-Size Estimation When Testing for the Mean of a Normal Distribution (One-Sided Alternative)  Suppose we wish to test H0 : µ = µ0

H1 : µ = µ1

vs.

where the data are normally distributed with mean µ and known variance σ2. The sample size needed to conduct a one-sided test with significance level α and probability of detecting a significant difference = 1 − β is n=

Example 7.33

Solution

(

σ 2 z1− β + z1− α

(µ 0 − µ1 )2

)

2

Obstetrics  Consider the birthweight data in Example 7.2. Suppose that µ0 = 120 oz, µ1 = 115 oz, σ = 24, α = .05, 1 − β = .80, and we use a one-sided test. Compute the appropriate sample size needed to conduct the test. n=

242 ( z.8 + z.95 )2 = 23.04( 0.84 + 1.645)2 = 23.04(6.175) = 142.3 25

The sample size is always rounded up so we can be sure to achieve at least the required level of power (in this case, 80%). Thus a sample size of 143 is needed to have an 80% chance of detecting a significant difference at the 5% level if the alternative mean is 115 oz and a one-sided test is used. Notice that the sample size is very sensitive to the alternative mean chosen. We see from Equation 7.26 that the sample size is inversely proportional to (µ0 − µ1)2. Thus, if the absolute value of the distance between the null and alternative means is halved, then the sample size needed is four times as large. Similarly, if the distance between the null and alternative means is doubled, then the sample size needed is 1/4 as large.

Example 7.34

Obstetrics  Compute the sample size for the birthweight data in Example 7.2 if µ1 = 110 oz rather than 115 oz.

Solution

The required sample size would be 1/4 as large because (µ0 − µ1)2 = 100 rather than 25. Thus n = 35.6, or 36 people, would be needed.

Example 7.35

Cardiovascular Disease, Pediatrics  Consider the cholesterol data in Example 7.1. Suppose the null mean is 175 mg/dL, the alternative mean is 190 mg/dL, the stan­ dard deviation is 50, and we wish to conduct a one-sided significance test at the 5% level with a power of 90%. How large should the sample size be?

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7.6  ■  Sample-Size Determination   231

Solution

n= =

σ 2 ( z1− β + z1− α )2 (µ 0 − µ1 )2

50 2 ( z.9 + z.95 )2 (190 − 175)2

=

2500(1.28 + 1.645)2 2500(8.556) = = 95.1 225 152

Thus 96 people are needed to achieve a power of 90% using a 5% significance level. We should not be surprised that we did not find a significant difference with a sample size of 10 in Example 7.18. Clearly, the required sample size is related to the following four quantities.

Equation 7.27

Factors Affecting the Sample Size (1) The sample size increases as σ2 increases. (2) The sample size increases as the significance level is made smaller (α decreases). (3) The sample size increases as the required power increases (1 − β increases). (4) The sample size decreases as the absolute value of the distance between the null and alternative means (|µ0 − µ1|) increases.

Example 7.36

Obstetrics  What would happen to the sample-size estimate in Example 7.33 if σ were increased to 30? If α were reduced to .01? If the required power were increased to 90%? If the alternative mean were changed to 110 oz (keeping all other parameters the same in each instance)?

Solution

From Example 7.33 we see that 143 infants need to be studied to achieve a power of 80% using a 5% significance level with a null mean of 120 oz, an alternative mean of 115 oz, and a standard deviation of 24 oz. If σ increases to 30, then we need

n = 30 2 ( z.8 + z.95 )

2

(120 − 115)2 = 900 ( 0.84 + 1.645)2 25 = 222.3, or 223 infants

If α were reduced to .01, then we need

n = 242 ( z.8 + z.99 )

2

(120 − 115)2 = 576 ( 0.84 + 2.326 )2 25 = 230.9, or 231 infants

If 1 − β were increased to .9, then we need

n = 242 ( z.9 + z.95 )

2

(120 − 115)2 = 576 (1.28 + 1.645)2 25 = 197.1, or 198 infants

If µ1 is decreased to 110 or, equivalently, if |µ0 − µ1| is increased from 5 to 10, then we need

n = 242 ( z.8 + z.95 )

2

(120 − 110 )2 = 576 ( 0.84 + 1.645)2 100 = 35.6, or 36 infants

Thus the required sample size increases if σ increases, α decreases, or 1 − β increases. The required sample size decreases if the absolute value of the distance between the null and alternative means increases. One question that arises is how to estimate the parameters necessary to compute sample size. It usually is easy to specify the magnitude of the null mean (µ0). Similarly, by convention the type I error (α) is usually set at .05. What the level of

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232   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

the power should be is somewhat less clear, although most investigators seem to feel uncomfortable with a power of less than .80. The appropriate values for µ1 and σ2 are usually unknown. The parameters µ1, σ2 may be obtained from previous work, similar experiments, or prior knowledge of the underlying distribution. In the absence of such information, the parameter µ1 is sometimes estimated by assessing what a scientifically important difference |µ0 − µ1| would be in the context of the problem being studied. Conducting a small pilot study is sometimes valuable. Such a study is generally inexpensive, and one of its principal aims is to obtain estimates of µ1 and σ2 for the purpose of estimating the sample size needed to conduct the major investigation. Keep in mind that most sample-size estimates are “ballpark estimates” because of the inaccuracy in estimating µ1 and σ2. These estimates are often used merely to check that the proposed sample size of a study is close to what is actually needed rather than to identify a precise sample size.

Sample-Size Determination (Two-Sided Alternatives) The sample-size formula given in Equation 7.26 was appropriate for a one-sided significance test at level α for the mean of a normal distribution with known variance. If it is not known whether the alternative mean (µ1) is greater or less than the null mean (µ0), then a two-sided test is appropriate, and the corresponding sample size needed to conduct a study with power 1 − β is given by n=

(

σ 2 z1− β + z1− α / 2

(µ 0 − µ1 )2

)

2

To see this, use the approximate power formula in Equation 7.21 and solve for n in terms of the other parameters, whereby

 µ − µ1 n  Φ  − z1− α / 2 + 0  =1−β σ   or − z1− α / 2 +

µ 0 − µ1 n = z1− β σ

If z 1−α/2 is added to both sides of the equation and the result is multiplied by σ/| µ0 − µ1|, we get

n=

( z1−β + z1−α /2 ) σ µ 0 − µ1

If both sides of the equation are squared, we get

( z1−β + z1−α /2 )

2

n=

σ2

(µ 0 − µ1 )2

This procedure can be summarized as follows.

Equation 7.28

Sample-Size Estimation When Testing for the Mean of a Normal Distribution (Two-Sided Alternative)  Suppose we wish to test H0: µ = µ0 vs. H0: µ = µ1, where the data are normally distributed with mean µ and known variance σ2. The sample size needed to conduct a twosided test with significance level α and power 1 − β is

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7.6  ■  Sample-Size Determination   233

n=

(

)

2

σ 2 z1− β + z1− α / 2

(µ 0 − µ1 )2

Note that this sample size is always larger than the corresponding sample size for a one-sided test, given in Equation 7.26, because z1−α/2 is larger than z1−α.

Example 7.37

Cardiology  Consider a study of the effect of a calcium-channel-blocking agent on heart rate for patients with unstable angina, as described in Example 7.32. Suppose we want at least 80% power for detecting a significant difference if the effect of the drug is to change mean heart rate by 5 beats per minute over 48 hours in either direction and σ = 10 beats per minute. How many patients should be enrolled in such a study?

Solution

We assume α = .05 and σ = 10 beats per minute, as in Example 7.32. We intend to use a two-sided test because we are not sure in what direction the heart rate will change after using the drug. Therefore, the sample size is estimated using the two-sided formulation in Equation 7.28. We have n=

(

σ 2 z1− β + z1− α / 2

(µ 0 − µ1 )2 2 10 2 ( z.8 + z.975 ) =

2

100( 0.84 + 1.96)2 25 5 = 4(7.84) = 31.36, or 32 patieents 2

)

=

Thus 32 patients must be studied to have at least an 80% chance of finding a significant difference using a two-sided test with α = .05 if the true mean change in heart rate from using the drug is 5 beats per minute. Note that in Example 7.32 the investigators proposed a study with 20 patients, which would provide only 61% power for testing the preceding hypothesis, which would have been inadequate. If the direction of effect of the drug on heart rate were well known, then a onesided test might be justified. In this case, the appropriate sample size could be obtained from the one-sided formulation in Equation 7.26, whereby

n=

=

(

σ 2 z1− β + z1− α

(µ 0 − µ1 )2

)

2

10 2 ( z.8 + z.95 )

2

=

52

100( 0.84 + 1.645)2 = 4(6.175) = 24.7, or 25 patientts 25

Thus we would need to study only 25 patients for a one-sided test instead of the 32 patients needed for a two-sided test.

Sample-Size Estimation Based on CI Width In some instances, it is well known that the treatment has a significant effect on some physiologic parameter. Interest focuses instead on estimating the effect with a given degree of precision.

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234   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Example 7.38

Cardiology  Suppose it is well known that propranolol lowers heart rate over 48 hours when given to patients with angina at standard dosage levels. A new study is proposed using a higher dose of propranolol than the standard one. Investigators are interested in estimating the drop in heart rate with high precision. How can this be done? Suppose we quantify the precision of estimation by the width of the two-sided 100% × (1 − α) CI. Based on Equation 6.6, the 100% × (1 − α) CI for µ = true decline in heart rate is x ± t n −1,1− α / 2 s n . The width of this CI is 2t n−1,1− α / 2 s n . If we wish this interval to be no wider than L, then 2t n−1,1− α / 2 s

n=L

We multiply both sides of the equation by n L and obtain 2t n−1,1− α / 2 s L = n

or, on squaring both sides, n = 4t n2−1,1− α / 2 s2 L2

We usually approximate tn−1,1−α/2 by z1−α/2 and obtain the following result:

Equation 7.29

Sample-Size Estimation Based on CI Width  Suppose we wish to estimate the mean of a normal distribution with sample variance s2 and require that the two-sided 100% × (1 − α) CI for µ be no wider than L. The number of subjects needed is approximately n = 4z12− α/ 2 s2 L2

Example 7.39

Solution

Cardiology  Find the minimum sample size needed to estimate the change in heart rate (µ) in Example 7.38 if we require that the two-sided 95% CI for µ be no wider than 5 beats per minute and the sample standard deviation for change in heart rate equals 10 beats per minute. We have α = .05, s = 10, L = 5. Therefore, from Equation 7.29, n = 4 ( z.975 ) (10 ) 2

2

(5)2

= 4(1.96)2 (100 ) 25 = 61.5

Thus 62 patients need to be studied.

REVIEW

REVIEW QUESTIONS 7 B

1

In the BMD study referred to in Case Study 2 (p. 30), the mean weight difference between the heavier-smoking twin and the lighter-smoking twin was −5.0% ± 3.1% (mean ± se) based on 41 pairs (expressed as a percentage of the pair mean). Is there a significant difference in weight between the heavier- and the lighter-smoking twin?

2

What is the power of a test? What factors affect the power and in what way?

3

What factors affect the sample-size estimate for a study? What is the principal difference between a power estimate and a sample-size estimate? When do we use each?

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7.7  ■  The Relationship Between Hypothesis Testing and Confidence Intervals   235

7.7 The Relationship Between Hypothesis Testing and Confidence Intervals A test procedure was presented in Equation 7.10 for testing the hypothesis H0: µ = µ0 vs. H1: µ ≠ µ0. Similarly, a method for obtaining a two-sided CI for the parameter µ of a normal distribution when the variance is unknown was discussedin Section 6.5. The relationship between these two procedures can be stated as f­ ollows.

Equation 7.30

The Relationship Between Hypothesis Testing and Confidence Intervals (Two-Sided Case)  Suppose we are testing H0: µ = µ0 vs. H1: µ ≠ µ0. H0 is rejected with a two-sided level α test if and only if the two-sided 100% × (1 − α) CI for µ does not contain µ0. H0 is accepted with a two-sided level α test if and only if the two-sided 100% × (1 − α) CI for µ does contain µ0. Recall that the two-sided 100% × (1 − α) CI for µ = (c1 , c2 ) = x ± t n −1,1− α / 2 s n . Suppose we reject H0 at level α. Then either t < −tn−1,1−α/2 or t > tn−1,1−α/2. Suppose that

(

t = ( x − µ0 ) s

)

n < −t n −1,1− α / 2

We multiply both sides by s x − µ 0 < −t n −1,1− α / 2 s

n and obtain

n

If we add µ0 to both sides, then

x < µ 0 − t n −1,1− α / 2 s

n

µ 0 > x + t n −1,1− α / 2 s

n = c2

or

Similarly, if t > tn−1,1−α/2, then

x − µ 0 > t n −1,1− α / 2 s

n

µ 0 < x − t n −1,1− α / 2 s

n = c1

or

Thus, if we reject H0 at level α using a two-sided test, then either µ0 < c1 or µ0 > c2; that is, µ0 must fall outside the two-sided 100% × (1 − α) CI for µ. Similarly, it can be shown that if we accept H0 at level α using a two-sided test, then µ0 must fall within the two-sided 100% × (1 − α) CI for µ (or, c1 ≤ µ0 ≤ c2). Hence, this relationship is the rationale for using CIs in Chapter 6 to decide on the reasonableness of specific values for the parameter µ. If any specific proposed value µ0 did not fall in the two-sided 100% × (1 − α) CI for µ, then we stated that it was an unlikely value for the parameter µ. Equivalently, we could have tested the hypothesis H0: µ = µ0 vs. H1: µ ≠ µ0 and rejected H0 at significance level α. Here is another way of expressing this relationship.

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236   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Equation 7.31

The two-sided 100% × (1 − α) CI for µ contains all values µ0 such that we accept H0 using a two-sided test with significance level α, where the hypotheses are H0: µ = µ0 vs. H1: µ ≠ µ0. Conversely, the 100% × (1 − α) CI does not contain any value µ0 for which we can reject H0 using a two-sided test with significance level α, where H0: µ = µ0 and H1: µ ≠ µ0.

Example 7.40

Cardiovascular Disease  Consider the cholesterol data in Example 7.20. We have x = 181.52 mg dL, s = 40 mg/dL, and n = 100. The two-sided 95% CI for µ is given by

( x − t99,.975 s

n , x + t 99,.975 s

=  x − TINV(.05, 99) s

n

)

n , x + TINV(.05, 99) s

n 

1.984(40 ) 1.984(40 )   = 181.52 − ,181.52 +  10 10  = (181.52 − 7.94,181.52 + 7.94) = (173.58,189.46) This CI contains all values for µ0 for which we accept H0: µ = µ0 and does not contain any value µ0 for which we could reject H0 at the 5% level. Specifically, the 95% CI (173.58, 189.46) does not contain µ0 = 190, which corresponds to the decision in Example 7.21, where we were able to reject H0: µ = 190 at the 5% level of significance. Another way of stating this is that the p-value computed in Example 7.22 for µ0 = 190 = .037, which is less than .05.

Example 7.41

Cardiovascular Disease  Suppose the sample mean for cholesterol was 185 mg/dL for the cholesterol data in Example 7.20. The 95% CI would be (185 − 7.94,185 + 7.94) = (177.06,192.94) which contains the null mean (190). The p-value for the hypothesis test would be p = 2 × Pr [t 99 < (185 − 190 ) 4 ] = 2 × Pr (t 99 < −1.25)

= TDIST T(1.25, 99, 2 ) = .214 > .05 using the TDIST function of Excel. So we can accept H0 using α = .05, if µ0 = 190, which is consistent with the statement that 190 falls within the above 95% CI. Thus, the conclusions based on the CI and hypothesis-testing approaches are also the same here. A similar relationship exists between the one-sided hypothesis test developed in Section 7.3 and the one-sided CI for the parameter µ developed in Section 6.10. Equivalent CI statements can also be made about most of the other one-sided or two-sided hypothesis tests covered in this text. Because the hypothesis-testing and CI approaches yield the same conclusions, is there any advantage to using one method over the other? The p-value from a hypothesis test tells us precisely how statistically significant the results are. However, often results that are statistically significant are not very important in the context of the subject matter because the actual difference between x and µ0

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7.8  ■  Bayesian Inference   237

may not be very large, but the results are statistically significant because of a large sample size. A 95% CI for µ would give additional information because it would provide a range of values within which µ is likely to fall. Conversely, the 95% CI does not contain all the information contained in a p-value. It does not tell us precisely how significant the results are but merely tells us whether they are significant at the 5% level. Hence it is good practice to compute both a p-value and a 95% CI for µ. Unfortunately, some researchers have become polarized on this issue, with some statisticians favoring only the hypothesis-testing approach and some epidemiologists favoring only the CI approach. These issues have correspondingly influenced editorial policy, with some journals requiring that results be presented in one format or the other. The crux of the issue is that, traditionally, results need to be statistically significant (at the 5% level) to demonstrate the validity of a particular finding. One advantage of this approach is that a uniform statistical standard is provided (the 5% level) for all researchers to demonstrate evidence of an association. This protects the research community against scientific claims not based on any statistical or empirical criteria whatsoever (such as solely on the basis of clinical case reports). Advocates of the CI approach contend that the width of the CI provides information on the likely magnitude of the differences between groups, regardless of the level of significance. My opinion is that significance levels and confidence limits provide complementary information and both should be reported, where possible.

Example 7.42

Cardiovascular Disease  Consider the cholesterol data in Examples 7.22 and 7.40. The p-value of .037, computed in Example 7.22, tells us precisely how significant the results are. The 95% CI for µ = (173.58, 189.46) computed in Example 7.40 gives a range of likely values that µ might assume. The two types of information are complementary.

7.8 Bayesian Inference One limitation of the methods of interval estimation in Section 6.5 or the methods of hypothesis testing in Sections 7.1–7.7 is that it is difficult to make direct statements such as Pr(c1 < µ < c2) = 1 − α. Instead, we have made statements such as Equation 6.7.

Equation 7.32

(

Pr x − z1− α /2 σ

n < µ < x + z1− α / 2 σ

)

n =1− α

Equation 7.32 indicates that 100% × (1 − α) of the random intervals depicted in Equation 6.7 will include the unknown parameter µ, where we have assumed for simplicity that the standard deviation, σ, is known. Thus we cannot compute the

(

probability that a specific interval of the form x − z1− α / 2 σ

n , x + z1− α / 2 σ

)

n will

contain µ, which intuitively is what we would desire. However, we can use Bayesian inference for this purpose. To use Bayesian methods, we need to specify a prior distribution for µ. As stated in Chapter 3, a prior distribution is a generalization of the concept of a prior probability, where a probability distribution of possible values for a parameter (such as µ) is specified before looking at the available sample data. This distribution is then modified after some sample data are acquired to obtain a posterior distribution for µ.

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238   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

In the absence of data, we often have no knowledge of µ, so all possible values of µ are equally likely. This is called a flat or noninformative prior distribution and is written as

Equation 7.33

  Pr (µ ) ∝ c where c is a constant. We then need to determine the posterior distribution of µ given our sample data x1, . . . , xn, which is written as Pr(µ|x1,…, xn). It can be shown that if the distribution is normal and σ is known, then all the information in the sample concerning µ is contained in x, or in other words that

Equation 7.34

Pr (µ | x1 ,K , xn ) = Pr (µ | x )

In this case, x is referred to as a sufficient statistic for µ. Specifying a sufficient statistic(s) in a sample greatly simplifies the task of determining a posterior distribution. To obtain the posterior distribution, we use Bayes’ rule.

Pr (µ | x ) = Pr ( x | µ ) Pr (µ ) / Pr ( x ) Because Pr ( x ) is an expression that does not involve µ, we can write the posterior distribution in the form

Pr (µ | x ) ∝ Pr ( x | µ ) Pr (µ ) where

∫−∞Pr(µ | x )dµ = 1

However, the prior probability of µ—that is, Pr(µ)—is the same for all values of µ. Thus it follows that

Equation 7.35

Pr (µ | x ) ∝ Pr ( x | µ ) In the case of a continuous distribution, we approximate Pr ( x | µ ) by f ( x | µ ), where f ( x | µ ) is the probability density of x given µ. Also, we know from Equation 5.10 that x is normally distributed with mean = µ and variance = σ2/n. Therefore,

Equation 7.36

  f ( x | µ ) = 1

(

= 1

(

2π σ 2π σ

{ {(

)

)

(

n  exp −(1 2 ) ( x − µ ) σ

)

n 

(

n  exp − 1 / 2 ) ( µ − x ) σ

2

)

n 

} 2

}

It follows from Equations 7.35 and 7.36 that

Equation 7.37

  Pr (µ | x ) ∝ 1

(

2π σ

)

{

(

n  exp −(1 / 2 ) ( µ − x ) σ

)

n 

2

}

Finally, we can replace the proportionality sign with an equality sign on the right-hand side of Equation 7.37 because the expression on the right-hand side of Equation 7.37 is a probability density whose integral from −∞ to ∞ must be 1. It ­follows Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

7.8  ■  Bayesian Inference   239

from Equation 7.37 that the distribution of µ given x is normally distributed with mean = x and variance = σ2/n, or

Equation 7.38

µ x ∼ N ( x , σ 2 n) From Equation 7.38, we can specify a 100% × (1 − α) posterior predictive interval for µ based on the sample data of the form

Equation 7.39

Pr(µ1 < µ < µ 2 ) = 1 − α where

µ1 = x − z1− α / 2 σ

n , µ 2 = x + z1− α /2 σ

n

Example 7.43

Cardiovascular Disease  Consider the cholesterol data in Example 7.21. Assume that the standard deviation is known to be 40 and the sample size is 200 rather than 100. What is the 95% posterior predictive interval for µ?

Solution

We have x = 181.52 , σ = 40, and α = .05. Hence, based on Equation 7.38, we have the 95% posterior predictive interval for µ = (µ1, µ2), where µ1 = x − z1− α / 2 σ

n = 181.52 − z.975 (40 )

200

96 (40 ) 200 = 181.52 − 1.9 = 181.52 − 5.54 = 176.0 µ 2 = 181.52 + 5.54 = 187.1 Thus, Pr(176.0 < µ < 187.1) = 95%. Furthermore, because µ ~ N ( x , σ 2 n) = N (181.52, 40 2 200 ) , it follows that

(

Pr(µ < 190 ) = Φ (190 − 181.52 ) 40

)

200  = Φ ( 8.48 2.83) = Φ(3.00 ) = .999

Thus it is highly likely that µ is less than 190, where 190 is the mean serum cholesterol for 21- to 40-year-old women in the general population. This type of information cannot be obtained from frequentist inference. In the case of an uninformative prior, inferences using Bayesian inference are very similar to those using frequentist inference. Specifically, the 95% posterior predictive interval in Example 7.43 is the same as a two-sided 95% CI for µ if σ is known. Thus, whether or not µ0 falls within a 95% CI or a 95% posterior predictive interval will be the same, and based on Section 7.7, the conclusions we would draw from the data are also the same. However, some cases offer extensive prior information concerning a parameter. In such cases, inferences from frequentist and Bayesian approaches can be different.

Example 7.44

Hypertension  Suppose a 40-year-old African-American man has his blood pressure measured at a routine medical visit. Two readings are obtained from the patient, and the mean of the two diastolic blood pressure (DBP) readings (x) is 95 mm Hg. It usually is recommended that a person be given antihypertensive medication if their “usual” DBP level is ≥90 mm Hg. We will interpret the usual level of DBP as the underlying average DBP over many visits for that person, where two readings are

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240   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

obtained at each visit (that is, µ). The question is: What is p = Pr (µ ≥ 90 | x = 95)? If p is sufficiently high (for example, ≥80%), then a patient will be put on treatment; otherwise the patient will come back for additional visits and the mean DBP over more than one visit will be obtained. One approach to this problem would be to construct a 95% CI for µ based on the observed mean DBP. However, this interval will be very wide because a patient usually only comes back for a few (for example, ≤3) visits. In the preceding example, the 95% CI cannot be obtained at all because we only have one visit (n = 1) and df = n − 1 = 0. Thus a Bayesian solution to this problem seems more appropriate. In this case, extensive prior information exists concerning the distribution of DBP in the general population. Specifically, the Hypertension Detection and Follow-Up Program screened 158,955 people in a nationwide study with the purpose of identifying individuals with elevated blood pressure who would be eligible for a subsequent antihypertensive-treatment trial. There were a total of 7811 African-American men ages 30–49 years screened whose mean DBP was 87.8 mm Hg with a standard deviation of 11.9 mm Hg [1]. We will refer to 11.92 as the between-person variance σ 2p and 87.8 as the average underlying mean DBP over many 30- to 49-year-old AfricanAmerican men (or µp). Also, let’s assume the distribution of DBP is approximately normal. Thus we have an excellent informative prior for µ, namely

( )

)

(

µ ~ N µ p , σ 2p = N (87.8, 11.92 )

Furthermore, in a separate reproducibility study [2], 41 African-American men ages 30–49 years were seen over four visits 1 week apart to determine within-person variability. The within-person variance σ 2w was 45.9. Therefore, if we assume the DBP distribution over many weeks for the same participant is normal, then xij ∼ N (µi , σ 2w ) = N (µ, 45.9), where xij = DBP at the jth visit for the ith subject and µi = underlying mean for the ith subject. Thus, if xi is the mean DBP over n visits for the ith subject, and µi is the underlying mean DBP for that subject, then

( )

{

)

(

f ( xi | µi ) = 1

)

(

2 π σ w  exp ( −1 2 ) ( xi − µi ) σ w

n 

2

}

To obtain the posterior distribution, we note that Pr ( µi | xi ) ∝ f ( xi | µ ) f ( µ )

where f ( xi | µi ) = 1

2 2 π σ w  exp ( − n 2 ) ( xi − µi ) σ w 

and

f ( µi ) = 1

(

{

)

(

{

)

)

(

2 π σ p  exp ( −1 2 )  µi − µ p σ p 

2

}

}

After extensive algebra involving completing the square, the preceding product can be rewritten in the form

Pr ( µi | xi ) = 1

(

{

)

(

2 πσ *  exp ( − 1 2 )  µi − µ*

)

σ * 

2

}

where

(

µ* = xi σ 2w + µ p σ 2p

(

σ 2 * = 1 σ 2w + 1

)

) (1 σ

2 w

+ 1 σ 2p

)

−1 σ 2p

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7.9  ■  One-Sample χ2 Test for the Variance of a Normal Distribution   241

Thus the posterior distribution of µi given x i is normally distributed with mean given by µ*, which is a weighted average of the participant’s observed mean DBP ( xi ) and the overall mean DBP of the population of 30- to 49-year-old African-American men (µp), where the weights are inversely proportional to the within-subject and between-subject variance, respectively. The variance σ2* is also a function of both the between-subject σ 2p and within-subject σ 2w variance. Therefore, the effect of using the posterior distribution is to “pull back” the observed mean DBP toward the overall population mean. This would explain the well-known phenomenon whereby participants who have a high DBP at a single visit relative to the population mean usually have later measurements closer to the population mean. This phenomenon is called regression to the mean.

( )

Solution to Example 7.44

( )

In this example, xi = 95, µp = 87.8, σ 2w = 45.9 and σ 2p = 11.92 = 141.61. Therefore, µ * = ( 95/45.9 + 87.8/141.61) / (1/45.9 + 1/141.61) = 2.6897 / 0.02885 = 93.23 mm Hg

σ

2*

= (1/45.9 + 1/141.61)−1 = 1/0.0288 = 34.66

Thus the posterior distribution of µi is normal with mean = 93.23 and variance = 34.66. It follows that Pr ( µi > 90 | xi = 95) = 1 − Φ (90 − 93.23)

34.66 

= 1 − Φ( −3.23/5.887) = 1 − Φ( −0.549) = Φ( 0.549) = .71 = p Therefore, there is a 71% probability that this participant’s true DBP is above 90. In this case, because p < .80, it probably would be advisable to have the participant come back for another visit to confirm the initial mean value of 95 mm Hg and reassess his level of blood pressure based on the average DBP over two visits. For all the hypothesis-testing problems we consider in this book, there are both frequentist and Bayesian formulations that are possible. In general, we present only frequentist approaches. Usually the prior distribution is not known in advance, in which case inferences from frequentist and Bayesian approaches are generally similar. An excellent reference providing more coverage of Bayesian methods is [3].

7.9 One-Sample χ2 Test for the Variance of a Normal Distribution Example 7.45

Hypertension  Consider Example 6.39, concerning the variability of blood-pressure measurements taken on an Arteriosonde machine. We were concerned with the difference between measurements taken by two observers on the same person = di = x1i − x2i, where x1i = the measurement on the ith person by the first observer and x2i = the measurement on the ith person by the second observer. Let’s ­assume this difference is a good measure of interobserver variability, and we want to compare this variability with the variability using a standard blood-pressure cuff.

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242   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

We have reason to believe that the variability of the Arteriosonde machine may differ from that of a standard cuff. Intuitively, we think the variability of the new method should be lower. However, because the new method is not as widely used, the observers are probably less experienced in using it; therefore, the variability of the new method could possibly be higher than that of the old method. Thus a two-sided test is used to study this question. Suppose we know from previously published work that σ 2 = 35 for d i obtained from the standard cuff. We want to test the hypothesis H 0 : σ 2 = σ 20 = 35 vs. H1 : σ 2 ≠ σ 20 . How should we perform this test? If x1, . . . , xn are a random sample, then we can reasonably base the test on s2 because it is an unbiased estimator of σ2. We know from Equation 6.14 that if x1, . . . , xn are a random sample from an N(µ, σ2) distribution, then under H0,

X2 =

(n − 1)S 2 ~ χ2n −1 σ2

Therefore,

)

(

(

Pr X 2 < χ2n −1,α / 2 = α/2 = Pr X 2 > χ2n −1,1− α / 2

)

Hence, the test procedure is given as follows.

Equation 7.40

One-Sample χ 2 Test for the Variance of a Normal Distribution (Two-Sided Alternative)  We compute the test statistic X 2 = (n − 1) s2 σ 20 . If X 2 < χ2n −1,α / 2 or X 2 > χn2 −1,1− α / 2 , then H0 is rejected. If χn2 −1,α / 2 ≤ X 2 ≤ χn2 −1,1− α / 2, then H0 is accepted. The acceptance and rejection regions for this test are shown in Figure 7.10.

Figure 7.10

Acceptance and rejection regions for the one-sample χ2 test for the variance of a normal distribution (two-sided alternative) Distribution of X2 =

Frequency

Acceptance region

�02

under H0

Rejection region

Rejection region � 2 n – 1, �/2

(n – 1)S2

Value � 2n – 1, 1 – �/2

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7.9  ■  One-Sample χ2 Test for the Variance of a Normal Distribution   243

Alternatively, we may want to compute a p-value for our experiment. The computation of the p-value will depend on whether s 2 ≤ σ 20 or s2 > σ 20 . The rule is given as follows.

Equation 7.41

p-Value for a One-Sample χ2 Test for the Variance of a Normal Distribution (Two-Sided Alternative) Let the test statistic X 2 =

(n − 1)s2 . σ 20

If s2 ≤ σ 20 , then p-value = 2 × (area to the left of X 2 underr a χ2n−1 distribution ). If s2 > σ 20 , then p-value = 2 × (area to the right of X 2 undeer a χ2n−1 distribution). The p-values are illustrated in Figure 7.11.

Example 7.46

Hypertension  Assess the statistical significance of the Arteriosonde-machine data in Example 7.45.

Solution

We know from Example 6.39 that s2 = 8.178, n = 10. From Equation 7.40, we compute the test statistic X 2 given by

Figure 7.11

X2 =

(n − 1)s2 9(8.178) = = 2.103 35 σ 20

Illustration of the p-value for a one-sample χ2 test for the variance of a normal distribution (two-sided alternative)

Frequency

2 distribution χn–1

p/2

If s2 ≤ � 02 then p-value = 2 × shaded area. 0

X2

Value

2 distribution χn–1

Frequency

If s2 > � 02 then p-value = 2 × shaded area. p/2

X2

Value

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244   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Table 7.2

Computation of the exact p-value for the Arteriosonde-machine data in Example 7.46 using a one-sample χ2 test with Microsoft Excel 2007 Microsoft Excel 2007

x df cdf=CHIDIST(2.103,9) p-value(1-tail) = 1 – CHIDIST(2.103,9) p-value(2-tail) = 2 ×[1 – CHIDIST(2.103,9)]

2.103 9 0.989732 0.010268 0.020536

Under H0, X2 follows a χ2 distribution with 9 degrees of freedom. Thus the critical values are χ29,.025 = 2.70 and χ29,.975 = 19.02. Because X2 = 2.103 < 2.70, it follows that

H0 is rejected using a two-sided test with α = .05. To obtain the p-value, refer to ­ quation 7.41. Because s2 = 8.178 < 35 = σ 20 , the p-value is computed as follows: E

(

p = 2 × Pr χ29 < 2.103

)

From Table 6 of the Appendix we see that

χ29,.025 = 2.70, χ29,.01 = 2.09 Thus, because 2.09 < 2.103 < 2.70, we have .01 < p/2 < .025 or .02 < p < .05. To obtain the exact p-value, use Microsoft Excel 2007 to evaluate areas under the χ2 distribution. The CHIDIST function computes the area to the right of 2.103 for a χ29 distribution = .9897. Thus, subtract from 1 and multiply by 2 to obtain the exact two-sided p-value = .021. The details are given in Table 7.2. Therefore, the results are statistically significant, and we conclude the interobserver variance using the Arteriosonde machine significantly differs from the interobserver variance using the standard cuff. To quantify how different the two variances are, a two-sided 95% CI for σ2 could be obtained, as in Example 6.41. This interval was (3.87, 27.26). Of course, it does not contain 35 because the p-value is less than .05. In general, the assumption of normality is particularly important for hypothesis testing and CI estimation for variances. If this assumption is not satisfied, then the critical regions and p-values in Equations 7.40 and 7.41 and the confidence limits in Equation 6.15 will not be valid. In this section, we have presented the one-sample χ2 test for variances, which is used for testing hypotheses concerning the variance of a normal distribution. Beginning at the “Start” box of the flowchart (Figure 7.18, p. 258), we arrive at the one-sample χ2 test for variances by answering yes to each of the following three questions: (1) one variable of interest? (2) one-sample problem? and (3) underlying distribution normal or can central-limit theorem be assumed to hold? and by answering no to (4) inference concerning µ? and yes to (5) inference concerning σ?

7.10 One-Sample Inference for the Binomial Distribution Normal-Theory Methods

Example 7.47

Cancer  Consider the breast-cancer data in Example 6.48. In that example we were interested in the effect of having a family history of breast cancer on the incidence of breast cancer. Suppose that 400 of the 10,000 women ages 50–54 sampled whose

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7.10  ■  One-Sample Inference for the Binomial Distribution   245

mothers had breast cancer had breast cancer themselves at some time in their lives. Given large studies, assume the prevalence rate of breast cancer for U.S. women in this age group is about 2%. The question is: How compatible is the sample rate of 4% with a population rate of 2%? Another way of asking this question is to restate it in terms of hypothesis testing: If p = prevalence rate of breast cancer in 50- to 54-year-old women whose moth­‑ ers have had breast cancer, then we want to test the hypothesis H0: p = .02 = p0 vs. H1: p ≠ .02. How can this be done? The significance test is based on the sample proportion of cases pˆ . Assume the normal approximation to the binomial distribution is valid. This assumption is reasonable when np0q0 ≥ 5. Therefore, from Equation 6.17 we know that under H0 p q   pˆ ~ N  p0 , 0 0   n 

It is more convenient to standardize pˆ . For this purpose, we subtract the expected value of pˆ under H0 = p0 and divide by the standard error of pˆ under H 0 = p0 q0 n , creating the test statistic z given by z=

pˆ − p0 p0 q0 n

It follows that under H0, z ~ N(0,1). Thus Pr ( z < zα / 2 ) = Pr ( z > z1− α / 2 ) = α/2

Thus the test takes the following form.

Equation 7.42

One-Sample Test for a Binomial Proportion—Normal-Theory Method (Two-Sided Alternative)  Let the test statistic z = ( pˆ − p0

)

p0 q0 n .

If z < zα/2 or z > z1−α/2, then H0 is rejected. If zα/2 ≤ z ≤ z1−α/2, then H0 is accepted. This test should only be used if np0q0 ≥ 5. The acceptance and rejection regions are shown in Figure 7.12.

Figure 7.12

Acceptance and rejection regions for the one-sample binomial test— normal-theory method (two-sided alternative)

Frequency

N(0, 1) distribution

Rejection region

Rejection region Acceptance region

z�/2

0 Value

z1–�/2

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246   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Alternatively, a p-value could be computed. The computation of the p-value de‑ ­ ­ends on whether pˆ ≤ p0 or pˆ > p0 . If pˆ ≤ p0 , then p p-value = 2 × area to the left of z under an N(0, 1) curve

If pˆ > p0 , then p-value = 2 × area to the right of z under an N(0, 1) curve

This is summarized as follows.

Equation 7.43

Computation of the p-Value for the One-Sample Binomial Test—Normal-Theory Method (Two-Sided Alternative) Let the test statistic z = ( pˆ − p0

)

p0 q0 n .

If pˆ ≤ p0 , then p-value = 2 × Φ(z) = twice the area to the left of z under an N(0, 1) curve. If pˆ > p0, then p-value = 2 × [1 − Φ(z)] = twice the area to the right of z under an N(0, 1) curve. The calculation of the p-value is illustrated in Figure 7.13.

These definitions of a p-value are again compatible with the idea of a p-value as the probability of obtaining results as extreme as or more extreme than the results in our particular sample. Figure 7.13

Illustration of the p -value for a one-sample binomial test— normal-theory method (two-sided alternative) If p ≤ p0, then p-value = 2 × area to the left of z under an N(0, 1) curve.

Frequency

N(0, 1) distribution

p/2

z

Value

If p > p0, then p-value = 2 × area to the right of z under an N(0, 1) curve.

N(0, 1) distribution Frequency

p/2

z

Value

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7.10  ■  One-Sample Inference for the Binomial Distribution   247

Example 7.48

Solution

Cancer  Assess the statistical significance of the data in Example 7.47. Using the critical-value method, we compute the test statistic z=

=

pˆ − p0 p0 q0 n .04 − .02 .02 = = 14.3 . 0014 .02(.98) 10, 000

Because z1−α/2 = z.975 = 1.96, it follows that H0 can be rejected using a two-sided test with α = .05. To compute the p-value, because p = .04 > p0 = .02, it follows that p - value = 2 × [1 − Φ( z )]

= 2 × [1 − Φ(14.3)] < .001

Thus the results are very highly significant.

Exact Methods The test procedure presented in Equation 7.42 to test the hypothesis H0: p = p0 vs. H1: p ≠ p0 depends on the assumption that the normal approximation to the bi­ nomial distribution is valid. This assumption is only true if np0q0 ≥ 5. How can the preceding hypothesis be tested if this criterion is not satisfied? We will base our test on exact binomial probabilities. In particular, let X be a binomial random variable with parameters n and p0 and let pˆ = x n, where x is the observed number of events. The computation of the p-value depends on whether pˆ ≤ p0 or pˆ > p0 . If pˆ ≤ p0 , then p 2 = Pr ( ≤ x successes in n trials | H 0 )

=

x

 n

∑  k  p0k (1 − p0 )

n−k

k =0

If pˆ > p0 , then p 2 = Pr ( ≥ x successes in n trials | H 0 )

=

n

 n

∑  k  p0k (1 − p0 )

n−k

k=x

This is summarized as follows.

Equation 7.44

Computation of the p -Value for the One-Sample Binomial Test—Exact Method (Two-Sided Alternative)  x  n  If pˆ ≤ p0 , p = 2 × Pr ( X ≤ x ) = min 2 ∑   p0k (1 − p0 )n − k ,1 k    k =0 

 n  n  If pˆ > p0 , p = 2 × Pr ( X ≥ x ) = min 2 ∑   p0k (1 − p0 )n − k ,1  k=x  k  The computation of the p-value is depicted in Figure 7.14, in the case of n = 30, p0 = .5 and x = 10 and 20, respectively.

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248   C H A P T E R 7 

Figure 7.14

Illustration of the p -value for a one-sample binomial test—exact method (two-sided alternative)

If p ≤ p0, then p/2 = sum of binomial probabilities for X ≤ x = sum of vertical bars shown 0.03

0.03

0.02

0.02

0.01

0.00

If p � p0, then p/2 = sum of binomial probabilities for X ≥ x = sum of vertical bars shown

Pr(X = k)

Pr(X = k)

  Hypothesis Testing: One-Sample Inference

5

10

0.01

0.00

20

k (a)

25

30

k (b)

In either case the p-value corresponds to the sum of the probabilities of all events that are as extreme as or more extreme than the sample result obtained.

Example 7.49

Occupational Health, Cancer  The safety of people who work at or live close to ­ uclear-power plants has been the subject of widely publicized debate in recent n years. One possible health hazard from radiation exposure is an excess of cancer deaths among those exposed. One problem with studying this question is that because the number of deaths attributable to either cancer in general or specific types of cancer is small, reaching statistically significant conclusions is difficult except after long periods of follow-up. An alternative approach is to perform a proportionalmortality study, whereby the proportion of deaths attributed to a specific cause in an exposed group is compared with the corresponding proportion in a large population. Suppose, for example, that 13 deaths have occurred among 55- to 64-year-old male workers in a nuclear-power plant and that in 5 of them the cause of death was cancer. Assume, based on vital-statistics reports, that approximately 20% of all deaths can be attributed to some form of cancer. Is this result significant?

Solution

We want to test the hypothesis H0: p = .20 vs. H1: p ≠ .20, where p = probability that the cause of death in nuclear-power workers was cancer. The normal approximation to the binomial cannot be used, because

np0 q0 = 13(.2 )(.8) = 2.1 < 5 However, the exact procedure in Equation 7.44 can be used:

5 pˆ = = .38 > .20 13 13 13 4 13      13 − k 13 − k  Therefore, p = 2 ∑   (.2 )k (.8) = 2 × 1 − ∑   (.2 )k (.8)  k k     k =5  k =0 

From Table 1 in the Appendix, with n = 13, p = .2, we have Pr ( 0 ) = .0550 Pr (1) = .1787 Pr (2 ) = .2680 Pr (3) = .2457 Pr( = .1535 Copyright 2010 Cengage Learning,4)Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

Pr ( 0 ) = .0550 Pr (1) = .1787 Pr (2 ) = .2680 Pr (3) = .2457 Pr(4) = .1535

7.10  ■  One-Sample Inference for the Binomial Distribution   249

Therefore,  p = 2 × [1 − (.0550 + .1787 + .2680 + .2457 + .1535)] = 2 × (1 − .9009) = .198 In summary, the proportion of deaths from cancer is not significantly different for nuclear-power-plant workers than for men of comparable age in the general population.

Power and Sample-Size Estimation The power of the one-sample binomial test can also be considered using the largesample test procedure given on page 245. Suppose we are conducting a two-tailed test at level α, where p = p0 under the null hypothesis. Under the alternative hypothesis of p = p1, the power is given by the following formula.

Equation 7.45

Power for the One-Sample Binomial Test (Two-Sided Alternative)  The power of the one-sample binomial test for the hypothesis H 0 : p = p0 vs. H1 : p ≠ p0 for the specific alternative p = p1 is given by

 p q Φ 0 0  p1q1

 p0 − p1 n     zα/ 2 + p0 q0   

To use this formula, we assume that np0q0 ≥ 5 so that the normal-theory methods in this section on page 245 are valid.

Example 7.50

Cancer  Suppose we wish to test the hypothesis that women with a sister history of breast cancer are at higher risk of developing breast cancer themselves. Suppose we assume, as in Example 7.47, that the prevalence rate of breast cancer is 2% among 50- to 54-year-old U.S. women, whereas it is 5% among women with a sister history. We propose to interview 500 women 50 to 54 years of age with a sister history of the disease. What is the power of such a study assuming that we conduct a two-sided test with α = .05?

Solution

We have α = .05, p0 = .02, p1 = .05, n = 500. The power, as given by Equation 7.45, is

 .02(.98)  .03 500   Power = Φ   z.025 +  .02 (.98)    .05(.95)  9) = .966 = Φ [.642( −1.96 + 4.792 )] = Φ(1.819 Thus there should be a 96.6% chance of finding a significant difference based on a sample size of 500, if the true rate of breast cancer among women with a sister ­history is 2.5 times as high as that of typical 50- to 54-year-old women. Similarly, we can consider the issue of appropriate sample size if the one-sample binomial test for a given α, p0, p1, and power is being used. The sample size is given by the following formula.

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250   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Sample-Size Estimation for the One-Sample Binomial Test (Two-Sided Alternative) Suppose we wish to test H0: p = p0 vs. H1: p ≠ p0. The sample size needed to conduct a two-sided test with significance level α and power 1 − β vs. the specific alternative hypothesis p = p1 is

Equation 7.46

 p1q1  p0 q0  z1− α 2 + z1− β  p  0 q0  n= 2 ( p1 − p0 )

2

Example 7.51

Cancer  How many women should we interview in the study proposed in Example 7.50 to achieve 90% power if a two-sided significance test with α = .05 is used?

Solution

We have α = .05, 1 − β = .90, p0 = .02, p1 = .05. The sample size is given by Equation 7.46:  .05(.95)  .02(.98)  z.975 + z.90  . 02(.98)   n= (.03)2 =

2

.0196 [1.96 + 1.28(1.557)] .0196(15.623) = = 340.2, or 341 women .0009 .0009 2

Thus, 341 women with a sister history of breast cancer must be interviewed in order to have a 90% chance of detecting a significant difference using a two-sided test with α = .05 if the true rate of breast cancer among women with a sister history is 2.5 times as high as that of a typical 50- to 54-year-old woman.

REVIEW

Note that if we wish to perform a one-sided test rather than a two-sided test at level α, then α is substituted for α/2 in the power formula in Equation 7.45 and the sample-size formula in Equation 7.46. In this section, we have presented the one-sample binomial test, which is used for testing hypotheses concerning the parameter p of a binomial distribution. Beginning at the “Start” box of the flowchart (Figure 7.18, p. 258), we arrive at the one-sample binomial test by answering yes to (1) one variable of interest? and (2) one-sample problem? no to (3) underlying distribution normal or can central-limit theorem be assumed to hold? and yes to (4) underlying distribution is binomial? REVIEW QUESTIONS 7C

1

A sample of 120 high-school students (60 boys, 60 girls) is weighed in their physical-education class. Of the students, 15% are above the 95th percentile for body-mass index (BMI) [wt(kg)/ht2(m2)] as determined by national norms. Health educators at the school want to determine whether the obesity profile in the school differs from what is expected.

(a) What hypotheses can be used to address this question?

(b) What test can be used to test these hypotheses?

(c) Write down the test statistic for this test.

(d) What is the p-value of the test?

(e) What is your overall conclusion based on your findings?

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7.11  ■  One-Sample Inference for the Poisson Distribution   251

2

The principal at the school also wants to address the questions in Review Question 7C.1 (a)−(e) for specific ethnic groups. Of the 50 Hispanic students at the school, 10 are above the 95th percentile for BMI.

(a) What test can be used to address the question in Review Question 7C.1(a)−(e) among the Hispanic students?

(b) What is the p-value of the test?

(c) What is your overall conclusion based on your results?

3

How much power did the test in Review Question 7C.1 have if the true percentage of students in the school above the 95th percentile for BMI is 15%?

7.11 One-Sample Inference for the Poisson Distribution Example 7.52

Occupational Health  Many studies have looked at possible health hazards faced by rubber workers. In one such study, a group of 8418 white male workers ages 40–84 (either active or retired) on January 1, 1964, were followed for 10 years for various mortality outcomes [4]. Their mortality rates were then compared with U.S. white male mortality rates in 1968. In one of the reported findings, 4 deaths due to Hodgkin’s disease were observed compared with 3.3 deaths expected from U.S. mortality rates. Is this difference significant? One problem with this type of study is that workers of different ages in 1964 have very different mortality risks over time. Thus the test procedures in Equations 7.42 and 7.44, which assume a constant p for all people in the sample, are not applicable. However, these procedures can be generalized to take account of the different mortality risks of different individuals. Let

X = total observed number of deaths for members of the study population

pi = probability of death for the ith individual Under the null hypothesis that the death rates for the study population are the same as those for the general U.S. population, the expected number of events µ0 is given by n

µ 0 = ∑ pi i =1

If the disease under study is rare, then the observed number of events may be considered approximately Poisson-distributed with unknown expected value = µ. We wish to test the hypothesis H 0 : µ = µ 0 vs. H1 : µ ≠ µ 0 . One approach for significance testing is to use the critical-value method. We know from Section 7.7 that the two-sided 100% × (l − α) CI for µ given by (c1, c2) contains all values µ0 for which we would accept H0 based on the preceding hypothesis test. Thus if c1 ≤ µ0 ≤ c2, then we accept H0, whereas if either µ0 < c1 or µ0 > c2, then we reject H0. Table 8 in the Appendix contains exact confidence limits for the Poisson expectation µ, and this leads us to the following simple approach for hypothesis testing.

Equation 7.47

One-Sample Inference for the Poisson Distribution (Small-Sample Test— Critical-Value Method)  Let X be a Poisson random variable with expected value = µ. To test the hypothesis H 0 : µ = µ 0 vs. H1 : µ ≠ µ 0 using a two-sided test with significance level α,

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252   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

(1) Obtain the two-sided 100% × (l − α) CI for µ based on the observed value x of X. Denote this CI (c1, c2). (2) If µ0 < c1 or µ0 > c2, then reject H0. If c1 ≤ µ0 ≤ c2, then accept H0.

Example 7.53

Occupational Health  Test for the significance of the findings in Example 7.52 using the critical-value method with a two-sided significance level of .05.

Solution

We wish to test the hypothesis H 0: µ = 3.3 vs. H1: µ ≠ 3.3. We observed 4 events = x. Hence, referring to Table 8, the two-sided 95% CI for µ based on x = 4 is (1.09, 10.24). From Equation 7.47, because 1.09 ≤ 3.3 ≤ 10.24, we accept H0 at the 5% significance level. Another approach to use for significance testing is the p-value method. We wish to reject H0 if x is either much larger or much smaller than µ0. This leads to the following test procedure.

One-Sample Inference for the Poisson Distribution (Small-Sample Test—p -Value Method)  Let µ = expected value of a Poisson distribution. To test the hypothesis H 0: µ = µ 0 vs. H1: µ ≠ µ 0 H 0: µ = µ 0 vs. H1: µ ≠ µ 0 ,

Equation 7.48

(1) Compute   x = observed number of deaths in the study population (2) Under H0, the random variable X will follow a Poisson distribution with parameter µ0. Thus, the exact two-sided p-value is given by x  e − µ 0 µ k0  min  2 × ∑ , 1 k!   k =0  

if x < µ 0

  x −1 e − µ 0 µ k0   min 2 ×  ∑  , 1  k = 0 k !     

if x ≥ µ 0

These computations are shown in Figure 7.15 for the case of µ0 = 5, with x = 3 and 8, respectively.

Example 7.54

Solution

Occupational Health  Test for the significance of the findings in Example 7.52 using the p-value method. We refer to Equation 7.48. Because x = 4 > µ0 = 3.3 the p-value is given by

k 3  e −3.3 ( 3.3)  p = 2 × 1 − ∑  k!   k = 0

From the Poisson distribution, we have Pr ( 0 ) = e −3.3 = .0369

Pr (1) =

e −3.3 (3.3) = .1217 1!

e −3.3 (3.3)2 = .2008 2! Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part. e −3.3 (3.3)3 Pr (2 ) =

7.11  ■  One-Sample Inference for the Poisson Distribution   253

Figure 7.15

Computation of the exact p-value for the one-sample Poisson test

0.10

0.05

If x ≥ �0, then p/2 = sum of Poisson probabilities ≥ x for a Poisson distribution with mean �0 � = sum of vertical bars shown

0.07 0.06 Pr(X = k)

Pr(X = k)

If x < �0, then p/2 = sum of Poisson probabilities ≤ x for a Poisson distribution with mean �0 0.15 � = sum of vertical bars shown

0.05 0.04 0.03 0.02 0.01

0.00

1

2

3

0.00

8

k

Pr ( 0 ) = e −3.3 = .0369

(a)

Pr (1) =

e −3.3 (3.3) = .1217 1!

Pr (2 ) =

e −3.3 (3.3)2 = .2008 2!

Pr (3) =

e −3.3 (3.3)3 = .2209 3!

9

10

11

···

k (b)

Thus  p = 2 × [1 − (.0369 + .1217 + .2008 + .2209)] = 2 × (1 − .5803) = .839 Thus there is no significant excess or deficit of Hodgkin’s disease in this population. An index frequently used to quantify risk in a study population relative to the general population is the standardized mortality ratio (SMR).

Definition 7.16

The standardized mortality ratio is defined by 100% × O/E = 100% × the observed number of deaths in the study population divided by the expected number of deaths in the study population under the assumption that the mortality rates for the study population are the same as those for the general population. For nonfatal conditions the SMR is sometimes known as the standardized morbidity ratio.

Thus,

Example 7.55

Solution

If SMR > 100%, there is an excess risk in the study population relative to the general population.

If SMR < 100%, there is a reduced risk in the study population relative to the general population.

If SMR = 100%, there is neither an excess nor a deficit of risk in the study population relative to the general population.

Occupational Health  What is the SMR for Hodgkin’s disease using the data in Example 7.52? SMR = 100 × 4/3.3 = 121%

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254   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

The test procedures in Equations 7.47 and 7.48 can also be interpreted as tests of whether the SMR is significantly different from 100%.

Example 7.56

Occupational Health  In the rubber-worker data described in Example 7.52, there were 21 bladder cancer deaths and an expected number of events from generalpopulation cancer mortality rates of 18.1. Evaluate the statistical significance of the results.

Solution

We refer to the 21 row and the .95 column in Appendix Table 8 and find the 95% CI for µ = (13.00, 32.10). Because µ0 = expected number of deaths = 18.1 is within the 95% CI, we can accept H0 at the 5% level of significance. To get an exact p-value, we refer to Equation 7.48 and compute

20   p = 2 ×  1 − ∑ e −18.1 (18.1)k k !   k =0

This is a tedious calculation, so we have used the POISSON function of Excel, as shown in Table 7.3. From Excel 2007, we see that Pr( X ≤ 20 µ = 18.1) = .7227 . Therefore, the p-value = 2 × (1 − .7227) = .55. Thus, there is no significant excess or deficit of bladder cancer deaths in the rubber-worker population. The SMR for bladder cancer = 100% × 21/18.1 = 116%. Another interpretation of the significance tests in Equations 7.47 and 7.48 is that the underlying SMR in the reference population does not significantly differ from 100%.

Table 7.3

Computation of the exact p -value for the bladder-cancer data in Example 7.56 Microsoft Excel 2007

mean k Pr(X < = k)= Poisson(20,18.1, true)

18.1 20 0.722696

The test procedures in Equations 7.47 and 7.48 are exact methods. If the expected number of events is large, then the following approximate method can be used.

Equation 7.49

One-Sample Inference for the Poisson Distribution (Large-Sample Test)  Let µ = expected value of a Poisson random variable. To test the hypothesis H 0: µ = µ 0 vs. H1: µ ≠ µ 0, (1) Compute x = observed number of events in the study population. (2) Compute the test statistic

X2 =

( x − µ 0 )2 µ0

2

 SMR  = µ0  − 1 ∼ χ12 under H 0  100 

(3) For a two-sided test at level α, H0 is rejected if

X 2 > χ12,1− α

and H0 is accepted if  X 2 ≤ χ12,1− α (4) The exact p-value is given by Pr( χ12 > X 2 ).

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7.11  ■  One-Sample Inference for the Poisson Distribution   255

(5) This test should only be used if µ 0 ≥ 10. The acceptance and rejection regions for this test are depicted in Figure 7.16. The computation of the exact p-value is given in Figure 7.17. (6) In addition, an approximate 100% × (1 − α) CI for µ is given by x ± z1− α 2 x .

Example 7.57

Occupational Health  Assess the statistical significance of the bladder-cancer data in Example 7.56 using the large-sample test.

Solution

We wish to test the hypothesis H 0: µ = 18.1 vs. H1: µ ≠ 18.1. In this case, x = 21 and SMR = 100% × 21/18.1 = 116%. Hence we have the test statistic X2 = =

Figure 7.16

or 18.1 × (1.16 − 1)2

8.41 = 0.46 ~ χ12 under H 0 18.1

Acceptance and rejection regions for the one-sample Poisson test (large-sample test)

Frequency

(21 − 18.1)2 18.1

χ12 distribution

X2 ≤ χ1,2 1–� Acceptance region 0

X2 > χ1,2 1–� Rejection region

2 χ1, 1–�

Value

Figure 7.17

Computation of the p-value for the one-sample Poisson test (large-sample test)

Frequency

χ12 distribution

p 0

X2

Value

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256   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Because χ12,.95 = 3.84 > X 2 , p > .05 and H0 is accepted. Furthermore, from Table 6 in the Appendix we note that χ12,.50 = 0.45, χ12,.75 = 1.32 , and 0.45 < X2 < 1.32. Thus 1 − .75 < p < 1 − .50, or .25 < p < .50. Therefore the rubber workers in this plant do not have a significantly increased risk of bladder cancer mortality relative to the general population. Using MINITAB to compute the p-value for the large-sample test yields a p-value = Pr( χ12 > 0.46) = .50 to two decimal places. In addition, an approximate 95% CI for µ is given by 21 ± 1.96 21 = (12.0, 30.0 ). From Example 7.56, the exact p-value based on the Poisson distribution = .55 and the exact 95% CI = (13.0,32.1). In general, exact methods are strongly preferred for inference concerning the Poisson distribution. In this section, we have presented the one-sample Poisson test, which is used for testing hypotheses concerning the parameter µ of a Poisson distribution. Beginning at the “Start” box of the flowchart (Figure 7.18, p. 258), we arrive at the one-sample Poisson test by answering yes to (1) one variable of interest? and (2) one-sample problem? no to (3) underlying distribution normal or can central-limit theorem be assumed to hold? and (4) underlying distribution is binomial? and yes to (5) underlying distribution is Poisson?

7.12 Case Study: Effects of Tobacco Use on Bone-Mineral Density in Middle-Aged Women In Chapter 6, we compared the bone-mineral density (BMD) of the lumbar spine between heavier- and lighter-smoking twins using CI methodology. We now want to consider a similar issue based on hypothesis-testing methods.

Example 7.58

Endocrinology  The mean difference in BMD at the lumbar spine between the heavier- and lighter-smoking twins when expressed as a percentage of the twin pair mean was −5.0% ± 2.0% (mean ± se) based on 41 twin pairs. Assess the statistical significance of the results.

Solution

We will use the one-sample t test to test the hypothesis H 0: µ = 0 vs. H1: µ ≠ 0 , where µ = underlying mean difference in BMD between the heavier- and lightersmoking twins. Using Equation 7.10, we have the test statistic

t=

x − µ0 s n

Because µ0 = 0 and s

t=

n = se, it follows that

x −5.0 = = −2.5 ~ t 40 under H 0 se 2.0

Using Table 5 in the Appendix, we see that t 40 ,.99 = 2.423, t 40 ,.995 = 2.704 . Because 2.423 < 2.5 < 2.704, it follows that 1 − .995 < p/2 < 1 − .99 or .005 < p/2 < .01 or .01 < p < .02. The exact p-value from Excel = 2 × Pr(t40 < −2.5) = TDIST (2.5,40,2) = .017. Hence, there is a significant difference in mean BMD between the heavierand lighter-smoking twins, with the heavier-smoking twins having lower mean BMD.

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7.13  ■  Summary   257

7.13 Summary In this chapter some of the fundamental ideas of hypothesis testing were introduced: (1) specification of the null (H0) and alternative (H1) hypotheses; (2) type I error (α), type II error (β), and power (1 − β) of a hypothesis test; (3) the p-value of a hypothesis test; and (4) the distinction between one-sided and two-sided tests. Methods for estimating the appropriate sample size for a proposed study as determined by the prespecified null and alternative hypotheses and type I and type II errors were also discussed. These general concepts were applied to several one-sample hypothesis-testing situations: (1) The mean of a normal distribution with unknown variance (one-sample t test) (2) The mean of a normal distribution with known variance (one-sample z test) (3) The variance of a normal distribution (one-sample χ2 test) (4) The parameter p of a binomial distribution (one-sample binomial test) (5) The expected value µ of a Poisson distribution (one-sample Poisson test) Each of the hypothesis tests can be conducted in one of two ways: (1) Specify critical values to determine the acceptance and rejection regions ­(critical-value method) based on a specified type I error α. (2) Compute p-values ( p-value method). These methods were shown to be equivalent in the sense that they yield the same inferences regarding acceptance and rejection of the null hypothesis. Furthermore, the relationship between the hypothesis-testing methods in this chapter and the CI methods in Chapter 6 was explored. We showed that the inferences that can be drawn from using these methods are usually the same. Finally, methods of Bayesian inference were introduced, both (a) when no prior information exists concerning a parameter and (b) when a substantial amount of prior information is available. Many hypothesis tests are covered in this book. A master flowchart (pp. 841– 846) is provided at the back of the book to help clarify the decision process in selecting the appropriate test. The flowchart can be used to choose the proper test by answering a series of yes/no questions. The specific hypothesis tests covered in this chapter have been presented in an excerpt from the flowchart shown in Figure 7.18 and have been referred to in several places in this chapter. For example, if we are interested in performing hypothesis tests concerning the mean of a normal distribution with known variance, then, beginning at the “Start” box of the flowchart, we would answer yes to each of the following questions: (1) only one variable of interest? (2) one-sample problem? (3) underlying distribution normal or can central-limit theorem be assumed to hold? (4) inference concerning µ? (5) σ known? The flowchart leads us to the box on the lower left of the figure, indicating that the onesample z test should be used. In addition, the page number(s) where a specific hypothesis test is discussed is also provided in the appropriate box of the flowchart. The boxes marked “Go to 1” and “Go to 4” refer to other parts of the master flowchart in the back of the book. The study of hypothesis testing is extended in Chapter 8 to situations in which two different samples are compared. This topic corresponds to the answer yes to the question (1) only one variable of interest? and no to (2) one-sample problem?

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258   C H A P T E R 7  Figure 7.18

  Hypothesis Testing: One-Sample Inference

Flowchart for appropriate methods of statistical inference Start

Yes

One-sample problem?

Only one variable of interest?

Go to

No

4 (see page 844)

Go to

No

1 (see page 843)

Yes

Yes

Underlying distribution normal or can central-limit theorem be assumed to hold?

No

Underlying distribution is binomial? Inference concerning �?

Yes

Underlying distribution is Poisson?

No Yes

Yes Inference concerning �

One-sample � 2 test for variances (Caution: This test is very sensitive to nonnormality) pages 242–243

� known?

No

No

One-sample binomial test

Normal approximation valid?

No

Use another underlying distribution or use nonparametric methods pages 330, 336

One-sample Poisson test pages 251, 252, 254

No

Exact methods page 247

Yes Yes One-sample z test pages 220–221

One-sample t test pages 217–218

Normal-theory method pages 245–246

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   Problems   259

P rob l e m s

Renal Disease The mean serum-creatinine level measured in 12 patients 24 hours after they received a newly proposed antibiotic was 1.2 mg/dL. *7.1  If the mean and standard deviation of serum creatinine in the general population are 1.0 and 0.4 mg/dL, respectively, then, using a significance level of .05, test whether the mean serum-creatinine level in this group is different from that of the general population. *7.2  What is the p-value for the test? x − µ0 7.3  Suppose = −1.52 and a one-sample t test is s n performed based on seven subjects. What is the two-tailed p-value? *7.4  Suppose the sample standard deviation of serum creatinine in Problem 7.1 is 0.6 mg/dL. Assume that the standard deviation of serum creatinine is not known, and perform the hypothesis test in Problem 7.1. Report a ­p-value. *7.5  Compute a two-sided 95% CI for the true mean serum-creatinine level in Problem 7.4. *7.6  How does your answer to Problem 7.5 relate to your answer to Problem 7.4?

Diabetes Plasma-glucose levels are used to determine the presence of diabetes. Suppose the mean ln (plasma-glucose) concentration (mg/dL) in 35- to 44-year-olds is 4.86 with standard deviation = 0.54. A study of 100 sedentary people in this age group is planned to test whether they have a higher or lower level of plasma glucose than the general population. 7.7  If the expected difference is 0.10 ln units, then what is the power of such a study if a two-sided test is to be used with α = .05? 7.8  Answer Problem 7.7 if the expected difference is 0.20 ln units. 7.9  How many people would need to be studied to have 80% power under the assumptions in Problem 7.7?

Cardiovascular Disease Suppose the incidence rate of myocardial infarction (MI) was 5 per 1000 among 45- to 54-year-old men in 1990. To look at changes in incidence over time, 5000 men in this age group were followed for 1 year starting in 2000. Fifteen new cases of MI were found. 7.10  Using the critical-value method with α = .05, test the hypothesis that incidence rates of MI changed from 1990 to 2000.

7.11  Report a p-value to correspond to your answer to Problem 7.10. Suppose that 25% of patients with MI in 1990 died within 24 hours. This proportion is called the 24-hour case-fatality rate. 7.12  Of the 15 new MI cases in the preceding study, 5 died within 24 hours. Test whether the 24-hour case-fatality rate changed from 1990 to 2000. 7.13  Suppose we eventually plan to accumulate 50 MI cases during the period 2000–2005. Assume that the 24-hour case-fatality rate is truly 20% during this period. How much power would such a study have in distinguishing between case-fatality rates in 1990 and 2000–2005 if a two-sided test with significance level .05 is planned? 7.14  How large a sample is needed in Problem 7.13 to achieve 90% power?

Pulmonary Disease Suppose the annual incidence of asthma in the general population among children 0–4 years of age is 1.4% for boys and 1% for girls. *7.15   If 10 cases are observed over 1 year among 500 boys 0–4 years of age with smoking mothers, then test whether there is a significant difference in asthma incidence between this group and the general population using the critical-value method with a two-sided test. *7.16  Report a p-value corresponding to your answer to Problem 7.15. *7.17  Suppose that four cases are observed over 1 year among 300 girls 0–4 years of age with smoking mothers. Answer Problem 7.15 based on these data. *7.18  Report a p-value corresponding to your answer to Problem 7.17.

Genetics Ribosomal 5S RNA can be represented as a sequence of 120 nucleotides. Each nucleotide can be represented by one of four characters: A (adenine), G (guanine), C (cytosine), or U (uracil). The characters occur with different probabilities for each position. We wish to test whether a new sequence is the same as ribosomal 5S RNA. For this purpose, we replicate the new sequence 100 times and find there are 60 A’s in the 20th position. 7.19  If the probability of an A in the 20th position in ribosomal 5S RNA is .79, then test the hypothesis that the new sequence is the same as ribosomal 5S RNA using the critical-value method. 7.20  Report a p-value corresponding to your results in Problem 7.19.

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260   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Cancer 7.21  Suppose we identify 50 women 50 to 54 years of age who have both a mother and a sister with a history of breast cancer. Five of these women themselves have developed breast cancer at some time in their lives. If we assume that the expected prevalence rate of breast cancer in women whose mothers have had breast cancer is 4%, does having a sister with the disease add to the risk? Explain.

Obstetrics The drug erythromycin has been proposed to possibly lower the risk of premature delivery. A related area of interest is its association with the incidence of side effects during pregnancy. Assume 30% of all pregnant women complain of nausea between weeks 24 and 28 of pregnancy. Furthermore, suppose that of 200 women who are taking erythromycin regularly during the period, 110 complain of nausea. *7.22  Test the hypothesis that the incidence rate of nausea for the erythromycin group is the same for a typical pregnant woman.

Cardiovascular Disease, Nutrition Much discussion has appeared in the medical literature in recent years on the role of diet in the development of heart disease. The serum-cholesterol levels of a group of people who eat a primarily macrobiotic diet are measured. Among 24 of them, ages 20–39, the mean cholesterol level was found to be 175 mg/dL with a standard deviation of 35 mg/dL. 7.23  If the mean cholesterol level in the general population in this age group is 230 mg/dL and the distribution is assumed to be normal, then test the hypothesis that the group of people on a macrobiotic diet have cholesterol levels ­different from those of the general population.

*7.27  Suppose we conduct a study of the preceding hypothesis based on 20 participants. What is the probability we will be able to reject H0 using a one-sided test at the 5% level if the true mean and standard deviation of the DBP ­difference are the same as in the pilot study?

Occupational Health The proportion of deaths due to lung cancer in males ages 15–64 in England and Wales during the period 1970–1972 was 12%. Suppose that of 20 deaths that occur among male workers in this age group who have worked for at least 1 year in a chemical plant, 5 are due to lung cancer. We wish to determine whether there is a difference between the proportion of deaths from lung cancer in this plant and the proportion in the general population. 7.28  State the hypotheses to use in answering this question. 7.29  Is a one-sided or two-sided test appropriate here? 7.30  Perform the hypothesis test, and report a p-value. After reviewing the results from one plant, the company decides to expand its study to include results from three additional plants. It finds that of 90 deaths occurring among 15- to 64-year-old male workers who have worked for a least 1 year in these four plants, 19 are due to lung cancer. 7.31  Answer Problem 7.30 using the data from four plants, and report a p-value. One criticism of studies of this type is that they are biased by the “healthy worker” effect. That is, workers in general are healthier than the general population, particularly regarding cardiovascular endpoints, which makes the proportion of deaths from noncardiovascular causes seem abnormally high.

7.24  Compute a 95% CI for the true mean cholesterol level in this group.

7.32  If the proportion of deaths from ischemic heart disease (IHD) is 40% for all 15- to 64-year-old men in England and Wales, whereas 18 of the preceding 90 deaths are attributed to IHD, then answer Problem 7.31 if deaths caused by IHD are excluded from the total.

7.25  What type of complementary information is provided by the hypothesis test and CI in this case?

Nutrition

Hypertension A pilot study of a new antihypertensive agent is performed for the purpose of planning a larger study. Five patients who have a mean DBP of at least 95 mm Hg are recruited for the study and are kept on the agent for 1 month. After 1 month the observed mean decline in DBP in these five patients is 4.8 mm Hg with a standard deviation of 9 mm Hg. *7.26  If µd = true mean difference in DBP between baseline and 1 month, then how many patients would be needed to have a 90% chance of detecting a significant change in DBP over 1 month using a one-tailed test with a significance level of 5%? Assume that the true mean and standard deviation of the DBP difference were the same as observed in the pilot study.

Iron-deficiency anemia is an important nutritional health problem in the United States. A dietary assessment was performed on 51 boys 9 to 11 years of age whose families were below the poverty level. The mean daily iron intake among these boys was found to be 12.50 mg with standard deviation 4.75 mg. Suppose the mean daily iron intake among a large population of 9- to 11-year-old boys from all income strata is 14.44 mg. We want to test whether the mean iron intake among the low-income group is different from that of the general population. *7.33  State the hypotheses that we can use to consider this question. *7.34  Carry out the hypothesis test in Problem 7.33 using the critical-value method with an α level of .05, and summarize your findings.

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Problems   261

*7.35  What is the p-value for the test conducted in ­Problem 7.34? The standard deviation of daily iron intake in the larger population of 9- to 11-year-old boys was 5.56 mg. We want to test whether the standard deviation from the low-income group is comparable to that of the general population. *7.36  State the hypotheses that we can use to answer this question. *7.37  Carry out the test in Problem 7.36 using the criticalvalue method with an α level of .05, and summarize your findings. *7.38  What is the p-value for the test conducted in ­Problem 7.37? *7.39  Compute a 95% CI for the underlying variance of daily iron intake in the low-income group. What can you infer from this CI? 7.40  Compare the inferences you made from the procedures in Problems 7.37, 7.38, and 7.39.

Demography A study is performed using census data to look at various health parameters for a group of 10,000 Americans of Chinese descent living in the Chinatown areas of New York and San Francisco in 1970. The comparison group for this study is the total U.S. population in 1970. Suppose it is found that 100 of these Chinese-Americans have died over a 1-year period and that this represents a 15% decline from the expected mortality rate based on 1970 U.S. age- and sex-specific mortality rates. 7.41  Test whether the total mortality experience in this group differs significantly from that in the total U.S. population. Report an exact p-value. Suppose eight deaths from tuberculosis occur in this group, which is twice the rate expected based on the total U.S. population in 1970. 7.42  Test whether the mortality experience from tuberculosis in this group differs significantly from that in the total U.S. population. Report an exact p-value.

Occupational Health

who had worked in the plant for 10 or more years, whereas 6.3 were expected based on U.S. white-male mortality rates. 7.43  What is the SMR for this group? 7.44  Perform a significance test to assess whether there is an association between long duration of employment and mortality from cirrhosis of the liver in the group hired prior to 1946. Report a p-value. 7.45  A similar analysis was performed among workers who were hired after 1945 and who were employed for 10 or more years. It found 4 deaths from cirrhosis of the liver, whereas only 3.4 were expected. What is the SMR for this group? 7.46  Perform a significance test to assess whether there is an association between mortality from cirrhosis of the liver and duration of employment in the group hired after 1945. Report a p-value.

Ophthalmology Researchers have reported that the incidence rate of cataracts may be elevated among people with excessive exposure to sunlight. To confirm this, a pilot study is conducted among 200 people ages 65–69 who report an excessive tendency to burn on exposure to sunlight. Of the 200 people, 4 develop cataracts over a 1-year period. Suppose the expected incidence rate of cataracts among 65- to 69-yearolds is 1% over a 1-year period. *7.47  What test procedure can be used to compare the 1-year rate of cataracts in this population with that in the general population? *7.48  Implement the test procedure in Problem 7.47, and report a p-value (two-sided). The researchers decide to extend the study to a 5-year period and find that 20 of the 200 people develop a cataract over a 5-year period. Suppose the expected incidence of cataracts among 65- to 69-year-olds in the general population is 5% over a 5-year period. *7.49  Test the hypothesis that the 5-year incidence rate of cataracts is different in the excessive-sunlight-exposure group compared with the general population, and report a p-value (two-sided).

The mortality experience of 8146 male employees of a research, engineering, and metal-fabrication plant in Tonawanda, New York, was studied from 1946 to 1981 [5]. Potential workplace exposures included welding fumes, cutting oils, asbestos, organic solvents, and environmental ionizing radiation, as a result of waste disposal during the Manhattan Project of World War II. Comparisons were made for specific causes of death between mortality rates in workers and U.S. white-male mortality rates from 1950 to 1978.

A study was performed in Basel, Switzerland, on the relationship between the concentration of plasma antioxidant vitamins and cancer risk [6]. Table 7.4 shows data for plasma vitamin-A concentration for stomach-cancer cases and controls.

Suppose that 17 deaths from cirrhosis of the liver were observed among workers who were hired prior to 1946 and

7.51  If we assume that the mean plasma vitamin-A concentration among controls is known without error, then

*7.50  Construct a 95% CI for the 5-year true rate of cataracts among the excessive-sunlight-exposure group.

Cancer

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262   C H A P T E R 7 

  Hypothesis Testing: One-Sample Inference

Table 7.4  Plasma vitamin-A concentration ( µmol/L) for stomach-cancer cases and controls

Mean

Stomach-cancer cases Controls

2.65 2.88

se

0.11

n

20 2421

what procedure can be used to test whether the mean concentration is the same for stomach-cancer cases and controls? 7.52  Perform the test in Problem 7.51, and report a p-value (two-sided). 7.53  How many stomach-cancer cases are needed to achieve 80% power if the mean plasma vitamin-A concentration among controls is known without error, the true difference in mean concentration is 0.20 µmol/L, and a twosided test is used with α = .05?

Nutrition, Cardiovascular Disease Previous studies have shown that supplementing the diet with oat bran may lower serum-cholesterol levels. However, it is not known whether the cholesterol is reduced by a direct effect of oat bran or by replacing fatty foods in the diet. To address this question, a study was performed to compare the effect of dietary supplementation with highfiber oat bran (87 g/day) to dietary supplementation with a low-fiber refined wheat product on the serum cholesterol of 20 healthy participants ages 23–49 years [7]. Each subject had a cholesterol level measured at baseline and then was randomly assigned to receive either a high-fiber or a lowfiber diet for 6 weeks. A 2-week period followed during which no supplements were taken. Participants then took the alternate supplement for a 6-week period. The results are shown in Table 7.5. 7.54  Test the hypothesis that the high-fiber diet has an effect on cholesterol levels as compared with baseline (report your results as p < .05 or p > .05). 7.55  Test the hypothesis that the low-fiber diet has an effect on cholesterol levels as compared with baseline (report your results as p < .05 or p > .05). 7.56  Test the hypothesis that the high-fiber diet has a differential effect on cholesterol levels compared with a lowfiber diet (report your results as p < .05 or p > .05).

7.57  What is the approximate standard error of the mean for the high-fiber compared with the low-fiber diet (that is, the mean difference in cholesterol level between high- and low-fiber diets)? 7.58  How many participants would be needed to have a 90% chance of finding a significant difference in mean cholesterol lowering between the high- and low-fiber diets if the high-fiber diet lowers mean cholesterol by 5 mg/dL more than the low-fiber diet and a two-sided test is used with significance level = .05?

Nutrition Refer to Data Set VALID.DAT, on the Companion Website. 7.59  Assess whether reported nutrient consumption (saturated fat, total fat, alcohol consumption, total caloric intake) is comparable for the diet record and the food-frequency questionnaire. Use either hypothesis-testing and/or CI methodology. 7.60  Answer Problem 7.59 for the percentage of calories from fat (separately for total fat and saturated fat) as reported on the diet record and the food-frequency questionnaire. Assume there are 9 calories from fat for every gram of fat consumed.

Demography Refer to Data Set SEXRAT.DAT, on the Companion Website. 7.61  Apply hypothesis-testing methods to answer the questions posed in Problem 4.57.

Cardiology Refer to Data Set NIFED.DAT, on the Companion Website. 7.62  Use hypothesis-testing methods to assess whether either treatment affects blood pressure or heart rate in ­patients with severe angina.

Cancer The combination of photochemotherapy with oral methoxsalen (psoralen) and ultraviolet A radiation (called PUVA treatment) is an effective treatment for psoriasis. However, PUVA is mutagenic, increases the risk of squamous-cell skin cancer, and can cause irregular, pigmented skin lesions.

Table 7.5  Serum-cholesterol levels before and during high-fiber and low-fiber supplemention

Total cholesterol (mg/dL)

n

Baseline

High fiber

Low fiber

Difference (high fiber – low fiber

Difference (high fiber – baseline)

Difference (low fiber – baseline)

20

186 ± 31

172 ± 28

172 ± 25

-1 (-8, +7)

-14  (-21, -7)

-13   (-20, -6)

Note: Plus–minus (±) values are mean ± sd. Values in parentheses are 95% confidence limits.

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Problems   263

Stern et al. [8] performed a study to assess the incidence of melanoma among patients treated with PUVA. The study identified 1380 patients with psoriasis who were first treated with PUVA in 1975 or 1976. Patients were subdivided according to the total number of treatments received ( 0, then using OC pills is associated with a raised mean SBP. If ∆ < 0, then using OC pills is associated with a lowered mean SBP. We want to test the hypothesis H0: ∆ = 0 vs. H1: ∆ ≠ 0. How should we do this? The problem is that µi is unknown, and we are assuming, in general, that it is different for each woman. However, consider the difference di = xi2 − xi1. From Equation 8.3 we know that di is normally distributed with mean ∆ and variance that we denote by σ 2d . Thus, although blood pressure levels µi are different for each woman, the differences in blood pressure between baseline and follow-up have the same underlying mean (∆) and variance σ 2d over the entire population of women. The hypothesistesting problem can thus be considered a one-sample t test based on the differences (di). From our work on the one-sample t test in Section 7.4, we know that the best test of the hypothesis H0: ∆ = 0 vs. H1: ∆ ≠ 0, when the variance is unknown, is based on the mean difference

( )

d = ( d1 + d2 + L + dn ) n

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272   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Specifically, from Equation 7.10 for a two-sided level α test, we have the following test procedure, called the paired t test.

Paired t Test Denote the test statistic d sd of the observed differences:

Equation 8.4

(

sd =

2  n  n   ∑ di2 −  ∑ di  n    i =1  i =1   

)

n by t, where sd is the sample standard deviation

(n − 1)

n = number of matched pairs

If t > tn−1,1−α/2  or  t < −tn−1,1−α/2

then H0 is rejected.

If −tn−1,1−α/2 ≤ t ≤ tn−1,1−α/2

then H0 is accepted. The acceptance and rejection regions for this test are shown in Figure 8.1.

Figure 8.1

Acceptance and rejection regions for the paired t test Distribution of t in Equation 8.4 under H0 = tn – 1 distribution

0.4

Frequency

0.3 0.2

t < – t n – 1, 1 – �/2 Rejection region

t > t n – 1, 1 – �/2 Rejection region

Acceptance region t ≤ t n – 1, 1 – �/2

0.1 0.0

–t n – 1, 1 – �/2

t n – 1, 1 – �/2

Value

Similarly, from Equation 7.11, a p-value for the test can be computed as follows.

Equation 8.5

Computation of the p-Value for the Paired t Test If t < 0,

Example 8.5

)

n under a tn−l distribution]

If t ≥ 0,

(

p = 2 × [the area to the left of t = d sd

p = 2 × [the area to the right of t under a tn−l distribution]

The computation of the p-value is illustrated in Figure 8.2. Hypertension  Assess the statistical significance of the OC–blood pressure data in Table 8.1.

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8.2  ■  The Paired t Test   273

Figure 8.2

Computation of the p-value for the paired t test 0.4 tn – 1 distribution

Frequency

0.3 0.2 p/2

0.1 0.0

t

Value If t = d/(sd/ n) � 0, then p = 2 × (area to the left of t under a tn – 1 distribution). 0.4

Frequency

0.3

tn – 1 distribution

0.2 p/2

0.1 0.0

t

Value If t = d/(sd/ n) ≥ 0, then p = 2 × (area to the right of t under a tn – 1 distribution).

Solution

d = (13 + 3 + L + 2 ) 10 = 4.80 sd2 = (13 − 4.8)2 + L + (2 − 4.8)2  9 = 20.844 sd = 20.844 = 4.566

(

t = 4.80 4.566

)

10 = 4.80 1.444 = 3.32

The critical-value method is first used to perform the significance test. There are 10 − 1 = 9 degrees of freedom (df), and from Table 5 in the Appendix we see that t9,.975 = 2.262. Because t = 3.32 > 2.262, it follows from Equation 8.4 that H0 can be rejected using a two-sided significance test with α = .05. To compute an approximate p-value, refer to Table 5 and note that t9,.9995 = 4.781, t9,.995 = 3.250. Thus, because 3.25 < 3.32 < 4.781, it follows that .0005 < p/2 < .005 or .001 < p < .01. To compute a more exact p-value, a computer program must be used. The results in Table 8.2 were obtained using the Microsoft Excel 2007 T-TEST program. To use the program, the user specifies the arrays being compared on the spreadsheet (B3:B12 and C3:C12), the number of tails for the p-value (2), and the type of t test (paired t test, type 1). Note from Table 8.2 that the exact two-sided p-value = .009. Therefore, we can conclude that starting OC use is associated with a significant change in blood pressure. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

274   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Table 8.2

Use of the Microsoft Excel T-TEST program to analyze the blood-pressure data in Table 8.1 SBP while not using OCs

SBP while using OCs

Paired t test p-value*

128 115 106 128 122 145 132 109 102 117

0.008874337

115 112 107 119 115 138 126 105 104 115

*TTEST(B3:B12,C3:C12,2,1)

Example 8.5 is a classic example of a paired study because each woman is used as her own control. In many other paired studies, different people are used for the two groups, but they are matched individually on the basis of specific matching characteristics.

Example 8.6

Solution

Gynecology  A topic of recent clinical interest is the effect of different contraceptive methods on fertility. Suppose we wish to compare how long it takes users of either OCs or diaphragms to become pregnant after stopping contraception. A study group of 20 OC users is formed, and diaphragm users who match each OC user with regard to age (within 5 years), race, parity (number of previous pregnancies), and socioeconomic status (SES) are found. The investigators compute the differences in time to fertility between previous OC and diaphragm users and find that the mean difference d (OC minus diaphragm) in time to fertility is 4 months with a standard deviation (sd) of 8 months. What can we conclude from these data? Perform the paired t test. We have

(

t = d sd

)

(

n =4 8

)

20 = 4 1.789 = 2.24 ∼ t19

under H0. Referring to Table 5 in the Appendix, we find that

t19,.975 = 2.093

and

t19,.99 = 2.539

Thus, because 2.093 < 2.24 < 2.539, it follows that .01 < p/2 < .025 or .02 < p < .05. Therefore, previous OC users take a significantly longer time to become pregnant than do previous diaphragm users. In this section, we have introduced the paired t test, which is used to compare the mean level of a normally distributed random variable (or a random variable with sample size large enough so that the central-limit theorem can be assumed to hold) between two paired samples. If we refer to the flowchart (Figure 8.13, p. 308), starting from position 1, we answer yes to (1) two-sample problem? (2) underlying distribution normal or can central-limit theorem be assumed to hold? and (3) inferences concerning means? and no to (4) are samples independent? This leads us to the box labeled “Use paired t test.”

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REVIEW QUESTIONS 8A

1

How do a paired-sample design and an independent-sample design differ?

2

A man measures his heart rate before using a treadmill and then after walking on a treadmill for 10 minutes on 7 separate days. His mean heart rate at baseline and 10 minutes after treadmill walking is 85 and 93 beats per minute (bpm), respectively. The mean change from baseline to 10 minutes is 8 bpm with a standard deviation of 6 bpm.

(a)  What test can we use to compare pre- and post-treadmill heart rate?

(b) Implement the test in Review Question 8A.2a, and report a two-tailed p-value.

(c) Provide a 90% confidence interval (CI) for the mean change in heart rate after using the treadmill for 10 minutes.

(d)  What is your overall conclusion concerning the data?

8.3 Interval Estimation for the Comparison of Means from Two Paired Samples In the previous section, methods of hypothesis testing for comparing means from two paired samples were discussed. It is also useful to construct confidence limits for the true mean difference (∆). The observed difference scores (di) are normally distributed with mean ∆ and variance σ 2d . Thus the sample mean difference (d ) is normally distributed with mean ∆ and variance σ 2d n , where σ 2d is unknown. The methods of CI estimation in Equation 6.6 can be used to derive a 100% × (1 − α) CI for ∆, which is given by

Equation 8.6

( d − tn −1,1−α /2 sd

n , d + t n −1,1− α / 2 sd

n

)

onfidence Interval for the True Difference (∆) Between the Underlying Means of C Two Paired Samples (Two-Sided)  A two-sided 100% × (1 − α) CI for the true mean difference (∆) between two paired samples is given by

( d − tn −1,1−α /2 sd

n , d + t n −1,1− α / 2 sd

n

)

Example 8.7

Hypertension  Using the data in Table 8.1, compute a 95% CI for the true increase in mean SBP after starting OCs.

Solution

From Example 8.5 we have d = 4.80 mm Hg, sd = 4.566 mm Hg, n = 10. Thus, from Equation 8.6, a 95% CI for the true mean SBP change is given by d ± t n −1,.975 sd

n = 4.80 ± t 9,.975 (1.444) = 4.80 ± 2.262(1.444) = 4.80 ± 3.27 = (1.53, 8.07) mm Hg

Thus the true change in mean SBP is most likely between 1.5 and 8.1 mm Hg.

Example 8.8

Gynecology  Using the data in Example 8.6, compute a 95% CI for the true mean difference between OC users and diaphragm users in time to fertility.

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REVIEW

8.3  ■  Interval Estimation for the Comparison of Means from Two Paired Samples   275

276   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Solution

From Example 8.6, we have d = 4 months, sd = 8 months, n = 20. Thus the 95% CI for µd is given by d±

t n −1,.975sd n

= 4±

t19,.975 (8)

20 2.093(8) =4± = 4 ± 3.74 = ( 0.26, 7.74) months 20

Thus the true lag in time to fertility can be anywhere from about 0.25 month to nearly 8 months. A much larger study is needed to narrow the width of this CI.

8.4 Two-Sample t Test for Independent Samples with Equal Variances

Let’s now discuss the question posed in Example 8.2, assuming that the crosssectional study defined in Equation 8.2 is being used, rather than the longitudinal study defined in Equation 8.1.

Example 8.9

Hypertension  Suppose a sample of eight 35- to 39-year-old nonprenant, premenopausal OC users who work in a company and have a mean systolic blood pressure (SBP) of 132.86 mm Hg and sample standard deviation of 15.34 mm Hg are identified. A sample of 21 nonpregnant, premenopausal, non-OC users in the same age group are similarly identified who have mean SBP of 127.44 mm Hg and sample standard deviation of 18.23 mm Hg. What can be said about the underlying mean difference in blood pressure between the two groups? Assume SBP is normally distributed in the first group with mean µ1 and variance σ12 and in the second group with mean µ2 and variance σ 22 We want to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2. Assume in this section that the underlying variances in the two groups are the same (that is, σ12 = σ 22 = σ 2). The means and variances in the two samples are denoted by x1 , x2 , s12 , s22 , respectively. It seems reasonable to base the significance test on the difference between the two sample means, x1 − x2 . If this difference is far from 0, then H0 will be rejected; otherwise, it will be accepted. Thus we wish to study the behavior of x1 − x2 under H0. We know X1 is normally distributed with mean µ1 and variance σ2/n1 and X2 is normally distributed with mean µ2 and variance σ2/n2. Hence, from Equation 5.10, because the two samples are independent, X1 − X2 is normally distributed with mean µ1 − µ2 and variance σ2(1/n1 + 1/n2). In symbols,

Equation 8.7

 1 1  X1 − X2 ∼ N µ1 − µ 2 , σ 2  +    n1 n2    Under H0, we know that µ1 = µ2. Thus Equation 8.7 reduces to

Equation 8.8

 1 1  X1 − X2 ∼ N  0,σ 2  +   n n  1 2  

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8.4  ■  Two-Sample t Test for Independent Samples with Equal Variances   277

If σ2 were known, then X1 − X2 could be divided by σ 1 n1 + 1 n2 . From Equation 8.8,

Equation 8.9

X1 − X2 ∼ N ( 0,1) 1 1 σ + n1 n2 and the test statistic in Equation 8.9 could be used as a basis for the hypothesis test. Unfortunately, σ2 in general is unknown and must be estimated from the data. How can σ2 be best estimated in this situation? From the first and second samples, the sample variances are s12 , s22 respectively, each of which could be used to estimate σ2. The average of s12 and s22 could simply be used as the estimate of σ2. However, this average will weight the sample variances equally even if the sample sizes are very different from each other. The sample variances should not be weighted equally because the variance from the larger sample is probably more precise and should be weighted more heavily. The best estimate of the population variance σ2, which is denoted by s2, is given by a weighted average of the two sample variances, where the weights are the number of df in each sample.

Equation 8.10

The pooled estimate of the variance from two independent samples is given by

s2 =

(n1 − 1) s12 + (n2 − 1) s22 n1 + n2 − 2

In particular, s2 will then have n1 − 1 df from the first sample and n2 − 1 df from the second sample, or

(n1 − 1) + (n2 − 1) = n1 + n2 − 2 df

overall. Then s can be substituted for σ in Equation 8.9, and the resulting test statistic can then be shown to follow a t distribution with n1 + n2 − 2 df rather than an N(0,1) distribution because σ2 is unknown. Thus the following test procedure is used.

Equation 8.11

wo-Sample t Test for Independent Samples with Equal Variances T Suppose we wish to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2 with a significance level of α for two normally distributed populations, where σ2 is assumed to be the same for each population.

Compute the test statistic: t=

x1 − x2 1 1 + s n1 n2 ( n1 − 1) s12 + ( n2 − 1) s22  ( n1 + n2 − 2 )  

where  s =

If  t > t n1 + n2 − 2 ,1− α / 2  or  t < −t n1 + n2 − 2 ,1− α / 2

then H0 is rejected.

If  −t n1 + n2 − 2 ,1− α / 2 ≤ t ≤ t n1 + n2 − 2 ,1− α / 2

then H0 is accepted. The acceptance and rejection regions for this test are shown in Figure 8.3.

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278   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Figure 8.3

Acceptance and rejection regions for the two-sample t test for independent samples with equal variances 0.4 t < – t n1 + n2 – 2, 1 – �/2 Rejection region

Frequency

0.3

t > t n1 + n2 – 2, 1 – �/2 Rejection region

0.2

Acceptance region

0.1

t ≤ t n1 + n2 – 2, 1 – �/2

0.0

–t n1 + n2 – 2, 1 – �/2

t n1 + n2 – 2, 1 – �/2

Value Distribution of t in Equation 8.11 under H0 = tn1 + n2 – 2 distribution

Similarly, a p-value can be computed for the test. Computation of the p-value depends on whether x1 ≤ x2 (t ≤ 0 ) or x1 > x2 (t > 0 ). In each case, the p-value corresponds to the probability of obtaining a test statistic at least as extreme as the observed value t. This is given in Equation 8.12.

Equation 8.12

Computation of the p-Value for the Two-Sample t Test for Independent Samples with Equal Variances Compute the test statistic: t=

x1 − x2 1 1 + s n1 n2

where  s = (n1 − 1)s12 + (n2 − 1)s22  (n1 + n2 − 2 )

If t ≤ 0, p = 2 × (area to the left of t under a t n1 + n2 − 2 distribution).

If t > 0, p = 2 × (area to the right of t under a t n1 + n2 − 2 distribution).

The computation of the p-value is illustrated in Figure 8.4.

Example 8.10

Solution

Hypertension  Assess the statistical significance of the data in Example 8.9. The common variance is first estimated: s2 =

7(15.34)2 + 20(18.23)2 8293.9 = = 307.18 27 27

or s = 17.527. The following test statistic is then computed:

t=

5.42 132.86 − 127.44 5.42 = = 0.74 = 17.527 1 8 + 1 21 17.527 × 0.415 7.282

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8.4  ■  Two-Sample t Test for Independent Samples with Equal Variances   279

Figure 8.4

Computation of the p-value for the two-sample t test for independent samples with equal variances 0.4 t n1 + n2 – 2 distribution

Frequency

0.3 0.2 0.1

p/2

0.0

t

0 Value

1 1 + ≤ 0, then p = 2 × (area to n1 n2 the left of t under a tn1 + n2 – 2 distribution).

/s

If t = (x1 – x2)

0.4

t n1 + n2 – 2 distribution

Frequency

0.3 0.2 p/2

0.1 0.0

t

Value 1 1 + > 0, then p = 2 × (area to n1 n2 the right of t under a tn1 + n2 – 2 distribution).

/s

If t = (x1 – x2)

If the critical-value method is used, then note that under H0, t comes from a t27 distribution. Referring to Table 5 in the Appendix, we see that t27,.975 = 2.052. Because −2.052 ≤ 0.74 ≤ 2.052, it follows that H0 is accepted using a two-sided test at the 5% level, and we conclude that the mean blood pressures of the OC users and non-OC users do not significantly differ from each other. In a sense, this result shows the superiority of the longitudinal design in Example 8.5. Despite the similarity in the magnitudes of the mean blood-pressure differences between users and nonusers in the two studies, significant differences could be detected in Example 8.5, in contrast to the nonsignificant results that were obtained using the preceding cross-sectional design. The longitudinal design is usually more efficient because it uses people as their own controls. To compute an approximate p-value, note from Table 5 that t27,.75 = 0.684, t27,.80 = 0.855. Because 0.684 < 0.74 < 0.855, it follows that .2 0.74) = .46.

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280   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

8.5 Interval Estimation for the Comparison of Means from Two Independent Samples (Equal Variance Case) In the previous section, methods of hypothesis testing for the comparison of means from two independent samples were discussed. It is also useful to compute 100% × (1 − α) CIs for the true mean difference between the two groups = µ1 − µ2. From Equation 8.7, if σ is known, then X1 − X2 ∼ N[ µ1 − µ 2 , σ 2 (1 n1 + 1 n2 )] or, equivalently,

X1 − X2 − ( µ1 − µ 2 ) ∼ N ( 0,1) 1 1 σ + n1 n2 If σ is unknown, then σ is estimated by s from Equation 8.10 and

X1 − X2 − ( µ1 − µ 2 ) ∼ t n1 + n2 − 2 1 1 + s n1 n2 To construct a two-sided 100% × (1 − α) CI, note that

    X − X − − µ µ ( ) 1 2 1 2 ≤ t n1 + n2 − 2 ,1− α 2  = 1 − α Pr  −t n1 + n2 − 2 ,1− α 2 ≤   1 1 + s   n n 1 2   This can be written in the form of two inequalities:

−t n1 + n2 − 2 ,1− α 2 ≤

and 

X1 − X2 − ( µ1 − µ 2 ) 1 1 + s n1 n2

X1 − X2 − ( µ1 − µ 2 ) ≤ t n1 + n2 − 2 ,1− α / 2 1 1 + s n1 n2

Each inequality is multiplied by s

µ1 − µ 2 − t n1 + n2 − 2 ,1− α / 2 s

1 1 + and µ1 − µ2 is added to both sides to obtain n1 n2

1 1 + ≤ X1 − X2 n1 n2

and X1 − X2 ≤ µ1 − µ 2 + t n1 + n2 − 2 ,1− α / 2 s

1 1 + n1 n2

1 1 is added to both sides of the first inequality and sub+ n1 n2 tracted from both sides of the second inequality to obtain

Finally, t n

1 + n2 − 2 ,1− α / 2

s

µ1 − µ 2 ≤ X1 − X2 + t n1 + n2 − 2 ,1− α / 2 s

X1 − X2 − t n1 + n2 − 2 ,1− α / 2 s

1 1 + n1 n2

1 1 + ≤ µ1 − µ 2 n1 n2

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8.6  ■  Testing for the Equality of Two Variances   281

If these two inequalities are combined, the required CI is obtained.  1 1 1 1   X1 − X2 − t n1 + n2 − 2 ,1− α / 2 s n + n , X1 − X2 + t n1 + n2 − 2 ,1− α / 2 s n + n   1 2 1 2 

If the sample means x1, x2 are substituted for the random variables X1, X2 then this procedure can be summarized as follows.

Equation 8.13

onfidence Interval for the Underlying Mean Difference (µ1 − µ2) Between Two C Groups (Two-Sided) (σ12 = σ22 )  A two-sided 100% × (1 − α) CI for the true mean difference µ1 − µ2 based on two independent samples is given by

 1 1 1 1   x1 − x2 − t n1 + n2 − 2 ,1− α / 2 s n + n , x1 − x2 + t n1 + n2 − 2 ,1− α / 2 s n + n   1 2 1 2 

Example 8.11

Hypertension  Using the data in Examples 8.9 and 8.10, compute a 95% CI for the true mean difference in systolic blood pressure (SBP) between 35- to 39-year-old OC users and non-OC users.

Solution

A 95% CI for the underlying mean difference in SBP between the population of 35- to 39-year-old OC users and non-OC users is given by

5.42 − t 27,.975 (7.282 ), 5.42 + t 27,.975 (7.282 ) −9.52, 20.36) = [ 5.42 − 2.052(7.282 ), 5.42 + 2.052(7.282 )] = (− This interval is rather wide and indicates that a much larger sample is needed to accurately assess the true mean difference. In this section, we have introduced the two-sample t test for independent samples with equal variances. This test is used to compare the mean of a normally distributed random variable (or a random variable with samples large enough so that the central-limit theorem can be assumed to hold) between two independent samples with equal variances. If we refer to the flowchart (Figure 8.13, p. 308), starting from position 1 we answer yes to (1) two-sample problem? (2) underlying distribution normal or can central-limit theorem be assumed to hold? (3) inferences concerning means? (4) are samples independent? and no to (5) are variances of two samples significantly different? (discussed in Section 8.6). This leads us to the box labeled “Use two-sample t test with equal variances.”

8.6 Testing for the Equality of Two Variances In Section 8.4, when we conducted a two-sample t test for independent samples, we assumed the underlying variances of the two samples were the same. We then estimated the common variance using a weighted average of the individual sample variances. In this section we develop a significance test to validate this assumption. In particular, we wish to test the hypothesis H 0: σ12 = σ 22 vs. H1: σ12 ≠ σ 22 , where the two samples are assumed to be independent random samples from an N(µ1 , σ12 ) and N(µ 2 , σ 22 ) distribution, respectively.

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282   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Example 8.12

Cardiovascular Disease, Pediatrics  Consider a problem discussed earlier, namely the familial aggregation of cholesterol levels. In particular, suppose cholesterol levels are assessed in 100 children, 2 to 14 years of age, of men who have died from heart disease and it is found that the mean cholesterol level in the group ( x1 ) is 207.3 mg/ dL. Suppose the sample standard deviation in this group (s1) is 35.6 mg/dL. Previously, the cholesterol levels in this group of children were compared with 175 mg/dL, which was assumed to be the underlying mean level in children in this age group based on previous large studies. A better experimental design would be to select a group of control children whose fathers are alive and do not have heart disease and who are from the same census tract as the case children, and then to compare their cholesterol levels with those of the case children. If the case fathers are identified by a search of death records from the census tract, then researchers can select control children who live in the same census tract asthe case families but whose fathers have no history of heart disease. The case and control children come from the same census tract but are not individually matched. Thus they are considered as two independent samples rather than as two paired samples. The cholesterol levels in these children can then be measured. Suppose the researchers found that among 74 control children, the mean cholesterol level ( x2 ) is 193.4 mg/dL with a sample standard deviation (s2) of 17.3 mg/dL. We would like to compare the means of these two groups using the two-sample t test for independent samples given in Equation 8.11, but we are hesitant to assume equal variances because the sample variance of the case group is about four times as large as that of the control group: 35.62 17.32 = 4.23 What should we do? What we need is a significance test to determine if the underlying variances are in fact equal; that is, we want to test the hypothesis H 0: σ12 = σ 22 vs. H1: σ12 ≠ σ 22. It seems reasonable to base the significance test on the relative magnitudes of the sample variances s12 , s22 . The best test in this case is based on the ratio of the sample 2 2 variances s12 s22 rather than on the difference between the sample variances s1 − s2 . Thus H0 would be rejected if the variance ratio is either too large or too small and accepted otherwise. To implement this test, the sampling distribution of s12 s22 under the null hypothesis σ12 = σ 22 must be determined.

(

)

(

)

The F Distribution

(

(

)

)

2 2 The distribution of the variance ratio S1 S2 was studied by statisticians R. A. Fisher and G. Snedecor. It can be shown that the variance ratio follows an F distribution under the null hypothesis that σ12 = σ 22 . There is no unique F distribution but instead a family of F distributions. This family is indexed by two parameters termed the numerator and denominator degrees of freedom, respectively. If the sizes of the first and second samples are n1 and n2 respectively, then the variance ratio follows an F distribution with n1 − 1 (numerator df) and n2 − 1 (denominator df), which is called an Fn1 −1,n2 −1 distribution. The F distribution is generally positively skewed, with the skewness dependent on the relative magnitudes of the two degrees of freedom. If the numerator df is 1 or 2, then the distribution has a mode at 0; otherwise it has a mode greater than 0. The distribution is illustrated in Figure 8.5. Table 9 in the Appendix gives the percentiles of the F distribution.

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8.6  ■  Testing for the Equality of Two Variances   283

Figure 8.5

Probability density for the F distribution 1.5 1.4 1.3 1.2 1.1

F1,6

1.0

f (x)

0.9 0.8 0.7

F4,6

0.6 0.5 0.4 0.3 0.2 0.1

0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1.0 1.1 1.2 1.3 1.4 1.5 1.6 1.7 1.8 1.9 2.0

Definition 8.6

x

The 100 × pth percentile of an F distribution with d1 and d2 degrees of freedom is denoted by Fd ,d , p. Thus 1 2

(

)

Pr Fd1 ,d2 ≤ Fd1 ,d2 , p = p

The F table is organized such that the numerator df (d1) is shown in the first row, the denominator df (d2) is shown in the first column, and the various percentiles (p) are shown in the second column.

Example 8.13

Solution

Find the upper first percentile of an F distribution with 5 and 9 df. F5,9,.99 must be found. Look in the 5 column, the 9 row, and the subrow marked .99 to obtain F5,9,.99 = 6.06 Generally, F distribution tables give only upper percentage points because the symmetry properties of the F distribution make it possible to derive the lower percentage points of any F distribution from the corresponding upper percentage points of an F distribution with the degrees of freedom reversed. Specifically, note that under H0, S22 S12 follows an Fd2 ,d1 distribution. Therefore,

(

)

Pr S22 S12 ≥ Fd2 ,d1 ,1− p = p By taking the inverse of each side and reversing the direction of the inequality, we get

 S2  1 Pr  12 ≤ =p F S  2 d2 ,d1 ,1− p 

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284   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Under H0, however, S12 S22 follows an Fd1 ,d2 distribution. Therefore

 S2  Pr  12 ≤ Fd1 ,d2 , p  = p  S2  It follows from the last two inequalities that

Fd1 ,d2 , p =

1 Fd2 ,d1 ,1− p

This principle is summarized as follows.

Equation 8.14

omputation of the Lower Percentiles of an F Distribution  C The lower pth percentile of an F distribution with d1 and d2 df is the reciprocal of the upper pth percentile of an F distribution with d2 and d1 df. In symbols,

Fd1 ,d2 , p = 1 Fd2 ,d1 ,1− p Thus from Equation 8.14 we see that the lower pth percentile of an F distribution is the same as the inverse of the upper pth percentile of an F distribution with the degrees of freedom reversed.

Example 8.14

Solution

Estimate F6,8,.05. From Equation 8.14,  F6,8,.05 = 1/F8,6,.95 = 1/4.15 = 0.241

The F Test We now return to the significance test for the equality of two variances. We want to test the hypothesis H 0: σ12 = σ 22 vs. H1: σ12 ≠ σ 22 . We stated that the test would be based on the variance ratio S12 S22 , which under H0 follows an F distribution with n1 − 1 and n2 − 1 df. This is a two-sided test, so we want to reject H0 for both small and large values of S12 S22 . This procedure can be made more specific, as follows.

Equation 8.15

Test for the Equality of Two Variances  F Suppose we want to conduct a test of the hypothesis H 0: σ12 = σ 22 vs. H1: σ12 ≠ σ 22 with significance level α.

Compute the test statistic F = s12 s22 .

If  F > Fn1 −1,n2 −1,1− α / 2   or  F < Fn1 −1,n2 −1,α / 2

then H0 is rejected.

If  Fn1 −1,n2 −1,α /2 ≤ F ≤ Fn1 −1,n2 −1,1− α /2

then H0 is accepted. The acceptance and rejection regions for this test are shown in Figure 8.6. Alternatively, the exact p-value is given by Equation 8.16.

Equation 8.16

Computation of the p-Value for the F Test for the Equality of Two Variances Compute the test statistic F = s12 s22 .

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8.6  ■  Testing for the Equality of Two Variances   285

Figure 8.6

Acceptance and rejection regions for the F test for the equality of two variances 0.7 Fn1 – 1, n2 – 1, �/2 ≤ F ≤ Fn1 – 1, n2 – 1, 1 – �/2

0.6 Frequency

0.5 0.4 0.3

F < Fn1 – 1, n2 – 1, �/2 Rejection 0.1 region 0.0

F > Fn1 – 1, n2 – 1, 1 – �/2 Rejection region

Acceptance region

0.2

Value

Fn1 – 1, n2 – 1, �/2 Fn1 – 1, n2 – 1, 1 – �/2 Fn1 – 1, n2 – 1 distribution = distribution of F = S12/S22 under H0

If F ≥ 1, then If F < 1, then

( p = 2 × Pr ( F

) < F)

p = 2 × Pr Fn1 −1,n2 −1 > F n1 −1,n2 −1

This computation is illustrated in Figure 8.7.

Example 8.15

Solution

Cardiovascular Disease, Pediatrics  Test for the equality of the two variances given in Example 8.12. F = s12 s22 = 35.62 17.32 = 4.23 Because the two samples have 100 and 74 people, respectively, we know from Equation 8.15 that under H0, F ~ F99,73. Thus H0 is rejected if F > F99,73,.975 or

F < F99,73,.025

Figure 8.7  Computation of the p-value for the F test for the equality of two variances 0.7

0.7

0.6

0.6 Fn1 – 1, n2 – 1 distribution

0.4 0.3 p/2

0.2

p/2

0.1 0.0

Fn1 – 1, n2 – 1 distribution

0.5 Frequency

Frequency

0.5

0.4 0.3 0.2 0.1

0.0

F Value

If F =

s12/s22

≥ 1, then p = 2 × (area to the right of F under an Fn1 – 1, n2 – 1 distribution)

0 F Value If F =

s12/s22

� 1, then p = 2 × (area to the left of F under an Fn1 – 1, n2 – 1 distribution)

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286   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Note that neither 99 df nor 73 df appears in Table 9 in the Appendix. One approach is to obtain the percentiles using a computer program. In this example, we want to find the value c1 = F99,73,.025 and c2 = F99,73,.975. such that

(

)

Pr F99,73 ≤ c1 = .025

and

(

)

Pr F99,73 ≥ c2 = .975

The result is shown in Table 8.3 using the FINV function of Microsoft Excel 2007, where the first argument of FINV is the desired right-hand tail area and the next two arguments are the numerator and denominator df, respectively.

Table 8.3

Computation of critical values for the cholesterol data in Example 8.15 using Excel 2007 Numerator df Denominator df

99 73

Percentile    0.025    0.975

0.6547598 1.54907909

FINV(.975, 99, 73) FINV(.025, 99, 73)

Thus c1 = 0.6548 and c2 = 1.5491. Because F = 4.23 > c2, it follows that p < .05. Alternatively, we could compute the exact p-value. This is given by p = 2 × Pr(F99,73 ≥ 4.23).

Table 8.4

Computation of the exact p-value in Example 8.15 using Excel 2007 Numerator df Denominator df

99 73

     x one-tailed p-value two-tailed p-value

4.23 4.41976E–10 8.83951E–10

FDIST(4.23, 99, 73) 2*FDIST(4.23, 99, 73)

Using the Excel 2007 FDIST function, which calculates the right-hand tail area, we see from Table 8.4 that to four decimal places, the p-value = 2 × Pr(F99,73 ≥ 4.23) ≤ .0001. Thus the two sample variances are significantly different. The two-sample t test with equal variances, as given in Section 8.4, cannot be used, because this test depends on the assumption that the variances are equal. A question often asked about the F test is whether it makes a difference which sample is selected as the numerator sample and which is selected as the denominator sample. The answer is that, for a two-sided test, it does not make a difference because of the rules for calculating lower percentiles given in Equation 8.14. A variance ratio > 1 is usually more convenient, so there is no need to use Equation 8.14. Thus the larger variance is usually put in the numerator and the smaller variance in the denominator.

Example 8.16

Hypertension  Using the data in Example 8.9, test whether the variance of blood pressure is significantly different between OC users and non-OC users.

Solution

The sample standard deviation of blood pressure for the 8 OC users was 15.34 and for the 21 non-OC users was 18.23. Hence the variance ratio is

F = (18.23 15.34 ) = 1.41 2

Under H0, F follows an F distribution with 20 and 7 df, whose percentiles do not appear in Table 9. However, the percentiles of an F24,7 distribution are provided in Table 9. Also, it can be shown that for a specified upper percentile (e.g., the 97.5th Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

8.7  ■  Two-Sample t Test for Independent Samples with Unequal Variances   287

percentile), as either the numerator or denominator df increases, the corresponding percentile decreases. Therefore,

F20 ,7,.975 ≥ F24,7,.975 = 4.42 > 1.41 It follows that p > 2(.025) = .05, and the underlying variances of the two samples do not significantly differ from each other. Thus it was correct to use the two-sample t test for independent samples with equal variances for these data, where the underlying variances were assumed to be the same. To compute an exact p-value, a computer program must be used to evaluate the area under the F distribution. The exact p-value for Example 8.16 has been evaluated using Excel 2007, with the results given in Table 8.5. The program evaluates the right-hand tail area = Pr(F20,7 ≥ 1.41) = .334. The two-tailed p-value = 2 × Pr(F20,7 ≥ 1.41) = 2 × .334 = .669.

Table 8.5

Computation of the exact p-value for the blood-pressure data in Example 8.16 using the F test for the equality of two variances with the Excel 2007 FDIST program Numerator df Denominator df

20 7

x 1.412285883 one-tailed p-value 0.334279505 two-tailed p-value 0.66855901

FDIST(1.41,20,7) 2*FDIST(1.41,20,7)

If the numerator and denominator samples are reversed, then the F statistic = 1/1.41 = 0.71 ~ F7,20 under H0. We use the FDIST program of Excel 2007 to calculate Pr(F7,20 ≥ 0.71). This is given by FDIST(0.71,7,20) = .666. Because F < 1, we have p-value = 2 × Pr(F7,20 ≤ 0.71) = 2 × (1 − .666) = .669, which is the same as the p-valuein Table 8.5. Thus it was correct to use the two-sample t test for independent samples with equal variances for these data, where the variances were assumed to be the same. In this section, we have introduced the F test for the equality of two variances. This test is used to compare variance estimates from two normally distributed samples. If we refer to the flowchart (Figure 8.13, p. 308), then starting from position 1 we answer yes to (1) two-sample problem? and (2) underlying distribution normal or can central-limit theorem be assumed to hold? and no to (3) inferences concerning means? and yes to (4) inferences concerning variances? This leads us to the box labeled “Two-sample F test to compare variances.” Be cautious about using this test with nonnormally distributed samples.

8.7 Two-Sample t Test for Independent Samples with Unequal Variances The F test for the equality of two variances from two independent, normally distributed samples was presented in Equation 8.15. If the two variances are not significantly different, then the two-sample t test for independent samples with equal variances outlined in Section 8.4 can be used. If the two variances are significantly different, then a two-sample t test for independent samples with unequal variances, which is presented in this section, should be used. Specifically, assume there are two normally distributed samples, where the first sample is a random sample of size n1 from an N(µ1 , σ12 ) distribution and the

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288   C H A P T E R 8 

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second sample is a random sample from an N(µ 2 , σ 22 ) distribution, and σ12 ≠ σ 22 . We again wish to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2. Statisticians refer to this problem as the Behrens-Fisher problem. It still makes sense to base the significance test on the difference between the sample means x1 − x2 . Under either hypothesis, X1 is normally distributed with mean µ1 and variance σ12 n1 and X2 is normally distributed with mean µ2 and variance σ 22 n2 . Hence it follows that

 σ2 σ2  X1 − X2 ∼ N  µ1 − µ 2 , 1 + 2  n1 n2  

Equation 8.17

Under H0, µ1 − µ2= 0. Thus, from Equation 8.17,

 σ2 σ2  X1 − X2 ∼ N  0, 1 + 2   n1 n2 

Equation 8.18

If σ12 and σ 22 were known, then the test statistic

z = ( x1 − x2 )

Equation 8.19

σ12 σ 22 + n1 n2

could be used for the significance test, which under H0 would be distributed as an N(0,1) distribution. However, σ12 and σ 22 are usually unknown and are estimated by s12 and s22 , respectively (the sample variances in the two samples). Notice that a pooled estimate of the variance was not computed as in Equation 8.10 because the variances σ12 , σ 22 are assumed to be different. If s12 is substituted for σ12 and s22 for σ 22 in Equation 8.19, then the following test statistic is obtained:

(

Equation 8.20

)

t = ( x1 − x2 )

s12 n1 + s22 n2

The exact distribution of t under H0 is difficult to derive. However, several approximate solutions have been proposed that have appropriate type I error. The Satterthwaite approximation is presented here. Its advantage is its easy implementation using the ordinary t tables [1].

Equation 8.21

wo-Sample t Test for Independent Samples with Unequal Variances T (Satterthwaite’s Method) (1) Compute the test statistic

t=

x1 − x2 s12 s22 + n1 n2

(2) Compute the approximate degrees of freedom d’, where

d′ =

( s12 n1 )

2

( s12

n1 + s22 n2

(n1 − 1) + ( s22

)

2

n2

)

2

(n2 − 1)

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8.7  ■  Two-Sample Test for Independent Samples with Unequal Variances   289

(3) Round d′ down to the nearest integer d″.

If  t > td″, 1−α/2

then reject H0.

If  −td″, 1−α/2 ≤ t ≤ td″, 1−α/2

then accept H0.

or

t < −td″, 1−α/2

The acceptance and rejection regions for this test are illustrated in Figure 8.8.

Figure 8.8

Acceptance and rejection regions for the two-sample t test for independent samples with unequal variances 0.4

Frequency

0.3 0.2

t < – t d", 1 – �/2 Rejection region

t > t d", 1 – �/2 Rejection region Acceptance region

0.1 0.0 –t d", 1 – �/2

0 Value

t d", 1 – �/2

td" distribution = approximate distribution of t in Equation 8.21 under H0

Similarly, the approximate p-value for the hypothesis test can be computed as follows.

Equation 8.22

Computation of the p-Value for the Two-Sample t Test for Independent Samples with Unequal Variances (Satterthwaite Approximation) Compute the test statistic t=

x1 − x2 s12 s22 + n1 n2

If t ≤ 0, then p = 2 × (area to the left of t under a td” distribution)

If t > 0, then p = 2 × (area to the right of t under a td” distribution)

where d” is given in Equation 8.21.

Computation of the p-value is illustrated in Figure 8.9.

Example 8.17

Cardiovascular Disease, Pediatrics  Consider the cholesterol data in Example 8.12. Test for the equality of the mean cholesterol levels of the children whose fathers have died from heart disease vs. the children whose fathers do not have a history of heart disease.

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290   C H A P T E R 8 

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Figure 8.9

Computation of the p-value for the two-sample t test for independent samples with unequal variances 0.4 t d" distribution

Frequency

0.3 0.2 p/2

0.1 0.0

t

Value If t = (x1 – x2)/ s21/n1 + s22/n2 ≤ 0, then p = 2 × (area to the left of t under a td" distribution)

0.4 t d" distribution

Frequency

0.3 0.2

p/2

0.1 0.0

t

Value If t = (x1 – x2)/ s12/n1 + s22/n2 > 0, then p = 2 × (area to the right of t under a td" distribution)

Solution

We have already tested for equality of the two variances in Example 8.15 and found them to be significantly different. Thus the two-sample t test for unequal variances in Equation 8.21 should be used. The test statistic is t=

207.3 − 193.4 35.62 100 + 17.32 74

13.9 = 3.40 4.089

=

The approximate degrees of freedom are now computed: d′ =

( s12

n1 + s22 n2

)

2

( s12 n1 ) (n1 − 1) + ( s22 n2 ) (n2 − 1) 2 (35.62 100 + 17.32 74) 16.7182 = = = 151.4 2 2 (35.62 100 ) 99 + (17.32 74) 73 1.8465 2

2

Therefore, the approximate degrees of freedom = d″ = 151. If the critical-value method is used, note that t = 3.40 > t120,.975 = 1.980 > t151,.975 Therefore, H0 can be

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8.7  ■  Two-Sample t Test for Independent Samples with Unequal Variances   291

rejected using a two-sided test with α = .05. Furthermore, t = 3.40 > t120,.9995 = 3.373 > t151,.9995, which implies that the p-value < 2 × (1.0 − .9995) = .001. To compute the exact p-value, we use Excel 2007, as shown in Table 8.6.

Table 8.6

Computation of the exact p-value for Example 8.17 using Excel 2007 t df two-tailed p-value

3.4 151 0.000862 TDIST(3.4,151,2)

We see from Table 8.6 that the p-value = 2 × [1 − Pr(t151 ≤ 3.40)] = .0009. We conclude that mean cholesterol levels in children whose fathers have died from heart disease are significantly higher than mean cholesterol levels in children of fathers without heart disease. It would be of great interest to identify the cause of this difference; that is, whether it is due to genetic factors, environmental factors such as diet, or both. In this chapter, two procedures for comparing two means from independent, normally distributed samples have been presented. The first step in this process is to test for the equality of the two variances, using the F test in Equation 8.15. If this test is not significant, then use the t test with equal variances; otherwise, use the t test with unequal variances. This overall strategy is illustrated in Figure 8.10.

Figure 8.10

Strategy for testing for the equality of means in two independent, normally distributed samples Significant

Perform t test assuming unequal variances in Equation 8.21

Perform F test for the equality of two variances in Equation 8.15

Not significant

Perform t test assuming equal variances in Equation 8.11

Example 8.18

Infectious Disease  Using the data in Table 2.11, compare the mean duration of hospitalization between antibiotic users and nonantibiotic users.

Solution

Refer to Table 8.7, where the PC-SAS T-TEST program (PROC TTEST) was used to analyze these data. Among the 7 antibiotic users (antib = 1), mean duration of hospitalization was 11.57 days with standard deviation 8.81 days; among the 18 non­ antibiotic users (antib = 2), mean duration of hospitalization was 7.44 days with standard deviation 3.70 days. Both the F test and the t test with equal and unequal variances are displayed in this program. Using Figure 8.10, note that the first step in comparing the two means is to perform the F test for the equality of two variances in order to decide whether to use the t test with equal or unequal variances. The F statistic is denoted in Table 8.7 by F Value = 5.68., with p-value (labeled Pr > F) = .004. Thus the variances differ significantly, and a two-sample t test with unequal variances should be used. Therefore, refer to the Unequal Variance row, where

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292   C H A P T E R 8 

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Table 8.7  Use of the PROC TTEST program to analyze the association between antibiotic use and duration of hospitalization (raw data presented in Table 2.11) The TTEST Procedure Statistics Variable antib dur dur dur

Lower CL N Mean

Upper CL Lower CL Upper CL Mean Mean Std Dev Std Dev Std Dev Std Err Minimum Maximum

1 7 3.4234 11.571 19.719 2 18 5.6056 7.4444 9.2833 Diff -0.95 4.127 9.2037 (1-2)

5.6772 2.7747 4.2821

8.8102 3.6977 5.5095

19.401 5.5434 7.7285

3.3299 0.8716 2.4541

3 3

30 17

T-Tests Variable

Method

Variances

dur dur

Pooled Satterthwaite

Equal Unequal

Variable

Method

Num DF

dur

Folded F

6

DF

t Value

Pr > |t|

23 6.84

1.68 1.20

0.1062 0.2704

Den DF

F Value

Pr > F

17

5.68

0.0043

Equality of Variances

the t statistic (as given in Equation 8.21) is 1.20 with degrees of freedom d’(df). = 6.8. The corresponding two-tailed p-value (labeled Pr > |t|) = .270. Thus no significant difference exists between the mean duration of hospitalization in these two groups. If the results of the F test had revealed a nonsignificant difference between the variances of the two samples, then the t test with equal variances would have been used, which is provided in the Equal Variance row of the SAS output. In this example, considerable differences are present in both the test statistics (1.68 vs. 1.20) and the two-tailed p-values (.106 vs. .270) resulting from using these two procedures. Using similar methods to those developed in Section 8.5, we can show that a two-sided 100% × (1 − α) CI for the underlying mean difference µ1 − µ2 in the case of unequal variances is given as follows:

Equation 8.23

Two-Sided 100% × (1 − α) CI for

(

µ1 − µ 2 σ 12 ≠ σ 22

(

)

2 2 2 2   x1 − x2 − t d ′′ ,1− α / 2 s1 n1 + s2 n2 , x1 − x2 + t d ′′ ,1− α / 2 s1 n1 + s2 n2

)

where d” is given in Equation 8.21.

Example 8.19

Solution

Infectious Disease  Using the data in Table 8.7, compute a 95% CI for the mean difference in duration of hospital stay between patients who do and do not receive antibiotics. Using Table 8.7, the 95% CI is given by 2 2 (11.571 − 7.444 ) − t 6 ,.975 8.810 7 + 3.698 18 , 

(11.571 − 7.444 ) + t6,.975 8.810 2 7 + 3.6982 18  = [ 4.127 − 2.447 ( 3.442 ) , 4.127 + 2.447 ( 3.442 )] = ( 4.127 − 8.423, 4.127 + 8.423) = ( −4.30,12.55)

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8.8  ■  Effects of Lead Exposure on Neurologic and Psychological Function in Children   293

REVIEW QUESTIONS 8B

Table 8.8

Table 8.9

1

What is an F distribution used for? How does it differ from a t distribution?

2

Suppose we wish to compare the mean level of systolic blood pressure (SBP) between Caucasian and African-American children. The following data were obtained from the Bogalusa Heart Study for 10- to 14-year-old girls:

Comparison of mean SBP of Caucasian and African-American 10- to 14-year-old girls

Mean

sd

N

Caucasian

104.4

9.0

1554

African-American

104.7

9.3

927

(a) What test can be used to compare the means of the two groups?

(b) Perform the test in Review Question 8B.2a, and report a p-value (two-tailed). [Hint: F926,1553,.975  =  1.121. Also, for d ≥ 200, assume that a td distribution is the same as an N(0,1) distribution.]

(c) What is a 95% CI for the mean difference in SBP between the two ethnic groups?

3

The following data comparing SBP between Caucasian and African-American young adult women were obtained from the same study:

Comparison of mean SBP of Caucasian and African-American 30- to 34-year-old women sd

N

107.7

9.5

195

115.3

14.9

96

Mean

Caucasian African-American

Answer the same questions as in Review Question 8B.2a, b, and c. (Note: F95,194,.975  =  1.402.)

8.8 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children Example 8.20

Environmental Health, Pediatrics  In Section 2.9, we described a study performed in El Paso, Texas, that examined the association between lead exposure and developmental features in children [2]. There are different ways to quantify lead exposure. One

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REVIEW

In this section, we have introduced the two-sample t test for independent samples with unequal variances. This test is used to compare the mean level of a normally distributed random variable (or a random variable with samples large enough so the central-limit theorem can be assumed to hold) between two independent samples with unequal variances. If we refer to the flowchart (Figure 8.13, p. 308), then starting from position 1 we answer yes to the following five questions: (1) twosample problem? (2) underlying distribution normal or can central-limit theorem be assumed to hold? (3) inference concerning means? (4) are samples independent? and (5) are variances of two samples significantly different? This leads us to the box labeled “Use two-sample t test with unequal variances.”

294   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

method used in the study consisted of defining a control group of children whose blood-lead levels were < 40 µg/100 mL in both 1972 and 1973 (n = 78) and an exposed group of children who had blood-lead levels ≥ 40 µg/100 mL in either 1972 or 1973 (n = 46). Two important outcome variables in the study were the number of finger–wrist taps per 10 seconds in the dominant hand (a measure of neurologic function) as well as the Wechsler full-scale IQ score (a measure of intellectual development). Because only children ≥ 5 years of age were given the neurologic tests, we actually have 35 exposed and 64 control children with finger–wrist tapping scores. The distributions of these variables by group were displayed in a box plot in Figures 2.9 and 2.10, respectively. The distributions appeared to be reasonably symmetric, particularly in the exposed group, although there is a hint that a few outliers may be present. (We discuss detection of outliers more formally in Section 8.9.) We also note from these figures that the exposed group seems to have lower levels than the control group for both these variables. How can we confirm whether this impression is correct? One approach is to use a two-sample t test to compare the mean level of the exposed group with the mean level of the control group on these variables. We used the PC-SAS TTEST procedure for this purpose, as shown in Tables 8.10 and 8.11. The program actually performs three different significance tests each time the t test procedure is specified. In Table 8.10, we analyze the mean finger–wrist tapping scores. Following the flowchart in Figure 8.10, we first perform the F test for equality of two variances. In Table 8.10, the F statistic (labeled as F Value) = 1.19 with 34 and 63 df. The p-value (labeled Pr > F ) equals 0.5408, which implies we can accept H0 that the variances are not significantly different. Therefore, following Figure 8.10, we should perform the two-sample t test with equal variances (Equation 8.11). The t statistic is in the t Value column and the Equal row is 2.68 with 97 df. The two-tailed p-value, found in the column headed Pr > |t| and the Equal row is 0.0087, which implies there is a significant difference in mean finger–wrist tapping scores between the exposed and the control groups, with the exposed group having lower mean scores. If there

Table 8.10  Comparison of mean finger–wrist tapping scores for the exposed vs. control group, using the SAS t test procedure

Variable group maxfwt maxfwt maxfwt

Lower CL N Mean

The TTEST Procedure Statistics Upper CL Lower CL Upper CL Mean Mean Std Dev Std Dev Std Dev Std Err Minimum Maximum

1 64 51.426 54.438 57.449 2 35 42.909 47.429 51.948 Diff (1-2) 1.813 7.0089 12.205

10.27 10.641 10.92

12.057 13.156 12.453

14.602 17.237 14.49

1.5071 2.2237 2.618

T-Tests DF

t Value

Pr > |t|

97 65

2.68 2.61

0.0087 0.0113

Equality of Variances Num DF Den DF F Value

Pr > F

Variable

Method

Variances

maxfwt maxfwt

Pooled Satterthwaite

Equal Unequal

Variable

Method

maxfwt

Folded F

34

63

1.19

13 13

84 83

0.5408

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8.9  ■  The Treatment of Outliers   295

Table 8.11  Comparison of mean full-scale IQ scores for the exposed vs. control group, using the SAS t test procedure The TTEST Procedure Statistics Lower CL Upper CL Lower CL Upper CL Variable group N Mean Mean Mean Std Dev Std Dev Std Dev Std Err Minimum Maximum iqf iqf iqf

1 78 89.425 92.885 96.344 2 46 84.397 88.022 91.647 Diff (1-2) -0.388 4.8629 10.114

13.257 10.125 12.68

15.345 12.207 14.268

18.218 15.374 16.313

1.7374 1.7998 2.6524

50 46

141 114

T-Tests Variable

Method

Variances

iqf iqf

Pooled Satterthwaite

Equal Unequal

Variable

Method

Num DF

iqf

Folded F

77

DF

t Value

Pr > |t|

122 111

1.83 1.94

0.0692 0.0544

Den DF

F Value

Pr > F

45

1.58

0.0982

Equality of Variances

had been a significant difference between the variances from the F test—that is, if (Pr > F ) < 0.05—then we would use the two-sample t test with unequal variances. The program automatically performs both t tests and lets the user decide which to use. If a two-sample t test with unequal variances were used, then referring to the Unequal row, the t statistic equals 2.61 (as given in Equation 8.21) with 65 df (d’ in Equation 8.21) with a two-sided p-value equal to 0.0113. The program also provides the mean, standard deviation (Std Dev), and standard error (Std Err) for each group. Referring to Table 8.11, for the analysis of the full-scale IQ scores, we see that the p-value for the F test is 0.0982, which is not statistically significant. Therefore, we again use the equal variance t test. The t statistic is 1.83 with 122 df, with two-tailed p-value equal to 0.0692. Thus the mean full-scale IQ scores for the two groups do not differ significantly.

8.9 The Treatment of Outliers We saw that the case study in Section 8.8 suggested there might be some outliers in the finger–wrist tapping and IQ scores. Outliers can have an important impact on the conclusions of a study. It is important to definitely identify outliers and either exclude them outright or at least perform alternative analyses with and without the outliers present. Therefore, in this section we study some decision rules for outlier detection. We refer to Figures 8.11 and 8.12, which provide stem-and-leaf and box plots from SAS of the finger–wrist tapping scores and the full-scale IQ scores for the control group and the exposed group, respectively. According to the box plots in Figure 8.11, there are potential outlying finger–wrist tapping scores (denoted by zeros in the plot) of 13, 23, 26, and 84 taps per 10 seconds for the control group and 13, 14, and 83 taps per 10 seconds for the exposed group. According to the box plots in Figure 8.12, there are potential outlying full-scale IQ scores of 50, 56, 125, 128, and 141 for the control group and 46 for the exposed group. All the potentially outlying

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296   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

values are far from the mean in absolute value. Therefore, a useful way to quantify an extreme value is by the number of standard deviations that a value is from the mean. This statistic applied to the most extreme value in a sample is called the Extreme Studentized Deviate and is defined as follows.

Definition 8.7

The Extreme Studentized Deviate (or ESD statistic) = maxi =1,...,n xi − x s.

Example 8.21

Compute the ESD statistic for the finger–wrist tapping scores for the control group.

Solution

From Table 8.10, we see that x = 54.4, s = 12.1. From Figure 8.11a we note that the distance from the mean for the smallest and largest values are |13 − 54.4| = 41.4 and |84 − 54.4| = 29.6, respectively. Therefore, because 41.4 > 29.6, it follows that ESD = 41.4/12.1 =3.44. How large must the ESD statistic be for us to conclude that the most extreme value is an outlier? Remember that in a sample of size n without outliers, we would  n  expect the largest value to correspond approximately to the 100% ×  th per n + 1  centile. Thus, for a sample of size 64 from a normal distribution this would correspond to approximately the 100 × 64/65th percentile ≈ 98.5th percentile = 2.17. If an outlier is present, then the ESD statistic will be larger than 2.17. The appropriate critical values depend on the sampling distribution of the ESD statistic for samples of size n from a normal distribution. Critical values from Rosner [3] based on an approximation provided by Quesenberry and David [4] are presented in Table 10 in the Appendix. The critical values depend on the sample size n and the percentile p. The pth percentile for the ESD statistic based on a sample of size n is denoted byESDn,p.

Figure 8.11  Stem-and-leaf and box plots of finger–wrist tapping score by group, El Paso Lead Study (b) Exposed

(a) Control Stem 8 7 7 6 6 5 5 4 4 3 3 2 2 1 1

# 1 2 3 5 8 12 15 12 2 1

Leaf 4 69 224 55558 01122344 566677778999 000000011222334 566666888999 02 8 6 3 3

+ + + Multiply Stem.Leaf by 10**+1

+

Boxplot 0

+ * +

+ +

1 1

0 0

1

* +

Stem 8 7 7 6 6 5 5 4 4 3 3 2 2 1 1

Leaf 3

# 1

1

2 567789 0122244 56889 0012244 5788 4

1 6 7 5 7 4 1

2

34

+ + + Multiply Stem.Leaf by 10**+1

Boxplot 0

+ * +

+ +

* +

+

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8.9  ■  The Treatment of Outliers   297

Figure 8.12  Stem-and-leaf and box plots of full-scale IQ by group, El Paso Lead Study (b) Exposed

(a) Control Stem 14 13 13 12 12 11 11 10 10 9 9 8 8 7 7 6 6 5 5

Leaf 1

58 0 558 1 55677778 011244 566666667789999 123444 5555666677888999 0004 566666778 0234

# 1

Boxplot 0

2 1 3 1 8 6 15 6 16 4 9 4

1 1

6 0

+ + + Multiply Stem.Leaf by 10**+1

Example 8.22

Solution

+

+ * +

+ +

0 0

* +

Stem

Leaf

#

11 10 10 9 9 8 8 7 7 6 6 5 5 4

124

3 5 3 10 8 7 7 2

01144 678 0111222334 55568889 0002233 5567899 12

6

+ + + Multiply Stem.Leaf by 10**+1

Boxplot

+ *

+ +

+

1

* +

+

Find the upper 5th percentile for the ESD statistic based on a sample of size 50. The appropriate percentile = ESD50,.95 is found by referring to the 50 row and the .95 column and is 3.13. For values of n that are not in the table, we can sometimes assess significance by using the principle that for a given level of significance, the critical values increase as the sample size increases. This leads to the following procedure for the detection of a single outlier in normally distributed samples.

Equation 8.24

ESD Single-Outlier Procedure  Suppose we have a sample x1 , . . ., xn ∼ N (µ, σ 2 ) but feel that there may be some outliers present. To test the hypothesis, H0: that no outliers are present vs. H1: that a single outlier is present, with a type I error of α, (1) We compute the ESD =  maxi =1,...,n x −x ESD = i is referred to as x(n). s

xi − x . The sample value xi, such that s

(2) We refer to Table 10 in the Appendix to obtain the critical value = ESDn,1−α. (3) If ESD > ESDn,1−α, then we reject H0 and declare that x(n) is an outlier. If ESD ≤ ESDn,1−α, then we declare that no outliers are present.

Example 8.23

Evaluate whether outliers are present for the finger–wrist tapping scores in the control group.

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298   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Solution

Following Equation 8.24, we compute the ESD test statistic. From Example 8.21, we have ESD = 3.44 with 13 being the most extreme value. To assess statistical significance with α = .05, we refer to Appendix Table 10. From Table 10, ESD70,.95 = 3.26. Because ESD = 3.44 > ESD70,.95 = 3.26 > ESD64,.95, it follows that p < .05. Therefore, we infer that the finger–wrist tapping score of 13 taps per 10 seconds is an outlier. In some instances, when multiple outliers are present, it is difficult to identify specific data points as outliers using the single-outlier detection procedure. This is because the standard deviation can get inflated in the presence of multiple outliers, reducing the magnitude of the ESD test statistic in Equation 8.24.

Example 8.24

Evaluate whether any outliers are present for the finger–wrist tapping scores in the exposed group.

Solution

Referring to Table 8.10, we see that x = 47.4, s = 13.2, and n = 35 in the exposed group. Furthermore, the minimum and maximum values are 13 and 83, respectively. Because 83 − 47.4 = 35.6 > 13 − 47.4 = 34.4 , it follows that the ESD statistic is 35.6/13.2 = 2.70. From Appendix Table 10, we see that ESD35,.95 = 2.98 > ESD = 2.70 . Therefore p > .05, and we accept the null hypothesis that no outliers are present. The solution to Example 8.24 is unsettling because it is inconsistent with Figure 8.11b. It appears that the values 13, 14, and 83 are outliers, yet no outliers are identified by the single-outlier procedure in Equation 8.24. The problem is that the multiple outliers have artificially inflated the standard deviation. This is called the masking problem, because multiple outliers have made it difficult to identify the single most extreme sample point as an outlier. This is particularly true if the multiple outliers are roughly equidistant from the sample mean, as in Figure 8.11b. To overcome this problem, we must employ a flexible procedure that can accurately identify either single or multiple outliers and is less susceptible to the masking problem. For this purpose, we first must determine a reasonable upper bound for the number of outliers in a data set. In my experience, a reasonable upper bound for the number of possible outliers is min([n/10], 5), where [n/10] is the largest integer ≤ n/ 10. If there are more than five outliers in a data set, then we most likely have an underlying nonnormal distribution, unless the sample size is very large. The following multipleoutlier procedure [3] achieves this goal.

Equation 8.25

ESD Many-Outlier Procedure  Suppose x1 , . . . , xn ∼ N (µ, σ 2 ) for a large majority of the sample points, but we suspect that we may have as many as k outliers, where k = min([n/10], 5), where [n/10] is the largest integer ≤ n/10. We wish to have a type I error of α to test the hypothesis H0: there are no outliers vs. H1: there are between 1 and k outliers, and we would like to use a decision rule that can specifically identify the outliers. For this purpose, 1. We compute the ESD statistic based on the full sample = maxi =1,....,n xi − x s. We denote this statistic by ESD(n) and the most outlying data point by x(n). 2. We remove x(n) from the sample and compute the mean, standard deviation, and ESD statistic from the remaining n − 1 data points. We denote the ESD statistic from the reduced sample by ESD(n−1). 3. We continue to remove the most outlying sample points and recompute the ESD statistic until we have computed k ESD statistics denoted by ESD(n), ESD(n−1), . . . , ESD(n − k +1) based on the original sample size of n, and successively

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8.9  ■  The Treatment of Outliers   299

reduced samples of size n  −  1, . . . , n − k + 1. The most outlying values identified at each of the k steps are denoted by x(n), x(n−1), . . . , x(n  −  k  +  1). 4. The critical values corresponding to the ESD statistics are ESDn,1−α , ESDn −1,1− α , . . . , ESDn − k +1,1− α . 5. We then use the following decision rule for outlier detection: If ESD( n − k +1) > ESDn − k +1,1− α , then we declare the k values x( n ) , . . . , x( n − k +1) as outliers else If ESD(n–k + 2) > ESDn–k + 2,1– α, then we declare the k – 1 values x(n), . . . , x(n–k + 2) as outliers  else  If ESD(n ) > ESDn,1–α, then we declare one outlier, x(n) else  If ESD(n) ≤ ESDn,1–α, then we declare no outliers present Thus we can declare either 0, 1, . . ., or k sample points as outliers. 6. We should use Table 10 from the Appendix to implement this procedure only if n ≥ 20.

Note that we must compute all k outlier test statistics ESD (n), ESD(n–1), . . . , ESD(n–k +1) regardless of whether any specific test statistic (e.g., ESD(n)) is significant. This procedure has good power either to declare no outliers or to detect from 1 to k outliers with little susceptibility to masking effects unless the true number of outliers is larger than k.

Example 8.25

Reanalyze the finger–wrist tapping scores for the exposed group in Figure 8.11b using the multiple-outlier procedure in Equation 8.25.

Solution

We will set the maximum number of outliers to be detected to be [35/10] = 3. From Example 8.24, we see that ESD(35) = 2.70 and the most outlying value = x(35) = 83. We remove 83 from the sample and recompute the sample mean (46.4) and standard deviation (11.8) from the reduced sample of size 34. Because |13 − 46.4| = 33.4 > |70 − 46.4| = 23.6, 13 is the most extreme value and ESD(34) = 33.4/11.8 = 2.83. We then remove 13 from the sample and recompute the sample mean (47.4) and standard deviation (10.4) from the reduced sample of size 33. Because |14 − 47.4| = 33.4 > |70 – 47.4| = 22.6, it follows that ESD(33) = 33.4/10.4 = 3.22. To assess statistical significance, we first compare 3.22 with the critical value ESD33,.95. From Table 10 in the Appendix, we see that ESD(33) = 3.22 > ESD35,.95 = 2.98 > ESD33,.95. Therefore, p < .05, and we declare the three most extreme values (83, 13, and 14) as outliers. Note that although significance was achieved by an analysis of the third most extreme value (14), once it is identified as an outlier, then the more extreme points (13, 83) are also designated as outliers. Also, note that the results are consistent with Figure 8.11b and are different from the results of the single-outlier procedure, in which no outliers were declared.

Example 8.26

Assess whether any outliers are present for the finger–wrist tapping scores for controls.

Solution

Because n = 64, min([64/10], 5) = min(6, 5) = 5. Therefore, we set the maximum number of outliers to be detected to 5 and organize the appropriate test statistics and critical values in a table (Table 8.12).

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300   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Table 8.12

Test statistics and critical values for Example 8.26 n

64 63 62 61 60

x

s

x(n)

ESD(n)

ESDn,.95

p-value

54.4 55.1 55.6 56.1 55.6

12.1 10.9 10.2 9.6 8.9

13 23 26 84 79

3.44 2.94 2.90 2.92 2.62

ESD64,.95a ESD63,.95b ESD62,.95b ESD61,.95b 3.20

ESD60,.95 = 3.20

b

From Table 8.12 we see that 79, 84, 26, and 23 are not identified as outliers, whereas 13 is identified as an outlier. Thus we declare one outlier present. This decision is consistent with the single-outlier test in Example 8.23. In general, use the multiple-outlier test in Equation 8.25 rather than the singleoutlier test in Equation 8.24 unless you are very confident there is at most one outlier. The issue remains: What should we do now that we have identified one outlier among the controls and three outliers among the exposed? We have chosen to reanalyze the data, using a two-sample t test, after deleting the outlying observations.

Example 8.27

Solution

Reanalyze the finger–wrist tapping score data in Table 8.10 after excluding the outliers identified in Examples 8.25 and 8.26. The t test results after excluding the outliers are given in Table 8.13.

Table 8.13  Comparison of mean finger–wrist tapping scores for the exposed vs. control groups after excluding outliers, using the SAS t test procedure

Variable group maxfwt maxfwt maxfwt

Lower CL N Mean

The TTEST Procedure Statistics Upper CL Lower CL Upper CL Mean Mean Std Dev Std Dev Std Dev Std Err Minimum Maximum

1 63 52.341 55.095 57.849 2 32 45.343 48.438 51.532 Diff 2.2559 6.6577 11.06 (1-2)

9.3033 6.8813 8.9312

10.935 8.5833 10.211

13.266 11.411 11.923

1.3777 1.5173 2.2167

T-Tests DF

t Value

Pr > |t|

93 77

3.00 3.25

0.0034 0.0017

Equality of Variances Num DF Den DF F Value

Pr > F

Variable

Method

Variances

maxfwt maxfwt

Pooled Satterthwaite

Equal Unequal

Variable

Method

maxfwt

Folded F

62

31

1.62

23 34

84 70

0.1424

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8.10  ■  Estimation of Sample Size and Power for Comparing Two Means   301

We see that a significant difference remains between the mean finger–wrist tapping scores for the exposed and control groups (p = .003). Indeed, the results are more significant than previously because the standard deviations are lower after exclusion of outliers, particularly for the exposed group. We can take several approaches to the treatment of outliers in performing data analyses. One approach is to use efficient methods of outlier detection and either exclude outliers from further data analyses or perform data analyses with and without outliers present and compare results. Another possibility is not to exclude the outliers but to use a method of analysis that minimizes their effect on the overall results. One method for accomplishing this is to convert continuous variables such as finger–wrist tapping score to categorical variables (for example, high = above the median vs. low = below the median) and analyze the data using categorical-data methods. We discuss this approach in Chapter 10. Another possibility is to use nonparametric methods to analyze the data. These methods make much weaker assumptions about the underlying distributions than do the normal-theory methods such as the t test. We discuss this approach in Chapter 9. Another approach is to use “robust” estimators of important population parameters (such as µ). These estimators give less weight to extreme values in the sample but do not entirely exclude them. The subject of robust estimation is beyond the scope of this book. Using each of these methods may result in a loss of power relative to using ordinary t tests if no outliers exist but offer the advantage of a gain in power if some outliers are present. In general, there is no one correct way to analyze data; the conclusions from a study are strengthened if they are consistently found by using more than one analytic technique. Software to implement the ESD Many-Outlier Procedure in Equation 8.25 in SAS is available at http://www.biostat.harvard.edu/~carey/outlier.html.

8.10 Estimation of Sample Size and Power for Comparing Two Means Estimation of Sample Size Methods of sample-size estimation for the one-sample z test for the mean of a normal distribution with known variance were presented in Section 7.6. This section covers estimates of sample size that are useful in planning studies in which two samples are to be compared.

Example 8.28

Hypertension  Consider the blood-pressure data for OC and non-OC users in Example 8.9 (p. 276) as a pilot study conducted to obtain parameter estimates to plan for a larger study. Suppose we assume the true blood-pressure distribution of 35- to 39-year-old OC users is normal with mean µ1 and variance σ12. Similarly, for non-OC users we assume the distribution is normal with mean µ2 and variance σ22. We wish to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2. How can we estimate the sample size needed for the larger study? Suppose we assume σ 12 and σ 22 are known and we anticipate equal sample sizes in the two groups. To conduct a two-sided test with significance level α and power of 1 – β, the appropriate sample size for each group is as follows:

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302   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

Equation 8.26

Sample Size Needed for Comparing the Means of Two Normally Distributed Samples of Equal Size Using a Two-Sided Test with Significance Level α and Power 1 – β

( σ12 + σ22 ) ( z1−α /2 + z1−β ) n=

2

∆2

 = sample size for each group

where ∆ = |µ2 – µ1|. The means and variances of the two respective groups are (µ1, σ12) and (µ2, σ22).

In words, n is the appropriate sample size in each group to have a probability of 1 – β of finding a significant difference based on a two-sided test with significance level α, if the absolute value of the true difference in means between the two groups is ∆ = |µ2 – µ1|, and a two-sided type I error of a is used.

Example 8.29

Hypertension  Determine the appropriate sample size for the study proposed in Example 8.28 using a two-sided test with a significance level of .05 and a power of .80.

Solution

In the small study, x1= 132.86, s1 = 15.34, x2 = 127.44, and s2 = 18.23. If the sample data (x1, s12, x2 , s22 ) are used as estimates of the population parameters (µ1, σ12, µ2, σ22 ), then ensuring an 80% chance of finding a significant difference using a two-sided significance test with α = .05 would require a sample size of

)

(

n = 15.342 + 18.232 (1.96 + 0.84 )

2

(132.86 − 127.44 )2 = 151.5

or 152 people in each group. Not surprisingly, no significant difference was found in Example 8.10 with sample sizes of 8 and 21 in the two groups, respectively. In many instances an imbalance between the groups can be anticipated and it can be predicted in advance that the number of people in one group will be k times the number in the other group for some number k ≠ 1. In this case, where n2 = kn1, the appropriate sample size in the two groups for achieving a power of 1 – β using a two-sided level α significance test is given by the following formulas:

Equation 8.27

Sample Size Needed for Comparing the Means of Two Normally Distributed Samples of Unequal Size Using a Two-Sided Test with Significance Level α and Power 1 – β

( σ12 + σ22 k ) ( z1−α /2 + z1−β ) =

2

n1

n2 =

∆2

( kσ12 + σ 22 ) ( z1−α /2 + z1−β )

= sample size of first group

2

∆2

= sample size of second group

where ∆ = |µ2 – µ1|; (µ1, σ12), (µ2, σ22), are the means and variances of the two respective groups and k = n2/n1 = the projected ratio of the two sample sizes.

Note that if k = 1, then the sample-size estimates given in Equation 8.27 are the same as those in Equation 8.26.

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8.10  ■  Estimation of Sample Size and Power for Comparing Two Means   303

Example 8.30

Hypertension  Suppose we anticipate twice as many non-OC users as OC users entering the study proposed in Example 8.28. Project the required sample size if a twosided test is used with a 5% significance level and an 80% power is desired.

Solution

If Equation 8.27 is used with µ1 = 132.86, σ1 = 15.34, µ2 =127.44, σ2 = 18.23, k = 2, α = .05, and 1 – β = .8, then in order to achieve an 80% power in the study using a two-sided significance test with α = .05 we need to enroll

n1 =

(15.342 + 18.232 / 2 ) (1.96 + 0.84)2 = 107.1, or 108 OC users (132.86 − 127.444 )2

and n2 = 2(108) = 216 non-OC users If the variances in the two groups are the same, then for a given α, β, the smallest total sample size needed is achieved by the equal-sample-size allocation rule in Equation 8.26. Thus in the case of equal variances, the sample sizes in the two groups should be as nearly equal as possible. Finally, to perform a one-sided rather than a two-sided test, we substitute α for α/2 in Equations 8.26 and 8.27.

Estimation of Power In many situations, a predetermined sample size is available for study and how much power the study will have for detecting specific alternatives needs to be determined.

Example 8.31

Hypertension  Suppose 100 OC users and 100 non-OC users are available for study and a true difference in mean SBP of 5 mm Hg is anticipated, with OC users having the higher mean SBP. How much power would such a study have assuming that the variance estimates in the pilot study in Example 8.9 are correct? Assuming σ12 and σ22 are known, the power using a two-sided test with significance level α is given by Equation 8.28.

Equation 8.28

Power for Comparing the Means of Two Normally Distributed Samples Using a Significance Level α  To test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2 for the specific alternative |µ1 – µ2| = ∆, with significance level α,   ∆ Power = Φ  − z1− α / 2 +  2 2  σ1 n1 + σ 2 n2  where (µ1, σ12), (µ2, σ22) are the means and variances of the two respective groups and n1, n2 are the sample sizes of the two groups.

Example 8.32

Hypertension  Estimate the power available for the study proposed in Example 8.31 using a two-sided test with significance level = .05.

Solution

From Example 8.31, n1 = n2= 100, ∆ = 5, σ1 = 15.34, σ2 = 18.23, and α = .05. Therefore, from Equation 8.28,

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304   C H A P T E R 8 

  Hypothesis Testing: Two-Sample Inference

  5  5  Power = Φ  − z.975 +  = Φ  −1.96 +  2 2   2.383  15.34 100 + 18.23 100  = Φ ( −1.96 + 2.099) = Φ ( 0.139) = .555

Thus there is a 55.5% chance of detecting a significant difference using a two-sided test with significance level = .05. To calculate power for a one-sided rather than a two-sided test, simply substitute α for α/2 in Equation 8.28.

8.11 Sample-Size Estimation for Longitudinal Studies Longitudinal studies often involve comparing mean change scores between two groups. If there have been previous longitudinal studies, then the standard deviation of change scores can be obtained from these studies and the methods of power and sample size estimation in Section 8.10 can be used. However, often there are no previous longitudinal studies. Instead, there may be small reproducibility studies in which the correlation between repeated measures on the same subject over time is known.

Example 8.33

Hypertension  Suppose we are planning a longitudinal study to compare the mean change in SBP between a treated and a control group. It is projected, based on previous data, that the standard deviation of SBP at both baseline and follow-up is 15 mm Hg and that the correlation coefficient between repeated SBP values 1 year apart is approximately .70. How many participants do we need to study to have 80% power to detect a significant difference between groups using a two-sided test with α = .05 if the true mean decline in SBP over 1 year is 8 mm Hg for the treated group and 3 mm Hg for the control group? To answer the question posed in Example 8.33, we would like to apply the sample-size formula given in Equation 8.26. However, using Equation 8.26 requires knowledge of the variances of change in SBP for each of the treated and control groups. Considering the control group first, let

x1i = SBP for the ith subject in the control group at baseline

x2i = SBP for the ith subject in the control group at 1 year

Therefore,

di = x2i – x1i = change in SBP for the ith subject in the control group over 1 year If x1i and x2i were independent, then from Equation 5.9 it would follow that

Var(di) = σ22 + σ12, where

σ 12 = variance of baseline SBP in the control group

σ 22 = variance of 1-year SBP in the control group However, repeated SBP measures on the same person are usually not independent. The correlation between them will, in general, depend on the time interval between the baseline and follow-up measures. Let us assume that the correlation coefficient

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8.11  ■  Sample-Size Estimation for Longitudinal Studies   305

between measures 1 year apart is ρ. We have defined a correlation coefficient in Chapter 5, and in Chapter 11 we will discuss how to estimate correlation coefficients from sample data. Then from Equation 5.11, we have

Var ( x2 i − x1i ) = σ 22 + σ12 − 2ρσ1σ 2 = σ 2d

Equation 8.29

where σd2 = variance of change in SBP.

For simplicity, we will assume that σ 12, σ 22 , ρ, and σ 2d are the same in the treated and control groups. We wish to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2, where

µ1 = true mean change in the control group µ2 = true mean change in the active group

Based on Equations 8.26 and 8.29, we obtain the following sample-size estimate.

Equation 8.30

Sample Size Needed for Longitudinal Studies Comparing Mean Change in Two Normally Distributed Samples with Two Time Points  Suppose we are planning a longitudinal study with an equal number of subjects (n) in each of two groups. We wish to test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2, where µ1 = underlying mean change over time t in group 1 µ2 = underlying mean change over time t in group 2 We will conduct a two-sided test at level α and wish to have a power of 1 – β of detecting a significant difference if |µ1 – µ2| = δ under H1. The required sample size per group is

n=

(

)

2

2 σ 2d z1− α / 2 + z1− β δ2

where σd2 = σ12 + σ22 – 2ρσ1σ2 σ12 = variance of baseline values within a treatment group σ22 = variance of follow-up values within a treatment group ρ = c orrelation coefficient between baseline and follow-up values within a treatment group

Solution to Example 8.33

We have σ12 = σ22 = 152 = 225, ρ = .70, and δ = -8 - (–3) = -5 mm Hg. Therefore, σd2 = 225 + 225 – 2(.70)(15)(15) = 135 Also, z1– α/2 = z.975 = 1.96, z1–β = z.80 = 0.84. Thus n=

2 (135) (1.96 + 0.84 )

2

( −5)

2

2116.8 = = 84.7, or 85 subjects in each group 25

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306   C H A P T E R 8 

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Similar to Equation 8.30, we can also consider the power of a longitudinal study given α, σ12, σ22, ρ, and a specified sample size per group (n).

Equation 8.31

Power of a Longitudinal Study Comparing Mean Change Between Two Normally Distributed Samples with Two Time Points  To test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2, where µ1 = underlying mean change over time t in treatment group 1 µ2 = underlying mean change over time t in treatment group 2 for the specific alternative |µ1 – µ2| = δ, with two-sided significance level α, and sample of size n in each group, the power is given by

 n δ Power = Φ  − z1− α /2 + σ d 2  

where σd2 = σ 12 + σ 22 – 2ρσ1σ2 σ 12 = variance of baseline values within a treatment group σ 22 = variance of follow-up values within a treatment group

ρ = correlation between baseline and follow-up values over time t within a treatment group

Example 8.34

Hypertension  Suppose that 75 participants per group are recruited for the study described in Example 8.33. How much power will the study have under the same assumptions as in Example 8.33?

Solution

We have n = 75, α = .05, d = –5 mm Hg, σ d2 =135 (from the solution to Example 8.33). Thus  75(5)  Power = Φ  − z.975 + 135(2 )   0 43.30  = Φ  −1.96 +   16.43 

= Φ ( 0.675) = .750

Thus the study will have 75% power to detect this difference. Note that based on Equations 8.30 and 8.31, as the correlation coefficient between repeated measures decreases, the variance of change scores (σd2) increases, resulting in an increase in the required sample size for a given level of power (Equation 8.30) and a decrease in power for a given sample size (Equation 8.31). Thus measures that are less reproducible over time require a larger sample size for hypothesis-testing purposes. Also, as the length of follow-up (t) increases, the correlation between repeated measures usually decreases. Therefore, studies with longer follow-up (say, 2 years)

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8.12  ■  Summary   307

require a larger sample size than studies with a shorter follow-up (say, 1 year) to detect a difference of the same magnitude (d). However, in some instances the expected difference between groups (d) may increase as t increases. Thus the overall impact of length of follow-up on sample size is uncertain. Finally, if data already exist on change scores over the time period t (either from a pilot study or from the literature), then the variance of change (σd2) can be estimated directly from the sample variance of change (in the pilot study or the literature), and it is unnecessary to use Equation 8.29 to compute σd2. However, a common mistake is to run a pilot study based on repeated measures a short time apart (e.g., 1 week) and base the estimate of σd2 on difference scores from this pilot study, even when the length of the main investigation is much longer (e.g., 1 year). This usually results in an underestimate of σd2 (or, correspondingly, an overestimate of ρ) and results in an underestimate (sometimes sizable) of required sample size for a given level of power or an overestimate of power for a given sample size [5]. The methods described in this section are for studies with a single follow-up visit. For studies with more follow-up visits, more complicated methods of sample size and power estimation are needed [5].

8.12 Summary In this chapter, we studied methods of hypothesis testing for comparing the means and variances of two samples that are assumed to be normally distributed. The basic strategy is outlined in the flowchart in Figure 8.13, which is an extract from the larger flowchart in the back of this book (pp. 841–846). Referring to 1 in the upper left, first note that we are dealing with the case of a two-sample problem in which either the underlying distributions are normal or the central-limit theorem can be assumed to hold. If we are interested in comparing the means of the two samples, then we refer to box 3. If our two samples are paired—that is, if each person is used as his or her own control or if the samples consist of different people who are matched on a one-to-one basis—then the paired t test is appropriate. If the samples are independent, then the F test for the equality of two variances is used to decide whether the variances are significantly different. If the variances are not significantly different, then the two-sample t test with equal variances is used; if the variances are significantly different, then the twosample t test with unequal variances is used. If we are only comparing the variances of the two samples, then only the F test for comparing variances is used, as indicated in the lower left of Figure 8.13. The chapter concluded by providing methods for the detection of outliers and presenting the appropriate sample size and power formulas for planning investigations in which the goal is to compare the means from two independent samples. We considered sample size and power formulas for both cross-sectional and longitudinal studies. In Chapter 9, we extend our work on the comparison of two samples to the case in which there are two groups to be compared but the assumption of normality is questionable. We will introduce nonparametric methods to solve this problem to complement the parametric methods discussed in Chapters 7 and 8.

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308   C H A P T E R 8 

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Figure 8.13

Flowchart summarizing two-sample statistical inference—normal-theory methods 3

No

Are samples independent?

Use paired t test page 272

1 Yes No

Two-sample problem?

Are variances of two samples significantly different? Note: Test using F test

Go to 2 Yes

(Use methods for comparing more than two samples)

Underlying distribution normal or can central-limit theorem be assumed to hold?

Use two-sample t test with unequal variances page 288 No

Yes

No

Yes

Yes Go to 3

Use two-sample t test with equal variances page 277

Yes

Underlying distribution is binomial?

Inferences concerning means?

No

Person-time data? Yes Go to

No

Inferences concerning variances

Are samples independent?

Yes

Are all expected values ≥ 5 ? Two-sample F test to compare variances (Caution: This test is very sensitive to nonnormality) page 284

No

Use another underlying distribution or use nonparametric methods page 341

5

No Use McNemar’s test pages 375, 377 No

Use Fisher’s exact test page 371

Yes Use two-sample test for binomial proportions or 2 × 2 contingency-table methods if no confounding is present, or Mantel-Haenszel test if confounding is present

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Problems   309

P rob l ems 8.1  Find the lower 2.5th percentile of an F distribution with 14 and 7 df. What symbol is used to denote this?

that the population parameters are the same as the sample estimates in Problem 8.2?

Nutrition

*8.16  Answer Problem 8.15 if a one-sided rather than a two-sided test is used.

The mean ±1 sd of ln [calcium intake (mg)] among 25 females, 12 to 14 years of age, below the poverty level is 6.56 ± 0.64. Similarly, the mean ± 1 sd of ln [calcium intake (mg)] among 40 females, 12 to 14 years of age, above the poverty level is 6.80 ± 0.76. 8.2  Test for a significant difference between the variances of the two groups. 8.3  What is the appropriate procedure to test for a significant difference in means between the two groups? 8.4  Implement the procedure in Problem 8.3 using the critical-value method. 8.5  What is the p-value corresponding to your answer to Problem 8.4? 8.6  Compute a 95% CI for the difference in means between the two groups. Refer to the data in Table 2.11. 8.7  Test for a significant difference in the variances of the initial white blood cell count between patients who did and patients who did not receive a bacterial culture. 8.8  What is the appropriate test procedure to test for significant differences in mean white blood cell count between people who do and people who do not receive a bacterial culture? 8.9  Perform the procedure in Problem 8.8 using the criticalvalue method. 8.10  What is the p-value corresponding to your answer to Problem 8.9? 8.11  Compute a 95% CI for the true difference in mean white blood cell count between the two groups. Refer to Problem 8.2. *8.12  Suppose an equal number of 12- to 14-year-old girls below and above the poverty level are recruited to study differences in calcium intake. How many girls should be recruited to have an 80% chance of detecting a significant difference using a two-sided test with α = .05? *8.13  Answer Problem 8.12 if a one-sided rather than a two-sided test is used. *8.14  Using a two-sided test with α = .05, answer Problem 8.12, anticipating that two girls above the poverty level will be recruited for every one girl below the poverty level who is recruited. *8.15  Suppose 50 girls above the poverty level and 50 girls below the poverty level are recruited for the study. How much power will the study have of finding a significant difference using a two-sided test with α = .05, assuming

*8.17  Suppose 50 girls above the poverty level and 25 girls below the poverty level are recruited for the study. How much power will the study have if a two-sided test is used with α = .05? *8.18  Answer Problem 8.17 if a one-sided test is used with α = .05.

Ophthalmology The drug diflunisal is used to treat mild to moderate pain, osteoarthritis (OA), and rheumatoid arthritis (RA). The ocular effects of diflunisal had not been considered until a study was conducted on its effect on intraocular pressure in glaucoma patients who were already receiving maximum therapy for glaucoma [6]. *8.19  Suppose the change (mean ± sd ) in intraocular pressure after administration of diflunisal (follow-up – baseline) among 10 patients whose standard therapy was methazolamide and topical glaucoma medications was −1.6 ± 1.5 mm Hg. Assess the statistical significance of the results. *8.20  The change in intraocular pressure after administration of diflunisal among 30 patients whose standard therapy was topical drugs only was −0.7 ± 2.1 mm Hg. Assess the statistical significance of these results. *8.21  Compute 95% CIs for the mean change in pressure in each of the two groups identified in Problems 8.19 and 8.20. *8.22  Compare the mean change in intraocular pressure in the two groups identified in Problems 8.19 and 8.20 using hypothesis-testing methods.

Cardiovascular Disease, Pediatrics A study in Pittsburgh measured various cardiovascular risk factors in children at birth and during their first 5 years of life [7]. In particular, heart rate was assessed at birth, 5 months, 15 months, 24 months, and annually thereafter until 5 years of age. Heart rate was related to age, sex, race, and socioeconomic status. The data in Table 8.14 were presented relating heart rate to race among newborns. Table 8.14  Relationship of heart rate to race among newborns Race

White Black

Mean heart rate (beats per minute)

sd

n

125 133

11 12

218 156

Source: Reprinted with permission of the American Journal of Epidemiology, 119(4), 554–563.

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310   C H A P T E R 8 

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8.23  Test for a significant difference in mean heart rate between Caucasian and African-American newborns. 8.24  Report a p-value for the test performed in Problem 8.23.

Pharmacology One method for assessing the bioavailability of a drug is to note its concentration in blood and/or urine samples at certain periods of time after the drug is given. Suppose we want to compare the concentrations of two types of aspirin (types A and B) in urine specimens taken from the same person 1 hour after he or she has taken the drug. Hence, a specific dosage of either type A or type B aspirin is given at one time and the 1-hour urine concentration is measured. One week later, after the first aspirin has presumably been cleared from the system, the same dosage of the other aspirin is given to the same person and the 1-hour urine concentration is noted. Because the order of giving the drugs may affect the results, a table of random numbers is used to decide which of the two types of aspirin to give first. This experiment is performed on 10 people; the results are given in Table 8.15.

Table 8.15  Concentration of aspirin in urine samples Person

Aspirin A 1-hour concentration (mg%)

Aspirin B 1-hour concentration (mg%)

1 2 3 4 5 6 7 8 9 10

15 26 13 28 17 20 7 36 12 18

13 20 10 21 17 22 5 30 7 11

Mean sd

19.20 8.63

15.60 7.78

Suppose we want to test the hypothesis that the mean concentrations of the two drugs are the same in urine specimens. *8.25  What are the appropriate hypotheses? *8.26  What are the appropriate procedures to test these hypotheses? *8.27  Conduct the tests mentioned in Problem 8.26. *8.28  What is the best point estimate of the mean difference in concentrations between the two drugs?

*8.29  What is a 95% CI for the mean difference? 8.30  Suppose an α level of .05 is used for the test in Problem 8.27. What is the relationship between the decision reached with the test procedure in Problem 8.27 and the nature of the CI in Problem 8.29?

Pulmonary Disease A 1980 study was conducted whose purpose was to compare the indoor air quality in offices where smoking was permitted with that in offices where smoking was not permitted [8]. Measurements were made of carbon monoxide (CO) at 1:20 p.m. in 40 work areas where smoking was permitted and in 40 work areas where smoking was not permitted. Where smoking was permitted, the mean CO level was 11.6 parts per million (ppm) and the standard deviation CO was 7.3 ppm. Where smoking was not permitted, the mean CO was 6.9 ppm and the standard deviation CO was 2.7 ppm. 8.31  Test for whether the standard deviation of CO is significantly different in the two types of working environments. 8.32  Test for whether or not the mean CO is significantly different in the two types of working environments. 8.33  Provide a 95% CI for the difference in mean CO between the smoking and nonsmoking working environments.

Ophthalmology A camera has been developed to detect the presence of cataract more accurately. Using this camera, the gray level of each point (or pixel) in the lens of a human eye can be characterized into 256 gradations, where a gray level of 1 represents black and a gray level of 256 represents white. To test the camera, photographs were taken of 6 randomly selected normal eyes and 6 randomly selected cataractous eyes (the two groups consist of different people). The median gray level of each eye was computed over the 10,000+ pixels in the lens. The data are given in Table 8.16. Table 8.16  Median gray level for cataractous and normal eyes Patient number

Cataractous median gray level

Normal median gray level

1 2 3 4 5 6

161 140 136 171 106 149

158 182 185 145 167 177

x

143.8 22.7

169.0 15.4

s

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Problems   311

8.34  What statistical procedure can be used to test whether there is a significant difference in the median gray levels between cataractous and normal eyes?

8.39  Perform both a paired and an unpaired analysis of the data. Does the type of analysis affect the assessment of the results? Explain.

8.35  Carry out the test procedure mentioned in Problem 8.34, and report a p-value. 8.36  Provide a 99% CI for the mean difference in median gray levels between cataractous and normal eyes.

8.40  Suppose patient 3 in the control group moves to another city before giving birth and her child’s weight is unknown. Does this event affect the analyses in Problem 8.39? If so, how?

Obstetrics

Pulmonary Disease

A clinical trial is conducted at the gynecology unit of a major hospital to determine the effectiveness of drug A in preventing premature birth. In the trial, 30 pregnant women are to be studied, 15 in a treatment group to receive drug A and 15 in a control group to receive a placebo. The patients are to take a fixed dose of each drug on a one-time-only basis between the 24th and 28th weeks of pregnancy. The patients are assigned to groups based on computer-generated random numbers, where for every two patients eligible for the study, one is assigned randomly to the treatment group and the other to the control group.

A possible important environmental determinant of lung function in children is amount of cigarette smoking in the home. Suppose this question is studied by selecting two groups: Group 1 consists of 23 nonsmoking children 5−9 years of age, both of whose parents smoke, who have a mean forced expiratory volume (FEV) of 2.1 L and a standard deviation of 0.7 L; group 2 consists of 20 nonsmoking children of comparable age, neither of whose parents smoke, who have a mean FEV of 2.3 L and a standard deviation of 0.4 L.

8.37  Suppose you are conducting the study. What would be a reasonable way of allocating women to the treatment and control groups?

*8.41  What are the appropriate null and alternative hypotheses in this situation? *8.42  What is the appropriate test procedure for the hypotheses in Problem 8.41?

Suppose the weights of the babies are those given in Table 8.17.

*8.43  Carry out the test in Problem 8.42 using the criticalvalue method.

Table 8.17  Birthweights in a clinical trial to test a drug for preventing low-birthweight deliveries

*8.44  Provide a 95% CI for the true mean difference in FEV between 5- to 9-year-old children whose parents smoke and comparable children whose parents do not smoke.

Patient number

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15

Baby weight (lb) Treatment group

Control group

6.9 7.6 7.3 7.6 6.8 7.2 8.0 5.5 5.8 7.3 8.2 6.9 6.8 5.7 8.6

6.4 6.7 5.4 8.2 5.3 6.6 5.8 5.7 6.2 7.1 7.0 6.9 5.6 4.2 6.8

8.38  How would you assess the effects of drug A in light of your answer to Problem 8.37? Specifically, would you use a paired or an unpaired analysis, and of what type?

*8.45  If this is regarded as a pilot study, how many children are needed in each group (assuming equal numbers in each group) to have a 95% chance of detecting a significant difference using a two-sided test with α = .05? *8.46  Answer the question in Problem 8.45 if the investigators use a one-sided rather than a two-sided test. Suppose 40 children, both of whose parents smoke, and 50 children, neither of whose parents smoke, are recruited for the study. *8.47  How much power would such a study have using a two-sided test with significance level = .05, assuming that the estimates of the population parameters in the pilot study are correct? *8.48  Answer Problem 8.47 if a one-sided rather than a two-sided test is used.

Infectious Disease The degree of clinical agreement among physicians on the presence or absence of generalized lymphadenopathy was assessed in 32 randomly selected participants from a prospective study of male sexual contacts of men with acquired immunodeficiency syndrome (AIDS) or an

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312   C H A P T E R 8 

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AIDS-related condition (ARC) [9]. The total number of palpable lymph nodes was assessed by each of three physicians. Results from two of the three physicians are presented in Table 8.18.

8.51  Perform the test in Problem 8.49, and report a pvalue.

8.49  What is the appropriate test procedure to determine whether there is a systematic difference between the assessments of Doctor A vs. Doctor B?

8.52  Compute a 95% CI for the true mean difference between observers. How does it relate to your answer to Problem 8.51?

Table 8.18  Reproducibility of assessment of number of palpable lymph nodes among sexual contacts of AIDS or ARC patients

Number of palpable lymph nodes

Patient

Doctor A

Doctor B

Difference

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32

4 17 3 11 12 5 5 6 3 5 9 1 5 8 7 8 4 12 10 9 5 3 12 5 13 12 6 19 8 15 6 5

1 9 2 13 9 2 6 3 0 0 6 1 4 4 7 6 1 9 7 11 0 0 12 1 9 6 9 9 4 9 1 4

3 8 1 −2 3 3 −1 3 3 5 3 0 1 4 0 2 3 3 3 −2 5 3 0 4 4 6 −3 10 4 6 5 1

Mean sd n

7.91 4.35 32

5.16 3.93 32

2.75 2.83 32

8.50  Should a one-sided or a two-sided test be performed? Why?

8.53  Suppose the results of Problem 8.51 show no significant difference. Does this mean this type of assessment is highly reproducible? Why or why not?

Renal Disease Ten patients with advanced diabetic nephropathy (kidney complications of diabetes) were treated with captopril over an 8-week period [10]. Urinary protein was measured before and after drug therapy, with results listed in Table 8.19 in both the raw and ln scale. Table 8.19  Changes in urinary protein after treatment with captopril Patient

  1   2   3   4   5   6   7   8   9 10

Raw scale urinary protein (g/24 hr)

ln Scale urinary protein ln (g/24 hr)

Before

After

Before

After

25.6 17.0 16.0 10.4 8.2 7.9 5.8 5.4 5.1 4.7

10.1 5.7 5.6 3.4 6.5 0.7 6.1 4.7 2.0 2.9

3.24 2.83 2.77 2.34 2.10 2.07 1.76 1.69 1.63 1.55

2.31 1.74 1.72 1.22 1.87 −0.36 1.81 1.55 0.69 1.06

*8.54  What is the appropriate statistical procedure to test whether mean urinary protein has changed over the 8-week period? *8.55  Perform the test in Problem 8.54 using both the raw and ln scale, and report a p-value. Are there any advantages to using the raw or the ln scale? *8.56  What is your best estimate of the percent change in urinary protein based on the data in Table 8.19? *8.57  Provide a 95% CI associated with your estimate in Problem 8.56.

Nutrition An important hypothesis in hypertension research is that sodium restriction may lower blood pressure. However, it is difficult to achieve sodium restriction over the long term,

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Problems   313

and dietary counseling in a group setting is sometimes used to achieve this goal. The data on urinary sodium in Table 8.20 were obtained on 8 individuals enrolled in a sodium-restricted group. Data were collected at baseline and after 1 week of dietary counseling. Table 8.20  Overnight sodium excretion (mEq/8hr) before and after dietary counseling Person

Week 0 (baseline)

Mean sd n

Men

Women

253.3 44.1

271.0 44.1

44

48

Note: n = number of people (e.g., for males, 22 pairs of twins = 44 people)

Week 1

Difference

1 2 3 4 5 6 7 8

7.85 12.03 21.84 13.94 16.68 41.78 14.97 12.07

9.59 34.50 4.55 20.78 11.69 32.51 5.46 12.95

−1.74 −22.47 17.29 −6.84 4.99 9.27 9.51 −0.88

x

17.65 10.56

16.50 11.63

1.14 12.22

s

Table 8.21  Comparison of mean total cholesterol for MZ twins reared apart, by sex

*8.63  If we assume (a) serum cholesterol is normally distributed, (b) the samples are independent, and (c) the standard deviations for men and women are the same, then what is the name of the statistical procedure that can be used to compare the two groups? *8.64  Suppose we want to use the procedure in Problem 8.63 using a two-sided test. State the hypotheses being tested, and implement the method. Report a p-value. *8.65  Suppose we want to use the procedure in Problem 8.63 using a one-sided test in which the alternative hypothesis is that men have higher cholesterol levels than women. State the hypotheses being tested and implement the method in Problem 8.63. Report a p-value.

8.58  What are appropriate hypotheses to test whether dietary counseling is effective in reducing sodium intake over a 1-week period (as measured by overnight urinary sodium excretion)?

*8.66  Are the assumptions in Problem 8.63 likely to hold for these samples? Why or why not?

8.59  Conduct the test mentioned in Problem 8.58, and report a p-value.

Pulmonary Disease

8.60  Provide a 95% CI for the true mean change in overnight sodium excretion over a 1-week period. 8.61  How many participants would be needed to have a 90% chance of detecting a significant change in mean urinary sodium excretion if a one-sided test is used with α = .05 and the estimates from the data in Table 8.20 are used as the true population parameters? Refer to Data Set NIFED.DAT on the Companion Website. See p. 140 for a complete description of the data set. 8.62  Assess whether there is any difference between the nifedipine and propranolol groups regarding their effects on blood pressure and heart rate. Refer to the indices of change defined in Problems 6.70−6.74.

Genetics A study was conducted of genetic and environmental influences on cholesterol levels. The data set used for the study were obtained from a twin registry in Sweden [11]. Specifically, four populations of adult twins were studied: (1) monozygotic (MZ) twins reared apart, (2) MZ twins reared together, (3) dizygotic (DZ) twins reared apart, and (4) DZ twins reared together. One issue is whether it is necessary to correct for sex before performing more complex genetic analyses. The data in Table 8.21 were presented for total cholesterol levels for MZ twins reared apart, by sex.

A study was performed looking at the effect of mean ozone exposure on change in pulmonary function. Fifty hikers were recruited into the study; 25 study participants hiked on days with low-ozone exposure, and 25 hiked on days with highozone exposure. The change in pulmonary function after a 4-hour hike was recorded for each participant. The results are given in Table 8.22. Table 8.22  Comparison of change in FEV on highozone vs. low-ozone days Ozone level

Mean change in FEVa

sd

n

High

0.101

0.253

25

Low

0.042

0.106

25

Change in FEV, forced expiratory volume, in 1 second (L) (baseline – follow-up)

a

8.67  What test can be used to determine whether the mean change in FEV differs between the high-ozone and low-ozone days? 8.68  Implement the test in Problem 8.67, and report a p-value (two-tailed). 8.69  Suppose we determine a 95% CI for the true mean change in pulmonary function on high-ozone days. Is this CI

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314   C H A P T E R 8 

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narrower, wider, or the same width as a 90% CI? (Do not actually compute the CI.)

were obtained for change in total duration of exercise (min) (6 months – baseline).

Rheumatology

*8.74  What test can be performed to test for change in mean total duration of exercise for a specific treatment group?

A study was conducted [12] comparing muscle function between patients with rheumatoid arthritis (RA) and osteoarthritis (OA). A 10-point scale was used to assess balance and coordination in which a high score indicates better coordination. The results were as shown in Table 8.23 for 36 RA patients and 30 OA patients. Table 8.23  Comparison of balance scores for patients with RA vs. OA

RA OA

sd

n

3.4 2.5

3.0 2.8

36 30

*8.70  What test can be used to determine whether the mean balance score is the same for RA and OA patients? What are some assumptions of this test? *8.71  Perform the test mentioned in Problem 8.70, and report a p-value. *8.72  What is your best estimate of the proportion of RA and OA patients with impaired balance, where impaired balance is defined as a balance score ≤2 and normality is assumed? *8.73  Suppose a larger study is planned. How many participants are needed to detect a difference of 1 unit in mean balance score with 80% power if the number of participants in each group is intended to be the same and a two-sided test is used with α = .05?

Cardiology A clinical trial compared percutaneous transluminal coronary angioplasty (PTCA) with medical therapy in treating single-vessel coronary-artery disease [13]. Researchers randomly assigned 107 patients to medical therapy and 105 to PTCA. Patients were given exercise tests at baseline and after 6 months of follow-up. Exercise tests were performed up to maximal effort until clinical signs (such as angina) were present. The results shown in Table 8.24 Table 8.24  Change in total duration of exercise for patients with coronary-artery disease randomized to medical therapy vs. PTCA

Medical therapy PTCA

*8.76  What test can be performed to compare the mean change in duration of exercise between the two treatment groups? *8.77  Perform the test mentioned in Problem 8.76, and report a p-value.

Hypertension

Mean balance score

*8.75  Perform the test in Problem 8.74 for the medical therapy group, and report a p-value.

Mean change (min)

sd

n

0.5 2.1

2.2 3.1

100 99

A case–control study was performed among participants in the Kaiser Permanente Health Plan to compare body-fat distribution among “hypertensive” people who were normotensive at entry into the plan and became hypertensive over time as compared with “normotensives” who remained normotensive throughout their participation in the plan. A match was found for each “hypertensive” person of the same sex, race, year of birth, and year of entry into the plan; 609 matched pairs were created. The data in Table 8.25 represent body mass index (BMI) at baseline in the two groups [14]. 8.78  What are the advantages of using a matched design for this study? 8.79  What test procedure can be used to test for differences in mean BMI between the two groups? 8.80  Implement the test procedure in Problem 8.79, and report a p-value. 8.81  Compute a 90% CI for the mean difference in BMI between the two groups.

Hepatic Disease An experiment was conducted to examine the influence of avian pancreatic polypeptide (aPP), cholecystokinin (CCK), vasoactive intestinal peptide (VIP), and secretin on pancreatic and biliary secretions in laying hens. In particular, researchers were concerned with the extent to which these hormones increase or decrease biliary and pancreatic flows and their pH values. White leghorn hens, 14−29 weeks of age, were surgically fitted with cannulas for collecting pancreatic and biliary secretions and a jugular cannula for continuous infusion of aPP, CCK, VIP, or secretin. One trial per day was conducted on a hen, as long as her implanted cannulas remained functional. Thus there were varying numbers of trials per hen. Each trial began with infusion of physiologic saline for 20 minutes. At the end of this period, pancreatic and biliary secretions were collected and the cannulas were attached to new vials. The biliary and pancreatic flow rates (in microliters per

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Problems   315

Table 8.25  Comparison of BMI for people who developed hypertension vs. people who remained normotensive

Cases

Controls

Mean

sd

Mean

sd

Mean difference

Test statistic

BMI (kg/m2)

25.39

3.75

24.10

3.42

1.29

6.66

minute) and pH values (if possible) were measured. Infusion of a hormone was then begun and continued for 40 minutes. Measurements were then repeated. Data Set HORMONE.DAT (on the Companion Website) contains data for the four hormones and saline, where saline indicates trials in which physiologic saline was infused in place of an active hormone during the second period. Each trial is one record in the file. There are 11 variables associated with each trial, as shown in Table 8.26. 8.82  Assess whether there are significant changes in secretion rates or pH levels with any of the hormones or with saline. 8.83  Compare the changes in secretion rate or pH levels for each active hormone vs. the placebo (saline) group. Use methods of hypothesis testing and/or CIs to express these comparisons statistically. 8.84  For each active-hormone group, categorize dosage by high dose (above the median) vs. low dose (at or below the median) and assess whether there is any doseresponse relationship (any differences in mean changes in secretion rates or pH between the high- and low-dose groups). Refer to Data Set FEV.DAT, on the Companion Website.

8.85  Compare the level of mean FEV between males and females separately in three distinct age groups (5−9, 10−14, and 15−19 years). 8.86  Compare the level of mean FEV between smokers and nonsmokers separately for 10- to 14-year-old boys, 10- to 14-year-old girls, 15- to 19-year-old boys, and 15- to 19year-old girls.

Hypertension, Pediatrics Refer to Data Set INFANTBP.DAT and INFANTBP.DOC, both on the Companion Website. Consider again the salt-taste indices and sugar-taste indices constructed in Problems 6.56−6.57. 8.87  Obtain a frequency distribution, and subdivide infants as high or low according to whether they are above or below the median value for the indices. Use hypothesis-testing and CI methodology to compare mean blood-pressure levels between children in the high and low groups. 8.88  Answer Problem 8.87 in a different way by subdividing the salt- and sugar-taste indices more finely (such as quintiles or deciles). Compare mean blood-pressure level for children at the extremes (i.e., those at the highest quintile vs. the lowest quintile). Do you get the impression that the indices are related to blood-pressure level? Why or why

Table 8.26  Format of HORMONE.DAT Column

Record number

1−8 10−17 19−26 28−35 37−44 46−53 55−62 64−71 1−8 10−17 19−26

1 1 1 1 1 1 1 1 2 2 2

Format of HORMONE.DAT

Code

Unique identification number for each chicken Biliary secretion rate (pre) Biliary pH (pre) Pancreatic secretion rate (pre) Pancreatic pH (pre) Dosage of hormone Biliary secretion rate (post) Biliary pH (post) Pancreatic secretion rate (post) Pancreatic pH (post) Hormone (1 = saline; 2 = aPP, 3 = CCK; 4 = secretin; 5 = VIP) Zero values for pH indicate missing values. The units for dosages are nanograms per mL of plasma for aPP, and µg per kg per hour for CCK, VIP, and secretin.

xx.x xx.x xx.x xx.x x.x xx.x xx.x x.x xx.x x.x xx.x

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316   C H A P T E R 8 

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not? We discuss this from a different point of view in our work on regression analysis in Chapter 11 and the analysis of variance in Chapter 12.

Sports Medicine Tennis elbow is a painful condition that afflicts many tennis players at some time. A number of different treatments are used for this condition, including rest, heat, and anti-inflammatory medications. A clinical trial was conducted among 87 participants, comparing the effectiveness of Motrin (generic name, ibuprofen), a widely used anti-inflammatory agent, vs. placebo. Participants received both drug and placebo, but the order of administration of the two was determined by randomization. Specifically, approximately half the participants (group A) received an initial 3-week course of Motrin, while the other participants (group B) received an initial 3-week course of placebo. After the 3-week period, participants were given a 2-week washout period during which they received no study medication. The purpose of the washout period was to eliminate any residual biological effect of the first-course medication. After the washout period, a second period of active drug administration began, with group A participants receiving 3 weeks of placebo, and group B participants receiving 3 weeks of Motrin. At the end of each active drug period as well as at the end of the washout period, participants were asked to rate their degree of pain compared with baseline (before the beginning of the first active drug period). The goal of the study was to compare the degree of pain while on Motrin vs. the degree of pain while on a placebo. This type of study is called a cross-over design, which we discuss in more detail in Chapter 13. Degree of pain vs. baseline was measured on a 1−6 scale, with 1 being “worse than baseline” and 6 being “completely improved.” The comparison was made in four different ways: (1) during maximum activity, (2) 12 hours following maximum activity, (3) during the average day, and (4) by overall impression of drug efficacy. The data are given in Data Set TENNIS2.DAT with documentation in TENNIS2. DOC, both on the Companion Website. 8.89  Compare degree of pain while on Motrin with degree of pain on placebo during maximal activity. 8.90  Answer Problem 8.89 for degree of pain 12 hours following maximum activity. 8.91  Answer Problem 8.89 for degree of pain during the average day. 8.92  Answer Problem 8.89 for the overall impression of drug efficacy.

Environmental Health, Pediatrics Refer to Figure 8.12 and Table 8.11. 8.93  Assess whether there are any outliers for full-scale IQ in the control group.

8.94  Assess whether there are any outliers for full-scale IQ in the exposed group. 8.95  Based on your answers to Problems 8.93 and 8.94, compare mean full-scale IQ between the exposed and the control groups, after the exclusion of outliers.

Pulmonary Disease 8.96  Refer to Data Set FEV.DAT on the Companion Website. Assess whether there are any outliers in FEV for the following groups: 5- to 9-year-old boys, 5- to 9-year-old girls, 10- to 14-year-old boys, 10- to 14-year-old girls, 15- to 19-year-old boys, and 15- to 19-year-old girls.

Ophthalmology A study compared mean electroretinogram (ERG) amplitude of patients with different genetic types of retinitis pigmentosa (RP), a genetic eye disease that often results in blindness. The results shown in Table 8.27 were obtained for ln (ERG amplitude) among patients 18–29 years of age. Table 8.27  Comparison of mean ln (ERG amplitude) by genetic type among patients with RP Genetic type

Dominant Recessive X-linked

Mean ± sd

0.85 ± 0.18 0.38 ± 0.21 −0.09 ± 0.21

n

62 35 28

8.97  What is the standard error of ln (ERG amplitude) among patients with dominant RP? How does it differ from the standard deviation in the table? 8.98  What test can be used to compare the variance of ln (ERG amplitude) between patients with dominant vs. recessive RP? 8.99  Implement the test in Problem 8.98, and report a pvalue (two-tailed). (Hint: F34,61,.975 = 1.778.) 8.100  What test can be used to compare the mean ln (ERG amplitude) between patients with dominant vs. recessive RP? 8.101  Implement the test in Problem 8.100, and report a two-tailed p-value.

Hypertension A study was performed comparing different nonpharmacologic treatments for people with high-normal diastolic blood pressure (DBP) (80−89 mm Hg). One of the modes of treatment studied was stress management. People were randomly assigned to a stress management intervention (SMI) group or a control group. Participants randomized to SMI were given instructions in a group setting concerning different techniques for stress management and met periodically over a 1-month period. Participants randomized to the

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Problems   317

control group were advised to pursue their normal lifestyles and were told that their blood pressure would be closely monitored and that their physician would be notified of any consistent elevation. The results for the SMI group (n = 242) at the end of the study (18 months) were as follows: Mean (change) = −5.53 mm Hg (follow-up – baseline), sd (change) = 6.48 mm Hg. 8.102  What test can be used to assess whether mean blood pressure has changed significantly in the SMI group? 8.103   Implement the test in Problem 8.102, and report a p-value. The results for the control group (n = 320) at the end of the study were as follows: Mean (change) = −4.77 mm Hg, sd (change) = 6.09 mm Hg. 8.104  What test can be used to compare mean bloodpressure change between the two groups? (Hint: For reference, F 241,319,.90 = 1.166, F241,319,.95 = 1.218, F241,319,.975 = 1.265.) 8.105  Implement the test in Problem 8.104, and report a two-tailed p-value. 8.106  How much power did the study have for detecting a significant difference between groups (using a two-sided test with a 5% level of significance) if the true effect of the SMI intervention is to reduce mean DBP by 2 mm Hg more than the control group and the standard deviation of change within a group is 6 mm Hg?

Endocrinology A study was performed to determine the effect of introducing a low-fat diet on hormone levels of 73 postmenopausal women not using exogenous hormones [15]. The data in Table 8.28 were presented for plasma estradiol in log10 (picograms/milliliter). Table 8.28  Change in plasma estradiol after adopting a low-fat diet

Preintervention Postintervention Difference   (postintervention – preintervention)

Estradiol log10(pg/mL)a

0.71 (0.26) 0.63 (0.26) −0.08 (0.20)

Values are mean and sd (in parentheses) for log (base 10) of preintervention and postintervention measurements and for their difference.

a

8.107  What test can be performed to assess the effects of adopting a low-fat diet on mean plasma-estradiol levels? 8.108  Implement the test in Problem 8.107, and report a p-value.

8.109  Provide a 95% CI for the change in mean log 10 (plasma estradiol). (Hint: The 95th percentile of a t distribution with 72 df = 1.6663; the 97.5th percentile of a t distribution with 72 df = 1.9935.) 8.110  Suppose a similar study is planned among women who use exogenous hormones. How many participants need to be enrolled if the mean change in log10 (plasma estradiol) is −0.08, the standard deviation of change is 0.20, and we want to conduct a two-sided test with an α level of .05 and a power of .80?

Cardiology A study was performed concerning risk factors for carotidartery stenosis (arterial narrowing) among 464 men born in 1914 and residing in the city of Malmö, Sweden [16]. The data reported for blood-glucose level are shown in Table 8.29. able 8.29  Comparison of blood-glucose level T between men with and without stenosis

Blood glucose (mmol/L)

No stenosis (n = 356)

Stenosis (n = 108)

Mean

sd

Mean

sd

5.3

1.4

5.1

0.8

8.111  What test can be performed to assess whether there is a significant difference in mean blood-glucose level between men with and without stenosis? (Hint: F355,107,.95 = 1.307; F355,107,.975 = 1.377.) 8.112  Implement the test mentioned in Problem 8.111, and report a p-value (two-tailed).

Ophthalmology A study is being planned to assess whether a topical anti­ allergic eye drop is effective in preventing the signs and symptoms of allergic conjunctivitis. In a pilot study, at an initial visit, participants are given an allergen challenge; that is, they are subjected to a substance that provokes allergy signs (e.g., cat dander) and their redness score is noted 10 minutes after the allergen challenge (visit 1 score). At a follow-up visit, the same procedure is followed, except that participants are given an active eye drop in one eye and the placebo in the fellow eye 3 hours before the challenge; a visit 2 score is obtained 10 minutes after the challenge. The data collected are shown in Table 8.30. 8.113  Suppose we want to estimate the number of participants needed in the main study so that there is a 90% chance of finding a significant difference between active and placebo eyes using a two-sided test with a significance level of .05. We expect the active eyes to have a mean redness score 0.5 unit less than that of the placebo eyes. How many participants are needed in the main study?

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318   C H A P T E R 8 

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8.114  Suppose 60 participants are enrolled in the main study. How much power would the study have to detect a 0.5-unit mean difference if a two-sided test is used with a significance level of .05?

Table 8.31  Pod weight (g) from inoculated (I) and uninoculated (U) plantsa

I

U

8.115  In a substudy, participants will be subdivided into two equal groups according to the severity of previous allergy symptoms, and the effectiveness of the eye drop (vs. placebo) will be compared between the two groups. If 60 participants are enrolled in the main study (in the two groups combined), then how much power will the substudy have if there is a true mean difference in effectiveness of 0.25 [i.e., (mean change score active eye – mean change score placebo eye, subgroup 1) – (mean change score active eye – mean change score placebo eye, subgroup 2) = 0.25] between the two groups and a two-sided test is used with a significance level of .05?

1.76 1.45 1.03 1.53 2.34 1.96 1.79 1.21

0.49 0.85 1.00 1.54 1.01 0.75 2.11 0.92

Mean sd n

1.634 0.420 8

1.084 0.510 8

The data for this problem were supplied by David Rosner.

Table 8.30  Effect of an eye drop in reducing ocular redness among participants subjected to an allergen challenge

a

Active eye

Placebo eye

Change score in active eye – change score in placebo eye

8.118  What test can be used to compare the mean pod weight between the two groups?

Mean ± sd

Mean ± sd

Mean ± sd

Change in −0.61 ± 0.70 −0.04 ± 0.68 −0.57 ± 0.86 average redness scorea (visit 2 – visit 1 score) The redness score ranges from 0 to 4 in increments of 0.5, where 0 is no redness at all and 4 is severe redness.

a

Microbiology A study sought to demonstrate that soy beans inoculated with nitrogen-fixing bacteria yield more and grow adequately without the use of expensive environmentally deleterious synthesized fertilizers. The trial was conducted under controlled conditions with uniform amounts of soil. The initial hypothesis was that inoculated plants would outperform their uninoculated counterparts. This assumption was based on the facts that plants need nitrogen to manufacture vital proteins and amino acids and that nitrogen-fixing bacteria would make more of this substance available to plants, increasing their size and yield. There were 8 inoculated plants (I) and 8 uninoculated plants (U). The plant yield as measured by pod weight for each plant is given in Table 8.31.

no significant difference between the mean pod weights for the two groups? Why or why not?

8.119  Perform the test in Problem 8.118, and report a p-value (two-tailed). 8.120  Provide a 95% CI for the difference in mean pod weight between the two groups.

Cardiovascular Disease A study was performed to assess whether hyperinsulinemia is an independent risk factor for ischemic heart disease [17]. A group of 91 men who developed clinical manifestations of ischemic heart disease (IHD) over a 5-year period were compared with 105 control men (matched with regard to age, obesity [BMI = wt/ht2 in units of kg/m2], cigarette smoking, and alcohol intake) who did not develop IHD over the period. The primary exposure variable of interest was level of fasting insulin at baseline. The data presented are shown in Table 8.32. Table 8.32  Mean fasting insulin (± sd ) for men with IHD and control men

Fasting insulin (pmol/L)

Controls (n = 105)

78.2 ± 28.8

Cases (n = 91)

92.1 ± 27.5

8.116  Provide a 95% CI for the mean pod weight in each group.

8.121  What test can be performed to compare the mean level of fasting insulin between case and control patients? (Hint: F104,90,.975 = 1.498.)

8.117  Suppose there is some overlap between the 95% CIs in Problem 8.116. Does this necessarily imply there is

8.122  Implement the test in Problem 8.121, and report a p-value (two-tailed).

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Problems   319

8.123  Provide a 95% CI for the mean difference in fasting insulin between the two groups. (Note: t194,.975 = 1.972.) 8.124  Suppose a 99% CI for the mean difference were also desired. Would this interval be of the same length, longer, or shorter than the 95% CI? (Do not actually compute the CI.)

Renal Disease The goal of the Swiss Analgesic Study was to assess the effect of taking phenacetin-containing analgesics on kidney function and other health parameters. A group of 624 women were identified from workplaces near Basel, Switzerland, with high intake of phenacetin-containing analgesics. This constituted the “study” group. In addition, a control group of 626 women were identified, from the same workplaces and with normal N-acetyl-P-aminophenyl (NAPAP) levels, who were presumed to have low or no phenacetin intake. The urine NAPAP level was used as a marker of phenacetin intake. The study group was then subdivided into high-NAPAP and low-NAPAP subgroups according to the absolute NAPAP level. However, both subgroups had higher NAPAP levels than the control group. The women were examined at baseline during 1967–1968 and also in 1969, 1970, 1971, 1972, 1975, and 1978, during which their kidney function was evaluated by several objective laboratory tests. Data Set SWISS.DAT on the Companion Website contains longitudinal data on serum-creatinine levels (an important index of kidney function) for 100 women in each of the high-NAPAP group, low-NAPAP group, and the control group. Documentation for this data set is given in SWISS. DOC on the Companion Website. 8.125  One hypothesis is that analgesic abusers would have different serum-creatinine profiles at baseline. Using the data from the baseline visit, can you address this question? 8.126  A major hypothesis of the study is that women with high phenacetin intake would show a greater change in serum-creatinine level compared with women with low phenacetin intake. Can you assess this issue using the longitudinal data in the data set? (Hint: A simple approach for accomplishing this is to look at the change in serum creatinine between the baseline visit and the last follow-up visit. More complex approaches using all the available data are considered in our discussion of regression analysis in Chapter 11.)

(C and D) will receive pamphlets from the American Cancer Society promoting smoking cessation but will receive no active intervention by psychologists. Random numbers are used to select two of the four schools to receive the active intervention and the remaining two schools to receive the control intervention. The intervention is planned to last for 1 year, after which study participants in all schools will provide self-reports of the number of cigarettes smoked, which will be confirmed by biochemical tests of urinary cotinine levels. The main outcome variable is the change in the number of cigarettes smoked per day. A participant who completely stops smoking is scored as smoking 0 cigarettes per day. It is hypothesized that the effect of the intervention will be to reduce the mean number of cigarettes smoked by 5 cigarettes per day over 1 year for the active-intervention group. It is also hypothesized that teenagers in the control group will increase their cigarette consumption by an average of 2 cigarettes per day over 1 year. Let us assume that the distribution of the number of cigarettes smoked per day at baseline in both groups is normal, with mean = 30 cigarettes per day and standard deviation = 5 cigarettes per day. Furthermore, it is expected, based on previous intervention studies, that the standard deviation of the number of cigarettes per day will increase to 7 cigarettes per day after 1 year. Finally, past data also suggest that the correlation coefficient between number of cigarettes smoked by the same person at baseline and 1 year will be .80. 8.127  How much power will the proposed study have if a two-sided test is used with α = .05? 8.128  Suppose the organizers of the study are reconsidering their sample-size estimate. How many participants should be enrolled in each of the active and control intervention groups to achieve 80% power if a two-sided test is used with α = .05?

Hypertension A study was recently reported comparing the effects of different dietary patterns on blood pressure within an 8-week follow-up period [18]. Subjects were randomized to three groups: A, a control diet group, N = 154; B, a fruits-andvegetables diet group, N = 154; C, a combination-diet group consisting of a diet rich in fruits, vegetables, and lowfat dairy products and with reduced saturated and total fat, N = 151. The results reported for systolic blood pressure (SBP) are shown in Table 8.33.

Health Promotion A study is planned on the effect of a new health-education program promoting smoking cessation among heavy-smoking teenagers (≥ 20 cigarettes—equal to one pack—per day). A randomized study is planned whereby 50 heavy-smoking teenagers in two schools (A and B) will receive an active intervention with group meetings run by trained psychologists according to an American Cancer Society protocol; 50 other heavy-smoking teenagers in two different schools

Table 8.33  Effects of dietary pattern on change in SBP Mean change in fruits-and-vegetables group Minus mean change in control group (97.5% CI)

−2.8 mm Hg (−4.7 to −0.9)

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320   C H A P T E R 8 

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8.129  Suppose we want to compute a two-sided p-value for this comparison. Without doing any further calculation, which statement(s) must be false? (1) p = .01 (2) p = .04 (3) p = .07 (4) p = .20 (Note: The actual p-value may differ from all these values.) 8.130  Suppose we assume that the standard deviation of change in blood pressure is the same in each group and is known without error. Compute the exact p-value from the information provided. 8.131  Suppose we want to compute a two-sided 95% CI for the true mean change in the fruits-and-vegetables group minus the true mean change in the control group, which we represent by (c1, c2). Without doing any further calculations, which of the following statement(s) must be false? (1) The lower confidence limit (c1) = −5.0. (2) The upper confidence limit (c2) = −1.0. (3) The width of the CI (c2 − c1) = 3.0. [Note: The actual values of c1, c2, or (c2 − c1) may differ from those given above.] 8.132  If we make the same assumption as in Problem 8.130, then compute the 95% CI from the information provided.

Diabetes The Diabetes Prevention Study was a randomized study conducted in Finland in which middle-aged participants (mean age, 55 years) with impaired glucose tolerance (IGT) were enrolled [19]. Study participants, who had high-normal glucose levels, were randomized to either an intervention group or a control group. People in the intervention group were encouraged to (a) reduce weight, (b) reduce fat intake, (c) increase fiber intake, and (d) increase hours per week of exercise, and they underwent intensive individuallevel counseling to reduce risk-factor levels. People in the control group received pamphlets with general information concerning diet and exercise but did not receive individual counseling. Data regarding changes in weight after 1 year are shown in Table 8.34. Table 8.34  Mean weight change by treatment group among people with IGT in the Diabetes Prevention Study

8.133  What test can be used to assess mean changes in weight in the intervention group? 8.134  Perform the test in Problem 8.133, and report a twotailed p-value. 8.135  What test can be used to compare mean change in weight between the intervention and control groups? (Note: F255,249,.975= 1.281.) 8.136  Perform the test in Problem 8.135, and report a twotailed p-value.

Health Promotion A study looked at the influence of retirement on the level of physical activity among people ages 45−64 in the Atherosclerosis Risk in Communities (ARIC) Study [20]. For this purpose a sport score from 1 (low physical activity) to 5 (high physical activity) and a leisure score from 1 (low physical activity) to 5 (high physical activity) were constructed. The main outcome measure was the sum of the sport and leisure scores [range from 2 (low physical activity) to 10 (high physical activity)]. These scores were ascertained at baseline (year 0) and at follow-up (year 6). A comparison was made between people who were still working at year 6 vs. those who were retired at year 6. The data in Table 8.35 were presented for African-American women. Table 8.35  Change in combined sport and leisure score for African-American women in the ARIC Study (year 6 score – year 0 score) Mean change

95% CI

n

Retired at year 6

0.29

(0.17, 0.42)

295

Working at year 6

0.15

(0.05, 0.25)

841

[Hint: Assume that for d > 200, a td , distribution is the same as an N(0,1) distribution.] 8.137  What are the standard deviation and standard error of the mean for the change score for retired women? 8.138  Construct a two-sided 90% CI for the mean change score for retired women. What does it mean? 8.139  What test can be used to assess whether the underlying mean change score differs for retired women vs. working women?

Intervention group (n = 256)

Control group (n = 250)

Mean ± sd

Mean ± sd

8.140  Implement the test in Problem 8.139, and report a two-tailed p-value.

Change in weight (kg) over 1 year*

−4.2 ± 5.1

−0.8 ± 3.7

Health Promotion

*Follow-up weight – baseline weight.

For the purposes of this problem, for any degrees of freedom (d) ≥ 200 assume that td ≅ N (0, 1) distribution.

Cigarette smoking has important health consequences and is positively associated with heart and lung diseases. Less well known are the consequences of quitting smoking. One study enrolled a group of 10 nurses, ages 50−54 years,

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Problems   321

Table 8.36  BMI change in 50- to 54-year-old women over a 6-year period

Never-smoking women

Heavy-smoking women (≥1 pk/day)

ID

BMI at baseline

BMI at 6-year follow-up

ID

BMI at baseline

1 2 3 4 5 6 7 8 9 10

26.5 33.8 27.6 24.4 21.6 32.3 31.9 23.0 31.2 36.3

29.3 32.9 25.5 28.3 23.3 37.1 35.4 24.8 30.4 37.1

11 12 13 14 15 16 17 18 19 20

25.6 24.4 31.0 20.4 22.3 22.2 20.8 23.5 26.6 23.0

31.1 27.6 36.6 20.8 23.2 23.8 26.1 31.0 29.2 24.0

Mean sd n

28.9 4.9 10

30.4 5.1 10

24.0 3.1 10

27.3 4.7 10

who had smoked at least 1 pack per day and quit for at least 6 years. The nurses reported their weight before and 6 years after quitting smoking. A commonly used measure of obesity that takes height and weight into account is BMI = wt/ht2 (in units of kg/m2). The BMI of the 10 women before and 6 years after quitting smoking are given in the last two columns of Table 8.36. 8.141  What test can be used to assess whether the mean BMI changed among heavy-smoking women 6 years after quitting smoking? 8.142  Implement the test in Problem 8.141, and report a two-tailed p-value. One issue is that there has been a secular change in weight in society. For this purpose, a control group of 50- to 54year-old never-smoking women were recruited and their BMI was reported at baseline (ages 50−54) and 6 years later at a follow-up visit. The results are given in the first two columns of Table 8.36. 8.143  What test can be used to assess whether the mean change in BMI over 6 years is different between women who quit smoking and women who have never smoked? 8.144  Implement the test in Problem 8.143, and report a two-tailed p-value. 8.145  Suppose the true mean increase in BMI among heavy-smoking women 6 years after quitting is 3.0 kg/m2 with a standard deviation of 2.5 kg/m2. The comparable true mean increase in BMI among never-smoking women over 6 years is 1.5 kg/m2 with a standard deviation of 2.0 kg/m2. How much power does the study in Problem 8.144 have of finding a significant difference if a two-sided test is used with a 5% significance level?

BMI 6 years after quitting smoking

Cardiovascular Disease An important emerging area in cardiovascular disease research is the study of subclinical markers of atherosclerosis, similar to the clogging of coronary arteries before any overt heart disease or stroke is apparent. One widely studied marker is the carotid-artery intima−media thickness (IMT), measured in mm, which can be measured noninvasively and is indicative of atherosclerosis in the carotid artery (in the neck). A study was performed to examine the relationship between IMT and childhood SES, which is measured by the number of years of schooling for the parent. The results in Table 8.37 were reported for black males. Table 8.37  Mean IMT by childhood SES (years of schooling of the parent)

SES (years of schooling)

0−8 (low)

>12 (high)

Mean IMT (mm) N

0.749 327

0.738 57

(0.732−0.766)

(0.698−0.779)

95% CI

Note: t326,.975 = 1.967; t56,.975 = 2.003.

8.146  What is the standard error of the mean for the lowand high-SES groups, respectively? 8.147  What test can be used to compare mean carotidartery IMT between low- and high-SES black males? (Note: F325,56,.975 = 1.542.)

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322   C H A P T E R 8 

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8.148  Perform the test in Problem 8.147, and report a twotailed p-value.

Cancer Age at menarche (onset of menstrual periods) is an important risk factor for breast cancer and possibly ovarian cancer. In general, women who reach menarche at an earlier age have a higher incidence of breast cancer. The long-term trend in developed countries is that age at menarche has been declining over the past 50 years. One hypothesis is that women with higher childhood SES have an earlier age at menarche. Suppose we identify 20 girls with low childhood SES (that is, head of household is a blue-collar worker) and find a mean age at menarche of 13.4 years with a standard deviation of 1.4 years. We identify an additional 30 girls with high childhood SES (head of household is a white-collar worker or executive) and find a mean age at menarche of 12.9 years with a standard deviation of 1.5 years. Assume that the underlying variance of age at menarche for girls with low childhood SES and girls with high childhood SES is the same.

The main question of interest here lies in the overall relationship between glycemic control and growth (weight mainly, but you might wish to consider other measures of growth as well) for the whole population, and not in this relationship for any particular boy. 8.152  Do boys with better glycemic control have different growth patterns in weight than boys with poorer glycemic control? One approach for looking at this is to calculate the average HgbA1c over all visits for each boy and to categorize boys as maintaining good control if their mean HgbA1c is below the median for the 94 boys and as in poor control otherwise. The simplest measure of growth is to calculate change in weight per year = (weight at last visit − weight at first visit)/ (age in years at last visit − age in years at first visit). You can then use t test methods to compare the mean rate of growth between boys who are in good control and boys who are in poor control. 8.153  Answer Problem 8.152 for height instead of weight. 8.154  Answer Problem 8.152 for BMI (BMI = wt/ht2 in units of kg/m2).

8.149  What test can be used to compare the mean of the two groups?

In Chapter 11, we discuss regression methods that allow for more sophisticated analyses of these data.

8.150  Perform the test in Problem 8.149, and report a twotailed p-value.

Pediatrics

8.151  How many participants should be enrolled in each group in a future study, if (a) the true mean difference in age at menarche between girls with low- and high-childhoodSES is 0.5 years, (b) standard deviation of age at menarche is 1.5 years within each group, (c) an equal number of girls are in each group, and (d) we would like to have a 90% chance of detecting a significant difference between the girls with high- and low-childhood SES?

Diabetes Type I diabetes is a common disease among children. It is widely accepted that maintaining glycemic control by regularly taking insulin shots is essential to avoid the longterm consequences of diabetes, which include neurologic, vision, and kidney problems and, eventually, premature heart disease or death. What is less clear is whether maintaining diabetes control affects growth and development in childhood. For this purpose, a group of adolescent boys ages 9−15 were examined periodically (approximately every 3 months, but with wide variation). At each exam, the degree of diabetes control was assessed by measuring glycosylated hemoglobin (HgbA1c). The higher the HgbA1c, the poorer the diabetic control is (normals typically have HgbA1c .05). 8.184  What test can be performed to compare the mean diet record vitamin C intake between the two groups? 8.185  Perform the test in Problem 8.184, and report a p-value (two-tailed). 8.186  Obtain a 95% CI for the mean difference in diet record vitamin C intake between the two groups.

R eferences [1] Satterthwaite, E W. (1946). An approximate distribution of estimates of variance components. Biometrics Bulletin, 2, 110–114. [2] Landrigan, P. J., Whitworth, R. H., Baloh, R. W., Staehling, N. W., Barthel, W. F., & Rosenblum, B. R (1975, March 29). Neuropsychological dysfunction in children with chronic low-level lead absorption. Lancet, 708–715. [3] Rosner, B. (1983). Percentage points for a generalized ESD many-outlier procedure. Technometrics, 25(2), 165–172.

[4] Quesenberry, C. P., & David, H. A. (1961). Some tests for outliers. Biometrika, 48, 379–399. [5] Cook, N. R., & Rosner, B. A. (1997). Sample size estimation for clinical trials with longitudinal measures: Application to studies of blood pressure. Journal of Epidemiology and Biostatistics, 2, 65–74. [6] Yablonski, M. E., Maren, T. H., Hayashi, M., Naveh, N., Potash, S. D., & Pessah, N. (1988). Enhancement of the ocular hypertensive effect of acetazolamide by diflunisal. American Journal of Ophthalmology, 106, 332–336.

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  Hypothesis Testing: Two-Sample Inference

[7] Schachter, J., Kuller, L. H., & Perfetti, C. (1984). Heart rate during the first five years of life: Relation to ethnic group (black or white) and to parental hypertension. American Journal of Epidemiology, 119(4), 554–563. [8] White, J. R., & Froeb, H. E. (1980). Small airway dysfunction in nonsmokers chronically exposed to tobacco smoke. New England Journal of Medicine, 302(13), 720–723. [9] Coates, R. A., Fanning, M. M., Johnson, J. K., & Calzavara, L. (1988). Assessment of generalized lymphadenopathy in AIDS research: The degree of clinical agreement. Journal of Clinical Epidemiology, 41(3), 267–273. [10] Taguma, Y., Kitamoto, Y., Futaki, G., Ueda, H., Monma, H., Ishizaki, M., Takahashi, H., Sekino, H., & Sasaki, Y. (1985). Effect of captopril on heavy proteinuria in azotemic diabetics. New England Journal of Medicine, 313(26), 1617–1620. [11] Heller, D. A., DeFaire, U., Pederson, N. L., Dahlen, G., & McClearn, G. E. (1993). Genetic and environmental influences on serum lipid levels in twins. New England Journal of Medicine, 328(16), 1150–1156. [12] Ekdahl, C., Andersson, S. I., & Svensson, B. (1989). Muscle function of the lower extremities in rheumatoid arthritis and osteoarthrosis. A descriptive study of patients in a primary health care district. Journal of Clinical Epidemiology, 42(10), 947–954. [13] Parisi, A. F., Folland, E. D., & Hartigan, P. (1992). A comparison of angioplasty with medical therapy in the treatment of single-vessel coronary artery disease. New England Journal of Medicine, 326(1), 10–16. [14] Selby, J. V., Friedman, G. D., & Quesenberry, C. P., Jr. (1989). Precursors of essential hypertension: The role of body fat distribution pattern. American Journal of Epidemiology, 129(1), 43–53. [15] Prentice, R., Thompson, D., Clifford, C., Gorbach, S., Goldin, B., & Byar, D. (1990). Dietary fat reduction and plasma estradiol concentration in healthy postmenopausal women. The Women’s Health Trial Study Group. Journal of the National Cancer Institute, 82, 129–134. [16] Jungquist, G., Hanson, B. S., Isacsson, S. O., Janzon, L., Steen, B., & Lindell, S. E. (1991). Risk factors for carotid

artery stenosis: An epidemiological study of men aged 69 years. Journal of Clinical Epidemiology, 44(4/5), 347–353. [17] Despres, J. P., Lamarche, B., Mauriege, P., Cantin, B., Dagenais, G. R., Moorjani, S., & Lupien, P. J. (1996). Hyperinsulinemia as an independent risk factor for ischemic heart disease. New England Journal of Medicine, 334, 952–957. [18] Appel, L. J., Moore, T. J., Oberzanek, E., Vollmer, W. M., Svetkey, L. P., et al. (1997). A clinical trial of the effects of dietary patterns on blood pressure. New England Journal of Medicine, 336, 1117–1124. [19] Tuomilehto, J., Lindstrom, J., Eriksson, J. G., Valle, T. T., Hamalainen, H., Illanne-Parikka, P., Keinanen-Kiukaanniemi, S., Laakso, M., Louheranta, A., Rastas, M., Salminen, V., Aunola, S., Cepaitis, Z., Moltchanov, V., Hakumaki, M., Mannelin, M., Martikkala, V., Sundvall, J., Uusitupa, M., & the Finnish Diabetes Prevention Study Group. (2001). Prevention of type 2 diabetes mellitus by changes in lifestyle among subjects with impaired glucose tolerance. New England Journal of Medicine, 344, 1343–1350. [20] Evenson, K. R., Rosamond, W. D., Cai, J., DiezRoux, A. V., & Brancati, F. L. (2002). Influence of retirement on leisure-time physical activity: The Atherosclerosis Risk in Communities Study. American Journal of Epidemiology, 155, 692–699. [21] Lawlor, D. A., Smith, G. D., Mitchell, R., & Ebrahim, S. (2006). Adult blood pressure and climate conditions in infancy: A test of the hypothesis that dehydration in infancy is associated with higher adult blood pressure. American Journal of Epidemiology, 163(7), 608–614. [22] Bare, L. A., Morrison, A. C., Rowland, C. M., Shiffman, D., Luke, M. M., Iakoubova, O. A., Kane, J. P., Malloy, M. J., Ellis, S. G., Pankow, J. S., Willerson, J. T., Devlin, J. J., & Boerwinkle, E. (2007). Five common gene variants identify elevated genetic risk for coronary heart disease. Genetics in Medicine, 9 (10), 682–689. [23] Mangano, D. T., for the Multicenter Study of Perioperative Ischemia Research Group. (2002). Aspirin and mortality from coronary bypass surgery. New England Journal of Medicine 347(17), 1309–1317.

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9

Nonparametric Methods

9.1 Introduction So far in this book, we’ve assumed that data come from some underlying distribution, such as the normal or binomial distribution, whose general form was assumed known. Methods of estimation and hypothesis testing have been based on these assumptions. These procedures are usually called parametric statistical methods because the parametric form of the distribution is assumed to be known. If these assumptions about the shape of the distribution are not made, and/or if the centrallimit theorem also seems inapplicable because of small sample size, then nonparametric statistical methods, which make fewer assumptions about the distributional shape, must be used. Another assumption so far in this text is that it is meaningful to measure the distance between possible data values. This assumption is characteristic of cardinal data.

Definition 9.1 Cardinal data are on a scale where it is meaningful to measure the distance between possible data values. Example 9.1

Body weight is a cardinal variable because a difference of 6 lb is twice as large as a difference of 3 lb. There are actually two types of cardinal data: interval-scale data and ratio-scale data.

Definition 9.2 For cardinal data, if the zero point is arbitrary, then the data are on an interval scale; if the zero point is fixed, then the data are on a ratio scale.

Example 9.2

Body temperature is on an interval scale because the zero point is arbitrary. For example, the zero point has a different meaning for temperatures measured in Fahrenheit vs. Celsius.

Example 9.3

Blood pressure and body weight are on ratio scales because the zero point is well defined in both instances. It is meaningful to measure ratios between specific data values for data on a ratio scale (for example, person A’s weight is 10% higher than person B’s) but not for data

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328 

  C H A P T E R 9  ■  Nonparametric Methods

on an interval scale (for example, the ratio of specific temperatures is different in degrees F from what it is in degrees C). It is meaningful to use means and standard deviations for cardinal data of either type. Another type of data that occurs frequently in medical and biological work but does not satisfy Definition 9.1 is ordinal data.

Definition 9.3 Ordinal data can be ordered but do not have specific numeric values. Thus common arithmetic cannot be performed on ordinal data in a meaningful way.

Example 9.4

Ophthalmology  Visual acuity can be measured on an ordinal scale because we know 20–20 vision is better than 20–30, which is better than 20–40, and so on. However, a numeric value cannot easily be assigned to each level of visual acuity that all ophthalmologists would agree on.

Example 9.5

In some clinical studies the major outcome variable is the change in a patient’s condition after treatment. This variable is often measured on the following 5-point scale: 1 = much improved, 2 = slightly improved, 3 = stays the same, 4 = slightly worse, 5 = much worse. This variable is ordinal because the different outcomes, 1, 2, 3, 4, and 5, are ordered in the sense that condition 1 is better than condition 2, which is better than condition 3, and so on. However, we cannot say that the difference between categories 1 and 2 (2 minus 1) is the same as the difference between categories 2 and 3 (3 minus 2), and so on. If these categories were on a cardinal scale, then the variable would have this property. Because ordinal variables cannot be given a numeric scale that makes sense, computing means and standard deviations for such data is not meaningful. Therefore, methods of estimation and hypothesis testing based on normal distributions, as discussed in Chapters 6 through 8, cannot be used. However, we are still interested in making comparisons between groups for variables such as visual acuity and outcome of treatment, and nonparametric methods can be used for this purpose. Another type of data scale, which has even less structure than an ordinal scale concerning relationships between data values, is a nominal scale.

Definition 9.4 Data are on a nominal scale if different data values can be classified into categories but the categories have no specific ordering. Example 9.6

Renal Disease  In classifying cause of death among patients with documented analgesic abuse, the following categories were used: (1) cardiovascular disease, (2) cancer, (3) renal or urogenital disease, and (4) all other causes of death. Cause of death is a good example of a nominal scale because the values (the categories of death) have no specific order with respect to each other. In this chapter the most commonly used nonparametric statistical tests are developed, assuming the data are on either a cardinal or an ordinal scale. If they are on a cardinal scale, then the methods are most useful if there is reason to question the normality of the underlying sampling distribution of the test statistic (for example, small sample size). For nominal (or categorical) data, discrete data methods, described in Chapter 10, are used.

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9.2  ■  The Sign Test    329

9.2 The Sign Test As discussed in Section 9.1, for ordinal data we can measure the relative ordering of different categories of a variable. In this section, we consider data with even more restrictive assumptions; namely, for any two people A, B we can identify whether the score for person A is greater than, less than, or equal to the score for person B, but not the relative magnitude of the differences.

Example 9.7

Dermatology  Suppose we want to compare the effectiveness of two ointments (A, B) in reducing excessive redness in people who cannot otherwise be exposed to sunlight. Ointment A is randomly applied to either the left or right arm, and ointment B is applied to the corresponding area on the other arm. The person is then exposed to 1 hour of sunlight, and the two arms are compared for degrees of redness. Suppose only the following qualitative assessments can be made: (1) Arm A is not as red as arm B. (2) Arm B is not as red as arm A. (3) Both arms are equally red. Of 45 people tested with the condition, 22 are better off on arm A, 18 are better off on arm B, and 5 are equally well off on both arms. How can we decide whether this evidence is enough to conclude that ointment A is better than ointment B?

Normal-Theory Method In this section, we consider a large-sample method for addressing the question posed in Example 9.7. Suppose that the degree of redness could be measured on a quantitative scale, with a higher number indicating more redness. Let xi = degree of redness on arm A, yi = degree of redness on arm B for the ith person. Let’s focus on di = xi – yi = difference in redness between the A and B arms for the ith participant and test the hypothesis H0: ∆ = 0 vs. H1: ∆ ≠ 0, where ∆ = the population median of the di or the 50th percentile of the underlying distribution of the di. (1) If ∆ = 0, then the ointments are equally effective. (2) If ∆ < 0, then ointment A is better because arm A is less red than arm B. (3) If ∆ > 0, then ointment B is better because arm A is redder than arm B. Notice that the actual di cannot be observed; we can only observe whether di > 0, di < 0, or di = 0. The people for whom di = 0 will be excluded because we cannot tell which ointment is better for them. The test will be based on the number of people C for whom di > 0 out of the total of n people with nonzero di. This test makes sense because if C is large, then most people prefer treatment B over treatment A, whereas if C is small, they prefer treatment A over treatment B. We would expect under H0 1 that Pr(nonzero di > 0) = . We will assume the normal approximation to the bino2 mial is valid. This assumption will be true if

 1  1   npq ≥ 5   or   n     ≥ 5  2  2 n ≥ 5     or   n ≥ 20 4 where n = the number of nonzero di’ s. Or  

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330 

  C H A P T E R 9  ■  Nonparametric Methods

The following test procedure for a two-sided level α test, called the sign test, can then be used:

Equation 9.1

The Sign Test  To test the hypothesis H0: ∆ = 0 vs. H1: ∆ ≠ 0, where the number of nonzero di’s = n ≥ 20 and C = the number of di’s where di > 0, if

Figure 9.1

n 1 + + z1− α / 2 n / 4 2 2

C < c1 =

or

n 1 − − z1− α / 2 n / 4 2 2

then H0 is rejected. Otherwise, H0 is accepted.

C > c2 =

The acceptance and rejection regions for this test are shown in Figure 9.1.

Acceptance and rejection regions for the sign test

Distribution of C under H0 n n , =N distribution 2 4

n 1 n – z1–�/2 – 2 2 4 Rejection region

Frequency

C<

Acceptance region

n 1 n + + z1–�/2 2 2 4 Rejection region

C>

n 1 n ≤C – – z1–�/2 2 2 4 n 1 n ≤ + + z1–�/2 2 2 4 0 n 1 – – z1–�/2 2 2

n 2

n 4

n 1 n + + z1–�/2 2 2 4

Value

Similarly, the p-value for the procedure is computed using the following formula.

Equation 9.2

Computation of the p-Value for the Sign Test (Normal-Theory Method) n    C − − .5     2 p = 2 × 1 − Φ   4 n       n   C − + .5   2 p = 2 × Φ if n/4   

p = 1.0

if

C=

C>

if

C<

n 2

n 2

n 2

This computation is illustrated in Figure 9.2.

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9.2  ■  The Sign Test    331

Figure 9.2  Computation of the p-value for the sign test

If C � n/2, then p = 2 × area to the left of C – under an N(0, 1) distribution

n 4

Frequency

N(0, 1) distribution

n 1 + 2 2

p/2

0 n 1 C– + 2 2

n 4

Value

If C � n/2, then p = 2 × area to the right of C – under an N(0, 1) distribution

n 1 – 2 2

n 4

Frequency

N(0, 1) distribution

p/2

0 Value

C–

n 1 – 2 2

n 4

An alternative and equivalent formula for the p-value is given by

  C − D − 1  p = 2 × 1 − Φ     n  

if C ≠ D

and

p = 1.0

if C = D

where C = the number of di > 0 and D = the number of di < 0. This test is called the sign test because it depends only on the sign of the differences and not on their actual magnitude. The sign test is actually a special case of the one-sample binomial test in Section 7.10, where the hypothesis H0: p = 1/2 vs. H1: p ≠ 1/2 was tested. In Equation 9.1 and Equation 9.2 a large-sample test is being used, and we are assuming the normal approximation to the binomial distribution is valid. Under H0, p = 1/2 and E(C) = np = . n/2, Var(C) = npq = n/4, and C ~ N(n/2, n/4). Furthermore, the .5 term in computing the critical region and p-value serves as a continuity correction and better approximates the binomial distribution by the normal distribution.

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332 

  C H A P T E R 9  ■  Nonparametric Methods

Example 9.8

Dermatology  Assess the statistical significance of the skin-ointment data in Example 9.7.

Solution

In this case there are 40 untied pairs and C = 18 < n/2 = 20. From Equation 9.1, the critical values are given by c2 = n 2 + 1 2 + z1-α 2 n 4 = 40 2 + 1 2 + z.975 40 4 = 20.5 + 1.96 ( 3.162 ) = 26.7 and c1 = n 2 - 1 2 - z1- α / 2 n 4 = 19.5 - 1.96 ( 3.162 ) = 13.3 Because 13.3 ≤ C = 18 ≤ 26.7, H0 is accepted using a two-sided test with α = .05 and we conclude the ointments do not significantly differ in effectiveness. From Equation 9.2, because C = 18 < n/2 = 20, the exact p-value is given by

1  p = 2 × Φ   18 - 20 +   2 

 40 4  = 2 × Φ ( -0.47) = 2 × .3 3176 = .635 

which is not statistically significant. Therefore, we accept H0, the ointments are equally effective. Alternatively, we could compute the test statistic

z=

C - D -1 n

where C = 18, D = 22, and n = 40, yielding

z=

18 - 22 - 1 = 40

3 = 0.47 40

and obtain the p-value from

p = 2 × [1 - Φ ( 0.47)] = .635

Exact Method If n < 20, then exact binomial probabilities rather than the normal approximation must be used to compute the p-value. H0 should still be rejected if C is very large or very small. The expressions for the p-value based on exact binomial probabilities are as follows:

Equation 9.3

Computation of the p-Value for the Sign Test (Exact Test) If C > n/2,  p = 2 ×

n

 n 1

n

 n 1

n

∑  k   2 

k =C C

∑  k   2 

If C < n/2,  p = 2 ×

If C = n/2,  p = 1.0

This computation is depicted in Figure 9.3.

k =0

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9.3  ■  The Wilcoxon Signed-Rank Test    333

Figure 9.3

Computation of the p-value for the sign test (exact test) If C � n/2, then p-value = 2 × sum of binomial probabilities from C to n for a binomial distribution with parameters n and 1/2.

Pr(X = k)

Pr(X = k)

If C � n/2, then p-value = 2 × sum of binomial probabilities from 0 to C for a binomial distribution with parameters n and 1/2.

C

C

n k

k

This test is a special case of the small-sample, one-sample binomial test described in 1 1 Equation 7.44, where the hypothesis H0: p = vs. H1: p ≠ is tested. 2 2

Example 9.9

Ophthalmology  Suppose we wish to compare two different types of eye drops (A, B) that are intended to prevent redness in people with hay fever. Drug A is randomly administered to one eye and drug B to the other eye. The redness is noted at baseline and after 10 minutes by an observer who is unaware of which drug has been administered to which eye. We find that for 15 people with an equal amount of redness in each eye at baseline, after 10 minutes the drug A eye is less red than the drug B eye for 2 people (di < 0); the drug B eye is less red than the drug A eye for 8 people (di > 0); and the eyes are equally red for 5 people (di = 0). Assess the statistical significance of the results.

Solution

The test is based on the 10 people who had a differential response to the two types of eye drops. Because n = 10 < 20, the normal-theory method in Equation 9.2 cannot be used; the exact method in Equation 9.3 must be used instead. Because 10 C =8> = 5, 2

p =2×

10

 10  1

∑  k   2 

10

k =8

Refer to the binomial tables (Table 1 in the Appendix) using n = 10, p = .5, and note that Pr(X = 8) = .0439, Pr(X = 9) = .0098, Pr(X = 10) = .0010. Thus p = 2 × Pr(X ≥ 8) = 2(.0439 + .0098 + .0010) = 2 × .0547 = .109, which is not statistically significant. Thus we accept H0, that the two types of eye drops are equally effective in reducing redness in people with hay fever.

9.3 The Wilcoxon Signed-Rank Test Example 9.10

Dermatology  Consider the data in Example 9.7 from a different perspective. We assumed that the only possible assessment was that the degree of sunburn with ointment A was either better or worse than that with ointment B. Suppose instead the degree of burn can be quantified on a 10-point scale, with 10 being the worst burn

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334 

  C H A P T E R 9  ■  Nonparametric Methods

and 1 being no burn at all. We can now compute di = xi − yi, where xi = degree of burn for ointment A and yi = degree of burn for ointment B. If di is positive, then ointment B is doing better than ointment A; if di is negative, then ointment A is doing better than ointment B. For example, if di = +5, then the degree of redness is 5 units greater on the ointment A arm than on the ointment B arm, whereas if di = −3, then the degree of redness is 3 units less on the ointment A arm than on the ointment B arm. How can this additional information be used to test whether the ointments are equally effective? Suppose the sample data in Table 9.1 are obtained. The fi values represent the frequency or the number of people with difference in redness di between the ointment A and ointment B arms. Notice that there is only a slight excess of people with negative di (that is, who are better off with ointment A, 22) than with positive di (that is, who are better off with ointment B, 18). However, the extent to which the 22 people are better off appears far greater than that of the 18 people because the negative di’s generally have a much greater absolute value than the positive di’s. This point is illustrated in Figure 9.4. We wish to test the hypothesis H0: ∆ = 0 vs. H1: ∆ ≠ 0, where ∆ = the median score difference between the ointment A and ointment B arms. If ∆ < 0, then ointment A is better; if ∆ > 0, then ointment B is better. More generally, we can test the hypothesis H0, that the distribution of di is symmetric about zero, vs. H1, that the distribution of di is not symmetric about zero. Let’s assume that the di’s have an underlying continuous distribution. Based on Figure 9.4, a seemingly reasonable test of this hypothesis would be to take account of both the magnitude and the sign of the differences di. A paired t test might be used here, but the problem is that the rating scale is ordinal. The measurement di = −5 does not mean that the difference in degree of burn is five times as great as di = −1, but rather it simply means there is a relative ranking of differences in degree of burn, with −8 being most favorable to ointment A, −7 the next most favorable, and so on. Thus a

Table 9.1

Difference in degree of redness between ointment A and ointment B arms after 10 minutes of exposure to sunlight   Negative

Positive

|di |

di

fi

di

fi

10 9 8 7 6 5 4 3 2 1

−10 −9 −8 −7 −6 −5 −4 −3 −2 −1

0 0 1 3 2 2 1 5 4 4 22

10 9 8 7 6 5 4 3 2 1

0 0 0 0 0 0 0 2 6 10 18

5

Number of   people with   same   absolute   value

0 1 3 2 2 1 7 10 14

Range of   ranks

Average   rank

— — 40 37–39 35–36 33–34 32 25–31 15–24 1–14

— — 40.0 38.0 35.5 33.5 32.0 28.0 19.5 7.5

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9.3  ■  The Wilcoxon Signed-Rank Test    335

Figure 9.4

Bar graph of the differences in redness between the ointment A and ointment B arms for the data in Example 9.10

Frequency

Negative differences (ointment A better than ointment B) 5 4 3 2 1 0

–8

–7

–6

–5

–4

–3

–2

–1

Frequency

Difference in redness between ointment A and B arms

10 9 8 7 6 5 4 3 2 1

Positive differences (ointment A worse than ointment B)

8

7

6

5

4

3

2

1

Difference in redness between ointment A and B arms

nonparametric test that is analogous to the paired t test is needed here. The Wilcoxon signed-rank test is such a test. It is nonparametric, because it is based on the ranks of the observations rather than on their actual values, as is the paired t test. The first step in this test is to compute ranks for each observation, as follows.

Equation 9.4

Ranking Procedure for the Wilcoxon Signed-Rank Test

(1) Arrange the differences di in order of absolute value as in Table 9.1.

(2) Count the number of differences with the same absolute value.

(3) Ignore the observations where di = 0, and rank the remaining observations from 1 for the observation with the lowest absolute value, up to n for the observation with the highest absolute value.

(4) If there is a group of several observations with the same absolute value, then find the lowest rank in the range = 1 + R and the highest rank in the range = G + R, where R = the highest rank used prior to considering this group and G = the number of differences in the range of ranks for the group. Assign the average rank = (lowest rank in the range + highest rank in the range)/2 as the rank for each difference in the group.

Example 9.11

Solution

Dermatology  Compute the ranks for the skin-ointment data in Table 9.1. First collect the differences with the same absolute value. Fourteen people have absolute value 1; this group has a rank range from 1 to 14 and an average rank of (1 + 14)/2 = 7.5. The group of 10 people with absolute value 2 has a rank range from (1 + 14) to (10 + 14) = 15 to 24 and an average rank = (15 + 24)/2 = 19.5, . . . , and so on.

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336 

  C H A P T E R 9  ■  Nonparametric Methods

The test is based on the sum of the ranks, or rank sum (R1), for the group of people with positive di—that is, the rank sum for people for whom ointment A is not as good as ointment B. A large rank sum indicates that differences in burn degree in favor of treatment B tend to be larger than those for treatment A, whereas a small rank sum indicates that differences in burn degree in favor of treatment A tend to be larger than those for treatment B. If the null hypothesis is true, then the expected value and variance of the rank sum (when there are no ties) are given by E( R1 ) = n(n + 1) / 4, Var ( R1 ) = n(n + 1)(2n + 1) / 24

where n is the number of nonzero differences. If the number of nonzero di’s is ≥ 16, then a normal approximation can be used for the sampling distribution of R1. This test procedure, the Wilcoxon signed-rank test, is given as follows.

Equation 9.5

ilcoxon Signed-Rank Test (Normal Approximation Method for Two-Sided Level W a Test)

(1) Rank the differences as shown in Equation 9.4.

(2) Compute the rank sum R1 of the positive differences. n(n + 1) (3) (a) If R1 ≠ and there are no ties (no groups of differences with the 4 same absolute value), then

n(n + 1) 1   T =  R1 − −  4 2 

n(n + 1) and there are ties, where ti refers to the number of differ4 ences with the same absolute value in the ith tied group and g is the number of tied groups, then

(b) If R1 ≠

n(n + 1) 1   T =  R1 − −  4 2 

(c)  If R1 =

(4) If   

g

n(n + 1)(2n + 1) 24 − ∑ (t i3 − t i ) 48 i =1

n(n + 1) , then T = 0. 4

T > z1− α/ 2

then reject H0. Otherwise, accept H0.

(5) The p-value for the test is given by

n(n + 1)(2n + 1) 24

p = 2 × [1 − Φ(T )]

(6) This test should be used only if the number of nonzero differences is ≥ 16 and if the difference scores have an underlying continuous symmetric distribution. The computation of the p-value is illustrated in Figure 9.5. The rationale for the different test statistic in the absence (3a) or presence (3b) of tied values is that the variance of R1 is reduced in the presence of ties (sometimes substantially) [1].

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9.3  ■  The Wilcoxon Signed-Rank Test    337

An alternative variance formula for R1 is n

Var ( R1 ) = ∑ rj2 4

j =1

where rj = rank of the absolute value of the jth observation and the sum is over all observations, whether positive or negative. This formula is valid both in the presence or absence of ties but is computationally easier than the variance formula in 3b if ties are present.

Figure 9.5

Computation of the p-value for the Wilcoxon signed-rank test

N(0, 1) distribution Frequency

p = 2 × [1 – Φ(T)]

p/2

T

Value

The term 1/2 in the computation of T serves as a continuity correction in the same manner as for the sign test in Equations 9.1 and 9.2.

Example 9.12

Dermatology  Perform the Wilcoxon signed-rank test for the data in Example 9.10.

Solution

Because the number of nonzero differences (22 + 18 = 40) ≥ 16, the normal approximation method in Equation 9.5 can be used. Compute the rank sum for the people with positive di—that is, where ointment B performs better than ointment A, as follows:

R1 = 10(7.5) + 6(19.5) + 2(28.0 ) = 75 + 117 + 56 = 248 The expected rank sum is given by

E( R1 ) = 40(41) / 4 = 410 The variance of the rank sum corrected for ties is given by Var ( R1 ) = 40(41)(81) / 24 - [(143 - 14) + (10 3 - 10 ) + (73 - 7) + (13 - 1) + (2 3 - 2 )

+ (2 3 - 2 ) + (33 - 3) + (13 - 1)] / 48 = 5535 - (2730 + 990 + 336 + 0 + 6 + 6 + 24 + 0 ) / 48 = 5535 - 4092 / 48 = 5449.75 If the alternative variance formula is used, then Var (T ) = 14(7.5)2 + 10(19.5)2 + L + (40 )2  4

= 21, 799 / 4 = 5449.75

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338 

  C H A P T E R 9  ■  Nonparametric Methods

Thus sd ( R1 ) = 5449.75 = 73.82. Therefore, the test statistic T is given by

1  T =  | 248 - 410 | -  73.82 = 161.5 / 73.82 = 2.19  2 The p-value of the test is given by

p = 2[1 - Φ(2.19)] = 2 × (1 - .9857) = .029 We therefore can conclude that there is a significant difference between ointments, with ointment A doing better than ointment B because the observed rank sum (248) is smaller than the expected rank sum (410). This conclusion differs from the conclusion based on the sign test in Example 9.8, where no significant difference between ointments was found. This result indicates that when the information is available, it is worthwhile to consider both magnitude and direction of the difference between treatments, as the signed-rank test does, rather than just the direction of the difference, as the sign test does. In general, for a two-sided test, if the signed-rank test is based on negative differences rather than positive differences, the same test statistic and p-value will always result. Thus the rank sum can be arbitrarily computed based on either positive or negative differences.

Example 9.13

Solution

Dermatology  Perform the Wilcoxon signed-rank test for the data in Example 9.10 based on negative—rather than positive—difference scores. R2 = rank sum for negative differences

= 4(7.5) + 4(19.5) + 5(28.0) + 1(32.0) + 2(33.5) + 2(35.5) + 3(38.0) + 1(40.0)

= 572 Thus R2 -

n(n + 1) n(n + 1) - .5 = | 572 - 410 | -.5 = 161.5 = R1 - .5 4 4

Because Var(R1) = Var(R2), the same test statistic T = 2.19 and p-value = .029 are obtained as when positive-difference scores are used. If the number of pairs with nonzero di ≤ 15, then the normal approximation is no longer valid and special small-sample tables giving significance levels for this test must be used. Such a table is Table 11 in the Appendix, which gives upper and lower critical values for R1 for a two-sided test with α levels of .10, .05, .02, and .01, respectively. In general, the results are statistically significant at a particular α level only if either R1 ≤ the lower critical value or R1 ≥ the upper critical value for that α level.

Example 9.14

Suppose there are 9 untied nonzero paired differences and a rank sum of 43. Evaluate the statistical significance of the results.

Solution

Because R1 = 43 ≥ 42, it follows that p < .02. Because R1 = 43 < 44, it follows that p ≥ .01. Thus .01 ≤ p < .02, and the results are statistically significant. If you have 0, then dominant patients tend to have better visual acuity than sex-linked patients; if ∆ < 0, then dominant patients tend to have worse visual acuity than sex-linked patients; if ∆ = 0, then dominant patients have the same acuity distribution as sex-linked patients. The two-sample t test for independent samples, discussed in Sections 8.4 and 8.7, would ordinarily be used for this type of problem. However, visual acuity cannot be given a specific numeric value that all ophthalmologists would agree on. Thus the t test is inapplicable, and a nonparametric analog must be used. The nonparametric analog to the independent-samples t test is the Wilcoxon rank-sum test. This test is nonparametric because it is based on the ranks of the individual observations rather than on their actual values, which would be used in the t test. The ranking procedure for this test is as follows.

Equation 9.6

Ranking Procedure for the Wilcoxon Rank-Sum Test

(1) Combine the data from the two groups, and order the values from lowest to highest or, in the case of visual acuity, from best (20–20) to worst (20–80).

(2) Assign ranks to the individual values, with the best visual acuity (20–20) having the lowest rank and the worst visual acuity (20–80) having the highest rank, or vice versa.

(3) If a group of observations has the same value, then compute the range of ranks for the group, as was done for the signed-rank test in Equation 9.4, and assign the average rank for each observation in the group.

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9.4  ■  The Wilcoxon Rank-Sum Test    341

Example 9.16

Solution

Compute the ranks for the visual-acuity data in Table 9.3. First collect all people with the same visual acuity over the two groups, as shown in Table 9.3. There are 6 people with visual acuity 20–20 who have a rank range of 1–6 and are assigned an average rank of (1 + 6)/2 = 3.5. There are 14 people for the two groups combined with visual acuity 20–25. The rank range for this group is from (1 + 6) to (14 + 6) = 7 to 20. Thus all people in this group are assigned the average rank = (7 + 20)/2 = 13.5, and similarly for the other groups. The test statistic for this test is the sum of the ranks in the first sample (R1). If this sum is large, then the dominant group has poorer visual acuity than the sexlinked group, whereas if it is small, the dominant group has better visual acuity. If the number of observations in the two groups are n1 and n2, respectively, then the average rank in the combined sample is (1 + n1 + n2)/2. Thus, under H0 the expected rank sum in the first group ≡ E(R1) = n1 × average rank in the combined sample = n1(n1 + n2 + 1)/2. It can be shown that the variance of R1 under H0 if there are no tied values is given by Var(R1) = n1n2(n1 + n2 + 1)/12. Furthermore, we will assume that the smaller of the two groups is of size at least 10 and that the variable under study has an underlying continuous distribution. Under these assumptions, the sampling distribution of the rank sum R1 is approximately normal. Thus the following test procedure is used.

Equation 9.7

Wilcoxon Rank-Sum Test (Normal Approximation Method for Two-Sided Level α Test) (1) Rank the observations as shown in Equation 9.6.

(2) Compute the rank sum R1 in the first sample (the choice of sample is arbitrary).

(3) (a) If R1 ≠ n1(n1 + n2 + 1)/2 and there are no ties, then compute

n (n + n2 + 1) 1   T =  R1 − 1 1 −  2 2 

 n1n2    (n + n2 + 1) 12  1

(b)  If R1 ≠ n1(n1 + n2 + 1)/2 and there are ties, then compute

n (n + n2 + 1) 1   T =  R1 − 1 1 −  2 2 

g   t i (t i2 − 1)   ∑  n1n2   i =1  + n n + 1 −   2 12   1 (n1 + n2 )(n1 + n2 − 1)     

where ti refers to the number of observations with the same value in the ith tied group, and g is the number of tied groups.

(c)  If R1 = n1(n1 + n2 + 1)/2, then T = 0.

(4) If

T > z1− α/ 2

then reject H0. Otherwise, accept H0.

(5) Compute the exact p-value by

p = 2 × [1 − Φ(T )]

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342 

  C H A P T E R 9  ■  Nonparametric Methods

Figure 9.6

Computation of the p-value for the Wilcoxon rank-sum test

N(0, 1) distribution Frequency

p = 2 × [1 – Φ(T)]

p/2

T

Value

(6) This test should be used only if both n1 and n2 are at least 10, and if there is an underlying continuous distribution.

The computation of the p-value is illustrated in Figure 9.6.

Example 9.17

Solution

Perform the Wilcoxon rank-sum test for the data in Table 9.3. Because the minimum sample size in the two samples is 25 ≥ 10, the normal approximation can be used. The rank sum in the dominant group is given by R1 = 5(3.5) + 9(13.5) + 6(25.5) + 3(34) + 2(42.5) = 17.5 5 + 121.5 + 153 + 102 + 85 = 479 Furthermore, E( R1 ) =

25(56) = 700 2

and Var(R1) corrected for ties is given by [ 25(30 ) / 12 ]{56 - [6(62 - 1) + 14(142 - 1) + 10(10 2 - 1) + 7(72 - 1) + 10(10 2 - 1)

+ 5(52 - 1) + 2(2 2 - 1) + 1(12 - 1)]] /[ 55(54)]} = 62.5(56 - 5382 / 2970 ) = 3386.74 Thus the test statistic T is given by

T=

(| 479 - 700 | - .5) = 220.5 = 3.79 3386.74

58.2

which follows an N(0,1) distribution under H0. The p-value of the test is

p = 2 × [1 - Φ(3.79)] < .001 We conclude that the visual acuities of the two groups are significantly different. Because the observed rank sum in the dominant group (479) is lower than the expected rank sum (700), the dominant group has better visual acuity than the sexlinked group. If either sample size is less than 10, the normal approximation is not valid, and a small-sample table of exact significance levels must be used. Table 12 in the Appendix gives upper and lower critical values for the rank sum in the first of two samples (T ) for a two-sided test with α levels of .10, .05, .02, and .01, respectively, under the

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9.4  ■  The Wilcoxon Rank-Sum Test    343

assumption that there are no ties. In general, the results are statistically significant at a particular α level if either T ≤ Tl = the lower critical value or T ≥ Tr = the upper critical value for that α level.

Example 9.18

Suppose there are two samples of size 8 and 15, with no ties, with a rank sum of 73 in the sample size of 8. Evaluate the statistical significance of the results.

Solution

Refer to n1 = 8, n2 = 15, α = .05 and find that Tl = 65, Tr = 127. Because T = 73 > 65 and T < 127, the results are not statistically significant using a two-sided test at the 5% level. Appendix Table 12 was constructed under the assumption of no tied values. If there are ties, and min (n1, n2) < 10, then an exact-permutation test must be used to assess statistical significance (see Lehmann [1] for more details). The Wilcoxon rank-sum test is sometimes referred to in the literature as the Mann-Whitney U test. The test statistic for the Mann-Whitney U test is based on the number of pairs of observations (xi, yj), one from each sample, such that xi < yj; in addition, 0.5 is added to the test statistic for each (xi, yj) pair such that xi = yj. The Mann-Whitney U test and the Wilcoxon rank-sum test are completely equivalent because the same p-value is obtained by applying either test. Therefore, the choice of which test to use is a matter of convenience. Because ranking all the observations in a large sample is tedious, a computer program is useful in performing this test. The Stata ranksum command was used on the data set in Table 9.3; the results are given in Table 9.4.

Table 9.4

Stata ranksum command used on the data in Table 9.3 Two-sample Wilcoxon rank-sum (Mann-Whitney) test

group |

obs

rank sum

1 | | 2

25 30

479 1061

700 840

1540

1540

combined | 55 unadjusted variance adjustment for ties

expected

3500.00 -113.26

adjusted variance 3386.74 Ho: visual~y(group==1) = visual~y(group==2) z = -3.798 Prob > |z| = 0.0001

The median visual acuity in the dominant and sex-linked groups is listed first. The dominant group, with a lower median, tends to have better visual acuity than the sex-linked group. The Wilcoxon rank-sum (labeled W) = 479 is given in the output. The two-tailed p-value after adjusting for ties is denoted by Prob > |z| and is 0.0001. Finally, a necessary condition for the strict validity of the rank-sum test is that the underlying distributions being compared must be continuous. However, McNeil has investigated the use of this test in comparing discrete distributions and has found only small losses in power when applying this test to grouped data from normal distributions, compared with the actual ungrouped observations from such distributions [3]. He concludes that the rank-sum test is approximately valid in this case, with the appropriate provision for ties as given in Equation 9.7.

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344 

  C H A P T E R 9  ■  Nonparametric Methods

9.5 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children In previous chapters, we have considered the effect of lead exposure on neurological and cognitive function in children as described in Data Set LEAD.DAT on the Companion Website. Other effects of lead as described in the literature are behavioral in nature. One such variable is hyperactivity. In this study, the children’s parents were asked to rate the degree of hyperactivity in their children on a four-point scale, from normal (0) to very hyperactive (3). The scale is ordinal in nature. Thus to compare the degree of hyperactivity between the exposed and control groups, nonparametric methods are appropriate. Because this question was only asked for the younger children, data are available for only 49 control children and 35 exposed children. The raw data are given in Table 9.5. The columns of the table correspond to the groups (1 = control, 2 = exposed). The rows of the table correspond to the degree of hyperactivity. Within each group, the percentage of children with a specific hyperactivity score (the column percentages) is also given. The exposed children seem slightly more hyperactive than the control children. We have used the Mann-Whitney U test to compare the hyperactivity distribution between the two groups. The results are given in Table 9.6. We see that the two-sided p-value (adjusted for ties) as given in the last row of the table is .46. Thus there is no significant difference in the distribution of hyperactivity level between the two groups.

REVIEW

REVIEW QUESTIONS 9B

1

What is the difference between the Wilcoxon signed-rank test and the Wilcoxon rank-sum test?

2

A pilot study is planned to test the efficacy of vitamin E supplementation as a possible preventive agent for Alzheimer’s disease. Twenty subjects age 65+ are randomized to either a supplement of vitamin E of 400 IU/day (group 1, n = 10), or placebo (group 2). It is important to compare the total vitamin E intake (from food and supplements) of the two groups at baseline. The baseline intake of each group in IU/day is as follows:

Group 1 (n = 10): 7.5, 12.6, 3.8, 20.2, 6.8, 403.3, 2.9, 7.2, 10.5, 205.4

Group 2 (n = 10): 8.2, 13.3, 102.0, 12.7, 6.3, 4.8, 19.5, 8.3, 407.1, 10.2

(a) What test can be used to compare the baseline vitamin E intake between the two groups if we do not wish to assume normality?

(b) Implement the test in Review Question 9B.2a and report a two-tailed p-value.

9.6 Summary This chapter presented some of the most widely used nonparametric statistical tests corresponding to the parametric procedures in Chapter 8. The main advantage of nonparametric methods is that the assumption of normality made in previous chapters can be relaxed when such assumptions are unreasonable. One drawback of nonparametric procedures is that some power is lost relative to using a parametric procedure (such as a t test) if the data truly follow a normal distribution or if the central-limit theorem is applicable. Also, the data typically must be expressed in terms of ranks, a scale some researchers find difficult to understand compared with maintaining the raw data in the original scale.

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9.6  ■  Summary    345

Table 9.5

Hyperactivity data for case study Tabulated statistics: Hyperact, Group ROWS: HYPERACT 1

COLUMNS: GROUP 2 ALL

24 48.98

15 42.86

39 46.43

1

20 40.82

14 40.00

34 40.48

2

3 6.12

5 14.29

8 9.52

3

2 4.08

1 2.86

3 3.57

11 *

* *

35 100.00

84 100.00

Missing ALL

29 *

49 100.00

CELL CONTENTS -COUNT % OF COL

Table 9.6

Results of Mann-Whitney U test Mann-Whitney Confidence Interval and Test N Median hyper-1 49 1.0000 hyper-2 35 1.0000 Point estimate for ETA1-ETA2 is 0.0000 95.1 Percent C.I. for ETA1–ETA2 is (–0.0000, 0.0001) W = 2008.5 Test of ETA1 = ETA2 vs. ETA1 not = ETA2 is significant at 0.5049 The test is significant at 0.4649 (adjusted for ties)

The specific procedures covered for the comparison of two samples include the sign test, the Wilcoxon signed-rank test, and the Wilcoxon rank-sum test. Both the sign test and the signed-rank test are nonparametric analogs to the paired t test. For the sign test it is only necessary to determine whether one member of a matched pair has a higher or lower score than the other member of the pair. For the signedrank test the magnitude of the absolute value of the difference score (which is then ranked), as well as its sign, is used in performing the significance test. The Wilcoxon rank-sum test (also known as the Mann-Whitney U test) is an analog to the twosample t test for independent samples, in which the actual values are replaced by rank scores. Nonparametric procedures appropriate for regression, analysis of variance, and survival analysis are introduced in Chapters 11, 12, and 14. The tests covered in this chapter are among the most basic of nonparametric tests. Hollander and Wolfe [4] and Lehmann [1] provide a more comprehensive treatment of nonparametric statistical methods.

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346 

  C H A P T E R 9  ■  Nonparametric Methods

P rob l e m s

Dentistry

Health Services Administration

In a study, 28 adults with mild periodontal disease are assessed before and 6 months after implementation of a dental-education program intended to promote better oral hygiene. After 6 months, periodontal status improved in 15 patients, declined in 8, and remained the same in 5.

Suppose we want to compare the length of hospital stay for patients with the same diagnosis at two different hospitals. The results are shown in Table 9.8.

*9.1  Assess the impact of the program statistically (use a two-sided test).

First   hospital 21, 10, 32, 60, 8, 44, 29, 5, 13, 26, 33 Second   hospital 86, 27, 10, 68, 87, 76, 125, 60, 35, 73, 96, 44, 238

Suppose patients are graded on the degree of change in periodontal status on a 7-point scale, with +3 indicating the greatest improvement, 0 indicating no change, and −3 indicating the greatest decline. The data are given in Table 9.7. 9.2  What nonparametric test can be used to determine whether a significant change in periodontal status has occurred over time? 9.3  Implement the procedure in Problem 9.2, and report a p-value. Table 9.7  Degree of change in periodontal status Change score

+3 +2 +1 0 -1 -2 -3

Number of patients

4 5 6 5 4 2 2

9.4  Suppose there are two samples of size 6 and 7, with a rank sum of 58 in the sample of size 6. Using the Wilcoxon rank-sum test, evaluate the significance of the results, assuming there are no ties.

Table 9.8  Comparison of length of stay in 2 hospitals

*9.9  Why might a t test not be very useful in this case? *9.10  Carry out a nonparametric procedure for testing the hypothesis that lengths of stay are comparable in the two hospitals.

Infectious Disease The distribution of white-blood-cell count is typically positively skewed, and assumptions of normality are usually not valid. 9.11  To compare the distribution of white-blood-cell counts of patients on the medical and surgical services in Table 2.11 when normality is not assumed, what test can be used? 9.12  Perform the test in Problem 9.11, and report a  p-value.

Sports Medicine Refer to Data Set TENNIS2.DAT (on the Companion  Website). 9.13  What test can be used to compare degree of pain during maximal activity in the first period between people randomized to Motrin and a placebo?

9.5  Answer Problem 9.4 for two samples of size 7 and 10, with a rank sum of 47 in the sample of size 7. Assume there are no ties.

9.14  Perform the test in Problem 9.13, and report a  p-value.

9.6  Answer Problem 9.4 for two samples of size 12 and 15, with a rank sum of 220 in the sample of size 12. Assume there are no ties.

Otolaryngology, Pediatrics

Obstetrics 9.7  Reanalyze the data in Table 8.17 using nonparametric methods. Assume the samples are unpaired. 9.8  Would such methods be preferable to parametric methods in analyzing the data? Why or why not?

A common symptom of otitis media in young children is the prolonged presence of fluid in the middle ear, known as middle-ear effusion. The presence of fluid may result in temporary hearing loss and interfere with normal learning skills in the first 2 years of life. One hypothesis is that babies who are breastfed for at least 1 month build up some immunity against the effects of the infection and have less prolonged effusion than do bottle-fed babies. A small study of 24 pairs

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Problems    347

of babies is set up, in which the babies are matched on a one-to-one basis according to age, sex, socioeconomic status, and type of medications taken. One member of the matched pair is a breastfed baby, and the other member is a bottle-fed baby. The outcome variable is the duration of middle-ear effusion after the first episode of otitis media. The results are given in Table 9.9. Table 9.9  Duration of middle-ear effusion in breast-fed and bottle-fed babies Pair number

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24

­p rincipal dietary polyunsaturated fat is linoleic acid. To test the effects of dietary supplementation with linoleic acid on blood pressure, 17 adults consumed 23 g/day of safflower oil, high in linoleic acid, for 4 weeks. Systolic blood pressure (SBP) measurements were taken at baseline (before ingestion of oil) and 1 month later, with the mean values over several readings at each visit given in  Table 9.10.

Table 9.10  Effect of linoleic acid on SBP

Duration of effusion in breastfed baby (days)

Duration of  effusion in  bottle-fed  baby (days)

20 11 3 24 7 28 58 7 39 17 17 12 52 14 12 30 7 15 65 10 7 19 34 25

18 35 7 182 6 33 223 7 57 76 186 29 39 15 21 28 8 27 77 12 8 16 28 20

*9.15  What hypotheses are being tested here? *9.16  Why might a nonparametric test be useful in testing the hypotheses? *9.17  Which nonparametric test should be used here? *9.18  Test the hypothesis that the duration of effusion is different among breastfed babies than among bottle-fed babies using a nonparametric test.

Hypertension Polyunsaturated fatty acids in the diet favorably affect several risk factors for cardiovascular disease. The

Subject Baseline SBP 1-month SBP

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17

119.67 100.00 123.56 109.89 96.22 133.33 115.78 126.39 122.78 117.44 111.33 117.33 120.67 131.67 92.39 134.44 108.67

117.33 98.78 123.83 107.67 95.67 128.89 113.22 121.56 126.33 110.39 107.00 108.44 117.00 126.89 93.06 126.67 108.67

Baseline −   1-month SBP

2.34 1.22 –0.27 2.22 0.55 4.44 2.56 4.83 –3.55 7.05 4.33 8.89 3.67 4.78 –0.67 7.77 0.00

9.19  What parametric test could be used to test for the  effect of linoleic acid on SBP? 9.20  Perform the test in Problem 9.19, and report a  p-value. 9.21  What nonparametric test could be used to test for the effect of linoleic acid on SBP? 9.22  Perform the test in Problem 9.21, and report a  p-value. 9.23  Compare your results in Problems 9.20 and 9.22, and discuss which method you feel is more appropriate here.

Hypertension An instrument that is in fairly common use in blood-pressure epidemiology is the random-zero device, in which the zero point of the machine is randomly set with each use and the observer is not aware of the actual level of blood pressure at the time of measurement. This instrument is intended to reduce observer bias. Before using such a machine, it is important to check that ­r eadings

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348 

  C H A P T E R 9  ■  Nonparametric Methods

are, on average, comparable to those of a standard cuff. For this purpose, two measurements were made on 20 children with both the standard cuff and the random-zero machine. The mean systolic blood pressure (SBP) for the two readings for each machine are given in Table 9.11. Suppose observers are reluctant to assume that the distribution of blood pressure is normal. Table 9.11  Comparison of mean SBP with the standard cuff vs. the random-zero machine (mm Hg) Person

1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20

Mean SBP (standard cuff)

Mean SBP   (random-zero)

79 112 103 104 94 106 103 97 88 113 98 103 105 117 94 88 101 98 91 105

84 99 92 103 94 106 97 108 77 94 97 103 107 120 94 87 97 93 87 104

*9.24  Which nonparametric test should be used to test the hypothesis that the mean SBPs for the two machines are comparable? *9.25  Conduct the test recommended in Problem 9.24. Another aspect of the same study is to compare the variability of blood pressure with each method. This comparison is achieved by computing x 1- x2 for each participant and method (i.e., absolute difference between first and second readings) and comparing absolute differences between machines for individual participants. The data are given in Table 9.12. The observers are reluctant to assume that the distributions are normal. *9.26  Which nonparametric test should be used to test  the hypothesis that variability of the two machines is  comparable? *9.27  Conduct the test recommended in Problem 9.26.

Table 9.12  Comparison of variability of SBP with the standard cuff and the random-zero machine (mm Hg) Person

Absolute difference, standard cuff (as)

Absolute difference,   random-zero (ar)

2 4 6 4 8 4 2 2 4 2 0 2 6 2 8 0 6 4 2 2

12 6 0 2 4 4 6 8 2 4 6 6 6 4 8 2 6 6 14 4

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16 17 18 19 20

Health Promotion Refer to Data Set SMOKE.DAT on the Companion Website. 9.28  Use nonparametric methods to test whether there is a difference between the number of days abstinent from smoking for males vs. females. 9.29  Divide the data set into age groups (above/below the median), and use nonparametric methods to test whether the number of days abstinent from smoking is related to age. 9.30  Use the same approach as in Problem 9.29 to test whether the amount previously smoked is related to the number of days abstinent from smoking. 9.31  Use the same approach as in Problem 9.29 to test whether the adjusted carbon monoxide (CO) level is related to the number of days abstinent from smoking. 9.32  Why are nonparametric methods well suited to a study of risk factors for smoking cessation?

Nutrition Refer to the urinary-sodium data in Table 8.20. 9.33  Use nonparametric methods to assess whether dietary counseling is effective in reducing sodium intake as judged by urinary-sodium excretion levels.

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Problems    349

Refer to the data set in Tables 7.7 and 7.8 (pp. 263–264).

reflects consistency in taking insulin injections over the past 30 days, were measured at each visit. People with diabetes have a higher-than-normal HgbA1c; the goal of insulin treatment is to lower the HgbA1c level as much as possible. To look at the relationship between change in weight and change in HgbA1c, each of 23 boys was ascertained during one 90-day interval when HgbA1c change was minimal (i.e., change of z1−α/2 then reject H0; if  z ≤ z1−α/2 then accept H0. (3) The approximate p-value for this test is given by     p = 2[1 − Φ(z)] (4) Use this test only when the normal approximation to the binomial disˆ ˆ ≥ 5 and tribution is valid for each of the two samples—that is, when n1 pq ˆ ˆ ≥ 5. n2 pq

The acceptance and rejection regions for this test are shown in Figure 10.1. Computation of the exact p-value is illustrated in Figure 10.2.

Example 10.5

Cancer  Assess the statistical significance of the results from the international study in Example 10.4.

Solution

The sample proportion of case women whose age at first birth was ≥30 is 683/3220 = .212 = pˆ1, and the sample proportion of control women whose age at first birth was ≥30 is 1498/10,245 = .146 = pˆ2. To compute the test statistic z in Equation 10.3, the estimated common proportion pˆ must be computed, which is given by

pˆ = (683 + 1498)/(3220 + 10,245) = 2181/13,465 = .162

qˆ = 1 − .162 = .838 Note that

ˆ ˆ = 3220(.162) (.838) = 437 ≥ 5   n1 pq ˆ ˆ = 10,245(.162) (.838) = 1391 ≥ 5 and  n2 pq Thus the test in Equation 10.3 can be used.

Figure 10.1

Acceptance and rejection regions for the two-sample test for binomial proportions (normal-theory test)

Frequency

N(0, 1) distribution

z ≤ z1 – �/2 Acceptance region

0 Value

z > z1 – �/2 Rejection region

z1 – �/2

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356   C H A P T E R 10 

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Figure 10.2

Computation of the exact p-value for the two-sample test for binomial proportions (normal-theory test)

Frequency

N(0, 1) distribution

p/2

0 Value

z

The test statistic is given by

   1 1  z =  .212 − .146 −  +   2 ( 3220 ) 2 (10, 245)    = .0657/.00 0744 = 8.8

1   1 .162 (.838)  +  3220 10, 245 

The p-value = 2 × [l − Φ (8.8)] < .001, and the results are highly significant. Therefore, we can conclude that women with breast cancer are significantly more likely to have had their first child after age 30 than are comparable women without breast cancer.

Example 10.6

Cardiovascular Disease  A study looked at the effects of OC use on heart disease in women 40 to 44 years of age. The researchers found that among 5000 current OC users at baseline, 13 women developed a myocardial infarction (MI) over a 3-year period, whereas among 10,000 non-OC users, 7 developed an MI over a 3-year period. Assess the statistical significance of the results.

Solution

Note that n1 = 5000, pˆ1 = 13/5000 = .0026, n2 = 10,000, pˆ2 = 7/10,000 = .0007. We want to test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2. The best estimate of the common proportion p is given by

13 + 7 20 pˆ = = = .00133 15, 000 15, 000 ˆ ˆ = 5000(.00133)(.99867) = 6.7, n2 pq ˆ ˆ = 10,000(.00133)(.99867) = 13.3, the Because n1 pq normal-theory test in Equation 10.3 can be used. The test statistic is given by

  1 1 .0026 − .0007 −  +  2 5000 2 10 , 000 ( ) ( )   = .00175 = 2.77 z= .00063 .0013 33 (.99867) (1 5000 + 1 10, 000 ) The p-value is given by 2 × [1 − Φ(2.77)] = .006. Thus there is a highly significant difference between MI incidence rates for current OC users vs. non-OC users. In other words, OC use is significantly associated with MI incidence over a 3-year period.

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10.2  ■  Two-Sample Test for Binomial Proportions   357

Contingency-Table Method The same test posed in this section on page 353 is now approached from a different perspective.

Example 10.7

Table 10.1

Cancer  Suppose all women with at least one birth in the international study in Example 10.4 are classified as either cases or controls and with age at first birth as either ≤ 29 or ≥ 30. The four possible combinations are shown in Table 10.1. Data for the international study in Example 10.4 comparing age at first birth in breast-cancer cases with comparable controls

Age at first birth

Status

≥30

≤29

Total

Case

683

2537

3220

Control

1498

8747

10,245

Total

2181

11,284

13,465

Source: Reprinted with permission from WHO Bulletin, 43, 209−221, 1970.

Case−control status is displayed along the rows of the table, and age at first birth groups are presented in the columns of the table. Hence, each woman falls into one of the four boxes, or cells, of the table. In particular, there are 683 women with breast cancer whose age at first birth is ≥30, 2537 women with breast cancer whose age at first birth is ≤29, 1498 control women whose age at first birth is ≥30, and 8747 control women whose age at first birth is ≤29. Furthermore, the number of women in each row and column can be totaled and displayed in the margins of the table. Thus, there are 3220 case women (683 + 2537), 10,245 control women (1498 + 8747), 2181 women with age at first birth ≥30 (683 + 1498), and 11,284 women with age at first birth ≤29 (2537 + 8747). These sums are referred to as row margins and column margins, respectively. Finally, the total number of units = 13,465 is given in the lower right-hand corner of the table; this total can be obtained either by summing the four cells (683 + 2537 + 1498 + 8747) or by summing the row margins (3220 + 10,245) or the column margins (2181 + 11,284). This sum is sometimes referred to as the grand total. Table 10.1 is called a 2 × 2 contingency table because it has two categories for case−control status and two categories for age-at-first-birth status.

Definition 10.1

A 2 × 2 contingency table is a table composed of two rows cross-classified by two columns. It is an appropriate way to display data that can be classified by two different variables, each of which has only two possible outcomes. One variable is arbitrarily assigned to the rows and the other to the columns. Each of the four cells represents the number of units (women, in the previous example), with a specific value for each of the two variables. The cells are sometimes referred to by number, with the (1, 1) cell being the cell in the first row and first column, the (1, 2) cell being the cell in the first row and second column, the (2, 1) cell being the cell in the second row and first column, and the (2, 2) cell being the cell in the second row and second column. The observed number of units in the four cells is likewise referred to as O11, O12, O21, and O22, respectively.

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358   C H A P T E R 10 

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Furthermore, it is customary to total (1) The number of units in each row and display them in the right margins, which are called row marginal totals or row margins. (2) The number of units in each column and display them in the bottom margins, which are called column marginal totals or column margins. (3) The total number of units in the four cells, which is displayed in the lower righthand corner of the table and is called the grand total.

Example 10.8

Cardiovascular Disease  Display the MI data in Example 10.6 in the form of a 2 × 2 contingency table.

Solution

Let the rows of the table represent the OC-use group, with the first row representing current OC users and the second row representing non-OC users. Let the columns of the table represent MI, with the first column representing Yes and the second column representing No. We studied 5000 current OC users, of whom 13 developed MI and 4987 did not. We studied 10,000 non-OC users, of whom 7 developed MI and 9993 did not. Thus the contingency table should look like Table 10.2.

Table 10.2

2 × 2 contingency table for the OC−MI data in Example 10.6

MI status over 3 years

OC-use group

Yes

No

Total

OC users

13

4987

5000

7

9993

10,000

20

14,980

15,000

Non-OC users Total

Two different sampling designs lend themselves to a contingency-table framework. The breast-cancer data in Example 10.4 have two independent samples (i.e., case women and control women), and we want to compare the proportion of women in each group who have a first birth at a late age. Similarly, in the OC−MI data in Example 10.6 there are two independent samples of women with different contraceptive-use patterns and we want to compare the proportion of women in each group who develop an MI. In both instances, we want to test whether the proportions are the same in the two independent samples. This test is called a test for homogeneity of binomial proportions. In this situation, one set of margins is fixed (e.g., the rows) and the number of successes in each row is a random variable. For example, in Example 10.4 the total number of breast-cancer cases and controls is fixed, and the number of women with age at first birth ≥30 is a binomial random variable conditional on the fixed-row margins (i.e., 3220 cases and 10,245 controls). Another possible design from which contingency tables arise is in testing for the independence of two characteristics in the same sample when neither characteristic is particularly appropriate as a denominator. In this setting, both sets of margins are assumed to be fixed. The number of units in one particular cell of the table [e.g., the (1, 1) cell] is a random variable, and all other cells can be determined from the fixed margins and the (1, 1) cell. An example of this design is given in Example 10.9.

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10.2  ■  Two-Sample Test for Binomial Proportions   359

Example 10.9

Table 10.3

Nutrition  The food-frequency questionnaire is widely used to measure dietary intake. A person specifies the number of servings consumed per day of each of many different food items. The total nutrient composition is then calculated from the specific dietary components of each food item. One way to judge how well a questionnaire measures dietary intake is by its reproducibility. To assess reproducibility the questionnaire is administered at two different times to 50people and the reported nutrient intakes from the two questionnaires are compared. Suppose dietary cholesterol is quantified on each questionnaire as high if it exceeds 300mg/day and as normal otherwise. The contingency table in Table 10.3 is a natural way to compare the results of the two surveys. Notice that this example has no natural denominator. We simply want to test whether there is some association between the two reported measures of dietary cholesterol for the same person. More specifically, we want to assess how unlikely it is that 15 women will report high dietary cholesterol intake on both questionnaires, given that 20 of 50women report high intake on the first questionnaire and 24 of 50 women report high intake on the second questionnaire. This test is called a test of independence or a test of association between the two characteristics. A comparison of dietary cholesterol assessed by a food-frequency questionnaire at two different times

Second food-frequency questionnaire

First food-frequency questionnaire

High

Normal

Total

15

5

20

9

21

30

24

26

50

High Normal Total

Fortunately, the same test procedure is used whether a test of homogeneity or a test of independence is performed, so we will no longer distinguish between these two tests in this section.

Significance Testing Using the Contingency-Table Approach Table 10.1 is an observed contingency table or an observed table. To determine statistical significance, we need to develop an expected table, which is the contingency table that would be expected if there were no relationship between breast cancer and age at first birth—that is, if H0: p1 = p2 = p were true. In this example p1 and p2 are the probabilities (among women with at least one birth) of a breast-cancer case and a control, respectively, having a first birth at an age ≥30. For this purpose, a general observed table, if there were x1 exposed out of n1 women with breast cancer and x2 exposed out of n2 control women, is given in Table 10.4. If H0 were true, then the best estimate of the common proportion p is pˆ , which is given in Equation 10.2 as

(n1 pˆ1 + n2 pˆ2 ) / (n1 + n2 )

or as  (x1 + x2) / (n1 + n2)

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360   C H A P T E R 10 

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Table 10.4

General contingency table for the international-study data in Example 10.4 if (1) of n1 women in the case group, x1 are exposed and (2) of n2 women in the control group, x2 are exposed (that is, having an age at first birth ≥ 30)

Age at first birth ≥30

≤29

Total

Case

x1

n1  x1

n1

Control

x2

n2  x2

n2

x1  x2

n1  n2  (x1  x2 )

n1  n2

Case–control status

Total

where x1 and x2 are the number of exposed women in groups 1 and 2, respectively. Furthermore, under H0 the expected number of units in the (1, 1) cell equals the expected number of women with age at first birth ≥30 among women with breast cancer, which is given by

n1 pˆ = n1 ( x1 + x2 ) ( n1 + n2 ) However, in Table 10.4 this number is simply the product of the first row margin (n1) multiplied by the first column margin (x1 + x2), divided by the grand total (n1 + n2). Similarly, the expected number of units in the (2, 1) cell equals the expected number of control women with age at first birth ≥30:

n2 pˆ = n2 ( x1 + x2 ) ( n1 + n2 ) which is equal to the product of the second row margin multiplied by the first column margin, divided by the grand total. In general, the following rule can be applied.

Equation 10.4

Example 10.10

Solution

omputation of Expected Values for 2 × 2 Contingency Tables C The expected number of units in the (i, j ) cell, which is usually denoted by Eij, is the product of the ith row margin multiplied by the jth column margin, divided by the grand total. Cancer  Compute the expected table for the breast-cancer data in Example 10.4. Table 10.1 gives the observed table for these data. The row totals are 3220 and 10,245; the column totals are 2181 and 11,284; and the grand total is 13,465. Thus E11 = expected number of units in the (1, 1) cell

   = 3220(2181)/13,465 = 521.6

E12 = expected number of units in the (1, 2) cell

   = 3220(11,284)/13,465 = 2698.4

E21 = expected number of units in the (2, 1) cell

   = 10,245(2181)/13,465 = 1659.4

E22 = expected number of units in the (2, 2) cell

   = 10,245(11,284)/13,465 = 8585.6 These expected values are shown in Table 10.5. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

10.2  ■  Two-Sample Test for Binomial Proportions   361

Table 10.5

Expected table for the breast-cancer data in Example 10.4

Age at first birth

Case−control status

Case Control Total

Example 10.11

Solution

≥30

≤29

521.6

2698.4

3220

1659.4

8585.6

10,245

2181

11,284

13,465

Total

Cardiovascular Disease  Compute the expected table for the OC−MI data in Example 10.6. From Table 10.2, which gives the observed table for these data,

E11 =

5000 ( 20 ) = 6.7 15, 000

E12 =

5000 (14, 980 ) = 4993.3 15,000

E21 =

10,000 ( 20 ) = 13.3 15,000

E22 =

10,000 (14,980 ) = 9986.7 15,000

These expected values are displayed in Table 10.6.

Table 10.6

Expected table for the OC−MI data in Example 10.6

MI status over 3 years

OC-use group

Yes

Current OC users

6.7

4993.3

5000

13.3

9986.7

10,000

20

14,980

15,000

Non-OC users Total

No

Total

We can show from Equation 10.4 that the total of the expected number of units in any row or column should be the same as the corresponding observed row or column total. This relationship provides a useful check that the expected values are computed correctly.

Example 10.12

Solution

Check that the expected values in Table 10.5 are computed correctly. The following information is given: (1) The total of the expected values in the first row = E11 + E12 = 521.6 + 2698.4 = 3220 = first row total in the observed table. (2) The total of the expected values in the second row = E21 + E22 = 1659.4 + 8585.6 = 10,245 = second row total in the observed table.

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(3) The total of the expected values in the first column = E11 + E21 = 521.6 + 1659.4 = 2181 = first column total in the observed table. (4) The total of the expected values in the second column = E12 + E22 = 2698.4 + 8585.6 = 11,284 = second column total in the observed table. We now want to compare the observed table in Table 10.1 with the expected table in Table 10.5. If the corresponding cells in these two tables are close, then H0 will be accepted; if they differ enough, then H0 will be rejected. How should we decide how different the cells should be for us to reject H0? It can be shown that the best way of comparing the cells in the two tables is to use the statistic (O − E)2/E, where O and E are the observed and expected number of units, respectively, in a particular cell. In particular, under H0 it can be shown that the sum of (O − E)2/E over the four cells in the table approximately follows a chi-square distribution with 1 degree of freedom (df). H0 is rejected only if this sum is large and is accepted otherwise because small values of this sum correspond to good agreement between the two tables, whereas large values correspond to poor agreement. This test procedure will be used only when the normal approximation to the binomial distribution is valid. In this setting the normal approximation can be shown to be approximately true if no expected value in the table is less than 5. Furthermore, under certain circumstances a version of this test statistic with a continuity correction yields more accurate p-values than does the uncorrected version when approximated by a chi-square distribution. For the continuity-corrected ver2 1  sion, the statistic  O − E −  E rather than (O − E)2/E is computed for each cell  2 and the preceding expression is summed over the four cells. This test procedure is called the Yates-corrected chi-square and is summarized as follows.

Equation 10.5

Yates-Corrected Chi-Square Test for a 2 × 2 Contingency Table  Suppose we wish to test the hypothesis H 0: p1 = p2 vs. H1: p1 ≠ p2 using a contingency-table approach, where Oij represents the observed number of units in the (i, j) cell and Eij represents the expected number of units in the (i, j) cell. (1) Compute the test statistic X 2 = ( O11 − E11 − .5)

E11 + ( O12 − E12 − .5)

2

2

+ ( O21 − E21 − .5)

2

E12

E21 + ( O22 − E22 − .5)

2

E22

which under H0 approximately follows a χ12 distribution. (2) For a level α test, reject H0 if X 2 > χ12,1− α and accept H0 if X 2 ≤ χ12,1− α. (3) The approximate p-value is given by the area to the right of X2 under a χ12 distribution. (4) Use this test only if none of the four expected values is less than 5. The acceptance and rejection regions for this test are shown in Figure 10.3. Computation of the p-value is illustrated in Figure 10.4. The Yates-corrected chi-square test is a two-sided test even though the critical region, based on the chi-square distribution, is one-sided. The rationale is that large values of Oij − Eij and, correspondingly, of the test statistic X2 will be obtained under H1 regardless of whether p1 < p2 or p1 > p2. Small values of X2 are evidence in favor of H0.

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10.2  ■  Two-Sample Test for Binomial Proportions   363

Figure 10.3

Acceptance and rejection regions for the Yates-corrected chi-square test for a 2 × 2 contingency table

Frequency

X2 =

(|O11 – E11| – .5)2 (|O12 – E12| – .5)2 + E11 E12

+

(|O21 – E21| – .5)2 (|O22 – E22| – .5)2 + E21 E22

�12 distribution 2 X2 ≤ �1, 1–� Acceptance region

2 X2 > �1, 1–� Rejection region

2 � 1, 1–�

Value

Figure 10.4

Computation of the p-value for the Yates-corrected chi-square test for a 2 × 2 contingency table

Frequency

X2 =

(|O11 – E11| – .5)2 (|O12 – E12| – .5)2 + E11 E12

+

(|O21 – E21| – .5)2 (|O22 – E22| – .5)2 + E21 E22

�12 distribution

p

X2 Value

Example 10.13

Cancer  Assess the breast-cancer data in Example 10.4 for statistical significance, using a contingency-table approach.

Solution

First compute the observed and expected tables as given in Tables 10.1 and 10.5, respectively. Check that all expected values in Table 10.5 are at least 5, which is clearly the case. Thus, following Equation 10.5,

X2 =

( 683 − 521.6 − .5)2 + ( 2537 − 2698.4 − .5)2 +

=

2698.4

521.6

( 1498 − 1659.4 − .5)2 + ( 8747 − 8585.6 − .5)2 8585.6

1659.4

160.9 160.92 160.9 160.9 + + + 521.6 2698.4 1659.4 8585.6 2

2

2

= 49.661 + 9.599 + 15.608 + 3.017 = 77.89 ∼ χ12 under H 0

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364   C H A P T E R 10 

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Because  χ12,.999 = 10.83 < 77.89 = X 2 , we have  p < 1−.999 = .001 and the results are extremely significant. Thus breast cancer incidence is significantly associated with having a first child after age 30.

Example 10.14

Cardiovascular Disease  Assess the OC−MI data in Example 10.6 for statistical significance, using a contingency-table approach.

Solution

First compute the observed and expected tables as given in Tables 10.2 and 10.6, respectively. Note that the minimum expected value in Table 10.6 is 6.7, which is ≥5. Thus the test procedure in Equation 10.5 can be used:

X2 =

( 13 − 6.7 − .5)2 + ( 4987 − 4993.3 − .5)2 6.7

+ =

4993.3

( 7 − 13.3 − .5)2 + ( 9993 − 9986.7 − .5)2 7 9986.7

13.3

2

2

2

5.8 5.8 5.8 5.82 + + + 7 6.7 4993.3 13.3 9986.7

= 5.104 + 0.007 + 2.552 + 0.003 = 7.67 ∼ χ12 under H 0 Because χ12,.99 = 6.63, χ12,.995 = 7.88, and 6.63 < 7.67 < 7.88 it follows that 1 − .995 < p < 1 − .99, or .005 < p < .01, and the results are highly significant. Thus there is a significant difference between MI incidence rates for OC users and non-OC users among 40- to 44-year-old women, with OC users having higher rates. The test procedures in Equation 10.3 and Equation 10.5 are equivalent in the sense that they always give the same p-values and always result in the same decisions about accepting or rejecting H0. Which test procedure is used is a matter of convenience. Most researchers find the contingency-table approach more understandable, and results are more frequently reported in this format in the scientific literature. At this time statisticians disagree widely about whether a continuity correction is needed for the contingency-table test in Equation 10.5. Generally, p-values obtained using the continuity correction are slightly larger. Thus results obtained are slightly less significant than comparable results obtained without using a continuity correction. However, the difference in results obtained using these two methods should be small for tables based on large sample sizes. The Yates-corrected test statistic is slightly more widely used in the applied literature, and therefore is used in this section. Another possible approach for performing hypothesis tests based on 2 × 2 contingency tables is to use Fisher’s exact test. This procedure is discussed in Section 10.3.

Short Computational Form for the Yates-Corrected Chi-Square Test for 2 × 2 Contingency Tables The test statistic X2 in Equation 10.5 has another computational version that is more convenient to use with a hand calculator and does not require the computation of an expected table.

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10.2  ■  Two-Sample Test for Binomial Proportions   365

Equation 10.6

Short Computational Form for the Yates-Corrected Chi-Square Test for 2 × 2 Contingency Tables Suppose we have the 2 × 2 contingency table in Table 10.7. The X2 test statistic in Equation 10.5 can be written

n  X 2 = n  ad − bc −    2  

2

[( a + b ) ( c + d ) ( a + c ) ( b + d )]

Thus the test statistic X2 depends only on (1) the grand total n, (2) the row and column margins a + b, c + d, a + c, b + d, and (3) the magnitude of the quantity ad − bc. To compute X2, (1) Compute n   ad − bc −  2    

2

Start with the first column margin, and proceed counterclockwise. (2) Divide by each of the two column margins. (3) Multiply by the grand total. (4) Divide by each of the two row margins. This computation is particularly easy with a hand calculator because previous products and quotients can be maintained in the display and used for further calculations.

Table 10.7

Example 10.15

Solution

General contingency table

a

b

a+b

c

d

c+d

a + c

b + d

n=a+b+c+d

Nutrition  Compute the chi-square statistic for the nutrition data in Example 10.9 using the short computational form in Equation 10.6. From Table 10.3, a = 15

b = 5

c = 9

d = 21 n = 50

Furthermore, the smallest expected value = (24 × 20)/50 = 9.6 ≥ 5. Thus it is valid to use the chi-square test. Use the approach in Equation 10.6: (1) Compute 2

n 50     ad − bc −  =  15 × 21 − 5 × 9 − 2 2  

2

= ( 270 − 25) = 2452 = 60,025 2

(2) Divide the result in step 1 (60,025) by each of the two column margins (24 and 26), thus obtaining 96.194.

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366   C H A P T E R 10 

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(3) Multiply the result in step 2 (96.194) by the grand total (50), obtaining 4809.70. (4) Divide the result in step 3 (4809.70) by each of the two row margins (20 and 30), obtaining 8.02. Because the critical value = χ12,.95 = 3.84 and X 2 = 8.02 > 3.84, the results are statistically significant. To find a range for the p-value, note from the chi-square table that χ12,.995 = 7.88, χ12,.999 = 10.83 , and thus, because 7.88 < 8.02 < 10.83, .001 < p < .005. These data have also been analyzed using the SPSSX/PC CROSSTABS program, as shown in Table 10.8. The program prints out the cell counts, the row and column totals and percentages, and the grand total. Furthermore, it prints out the minimum expected frequency (min E.F. = 9.6) and notes there are no expected frequencies 1.00

CHOL1

2.00

Row Total

1.00

15

5

20 40.0

2.00

9

21

30 60.0

Column Total

24 48.0

26 52.0

50 100.0

HIGH NORMAL

Chi-Square ---------8.01616 9.73558

D.F. ---1 1

Significance -----------0.0046 0.0018

Number of Missing Observations =

Min E.F. Cells with E.F. �1, 1–� Rejection region

2 �1, 1–�

Value

Figure 10.6

Computation of the p-value for McNemar’s test—normal-theory method

Frequency

X2 =

nA –

nD 2

–1 2

2

nD 4

�12 distribution

p-value

X2 Value

The acceptance and rejection regions for this test are shown in Figure 10.5.­ Computation of the p-value for McNemar’s test is depicted in Figure 10.6. This is a two-sided test despite the one-sided nature of the critical region in 1 1 or p > , nA − nD 2 will be 2 2 large and, correspondingly, X2 will be large. Thus, for alternatives on either side of 1  the null hypothesis  p =  , H0 is rejected if X2 is large and accepted if X2 is small.  2

­Figure 10.5. The rationale for this is that if either p <

Example 10.24

Solution

Cancer  Assess the statistical significance of the data in Table 10.14.  1  1 Note that nD = 21. Because nD     = 5.25 ≥ 5, the normal approximation to the  2  2 binomial distribution is valid and the test in Equation 10.12 can be used. We have 2

2

1 1   5 − 10.5 −  5.5 −    52 25 2 2 2 = = 4.76 X = = = 21 4 5.25 5.25 5.25

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10.4  ■  Two-Sample Test for Binomial Proportions for Matched-Pair Data (McNemar’s Test)   377

Equivalently, we could also compute the test statistic from

X2 =

( 5 − 16 − 1)2 5 + 16

=

10 2 = 4.76 21

From Table 6 in the Appendix, note that

χ12,.95 = 3.84

χ12,.975 = 5.02 Thus, because 3.84 < 4.76 < 5.02, it follows that .025 < p < .05, and the results are statistically significant. The exact p-value using Excel is p-value = CHIDIST (4.76, 1) = .029. We conclude that if the treatments give different results from each other for the members of a matched pair, then the treatment A member of the pair is significantly more likely to survive for 5 years than the treatment B member. Thus, all other things being equal (such as toxicity, cost, etc.), treatment A would be the treatment of choice.

Exact Test If n D/4 < 5—that is, if n D < 20—then the normal approximation to the binomial distribution cannot be used, and a test based on exact binomial probabilities is required. The details of the test procedure are similar to the small sample one-sample binomial test in Equation 7.44 and are summarized as follows.

Equation 10.13

McNemar’s Test for Correlated Proportions—Exact Test

(1) Follow the procedure in step 1 in Equation 10.12.

(2) Follow the procedure in step 2 in Equation 10.12.

(3) The exact p-value is given by

(a) p = 2 ×

nA

 nD  1

∑  k   2 

nD

k =0

(b) p = 2 ×

nD

 nD   1      k = nA  k  2

if nA < nD 2

nD

if nA > nD 2

(c) p = 1 if nA = nD 2

(4) This test is valid for any number of discordant pairs (nD) but is particularly useful for nD < 20, when the normal-theory test in Equation 10.12 cannot be used. The computation of the p-value for this test is shown in Figure 10.7.

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378   C H A P T E R 10 

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Figure 10.7

Computation of the p-value for McNemar’s test—exact method If nA <

nD 2

nA

, then p = 2 �

Σ

nA

Pr(k) = 2 �

k=0

Σ

k=0

nD k

1 2

nD

Pr(k)

p/2 = sum of these probabilities

nA k If nA >

nD 2

nD

nD

k = nA

k = nA

, then p = 2 �

Σ Pr(k) = 2 �Σ

nD k

1 2

nD

Pr(k)

p/2 = sum of these probabilities

nA

nD k

Example 10.25

Hypertension  A recent phenomenon in the recording of blood pressure is the development of the automated blood-pressure machine, where for a small fee a person can sit in a booth and have his or her blood pressure measured by a computer device. A study is conducted to compare the computer device with standard methods of blood pressure measurement. Twenty patients are recruited, and their hypertensive status is assessed by both the computer device and a trained observer. Hypertensive status is defined as either hypertensive (+) if systolic blood pressure is ≥160mm Hg or higher or if diastolic blood pressure is ≥95 mm Hg or higher; the patient is considered normotensive (−) otherwise. The data are given in Table 10.15. Assess the statistical significance of these findings.

Solution

An ordinary Yates-corrected chi-square test cannot be used for these data because each person is being used as his or her own control and there are not two independent samples. Instead, a 2 × 2 table of matched pairs is formed, as in Table 10.16. Note that 3 people are measured as hypertensive by both the computer device and the trained observer, 9 people are normotensive by both methods, 7 people are hypertensive by the computer device and normotensive by the trained

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10.4  ■  Two-Sample Test for Binomial Proportions for Matched-Pair Data (McNemar’s Test)   379

Table 10.15

Hypertensive status of 20 patients as judged by a computer device and a trained observer Hypertensive status

Table 10.16

Hypertensive status

Person

Computer device

Trained observer

Person

Computer device

Trained observer

 1  2  3  4  5  6  7  8  9 10

− − + + − + − + + −

− − − + − − − + + −

11 12 13 14 15 16 17 18 19 20

+ + − + − + + − − −

− − − − + − − − − −

Comparison of hypertensive status as judged by a computer device and a trained observer

Trained observer

Computer device

+

+

3

7

1

9

observer, and 1 person is normotensive by the computer device and hypertensive by the trained observer. Therefore, there are 12 (9 + 3) concordant pairs and 8 (7 + 1) discordant pairs (nD). Because nD < 20, the exact method must be used. We see that n A = 7, n D = 8. Therefore, because n A > n D/2 = 4, it follows from Equation 10.13 that

8  8  1  p =2× ∑     k =7  k  2

8

This expression can be evaluated using Table 1 in the Appendix by referring to n = 8, p = .5 and noting that Pr ( X ≥ 7 p = .5) = .0313 + .0039 = .0352. Thus, the two-tailed p-value = 2 × .0352 = .070. Alternatively, a computer program could be used to perform the computations, as in Table 10.17. The first and second columns have been interchanged so the discordant pairs appear in the diagonal elements (and are easier to identify). In summary, the results are not statistically significant, and we cannot conclude that there is a significant difference between the two methods, although a trend can be detected toward the computer device identifying more hypertensives than the trained observer.

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380   C H A P T E R 10 

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Table 10.17

Use of SPSSX/PC McNemar’s test program to evaluate the significance of the data in Table 10.16 SPSSX/PC Release 1.0 ------McNemar Test COMP COMPUTER DEVICE with OBS TRAINED OBSERVER COMP

1.00 2.00

OBS 2.00 1.00 Cases 7 9

3 1

(Binomial) 2-tailed P

20 0.0703

REVIEW

Note that for a two-sided one-sample binomial test, the hypothesis H 0: p = p0 vs. H1: p ≠ p0 H 0: p = p0 vs. H1: p ≠ p0 is tested. In the special case where p0 = 1/2, the same test procedure as for McNemar’s test is also followed. Finally, if we interchange the designation of which of two outcomes is an event, then the p-values will be the same in Equations 10.12 and 10.13. For example, if we define an event as surviving for 5+ years, rather than dying within 5 years in Table 10.14, then nA = 16, nB = 5 (rather than nA = 5, nB = 16 in Example 10.23). However, the test statistic X2 and the p-value are the same because nA − nB remains the same in Equation 10.12. Similarly, the p-value remains the same in Equation 10.13 because of the symmetry of the binomial distribution when p = 1/2 (under H0). In this section, we have studied McNemar’s test for correlated proportions, which is used to compare two binomial proportions from matched samples. We studied both a large-sample test when the normal approximation to the binomial distribution is valid (i.e., when the number of discordant pairs, nD, is ≥20) and a small-sample test when nD < 20. Referring to the flowchart at the end of this chapter (Figure 10.16, p. 409), we answer no to (1) are samples independent? which leads us to the box labeled “Use McNemar’s test.” REVIEW QUESTIONS 10C

1

(a)  What is the difference between McNemar’s test and the chi-square test for 2 × 2 tables?

(b)  When do we use each test?

2

What is a discordant pair? A concordant pair? Which type of pair is used in McNemar’s test?

3

A twin design is used to study age-related macular degeneration (AMD), a common eye disease of the elderly that results in substantial losses in vision. Suppose we contact 66 twinships in which one twin has AMD and the other twin does not. The twins are given a dietary questionnaire to report their usual diet. We find that in 10 twinships the AMD twin takes multivitamin supplements and the normal twin does not. In 8 twinships the normal twin takes multivitamin supplements and the AMD twin does not. In 3 twinships both twins take multivitamin supplements, and in 45 twinships neither twin takes multivitamin supplements.

(a) What test can be used to assess whether there is an association between AMD and taking multivitamin supplements?

(b) Are AMD and taking multivitamin supplements significantly associated based on these data?

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10.5  ■  Estimation of Sample Size and Power for Comparing Two Binomial Proportions   381

10.5 Estimation of Sample Size and Power for Comparing Two Binomial Proportions

In Section 8.10, methods for estimating the sample size needed to compare means from two normally distributed populations were presented. In this section, similar methods for estimating the sample size required to compare two proportions are developed.

Independent Samples

Example 10.26

Cancer, Nutrition  Suppose we know from Connecticut tumor-registry data that the incidence rate of breast cancer over a 1-year period for initially disease-free women ages 45−49 is 150 cases per 100,000 [2]. We wish to study whether ingesting large doses of vitamin E in capsule form will prevent breast cancer. The study is set up with (1) a control group of 45- to 49-year-old women who are mailed placebo pills and are expected to have the same disease rate as indicated in the Connecticut tumor-registry data and (2) a study group of similar-age women who are mailed vitamin E pills and are expected to have a 20% reduction in risk. How large a sample is needed if a two-sided test with a significance level of .05 is used and a power of 80% is desired? We want to test the hypothesis H 0: p1 = p2 vs. H1: p1 ≠ p2. Suppose we want to conduct a test with significance level α and power 1 − β and we anticipate there will be k times as many people in group 2 as in group 1; that is, n2 = kn1. The sample size required in each of the two groups to achieve these objectives is as follows.

Equation 10.14

Sample Size Needed to Compare Two Binomial Proportions Using a Two-Sided Test with Significance Level α and Power 1 − β, Where One Sample (n2) Is k Times as Large as the Other Sample (n1) (Independent-Sample Case)  To test the hypothesis H 0: p1 = p2 vs. H1: p1 ≠ p2 for the specific alternative p1 − p2 = ∆, with a significance level α and power 1 − β, the following sample size is required  1  n1 =  p q  1 +  z1− α 2 +  k 

p1q1 +

 p2 q2 z1− β  k 

2

∆2

n2 = kn1 where p1, p2 = projected true probabilities of success in the two groups q1 , q2 = 1 − p1 ,1 − p2 ∆ = p2 − p1 p1 + kp2 1+ k q =1− p

Example 10.27

Solution

p=

Cancer, Nutrition  Estimate the sample size required for the study proposed in Example 10.26 if an equal sample size is anticipated in each group.

p1 = 150 per 100,000 or 150/105 = .00150 q1 = 1 − .00150 = .99850

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382   C H A P T E R 10 

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If we want to detect a 20% reduction in risk, then p2 = 0.8p1 or

p2 = (150 × .8) 10 5 = 120 10 5 = .00120 q2 = 1 − .00120 = .99880 α = .05 1 − β = .8 k = 1 ( because n1 = n2 ) p=

.00150 + .00120 = .00135 2

q = 1 − .00135 = .99865

z1− α 2 = z.975 = 1.96

z1− β = z.80 = 0.84 Thus, referring to Equation 10.14,

 .00135(.99865)(1 + 1)(1.96) + .00150(.99850 ) + .00120(.99880 )( 0.84)  n1 =  (.00150 − .00120 )2 =

[.05193(1.96) + .05193( 0.84)]2 .00030

2

=

2

.145392 = 234, 881 = n2 .00030 2

or about 235,000 women in each group. To perform a one-tailed rather than a two-tailed test, simply substitute α for α/2 in the sample-size formula in Equation 10.14. Clearly, from the results in Example 10.27, we could not conduct such a large study over a 1-year period. The sample size needed would be reduced considerably if the period of study was lengthened beyond 1 year because the expected number of events would increase in a multiyear study. In many instances, the sample size available for investigation is fixed by practical constraints, and what is desired is an estimate of statistical power with the anticipated available sample size. In other instances, after a study is completed, we want to calculate the power using the sample sizes that were actually used in the study. For these purposes the following estimate of power is provided to test the hypothesis H 0: p1 = p2 vs. H1: p1 ≠ p2, with significance level α and sample sizes of n1 and n2 in the two groups.

Power Achieved in Comparing Two Binomial Proportions Using a Two-Sided Test with Significance Level a and Samples of Size n1 and n2 (Independent-Sample Case)  To test the hypothesis H 0 : p1 = p2 vs. H1: p1 ≠ p2 for the specific alternative p1 − p2 = ∆ p1 − p2 = ∆, compute

Equation 10.15

 ∆ Power = Φ  − z1− α 2  p1q1 n1 + p2 q2 n2

p q (1 n1 + 1 n2 )   p1q1 n1 + p2 q2 n2  

where

p1, p2 = projected true probabilities of success in groups 1 and 2, respectively

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10.5  ■  Estimation of Sample Size and Power for Comparing Two Binomial Proportions   383

q1 , q2 = 1 − p1 ,1 − p2 ∆ = p2 − p1 p=

n1 p1 + n2 p2 n1 + n2

q =1− p

Example 10.28

Otolaryngology  Suppose a study comparing a medical and a surgical treatment for children who have an excessive number of episodes of otitis media (OTM) during the first 3 years of life is planned. Success rates of 50% and 70% are assumed in the medical and surgical groups, respectively, and the recruitment of 100 patients for each group is realistically anticipated. Success is defined as ≤1 episode of OTM in the first 12 months after treatment. How much power does such a study have of detecting a significant difference if a two-sided test with an α level of .05 is used?

Solution

Note that p1 = .5, p2 = .7, q1 = .5, q2 = .3, n1 = n2 = 100, Δ = .2, p = (.5 + .7)/2 = .6, q = .4, α = .05, z1−a/2 = z.975 = 1.96. Thus from Equation 10.15 the power can be computed as follows:

 Power = Φ  

.2

[.5(.5) + .7(.3)] 100

1.96 .6(.4)(1 100 + 1 100 )   [.5(.5) + .7(.3)] 100 

(.0693)   .2 = Φ − 1.96 = Φ(2.949 − 2.002 ) = Φ( 0.947) = .83 .0678   .0678

Thus there is an 83% chance of finding a significant difference using the anticipated sample sizes. If a one-sided test is used, then Equation 10.15 can be used after replacing z1−α 2 by z1−α .

Paired Samples In Section 10.4, McNemar’s test for comparing binomial proportions in paired samples was introduced. As noted there, this test is a special case of the one-sample binomial test. Therefore, to estimate sample size and power, the more general formulas for the one-sample binomial test given in Section 7.10 can be used. Specifically, referring to Equation 7.46 to test the hypothesis H 0: p = p0 vs. H1: p ≠ p0 using a two-sided test with significance level α and power 1 − β for the specific alternative p = p1, a sample size of

n=

p0 q0  z1− α 2 + z1− β p1q1 ( p0 q0 ) 

2

( p1 − p0 )2

is needed. To use this formula in the case of McNemar’s test, set p0 = q0 = 1/2, p1 = pA = the proportion of discordant pairs that are of type A, and n = nD = the number of discordant pairs. On substitution,

nD

(z =

1− α 2

+ 2 z1− β pAq A

4( pA − .5)2

)

2

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384   C H A P T E R 10 

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However, the number of discordant pairs (nD) = the total number of pairs (n) × the probability that a matched pair is discordant. If the latter probability is denoted by pD, then nD = npD, or n = nD/pD. Thus the following sample-size formula can be used.

Equation 10.16

Sample Size Needed to Compare Two Binomial Proportions Using a Two-Sided Test with Significance Level α and Power 1 − β (Paired-Sample Case) 

If McNemar’s test for correlated proportions is used to test the hypothesis 1 1 H 0: p = vs. H1: p ≠ , for the specific alternative p = pA, where p = the probabil2 2 ity that a discordant pair is of type A, with a significance level of α and power 1 − β, then use

(z n=

1− α 2

or

(z 2n =

+ 2 z1− β pAq A

4 ( pA − .5) pD 2

1− α 2

+ 2 z1− β pAq A

2 ( pA − .5) pD 2

)

matched pairs

)

individuals

2

2

where  pD = projected proportion of discordant pairs among all pairs pA = projected proportion of discordant pairs of type A among discordant pairs

Example 10.29

Solution

Cancer  Suppose we want to compare two different regimens of chemotherapy (A, B) for treatment of breast cancer where the outcome measure is recurrence of breast cancer or death over a 5-year period. A matched-pair design is used, in which patients are matched on age and clinical stage of disease, with one patient in a matched pair assigned to treatment A and the other to treatment B. Based on previous work, it is estimated that patients in a matched pair will respond similarly to the treatments in 85% of matched pairs (i.e., both will either die or have a recurrence or both will be alive and not have a recurrence over 5 years). Furthermore, for matched pairs in which there is a difference in response, it is estimated that in two-thirds of the pairs the treatment A patient will either die or have a recurrence, and the treatment B patient will not; in one-third of the pairs the treatment B patient will die or have a recurrence, and the treatment A patient will not. How many participants (or matched pairs) need to be enrolled in the study to have a 90% chance of finding a significant difference using a two-sided test with type I error = .05? 2 1 We have α = .05, β = .10, pD = 1 − .85 = .15, pA = , q A = . Therefore, from Equa­ 3 3 tion 10.16,  z.975 + 2 z.90 ( 2 3) (1 3)   n ( pairs) =  2 4 ( 2 3 − 1 2 ) (.15) =

[1.96 + 2 (1.28) (.4714 )]2 4 (1 6 ) (.15) 2

2

=

3.16682 = 602 matcched pairs .0167

2n = 2 × 602 = 1204 individuals

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10.5  ■  Estimation of Sample Size and Power for Comparing Two Binomial Proportions   385

Therefore, 1204 women in 602 matched pairs must be enrolled. This will yield approximately .15 × 602 = 90 discordant pairs. In some instances, sample size is fixed and we want to determine what power a study has (or had) to detect specific alternatives. For a two-sided one-sample binomial test with significance level α, to test the hypothesis H 0: p = p0 vs. H1: p ≠ p0 for the specific alternative p = p1, the power is given by (see Equation 7.45)

  p − p0 n   Power = Φ  p0 q0 ( p1q1 )  zα 2 + 1  p0 q0     1 , p1 = p A , and n = nD , yielding 2  + 2 pA − .5 nD  

For McNemar’s test, set p0 = q0 =

 1 zα 2 Power = Φ   2 pAq A

(

)

On substituting nD = npD =, the following power formula is obtained.

Equation 10.17

Power Achieved in Comparing Two Binomial Proportions Using a Two-Sided Test with Significance Level α (Paired-Sample Case)  If McNemar’s test for correlated proportions is used to test the hypothesis H 0: p = 1 2 vs. H1: p ≠ 1 2, for the specific alternative p = pA, where p = the probability that a discordant pair is of type A,   1 zα 2 + 2 pA − .5 npD  Power = Φ  p q 2   A A

(

)

where

n = number of matched pairs

pD = projected proportion of discordant pairs among all pairs

pA = projected proportion of discordant pairs of type A among discordant pairs

Example 10.30

Solution

Cancer  Consider the study in Example 10.29. If 400 matched pairs are enrolled, how much power would such a study have? 2 We have α = .05, pD = .15, p A = , n = 400. Therefore, from Equation 10.17, 3  Power = Φ   2

{

  z.025 + 2 2 3 − .5 400 (.15)     (2 3) (1 3)  1

= Φ 1.0607  −1.96 + 2 (1 6 ) (7.7460 )

}

= Φ [1.0607 ( 0.6220 )] = Φ ( 0.660 ) = .745 Therefore, the study would have 74.5% power, or a 74.5% chance of detecting a statistically significant difference. To compute sample size and power for a one-sided alternative, substitute α for α/2 in the formulas in Equations 10.16 and 10.17.

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386   C H A P T E R 10 

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Note that a crucial element in calculating sample size and power for matchedpair studies based on binomial proportions using Equations 10.16 and 10.17 is knowledge of the probability of discordance between outcome for members of a matched pair (pD). This probability depends on the strictness of the matching criteria and on how strongly related the matching criteria are to the outcome variable. Also, the methods in the paired sample case are for matched studies with 1:1 matching (i.e., in Example 10.29, each treatment A patient was matched to a single treatment B patient). Dupont [3] discusses more advanced methods of power calculation for matched studies with m:1 matching (i.e., m controls per case).

Sample Size and Power in a Clinical Trial Setting In Examples 10.27 and 10.28, we have estimated sample size and power in proposed clinical trials assuming that compliance with (ability to follow) treatment regimens is perfect. To be more realistic, we should examine how these estimates will change if compliance is not perfect. Suppose we are planning a clinical trial comparing an active treatment vs. placebo. There are potentially two types of noncompliance to consider.

Definition 10.5

The dropout rate is defined as the proportion of participants in the active-treatment group who fail to actually receive the active treatment.

Definition 10.6

The drop-in rate is defined as the proportion of participants in the placebo group who actually receive the active treatment outside the study protocol.

Example 10.31

Cardiovascular Disease  The Physicians’ Health Study was a randomized clinical trial, one goal of which was to assess the effect of aspirin in preventing myocardial infarction (MI). Participants were 22,000 male physicians ages 40−84 and free of cardiovascular disease in 1982. The physicians were randomized to either active aspirin (one white pill containing 325 mg of aspirin taken every other day) or aspirin placebo (one white placebo pill taken every other day). As the study progressed, it was estimated from self-report that 10% of the participants in the aspirin group were not complying (that is, were not taking their study [aspirin] capsules). Thus the dropout rate was 10%. Also, it was estimated from self-report that 5% of the participants in the placebo group were taking aspirin regularly on their own outside the study protocol. Thus the drop-in rate was 5%. The issue is: How does this lack of compliance affect the sample size and power estimates for the study? Let λ1 = dropout rate, λ2 = drop-in rate, p1 = incidence of MI over a 5-year period among physicians who actually take aspirin, and p2 = incidence of MI over a 5-year period among physicians who don’t take aspirin under the assumption of perfect compliance. Finally, let p1∗ , p2∗ = observed rate of MI over a 5-year period in the aspirin and placebo groups, respectively (i.e., assuming that compliance is not perfect). ∗ ∗ We can estimate p1 , p2 using the total-probability rule. Specifically,

Equation 10.18

p1∗ = Pr(MI|assigned to aspirin group) = Pr(MI|aspirin-group complier) × Pr(compliance in the aspirin group)

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10.5  ■  Estimation of Sample Size and Power for Comparing Two Binomial Proportions   387

+P r(MI|aspirin-group noncomplier) × Pr(noncompliance in the aspirin group) = p1 (1 − λ1 ) + p2 λ1

Here we have assumed that the observed incidence rate for a noncompliant participant in the aspirin group = p2.

Similarly, p2∗ = Pr(MI|assigned to placebo group)

Equation 10.19

=P r(MI|placebo-group complier) × Pr(compliance in the placebo group) +P r(MI|placebo-group noncomplier) × Pr(noncompliance in the placebo group) = p2 (1 − λ 2 ) + p1λ 2

Here we have assumed that noncompliance in the placebo group means that the participant takes aspirin on his own and that such a participant has incidence rate = p1 = rate for aspirin-group compliers. Placebo-group participants who don’t take their study capsules and refrain from taking aspirin outside the study are considered compliers from the viewpoint of the preceding discussion; that is, their incidence rate is the same as that for placebo-group compliers = p2. If we subtract p2∗ from p1∗, we obtain

p1∗ − p2∗ = p1 (1 − λ1 − λ 2 ) − p2 (1 − λ1 − λ 2 ) = ( p1 − p2 ) (1 − λ1 − λ 2 )

Equation 10.20

= compliance-adjusted rate difference In the presence of noncompliance, sample size and power estimates should be based on the compliance-adjusted rates p1∗ , p2∗ rather than on the perfect compliance rates (p1, p2). These results are summarized as follows.

(

)

Sample-Size Estimation to Compare Two Binomial Proportions in a Clinical Trial Setting (Independent-Sample Case)  Suppose we want to test the hypothesis H 0: p1 = p2 vs. H1: p1 ≠ p2 for the specific alternative p1 − p2 = ∆ with a significance level α and a power 1 − β in a randomized clinical trial in which group 1 receives active treatment, group 2 receives placebo, and an equal number of subjects are allocated to each group. We assume that p1, p2 are the rates of disease in treatment groups 1 and 2 under the assumption of perfect compliance. We also assume that

Equation 10.21

λ1 = dropout rate = proportion of participants in the active-treatment group who fail to comply

λ2 = drop-in rate = proportion of participants in the placebo group who receive the active treatment outside the study protocol

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388   C H A P T E R 10 

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(1) The appropriate sample size in each group is n1 = n2 =

(

2 p ∗q ∗ z1− α 2 +

p1∗q1∗ + p2∗ q2∗ z1− β

)

2

∆ ∗2

where p1∗ = (1 − λ1 ) p1 + λ1 p2

p2∗ = (1 − λ 2 ) p2 + λ 2 p1

(

)

p ∗ = p1∗ + p2∗ 2 , q ∗ = 1 − p ∗, ∆∗ = p1∗ − p2∗ = (1 − λ1 − λ 2 ) p1 − p2 = (1 − λ1 − λ 2 ) ∆

(2) If noncompliance rates are low (λ1, λ2 each ≤ .10), then an approximate sample-size estimate is given by

n1,approx = n2 ,approx

( =

2 p q z1− α 2 +

p1q1 + p2 q2 z1− β ∆

2

)

2

×

1

(1 − λ1 − λ 2 )2

= nperfect compliance (1 − λ1 − λ 2 )

2

where nperfect compliance is the sample size in each group under the assumption of perfect compliance, as computed in Equation 10.14 with p1∗ = p1 , p2∗ = p2 , and k = n2 n1 = 1.

Example 10.32

Cardiovascular Disease  Refer to Example 10.31. Suppose we assume that the incidence of MI is .005 per year among participants who actually take placebo and that aspirin prevents 20% of MIs (i.e., relative risk = p1/p2 = 0.8). We also assume that the duration of the study is 5 years and that the dropout rate in the aspirin group = 10% and the drop-in rate in the placebo group = 5%. How many participants need to be enrolled in each group to achieve 80% power using a two-sided test with significance level = .05?

Solution

This is a 5-year study, so the 5-year incidence of MI among participants who actually take placebo ≈ 5(.005) = .025 = p2. Because the risk ratio = 0.8, we have p1/p2 = 0.8 or p1 = .020 = 5-year incidence of MI among participants who actually take aspirin. To estimate the true incidence rates to be expected in the study, we must factor in the expected rates of noncompliance. Based on Equation 10.21, the complianceadjusted rates p1∗ and p2∗ are given by p1∗ = (1 − λ1 ) p1 + λ1 p2

=.9(.020) + .1(.025) = .0205 p2∗ = (1 − λ 2 ) p2 + λ 2 p1

= .95(.025) + .05(.020 ) = .02475 Also, Δ ∗ = p1∗ − p2∗ = .00425 p∗ =

p1∗ + p2∗ .0205 + .02475 = = .02263, q ∗ = 1 − p ∗ = .97737 2 2

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10.5  ■  Estimation of Sample Size and Power for Comparing Two Binomial Proportions   389

Finally, z1− β = z.80 = 0.84, z1− α 2 = z.975 = 1.96 . Therefore, from Equation 10.21, the required sample size in each group is  2 (.02263) (.97737) (1.96 ) + .0205 (.9795) + .02475 (.97525) ( 0.84 )  n1 = n2 =  .004252

2

2

 .2103 (1.96 ) + .2103 ( 0.84 )  =  = 19,196 per group .00425   The total sample size needed = 38,392. If we don’t factor compliance into our sample-size estimates, then based on Equation 10.14, we would need

n1 = n2 =

(

2 p q z1− α 2 +

p1q1 + p2 q2 z1− β Δ2

)

2

 2 (.0225) (.9775)1.96 + .02 (.98) + .025 (.975) 0.8 84  = 2 .02 − .025

2

= 13, 794 per group p or a total sample size = 2(13,794) = 27,588. The approximate sample-size formula in step 2 of Equation 10.21 would yield

n1,approx = n2,approx =

=

nperfect compliance

(1 − .10 − .05)2 13, 794 = 19, 093 .852

or a total sample size of 2(19,093) = 38,186 participants. Thus the effect of noncompliance is to narrow the observed difference in risk between the aspirin and placebo groups and as a result to increase the required sample size by approximately 100% × (1/.852 − 1) = 38% or more exactly 100% × (38,392 − 27,588)/27,588 = 39%. The Physicians’ Health Study actually enrolled 22,000 participants, thus implying that the power of the study with 5 years of follow-up would be somewhat lower than 80%. In addition, the physicians were much healthier than expected and the risk of MI in the placebo group was much lower than expected. However, aspirin proved much more effective than anticipated, preventing 40% of MIs (relative risk = 0.6) rather than the 20% anticipated. This led to a highly significant treatment benefit for aspirin after 5 years of follow-up and an eventual change in the FDA-approved indications for aspirin to include labeling as an agent to prevent cardiovascular disease for men over age 50. The power formula for the comparison of binomial proportions in Equation 10.15 also assumes perfect compliance. To correct these estimates for noncompli− in Equation 10.15 with ance in a clinical trial setting, replace p1 , p2 , Δ, p−, and q − − * * * * * as given in Equation 10.21. The resulting power is a compliancep1, p2 , Δ , p , q adjusted power estimate.

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390   C H A P T E R 10 

  Hypothesis Testing: Categorical Data

REVIEW

REVIEW QUESTIONS 10D

1

Suppose we are planning a randomized trial of dietary interventions affecting weight gain in women. We want to compare women randomized to a high-fiber diet vs. women randomized to a low-fiber diet, with the outcome being 10+ lb weight gain after 5 years. We anticipate that after 5 years 20% of the women in the low-fiber group and 10% of the women in the high-fiber group will have gained 10+ lb.

(a) How many women need to be randomized in each group to achieve 80% power if a two-sided test will be used with a 5% significance level?

(b) Suppose we recruit 250 women in each group. How much power will the study have?

2

Consider the study in Review Question 10D.1. Suppose 20% of the women randomized to the high-fiber diet don’t follow the dietary instructions (and instead eat a standard Western diet, which we will assume is a low-fiber diet).

(a) How many women would be needed for the study under the conditions in Review Question 10D.1a?

(b) How much power will the study have if 250 women are recruited for each group?

3

Suppose we plan a comparative study of two eye drops (A, B) to reduce intraocular pressure (IOP) among patients with glaucoma. A contralateral design is used, in which drop A is assigned to a random eye and drop B is assigned to the fellow eye. The patients take the eye drops for 1 month, after which their IOP is measured again. The outcome is a decrease in IOP of 5+ mm Hg in an eye. We expect the following: (i) that both eyes will be failures (i.e., not show a decrease of 5+ mm Hg) in 50% of patients; (ii) that both eyes will be successes (i.e., will show a decrease of 5+ mm Hg) in 30% of patients; (iii) that in 15% of patients the drop A eye will result in a decrease in IOP of 5+ mm Hg but the drop B eye will not; and (iv) that in 5% of patients the drop B eye will show a decrease in IOP of 5+ mm Hg but the drop A eye will not.

(a) What method of analysis can be used to compare the efficacy of drop A vs. drop B?

(b) How many patients do we need to randomize to achieve 80% power if we have a two-sided test with α = .05, assuming that all patients take their drops?

10.6 R × C Contingency Tables Tests for Association for R × C Contingency Tables In the previous sections of this chapter, methods of analyzing data that can be organized in the form of a 2 × 2 contingency table—that is, where each variable under study has only two categories—were studied. Frequently, one or both variables under study have more than two categories.

Definition 10.7 An R × C contingency table is a table with R rows and C columns. It displays the relationship between two variables, where the variable in the rows has R categories and the variable in the columns has C categories.

Example 10.33

Cancer  Suppose we want to study further the relationship between age at first birth and development of breast cancer, as in Example 10.4. In particular, we would like

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10.6  ■  R × C Contingency Tables   391

to know whether the effect of age at first birth follows a consistent trend, that is, (1) more protection for women whose age at first birth is 2. If both R and C are > 2, then the chi-square test for R × C contingency tables is used. Referring to the flowchart at the end of this chapter (Figure 10.16, p. 409), we answer no to (1) 2 × 2 contingency table? and (2) 2 × k contingency table? which leads to (3) R × C contingency table with R > 2 and C > 2 and then to the box labeled “Use chi-square test for R × C tables.” If either R or C = 2, then assume we have rearranged the row and column variables so the row variable has two categories. Let’s designate the number of column categories by k (rather than C). If we are interested in assessing trend over the k binomial proportions formed by the proportions of units in the first row of each of the kcolumns, then we use the chi-square test for trend in binomial proportions. Referring to the flowchart in Figure 10.16 at the end of this chapter (p.409), we answer no to (1) 2 × 2 contingency table? yes to (2) 2 × k contingency table? and yes to (3) interested in trend over k binomial proportions? This leads us to the box labeled “Use chi-square test for trend if no confounding is present, or the Mantel Extension test if confounding is present.”

Relationship Between the Wilcoxon Rank-Sum Test and the Chi-Square Test for Trend The Wilcoxon rank-sum test given in Equation 9.7 is actually a special case of the chi-square test for trend.

Equation 10.25

Table 10.20

Relationship Between the Wilcoxon Rank-Sum Test and the Chi-Square Test for Trend  Suppose we have a 2 × k table as shown in Table 10.20. A hypothetical 2 × k table relating a dichotomous disease-variable D to a categorical exposure-variable E with k ordered categories

D

+ −

Score

E

1

2

k

x1 n1 − x1

x2 n2 − x2

… …

xk nk − xk

n1 S1

n2 S2

nk Sk

x n − x n

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398   C H A P T E R 10 

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The ith exposure category is assumed to have an associated score Si, i = 1, ..., k. Let pi = probability of disease in the ith exposure group. If pi = α + βSi, and we want to test the hypothesis H0: β = 0 vs. H1: β ≠ 0, then (1) We can use the chi-square test for trend, where we can write the test statistic in the form

X2 =

( O − E − 0.5)2 V

∼ χ12 under H0

where k

O = observed total score among subjects with disease = ∑ xi Si i =1

E = expected total score among subjects with disease under H0 =

V=

2   k  x (n − x )  k  ∑ ni Si2 −  ∑ ni Si  n  n ( n − 1)  i =1   i =1   

x k ∑ ni Si n i =1

and we reject H0 if X 2 > χ12,1− α and accept H0 otherwise. (2) We can use the Wilcoxon rank-sum test as given in Equation 9.7, where we have the test statistic

T=

R1 −

x ( n + 1) 1 − 2 2

k  ni ni2 − 1  ∑  x (n − x )   i =1  12  n + 1 − n ( n − 1)    

)

(

   

and reject H0 if T > z1−α/2 and accept H0 if T ≤ z1−α/2 where z1−α/2 = upper α/2 percentile of an N(0, 1) distribution.

(3) If the scores Si are set equal to the midrank for the ith group as defined in Equation 9.6, where the midrank for the ith exposure category = number of  1 + ni   observations in the first i - 1 groups +  2 

i −1

= ∑ nj + j =1

=

(1 + ni ) 2

1 + n1 2     

if i > 1

if i = 1

then the test procedures in steps (1) and (2) yield the same p-values and are equivalent. In particular, O = R1 = Rank sum in the first row, E =

(

x ( n + 1) 2

) , and X

k n n2 − 1  x (n − x )   i i  V =  + − 1 n ∑ n (n − 1)   12   i =1



2 1

= T2

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10.6  ■  R × C Contingency Tables   399

Example 10.38

Solution

Ophthalmology  Test the hypothesis that the average visual acuity is different for dominant and sex-linked people in Table 9.3 or, equivalently, that the proportion of dominant subjects changes in a consistent manner as visual acuity declines, using the chi-square test for trend. We have the following 2 × 8 table:

Visual acuity

20−20

20−25

20−30

20−40

20−50

20−60

20−70

20−80

Dominant

5

9

6

3

2

25

Sex-linked

1

5

4

4

8

5

2

1

30

6

14

10

7

10

5

2

1

55

3.5

13.5

25.5

34.0

42.5

50.0

53.5

55.0

Score

If the scores are set equal to the average ranks given in Table 9.3, then we have O = 5 ( 3.5) + 9 (13.5) + 6 ( 25.5) + 3 ( 34.0 ) + 2 ( 42.5) = 479 E =

25 [6 (3.5) + 14 (13.5) + 10 (25.5) + 7 (34.0 ) + 10 (42.5) + 10 (4.5) + 5 (50.0 ) 55 + 2 ( 53.5) + 1( 55.0 )]

25 (1540 ) = 700 55 25 ( 30 )   2 2 2 2 2 2 V=  6 ( 3.5) + 14 (13.5) + 10 ( 25.5) + 7 ( 34.0 ) + 10 ( 42.5) + 5 ( 50.0 ) 55 ( 54 )   =

1540 2  2 2 + 2 ( 53.5) + 1 ( 55.0 )  −  55  25 ( 30 ) = (56, 531.5 − 43,120 ) 55 ( 54 ) = X2 =

25 ( 30 ) (13, 411.55) = 3386.74 55 ( 54 )

( 479 − 700 − 0.5)2 3386.74

(

= 14.36 ∼ χ12 under H 0

)

The p-value = Pr χ12 > 14.36 < .001. Also, referring to Example 9.17, we see that O = R1 = 479, E = E(R1) = 700, V = V(R1) corrected for ties = 3386.74 and

X2 = 14.36 = T2 = 3.792

Thus the two test procedures are equivalent. However, if we had chosen different scores (e.g., 1, . . . , 8) for the 8 visual-acuity groups, then the test procedures would not be the same. The choice of scores is somewhat arbitrary. If each column corresponds to a specific quantitative exposure category, then it is reasonable to use the average exposure within the category as the score. If the exposure level is not easily quantified, then either midranks or consecutive integers are reasonable choices for scores. If the number of subjects in each exposure category is the same, then these two methods of scoring will yield identical test statistics and p-values using the chisquare test for trend.

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400   C H A P T E R 10 

  Hypothesis Testing: Categorical Data

The estimate of variance (V) given in Equation 10.25 is derived from the hypergeometric distribution and differs slightly from the variance estimate for the chisquare test for trend in Equation 10.24 given by

V=

 k  x (n − x )  k 2  n S − ni Si  ∑ ∑ 1 i 2  n  i =1  i =1  

2

 n  

which is based on the binomial distribution. The hypergeometric distribution is more appropriate, although the difference is usually slight, particularly for large n. Also, a continuity correction of 0.5 is used in the numerator of X 2 in Equation 10.25, but not in A in the numerator of X12 in Equation 10.24. This difference is also usually slight.

REVIEW

REVIEW QUESTIONS 10E

Table 10.21

1

(a) What is the difference between the chi-square test for trend and the chi-square test for heterogeneity?

(b) When do we use each test?

2

Suppose we are given the following 2 × 5 table with two disease categories and five exposure categories, as in Table 10.21.

Hypothetical table illustrating the association between exposure and disease

Exposure category

Disease category

1

2

3

4

5

+

2

3

4

6

3

6

5

5

4

2

(a) If exposure is treated as a nominal categorical variable, is it valid to use the chi-square test for heterogeneity on these data? Why or why not?

(b) If exposure is treated as an ordinal categorical variable, is it valid to use the chi-square test for trend on these data? Why or why not?

3

We are interested in studying the relationship between the prevalence of hypertension in adolescents and ethnic group, where hypertension is defined as being above the 90th percentile for a child’s age, sex, and height, based on national norms.

(a) Suppose that 8 of 100 Caucasian adolescent girls, 12 out of 95 AfricanAmerican adolescent girls, and 10 of 90 Hispanic adolescent girls are above the 90th percentile for blood pressure. What test can be used to assess whether there is an association between adolescent hypertension and ethnic group?

(b) Implement the test in Review Question 10E.3a, and report a two-tailed p-value.

4

We are also interested in the relationship between adolescent hypertension and obesity. For this purpose, we choose 30 normal-weight adolescent boys (i.e., bodymass index [BMI] = kg/m2 < 25), 30 overweight adolescent boys (25 ≤ BMI < 30), and 35 obese adolescent boys (BMI ≥ 30). We find that 2 of the normal-weight boys, 5 of the overweight boys, and 10 of the obese boys are hypertensive.

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10.7  ■  Chi-Square Goodness-of-Fit Test   401

(a) What test can be used to assess whether there is an association between adolescent hypertension and BMI?

(b) Implement the test in Review Question 10E.4a, and report a two-tailed p-value.

10.7 Chi-Square Goodness-of-Fit Test In our previous work on estimation and hypothesis testing, we usually assumed the data came from a specific underlying probability model and then proceeded either to estimate the parameters of the model or test hypotheses concerning different possible values of the parameters. This section presents a general method of testing for the goodness-of-fit of a probability model. Consider the problem in Example 10.39.

Example 10.39

Hypertension  Diastolic blood-pressure measurements were collected at home in a community-wide screening program of 14,736 adults ages 30−69 in East Boston, Massachusetts, as part of a nationwide study to detect and treat hypertensive people [6]. The people in the study were each screened in the home, with two measurements taken during one visit. A frequency distribution of the mean diastolic blood pressure is given in Table 10.22 in 10-mm Hg intervals. We would like to assume these measurements came from an underlying normal distribution because standard methods of statistical inference could then be applied on these data as presented in this text. How can the validity of this assumption be tested?

Table 10.22

Frequency distribution of mean diastolic blood pressure for adults 30–69 years old in a community-wide screening program in East Boston, Massachusetts Group (mm Hg)

F1, n – 2, 1 – � Rejection region

F1, n – 2 distribution p = Pr (F1, n – 2 > F ) p-value F

0 Value

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11.4  ■  Inferences About Parameters from Regression Lines   439

Table 11.2

ANOVA table for displaying regression results

SS

df

MS

F statistic

Regression Residual

(a)a (b)b

1 n − 2

(a)/1 (b)/(n − 2)

p-value

F = [(a)/1]/[(b)/(n − 2)]

Pr(F1,n−2 > F )

(a) + (b)

Total

(a) = Regression SS.

a

(b) = Residual SS.

b

Example 11.12

Solution

Obstetrics  Test for the significance of the regression line derived for the birthweight−estriol data in Example 11.8. From Example 11.8, Lxy = 412, Lxx = 677.42 Furthermore, 31

i =1

yi2

= 32, 418

31

Lyy = ∑

i =1

yi2

 31  −  ∑ yi   i =1 

2

31 = 32, 418 − 992 2 31 = 674

Therefore, Reg SS = L2xy / Lxx = Reg MS = 412 2 / 677.42 = 250.57 Total SS = Lyy = 674 50.57 = 423.43 Res SS = Total SS − Reg SS = 674 − 25 Res MS = Res SS / ( 31 − 2 ) = Res SS / 29 = 423.43 / 29 = 14.60

F = Reg MS / Res MS = 250.57 / 14.60 = 17.16 ~ F1,29 under H 0 From Table 9 in the Appendix,

F1,29,.999 < F1,20 ,.999 = 14.82 < 17.16 = F Therefore,

p < .001

and H0 is rejected and the alternative hypothesis, namely that the slope of the regression line is significantly different from 0, is accepted, implying a significant linear relationship between birthweight and estriol level. These results are summarized in the ANOVA table (Table 11.3) using the MINITAB REGRESSION program.

Table 11.3

ANOVA results for the birthweight−estriol data in Example 11.12 Analysis of Variance Source Regression Residual Error Total

DF 1 29 30

SS 250.57 423.43 674.00

MS 250.57 14.60

F 17.16

P 0.000

A summary measure of goodness of fit frequently referred to in the literature is R2.

Definition 11.14

R2 is defined as Reg SS/Total SS. R2 can be thought of as the proportion of the variance of y that is explained by x. If R2 = 1, then all variation in y can be explained by variation in x, and all data points fall

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440   C H A P T E R 11 

  Regression and Correlation Methods

on the regression line. In other words, once x is known y can be predicted exactly, with no error or variability in the prediction. If R2 = 0, then x gives no information about y, and the variance of y is the same with or without knowing x. If R2 is between 0 and 1, then for a given value of x, the variance of y is lower than it would be if x were unknown but is still greater than 0. In particular, the best estimate of the variance of y given x (or σ2 in the regression model in Equation 11.2) is given by Res MS (or sy2⋅x ). For large n, sy2⋅x ≈ sy2(1 - R2). Thus R2 represents the proportion of the variance of y that is explained by x.

Example 11.13

Obstetrics  Compute and interpret R2 and sy2.x for the birthweight−estriol data in Example 11.12.

Solution

From Table 11.3, the R 2 for the birthweight−estriol regression line is given by 250.57/674 = .372. Thus about 37% of the variance of birthweight can be explained by estriol level. Furthermore, sy2.x = 14.60, as compared with n

sy2 = ∑ ( yi − y )

i =1

2

(n − 1) = 674 / 30 = 22.47

Thus, for the subgroup of women with a specific estriol level, such as 10 mg/24 hr, the variance of birthweight is 14.60, whereas for all women with any estriol level, the variance of birthweight is 22.47. Note that sy2⋅x sy2 = 14.60 / 22.47 = .650 ≈ 1 − R2 = 1 − .372 = .628

2 In some computer packages (e.g., Stata) the expression 1 - sy . x /sy2 is referred to as 2 2 2 adjusted R . Thus, for the estriol data, R = 0.372, while adjusted R = 0.350. For large n, adjusted R2 ≈ R2. For small n, a better measure of % variation of y explained by x is given by the adjusted R2.

Example 11.14

Table 11.4

Pulmonary Disease  Forced expiratory volume (FEV) is a standard measure of pulmonary function. To identify people with abnormal pulmonary function, standards of FEV for normal people must be established. One problem here is that FEV is related to both age and height. Let us focus on boys who are ages 10−15 and postulate a regression model of the form FEV = α + β(height) + e. Data were collected on FEV and height for 655 boys in this age group residing in Tecumseh, Michigan [2]. Table 11.4 presents the mean FEV in liters for each of twelve 4-cm height groups. Find the best-fitting regression line, and test it for statistical significance. What proportion of the variance of FEV can be explained by height? Mean FEV by height group for boys ages 10−15 in Tecumseh, Michigan Height (cm)

Mean FEV (L)

Height (cm)

Mean FEV (L)

134a 138 142 146 150 154

1.7 1.9 2.0 2.1 2.2 2.5

158 162 166 170 174 178

2.7 3.0 3.1 3.4 3.8 3.9

The middle value of each 4-cm height group is given here. Source: Reprinted with permission of the American Review of Respiratory Disease, 108, 258−272, 1973.

a

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11.4  ■  Inferences About Parameters from Regression Lines   441

Solution

A linear-regression line is fitted to the points in Table 11.4: 12

12

12

i =1

i =1

i =1

∑ xi = 1872 ∑ xi2 = 294, 320 ∑ yt = 32.3

12

12

i =1

i =1

∑ yi2 = 93.11 ∑ xi yi = 5156.20 Therefore, 1872 ( 32.3) = 117.4 12 1872 2 Lxx = 294, 320 − = 2288 12 b = Lxy Lxx = 0.0513 Lxy = 5156.20 −

12  12  a =  ∑ yi − b ∑ xi  12 = [ 32.3 − 0.0513 (1872 )] 12 = −5.313  i =1 i =1 

Thus the fitted regression line is

FEV = −5.313 + 0.0513 × height Statistical significance is assessed by computing the F statistic in Equation 11.7 as follows: Reg SS = L 2xy Lxx = 117.4 2 2288 = 6.024 = Reg MS Total SS = Lyy = 93.11 − 32.3 2 12 = 6.169 Res SS = 6.169 − 6.0 024 = 0.145

Res MS = Res SS / ( n − 2 ) = 0.145 / 10 = 0.0145 F = Reg MS / Res MS = 414.8 ~ F1,10 under H 0 Clearly, the fitted line is statistically significant because from Table 9 in the Appendix, F1,10,.999 = 21.04, so p < .001. These results can be displayed in an ANOVA table (Table 11.5).

Table 11.5

ANOVA table for the FEV−height regression results in Example 11.14 Analysis of Variance Source DF Regression 1 Residual Error 10 Total 11

SS 6.0239 0.1452 6.1692

MS 6.0239 0.0145

F 414.78

P 0.000

Finally, the proportion of the variance of FEV that is explained by height is estimated by adjusted R2 = 1 - .0145/(6.1692/11) = .974. Thus differences in height explain most of the variability in FEV among boys in this age group.

t Test for Simple Linear Regression In this section an alternative method for testing the hypothesis H0: β = 0 vs. H1: β ≠ 0 is presented. This method is based on the t test and is equivalent to the F test presented in Equation 11.7. The procedure is widely used and also provides interval estimates for β. The hypothesis test here is based on the sample regression coefficient b or, more specifically, on b/se(b), and H0 will be rejected if |b|/se(b) > c for some constant c and will be accepted otherwise.

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442   C H A P T E R 11 

  Regression and Correlation Methods

The sample regression coefficient b is an unbiased estimator of the population regression coefficient β and, in particular, under H0, E(b) = 0. Furthermore, the variance of b is given by n

∑ ( xi − x )

σ2

2

i =1

= σ 2 Lxx 2

In general, σ2 is unknown. However, the best estimate of σ2 is given by sy ⋅x. Hence se( b ) ≈ sy ⋅x / ( Lxx )

1/ 2

Finally, under H0, t = b/se(b) follows a t distribution with n − 2 df. Therefore, the following test procedure for a two-sided test with significance level α is used.

Equation 11.8

t Test for Simple Linear Regression  To test the hypothesis H0: β = 0 vs.

H1: β ≠ 0, use the following procedure:

(1) Compute the test statistic

(

t = b sy2⋅x / Lxx

)

1/ 2

(2) For a two-sided test with significance level α,

If t > t n − 2 ,1− α / 2    or   t < t n − 2 ,α / 2 = −t n − 2 ,1− α / 2

then reject H0;

if −t n − 2 ,1− α / 2 ≤ t ≤ t n − 2 ,1− α / 2

then accept H0.

(3) The p-value is given by

p = 2 × (area to the left of t under a tn−2 distribution) if t < 0

p = 2 × (area to the right of t under a tn−2 distribution) if t ≥ 0

The acceptance and rejection regions for this test are shown in Figure 11.9. Computation of the p-value is illustrated in Figure 11.10.

Figure 11.9

Acceptance and rejection regions for the t test for simple linear regression Acceptance region tn – 2, �/2 ≤ t ≤ tn – 2, 1 – �/2 tn – 2 distribution Frequency

t = b/(sy2 · x/Lxx)1/2 t < tn – 2, �/2 Rejection region

tn – 2, �/2

t > tn – 2, 1 – �/2 Rejection region

0 Value

tn – 2, 1 – �/2

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11.5  ■  Interval Estimation for Linear Regression   443

Figure 11.10 Computation of the p-value for the t test for simple linear regression

tn – 2 distribution

Frequency

Frequency

tn – 2 distribution

p/2

p/2

t

0 Value

(a) If t < 0, then p = 2 × (area to the left of t under a tn – 2 distribution).

0 t Value (b) If t ≥ 0, then p = 2 × (area to the right of t under a tn – 2 distribution).

The t test in this section and the F test in Equation 11.7 are equivalent in that they always provide the same p-values. Which test is used is a matter of personal preference; both appear in the literature.

Example 11.15

Obstetrics  Assess the statistical significance for the birthweight−estriol data using the t test in Equation 11.8.

Solution

From Example 11.8, b = Lxy  / Lxx = 0.608. Furthermore, from Table 11.3 and Example 11.12,

(

se ( b ) = sy2⋅x Lxx

)

1/ 2

= (14.60 677.42 )

1/ 2

= 0.147

Thus t = b/se(b) = 0.608/0.147 = 4.14 ~ t29 under Ho Because   t29,.9995 = 3.659 < 4.14 = t we have   p < 2 × (1 − .9995) = .001 This information is summarized in Table 11.6. Note that the p-values based on the F test in Table 11.3 and the t test in Table 11.6 are the same (p = .000).

Table 11.6

The t test approach for the birthweight−estriol example The regression equation is brthwgt = 21.5 + 0.608 estriol Predictor Coef SE Coef Constant 21.523 2.620 estriol 0.6082 0.1468

T 8.21 4.14

P 0.000 0.000

11.5 Interval Estimation for Linear Regression Interval Estimates for Regression Parameters Standard errors and interval estimates for the parameters of a regression line are often computed to obtain some idea of the precision of the estimates. Furthermore, if we want to compare our regression coefficients with previously published regression coefficients β0 and α0, where these estimates are based on much larger samples

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444   C H A P T E R 11 

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than ours, then, based on our data, we can check whether β0 and α0 fall within the 95% confidence intervals for β and α, respectively, to decide whether the two sets of results are comparable. The standard errors of the estimated regression parameters are given as follows.

Equation 11.9

Standard Errors of Estimated Parameters in Simple Linear Regression sy2⋅x

se ( b ) =

Lxx

 1 x2  se ( a ) = sy2⋅x  +   n Lxx  Furthermore, the two-sided 100% × (1 − α) confidence intervals for β and α are given by

Equation 11.10

wo-Sided 100% × (1 − α) Confidence Intervals for the Parameters of a Regres­ T sion Line  If b and a are, respectively, the estimated slope and intercept of a regression line as given in Equation 11.3 and se(b), se(a) are the estimated standard errors as given in Equation 11.9, then the two-sided 100% × (1 − α) confidence intervals for β and α are given by

Example 11.16

Solution

b ± t n − 2 ,1− α / 2 se( b )   and    a ± t n − 2 ,1− α / 2 se(a),   respectively.

Obstetrics  Provide standard errors and 95% confidence intervals for the regression parameters of the birthweight−estriol data in Table 11.1. From Example 11.15, the standard error of b is given by 14.60 / 677.42 = 0.147 Thus a 95% confidence interval for β is obtained from

0.608 ± t29,.975(0.147) = 0.608 ± 2.045(0.147) = 0.608 ± 0.300 = (0.308, 0.908)

Compute x to obtain the standard error of a. From Example 11.8, 31

x=

∑ xi i =1

31

=

534 = 17.23 31

Thus the standard error of a is given by

 1 17.232  14.60  + = 2.62  31 677.42  It follows that a 95% confidence interval for α is provided by

21.52 ± t29,.975(2.62) = 21.52 ± 2.045(2.62) = 21.52 ± 5.36 = (16.16, 26.88) These intervals are rather wide, which is not surprising due to the small sample size. Suppose another data set based on 500 pregnancies, where the birthweight−estriol regression line is estimated as y = 25.04 + 0.52x, is found in the literature.

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11.5  ■  Interval Estimation for Linear Regression   445

Because 0.52 is within the 95% confidence interval for the slope and 25.04 is within the 95% confidence interval for the intercept, our results are comparable to those of the earlier study. We assume in this analysis that the variability in the slope (0.52) and intercept (25.04) estimates from the sample of 500 pregnancies is negligible compared with the error from the data set with 31 pregnancies.

Interval Estimation for Predictions Made from Regression Lines One important use for regression lines is in making predictions. Frequently, the accuracy of these predictions must be assessed.

Example 11.17

Pulmonary Function  Suppose we want to use the FEV−height regression line computed in Example 11.14 to develop normal ranges for 10- to 15-year-old boys of specific heights. In particular, consider John H., who is 12 years old and 160 cm tall and whose FEV is 2.5 L. Can his FEV be considered abnormal for his age and height? In general, if all boys of height x are considered, then the average FEV for such boys can be best estimated from the regression equation by yˆ = a + bx . How accurate is this estimate? The answer to this question depends on whether we are making predictions for one specific boy or for the mean value of all boys of a given height. The first estimate would be useful to a pediatrician interested in assessing the lung function of a particular patient, whereas the second estimate would be useful to a researcher interested in relationships between pulmonary function and height over large populations of boys. The standard error (se1) of the first type of estimate and the resulting interval estimate are given as follows.

Equation 11.11

redictions Made from Regression Lines for Individual Observations  P Suppose we wish to make predictions from a regression line for an individual observation with independent variable x that was not used in constructing the regression line. The distribution of observed y values for the subset of individuals with independent variable x is normal with mean = yˆ = a + bx and standard deviation given by

 1 ( x − x )2  se1 ( yˆ ) = sy2⋅x 1 + +  n Lxx  

Furthermore, 100% × (1 − α) of the observed values will fall within the interval

yˆ ± t n − 2 ,1− α / 2 se1 ( yˆ )

This interval is sometimes called a 100% × (1 − α) prediction interval for y.

Example 11.18

Pulmonary Function  Can the FEV of John H. in Example 11.17 be considered abnormal for his age and height?

Solution

John’s observed FEV is 2.5 L. The regression equation relating FEV and height was computed in Example 11.14 and is given by y = −5.313 + 0.0513 × height. Thus the estimated average FEV for 12-year-old boys of height 160 cm is

yˆ = −5.313 + 160 × 0.0513 = 2.90 L Before computing the se1 ( yˆ ), we need to obtain x. From Example 11.14,

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446   C H A P T E R 11 

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12

x=

∑ xi i =1

12

=

1872 = 156.0 12

Thus se1 ( yˆ ) is given by

 1 (160 − 156)2  se1 ( yˆ ) = 0.0145 1 + +  = 0.0145(1.090 ) = 0.126 2288  12  Furthermore, 95% of boys of this age and height will have an FEV between

2.90 ± t10 ,.975 ( 0.126) = 2.90 ± 2.228( 0.126) = 2.90 ± 0.28 = (2.62, 3.18) How can this prediction interval be used? Because the observed FEV for John H. (2.5 L) does not fall within this interval, we can say that John’s lung function is abnormally low for a boy of his age and height; to find a reason for this abnormality, further exploration, if possible, is needed. The magnitude of the standard error in Equation 11.11 depends on how far the observed value of x for the new sample point is from the mean value of x for the data points used in computing the regression line ( x ). The standard error is smaller when x is close to x than when x is far from x. In general, making predictions from a regression line for values of x that are very far from x is risky because the predictions are likely to be more inaccurate.

Example 11.19

Solution

Pulmonary Function  Suppose Bill is 190 cm tall, with an FEV of 3.5 L. Compare the standard error of his predicted value with that for John, given in Example 11.18. From Equation 11.11,  1 (190 − 156)2  se1 ( yˆ ) = 0.0145 1 + +  2288  12 

= 0.0145(1.589) = 0.152 > 0.126 = se1  (computed in Example 11.18)

This result is expected because 190 cm is further than 160 cm from x = 156 cm. Suppose we want to assess the mean value of FEV for a large number of boys of a particular height rather than for one particular boy. This parameter might interest a researcher working with growth curves of pulmonary function in children. How can the estimated mean FEV and the standard error of the estimate be found? The procedure is as follows.

Equation 11.12

tandard Error and Confidence Interval for Predictions Made from Regression Lines S for the Average Value of y for a Given x  The best estimate of the average value of y for a given x is yˆ = a + bx . Its standard error, denoted by se2 ( yˆ ), is given by

 1 ( x − x )2  se2 ( yˆ ) = sy2⋅x  +  Lxx  n Furthermore, a two-sided 100% × (1 − α) confidence interval for the average value of y is yˆ ± t n − 2 ,1− α / 2 se2 ( yˆ )

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11.5  ■  Interval Estimation for Linear Regression   447

Example 11.20

Pulmonary Function  Compute the standard error and 95% confidence interval for the average value of FEV over a large number of boys with height of 160 cm.

Solution

See the results of Example 11.18 for the necessary raw data to perform the computations. The best estimate of the mean value of FEV is the same as given in Example 11.18, which was 2.90 L. However, the standard error is computed differently. From Equation 11.12,  1 (160 − 156)2  se2 ( yˆ ) = 0.0145  +  = 0.0145( 0.090 ) = 0.036 2288  12 

Therefore, a 95% confidence interval for the mean value of FEV over a large number of boys with height 160 cm is given by 2.90 ± t10 ,.975 ( 0.036) = 2.90 ± 2.228( 0.036) = 2.90 ± 0.08 = (2.82, 2.98)

Notice that this interval is much narrower than the interval computed in Example 11.18 (2.62, 3.18), which is a range encompassing approximately 95% of individual boys’ FEVs. This disparity reflects the intuitive idea that there is much more precision in estimating the mean value of y for a large number of boys with the same height x than in estimating y for one particular boy with height x. Note again that the standard error for the average value of y for a given value of x is not the same for all values of x but gets larger the further x is from the mean value of x ( x ) used to estimate the regression line.

Example 11.21

Solution

Pulmonary Function  Compare the standard error of the average FEV for boys of height 190 cm with that for boys of 160 cm. From Equation 11.12,  1 (190 − 156)2  se2 ( yˆ ) = 0.0145  +  = 0.0145( 0.589) 2288  12  ˆ = 0.092 > 0.036 = se2 ( y ) for x = 160 cm

This result is expected because 190 cm is further than 160 cm from x = 156 cm.

Table 11.7

1

What is a residual? Why are residuals important in regression analysis?

2

A 79-year-old man was admitted to the hospital with coronary-artery disease, abdominal pain, and worsening intermittent claudication (which roughly means loss of circulation in the legs, making walking difficult and/or painful) [3]. As part of the patient’s workup, his lab values were followed over time while in the hospital. His hematocrit (%) values over the first 7 days in the hospital are shown in Table 11.7.

Hematocrit (%) values over the first 7 days in the hospital for a patient with intermittent claudication Day 0

Day 3

Day 4

Day 5

Day 6

Day 7

28.9

28.7

26.4

30.4

30.3

33.2

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REVIEW

REVIEW QUESTIONS 11A

448   C H A P T E R 11 

  Regression and Correlation Methods

(a) Fit a linear-regression line to the hematocrit values over the 7-day period.

(b) Is there a statistically significant change in his hematocrit values over time?

(c) Suppose we want to predict his hematocrit on the eighth hospital day.

(ii) What is the standard error of this estimate?

(iii) What is a 95% confidence interval associated with this estimate?

(i) What is the best estimate of this value?

11.6 Assessing the Goodness of Fit of Regression Lines A number of assumptions were made in using the methods of simple linear regression in the previous sections of this chapter. What are some of these assumptions, and what possible situations could be encountered that would make these assumptions not viable?

Equation 11.13

Assumptions Made in Linear-Regression Models

(1) For any given value of x, the corresponding value of y has an average value α + βx, which is a linear function of x.

(2) For any given value of x, the corresponding value of y is normally distributed about α + βx with the same variance σ2 for any x.

(3) For any two data points (x1, y1), (x2, y2), the error terms e1, e2 are independent of each other. Let us now reassess the birthweight−estriol data for possible violation of linear regression assumptions. To assess whether these assumptions are reasonable, we can use several different kinds of plots. The simplest plot is the x − y scatter plot. Here we plot the dependent variable y vs. the independent variable x and superimpose the regression line y = a + bx on the same plot. We have constructed a scatter plot of this type for the birthweight−estriol data in Figure 11.1. The linearity assumption appears reasonable in that there is no obvious curvilinearity in the raw data. However, there is a hint that there is more variability about the regression line for higher estriol values than for lower estriol values. To focus more clearly on this issue, we can compute the residuals about the fitted regression line and then construct a scatter plot of the residuals vs. either the estriol values (x) or the predicted birthweights ( yˆ = a + bx ). From Equation 11.2, we see that the errors (e) about the true regression line (y = α + βx) have the same variance σ2. However, it can be shown that the residuals about the fitted regression line (y = a + bx) have different variances depending on how far an individual x value is from the mean x value used to generate the regression line. Specifically, residuals for points (xi, yi) where xi is close to the mean x value for all points used in constructing the regression line (i.e., xi − x is small) will tend to be larger than residuals where xi − x is large. Interestingly, if xi − x is very large, then the regression line is forced to go through the point (xi, yi) (or nearly through it) with a small residual for this point. The standard deviation of the residuals is given in Equation 11.14.

Equation 11.14

tandard Deviation of Residuals About the Fitted Regression Line  S Let (xi, yi) be a sample point used in estimating the regression line, y = α + βx.

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11.6  ■  Assessing the Goodness of Fit of Regression Lines   449

If y = a + bx is the estimated regression line, and

eˆi = residual for the point (xi, yi) about the estimated regression line, then eˆi = yi − ( a + bxi ) and  1 ( x − x )2  ˆ 2 1 − − i sd ( eˆi ) = σ  n Lxx  

The Studentized residual corresponding to the point (xi, yi) is eˆi /sd ( eˆi ). In Figure 11.11, we have plotted the Studentized residuals (the individual residuals divided by their standard deviations) vs. the predicted birthweights (g/100) (yˆ = 21.52 + 0.608 × estriol). A point labeled 2 indicates that there are two identical data points—for example, the second and third points in Table 11.1 are both (9, 25). There is still a hint that

Figure 11.11

Plot of Studentized residuals vs. the predicted value of birthweight for the birthweight−estriol data in Table 11.1 The SAS System STUDENT 2.0

1

1.5 1 1

1 1.0

2

1

1

1

1

1

0.5 Studentized Residual

1 1

1 0.0

1

1 1

1 1 –0.5

2

1

1

1

1 –1.0 1

1

1 1

–1.5

1

–2.0

1 –2.5 25

26

27

28 29 30 31 32 33 34 Predicted Value of BRTHWT PRED

35

36

37

38

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450   C H A P T E R 11 

  Regression and Correlation Methods

the spread increases slightly as the predicted birthweight increases. However, this impression is mainly due to the four data points with the lowest predicted values, all of which have residuals that are close to 0. One commonly used strategy that can be employed if unequal residual variances are present is to transform the dependent variable (y) to a different scale. This type of transformation is called a variance-stabilizing transformation. The goal of using such a transformation is to make the residual variances approximately the same for each level of x (or, equivalently, each level of the predicted value). The most common transformations when the residual variance is an increasing function of x are either the ln or square-root transformations. The squareroot transformation is useful when the residual variance is proportional to the average value of y (e.g., if the average value goes up by a factor of 2, then the residual variance goes up by a factor of 2 also). The log transformation is useful when the residual variance is proportional to the square of the average values (e.g., if the average value goes up by a factor of 2, then the residual variance goes up by a factor of 4). For purposes of illustration, we have computed the regression using the ln transformation for birthweight (i.e., y = ln birthweight). The residual plot is shown in Figure 11.12. The plots in Figures 11.11 and 11.12 look similar. The plot using the squareroot transformation for birthweight is also similar. Therefore, we would probably choose to keep the data in the original scale for the sake of simplicity. However, in other data sets the use of the appropriate transformation is crucial and each of the linearity, equal-variance, and normality assumptions can be made more plausible using a transformed scale. However, occasionally a transformation may make the equal-variance assumption more plausible but the linearity assumption less plausible. Another possibility is to keep the data in the original scale but employ a weighted regression in which the weight is approximately inversely proportional to the residual variance. This may be reasonable if the data points consist of averages over varying numbers of individuals (e.g., people living in different cities, where the weight is proportional to the size of the city). Weighted regression is beyond the scope of this text (see Draper & Smith [4] for a more complete discussion of this technique). Other issues of concern in judging the goodness of fit of a regression line are outliers and influential points. In Section 8.9, we discussed methods for the detection of outliers in a sample, where only a single variable is of interest. However, it is more difficult to detect outliers in a regression setting than in univariate problems, particularly if multiple outliers are present in a data set. Influential points are defined heuristically as points that have an important influence on the coefficients of the fitted regression lines. Suppose we delete the ith sample point and refit the regression line from the remaining n − 1 data points. If we denote the estimated slope and intercept for the reduced data set by b(i) and a(i), respectively, then the sample point will be influential if either b − b(i ) or a − a(i ) is large. Outliers and influential points are not necessarily the same. An outlier ( xi , yi ) may or may not be influential, depending on its location relative to the remaining sample points. For example, if xi − x is small, then even a gross outlier will have a relatively small influence on the slope estimate but will have an important influence on the intercept estimate. Conversely, if xi − x is large, then even a data point that is not a gross outlier may be influential. See Draper & Smith [4] and Weisberg [5] for a more complete description of residual analysis, detection of outliers, and influential points in a regression setting. We have discussed using residual analysis to assess the validity of the linearity assumption (assumption 1 in Equation 11.13), and the validity of the equal-variance

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11.6  ■  Assessing the Goodness of Fit of Regression Lines   451

Figure 11.12

Plot of Studentized residuals vs. the predicted value of ln(birthweight) for the birthweight−estriol data in Table 11.1 The SAS System STUDENT 2.0

1

1.5 1 1.0

2

1

1

1

1 1 1

0.5

1

1

Studentized Residual

1 1

0.0

1 1

1 1

1 –0.5

1

1

1

2 1 –1.0 1

1

1 1

–1.5

–2.0 1

1

–2.5 3.24 3.28 3.32 3.36 3.40 3.44 3.48 3.52 3.56 3.60 3.64 3.26 3.30 3.34 3.38 3.42 3.46 3.50 3.54 3.58 3.62 3.66 Predicted Value of LBRTHWT PRED

assumption (assumption 2 in Equation 11.13). The normality assumption is most important in small samples. In large samples, an analog to the central-limit theorem can be used to establish the unbiasedness of b as an estimator of β and the appropriateness of test of significance concerning β (such as the F test for simple linear regression in Equation 11.7 or the t test for simple linear regression in Equation 11.8), or formulas for confidence-interval width of β (Equation 11.10), even if the error terms are not normally distributed. The independence assumption (assumption 3, Equation 11.13) is important to establish the validity of p-values and confidence-interval width from simple linear regression. Specifically, if multiple data points from the same individual are used in fitting a regression line, then p-values will generally be too low, and confidence-interval width will generally be too narrow using standard methods of regression analysis (which assume independence). We discuss this type of clustered data in more detail in Chapter 13.

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452   C H A P T E R 11 

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11.7 The Correlation Coefficient The discussion of linear-regression analysis in Sections 11.2−11.6 primarily focused on methods of predicting one dependent variable (y) from an independent variable (x). Often we are interested not in predicting one variable from another but rather in investigating whether or not there is a relationship between two variables. The correlation coefficient, introduced in Definition 5.13, is a useful tool for quantifying the relationship between variables and is better suited for this purpose than the regression coefficient.

Example 11.22

Cardiovascular Disease  Serum cholesterol is an important risk factor in the etiology of cardiovascular disease. Much research has been devoted to understanding the environmental factors that cause elevated cholesterol levels. For this purpose, cholesterol levels were measured on 100 genetically unrelated spouse pairs. We are not interested in predicting the cholesterol level of a husband from that of his wife but instead would like some quantitative measure of the relationship between their levels. We will use the correlation coefficient for this purpose. In Definition 5.13, we defined the population correlation coefficient ρ. In general, ρ is unknown and we have to estimate ρ by the sample correlation coefficient r.

Definition 11.15

The sample (Pearson) correlation coefficient (r) is defined by

Lxy / Lxx Lyy

The correlation is not affected by changes in location or scale in either variable and must lie between −1 and +1. The sample correlation coefficient can be interpreted in a similar manner to the population correlation coefficient ρ.

Equation 11.15

Interpretation of the Sample Correlation Coefficient

(1) If the correlation is greater than 0, such as for birthweight and estriol, then the variables are said to be positively correlated. Two variables (x, y) are positively correlated if as x increases, y tends to increase, whereas as x decreases, y tends to decrease.

(2) If the correlation is less than 0, such as for pulse rate and age, then the variables are said to be negatively correlated. Two variables (x, y) are negatively correlated if as x increases, y tends to decrease, whereas as x decreases, y tends to increase.

(3) If the correlation is exactly 0, such as for birthweight and birthday, then the variables are said to be uncorrelated. Two variables (x, y) are uncorrelated if there is no linear relationship between x and y.

Thus the correlation coefficient provides a quantitative measure of the dependence between two variables: the closer |r| is to 1, the more closely related the variables are; if |r| = 1, then one variable can be predicted exactly from the other. As was the case for the population correlation coefficient (ρ), interpreting the sample correlation coefficient (r) in terms of degree of dependence is only correct if the variables x and y are normally distributed and in certain other

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11.7  ■  The Correlation Coefficient   453

special cases. If the variables are not normally distributed, then the interpretation may not be correct (see Example 5.30 for an example of two random variables that have correlation coefficient = 0 but are completely dependent).

Example 11.23  Suppose the two variables under study are temperature in °F (y) and temperature in °C (x). The correlation between these two variables must be 1 because one variable is 9 a linear function of the other  y = x + 32  .   5

Example 11.24

Solution

Obstetrics  Compute the sample correlation coefficient for the birthweight−estriol data presented in Table 11.1. From Examples 11.8 and 11.12, Lxy = 412

Lxx = 677.42

Therefore,  r = Lxy

Lyy = 674

Lxx Lyy = 412

677.42(674) = 412 675.71 = .61

Relationship Between the Sample Correlation Coefficient (r) and the Population Correlation Coefficient (ρ) We can relate the sample correlation coefficient r and the population correlation coefficient ρ more clearly by dividing the numerator and denominator of r by (n − 1) in Definition 11.15, whereby

Equation 11.16

r=

Lxy / (n − 1)  Lxx   Lyy    n − 1   n − 1 

We note that sx2 = Lxx / (n − 1) and sy2 = Lyy / (n − 1). Furthermore, if we define the sample covariance by sxy = Lxy / (n − 1), then we can re-express Equation 11.16 in the following form.

Equation 11.17

r=

sxy sx sy

=

sample covariance between x and y (sample standard deviation of x )(sample standard deviation of y)

This is completely analogous to the definition of the population correlation coefficient ρ given in Definition 5.13 with the population quantities, Cov(X, Y), σx, and σy replaced by their sample estimates sxy, sx, and sy.

Relationship Between the Sample Regression Coefficient (b) and the Sample Correlation Coefficient (r) What is the relationship between the sample regression coefficient (b) and the sample correlation coefficient (r)? Note from Equation 11.3 that b = Lxy / Lxx and from Definition 11.15 that r = Lxy / Lxx Lyy . Therefore, if r is multiplied by

Equation 11.18

r

Lyy Lxx

=

Lxy Lxx Lyy

×

Lyy Lxx

=

Lxy Lxx

Lyy / Lxx , we obtain

=b

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454   C H A P T E R 11 

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Furthermore, from Definition 11.4, sy2 = sx2 =

Lyy n −1 Lxx n −1

sy2 / sx2 = Lyy / Lxx or  sy / sx = Lyy / Lxx Substituting sy / sx for Lyy / Lxx on the left-hand side of Equation 11.18 yields the following relationship.

Equation 11.19

b=

rsy sx

How can Equation 11.19 be interpreted? The regression coefficient (b) can be interpreted as a rescaled version of the correlation coefficient (r), where the scale factor is the ratio of the standard deviation of y to that of x. Note that r will be unchanged by a change in the units of x or y (or even by which variable is designated as x and which is designated as y), whereas b is in the units of y/x.

Example 11.25

Solution

Pulmonary Function  Compute the correlation coefficient between FEV and height for the pulmonary-function data in Example 11.14. From Example 11.14, Lxy = 117.4 Therefore,  r =

Lxx = 2288

Lyy = 6.169

117.4 117.4 = = .988 2288(6.169) 118.81

Thus a very strong positive correlation exists between FEV and height. The sample regression coefficient b was calculated as 0.0513 in Example 11.14. Furthermore, the sample standard deviation of x and y can be computed as follows: n

sx =

∑ ( xi − x )2 i =1

n −1

=

Lxx = n −1

2288 = 208 = 14.42 11

n

sy =

∑ ( yi − y )2 i =1

n −1

=

Lyy n −1

=

6.169 49 = 0.561 = 0.74 11

and their ratio is thus given by

sy / sx = 0.749 / 14.42 = .0519 Finally, b can be expressed as a rescaled version of r as

b = r ( sy / sx )  or  .0513 = .988(.0519) Notice that if height is re-expressed in inches rather than centimeters (1 in. = 2.54 cm), then sx is divided by 2.54, and b is multiplied by 2.54; that is,

bin. = bcm × 2.54 = .0513 × 2.54 = .130 where bin. is in the units of liters per inch and bcm is in the units of liters per centimeter. However, the correlation coefficient remains the same at .988.

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11.8  ■  Statistical Inference for Correlation Coefficients   455

When should the regression coefficient be used, and when should the correlation coefficient be used? The regression coefficient is used when we specifically want to predict one variable from another. The correlation coefficient is used when we simply want to describe the linear relationship between two variables but do not want to make predictions. In cases in which it is not clear which of these two aims is primary, both a regression and a correlation coefficient can be reported.

Example 11.26

Obstetrics, Pulmonary Disease, Cardiovascular Disease  For the birthweight−estriol data in Example 11.1, the obstetrician is interested in using a regression equation to predict birthweight from estriol levels. Thus the regression coefficient is more appropriate. Similarly, for the FEV−height data in Example 11.14, the pediatrician is interested in using a growth curve relating a child’s pulmonary function to height, and again the regression coefficient is more appropriate. However, in collecting data on cholesterol levels in spouse pairs in Example 11.22, the geneticist is interested simply in describing the relationship between cholesterol levels of spouse pairs and is not interested in prediction. Thus the correlation coefficient is more appropriate here.

REVIEW QUESTIONS 11B

1

What is the difference between a regression coefficient and a correlation coefficient?

2

Refer to the data in Table 2.11.

(a) Compute the correlation coefficient between white-blood count following admission and duration of hospital stay.

(b) Discuss what this correlation coefficient means.

11.8 Statistical Inference for Correlation Coefficients In the previous section, we defined the sample correlation coefficient. Based on Equation 11.17, if every unit in the reference population could be sampled, then the sample correlation coefficient (r) would be the same as the population correlation coefficient, denoted by ρ, which was introduced in Definition 5.13. In this section, we will use r, which is computed from finite samples, to test various hypotheses concerning ρ.

One-Sample t Test for a Correlation Coefficient

Example 11.27

Cardiovascular Disease  Suppose serum-cholesterol levels in spouse pairs are measured to determine whether there is a correlation between cholesterol levels in spouses. Specifically, we wish to test the hypothesis H0: ρ = 0 vs. H1: ρ ≠ 0. Suppose that r = .25 based on 100 spouse pairs. Is this evidence enough to warrant rejecting H0?

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REVIEW

In this section, we have introduced the concept of a correlation coefficient. In the next section, we discuss various hypothesis tests concerning correlation coefficients. Correlation coefficients are used when we are interested in studying the association between two variables but are not interested in predicting one variable from another. On the flowchart at the end of this chapter (Figure 11.32, p. 503), we answer yes to (1) interested in relationships between two variables? and (2) both variables continuous? no to (3) interested in predicting one variable from another? yes to (4) interested in studying the correlation between two variables? and yes to (5) both variables normal? This leads us to the box “Pearson correlation methods.”

456   C H A P T E R 11 

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In this instance, the hypothesis test would naturally be based on the sample correlation coefficient r and H0 would be rejected if |r| is sufficiently far from 0. Assuming that each of the random variables x = serum-cholesterol level for the husband and y = serum-cholesterol level for the wife is normally distributed, then the best procedure for testing the hypothesis is given as follows:

ne-Sample t Test for a Correlation Coefficient  O To test the hypothesis H0: ρ = 0 vs. H1: ρ ≠ 0, use the following procedure:

Equation 11.20

(1) Compute the sample correlation coefficient r.

(2) Compute the test statistic

t = r (n − 2 )1/ 2 (1 − r 2 )1/ 2

which under H0 follows a t distribution with n − 2 df.

(3) For a two-sided level α test,

if  t > t n − 2 ,1− α / 2    or   t < −t n − 2 ,1− α / 2

then reject H0.

If  −t n − 2 ,1− α / 2 ≤ t ≤ t n − 2 ,1− α / 2

then accept H0.

(4) The p-value is given by

p = 2 × (area to the left of t under a t n − 2 disttribution )

if t < 0

p = 2 × (area to the right of t under a t n − 2 distribution )

if t ≥ 0

(5) We assume an underlying normal distribution for each of the random variables used to compute r.

The acceptance and rejection regions for this test are shown in Figure 11.13. Computation of the p-value is illustrated in Figure 11.14.

Example 11.28

Solution

Perform a test of significance for the data in Example 11.27. We have n = 100, r = .25. Thus in this case,

t = .25 98

1 − .252 = 2.475 /.968 = 2.56

From Table 5 in the Appendix,

t 60 , .99 = 2.39

t 60 , .995 = 2.66

t120 , .99 = 2.358

t120 , .995 = 2.617

Therefore, because 60 < 98 < 120,

.005 < p / 2 < .01    or   .01 < p < .02 and H0 is rejected. Alternatively, using Excel 2007, the exact p-value = TDIST(2.56, 98, 2) = .012. We conclude there is a significant aggregation of cholesterol levels between spouses. This result is possibly due to common environmental factors such as diet. But it could also be due to the tendency for people of similar body build to marry each other, and their cholesterol levels may have been correlated at the time of marriage. Interestingly, the one-sample t test for correlation coefficients in Equation 11.20 is mathematically equivalent to the F test in Equation 11.7 and the t test in Equation 11.8 for simple linear regression, in that they always yield the same p-values. The question as to which test is more appropriate is best answered by whether a regression or a correlation coefficient is the parameter of primary interest.

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11.8  ■  Statistical Inference for Correlation Coefficients   457

Figure 11.13

Acceptance and rejection regions for the one-sample t test for a correlation coefficient –tn – 2, 1 – �/2 ≤ t ≤ tn – 2, 1 – �/2 Acceptance region

Frequency

tn – 2 distribution t= t < –tn – 2, 1 – �/2 Rejection region

0 – tn – 2, 1 – �/2

Figure 11.14

r n–2 1 – r2

t > tn – 2, 1 – �/2 Rejection region

0 Value

tn – 2, 1 – �/2

Computation of the p-value for the one-sample t test for a correlation coefficient If t < 0, then p = 2 × area to the left of t under a tn – 2 distribution.

t=

r n–2 1 – r2

Frequency

tn – 2 distribution

p/2

t

0 Value

If t ≥ 0, then p = 2 × area to the right of t under a tn – 2 distribution.

Frequency

tn – 2 distribution

p/2

0 Value

t

One-Sample z Test for a Correlation Coefficient In the previous section, a test of the hypothesis H0: ρ = 0 vs. H1: ρ ≠ 0 was considered. Sometimes the correlation between two random variables is expected to be some quantity ρ0 other than 0 and we want to test the hypothesis H0: ρ = ρ0 vs. H1: ρ ≠ ρ0.

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458   C H A P T E R 11 

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Example 11.29

Suppose the body weights of 100 fathers (x) and first-born sons (y) are measured and a sample correlation coefficient r of .38 is found. We might ask whether or not this sample correlation is compatible with an underlying correlation of .5 that might be expected on genetic grounds. How can this hypothesis be tested? In this case, we want to test the hypothesis H0: ρ = .5 vs. H1: ρ ≠ .5.The problem with using the t test formation in Equation 11.20 is that the sample correlation coefficient r has a skewed distribution for nonzero ρ that cannot be easily approximated by a normal distribution. Fisher considered this problem and proposed the following transformation to better approximate a normal distribution:

Equation 11.21

Fisher’s z Transformation of the Sample Correlation Coefficient r  The z trans­formation of r given by z=

1 1+ r ln   2 1− r

is approximately normally distributed under H0 with mean

z0 =

1 ln[(1 + ρ0 ) / (1 − ρ0 )] 2

and variance 1/(n − 3). The z transformation is very close to r for small values of r but tends to deviate substantially from r for larger values of r. A table of the z transformation is given in Table 13 in the Appendix.

Example 11.30

Solution

Compute the z transformation of r = .38. The z transformation can be computed from Equation 11.21 as follows: z=

1 1  1 + 0.38  1  1.38  1 ln   = ln   = ln(2.226) = ( 0.800 ) = 0.400 2 2  1 − 0.38  2  0.62  2

Alternatively, we could refer to Table 13 in the Appendix with r = .38 to obtain z = 0.400. Fisher’s z transformation can be used to conduct the hypothesis test as follows: Under H0, Z is approximately normally distributed with mean z0 and variance 1/(n − 3) or, equivalently,

λ = ( Z − z0 ) n − 3 ~ N ( 0,1) H0 will be rejected if z is far from z0. Thus the following test procedure for a twosided level α test is used.

Equation 11.22

One-Sample z Test for a Correlation Coefficient  To test the hypothesis H0: ρ = ρ0 vs. H1: ρ ≠ ρ0, use the following procedure: (1) Compute the sample correlation coefficient r and the z transformation of r. (2) Compute the test statistic

    λ = ( z − z0 ) n − 3 (3) If  λ > z1− α / 2   or   λ < − z1− α / 2

   reject H0.

If  − z1− α / 2 ≤ λ ≤ z1− α / 2   accept H0.

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11.8  ■  Statistical Inference for Correlation Coefficients   459

Figure 11.15

Acceptance and rejection regions for the one-sample z test for a correlation coefficient

N(0, 1) distribution

Frequency

� = (z – z0) n – 3 � < –z1 – �/2 Rejection region

Acceptance region –z1 – �/2 ≤ � ≤ z1 – �/2

–z1 – �/2

� > z1 – �/2 Rejection region

z1 – �/2

Value

(4) The exact p-value is given by p = 2 × Φ( λ )     p = 2 × [1 − Φ( λ )]

if λ ≤ 0 if λ > 0

(5) Assume an underlying normal distribution for each of the random variables used to compute r and z. The acceptance and rejection regions for this test are shown in Figure 11.15. Computation of the p-value is illustrated in Figure 11.16.

Example 11.31

Solution

Perform a test of significance for the data in Example 11.29. In this case r = .38, n = 100, ρ0 = .50. From Table 13 in the Appendix, z0 =

1  1 + .5  ln   = .549 2  1 − .5 

z=

1  1 + .38  ln   = .400 2  1 − .38 

Hence

λ = ( 0.400 − 0.549) 97 = ( −0.149)(9.849) = −1.47 ~ N ( 0,1) Thus the p-value is given by

2 × [1 − Φ(1.47)] = 2 × (1 − .9292 ) = .142 Therefore, we accept H0 that the sample estimate of .38 is compatible with an underlying correlation of .50; this would be expected on purely genetic grounds. To sum up, the z test in Equation 11.22 is used to test hypotheses about nonzero null correlations, whereas the t test in Equation 11.20 is used to test hypotheses about null correlations of zero. The z test can also be used to test correlations of zero under the null hypothesis, but the t test is slightly more powerful in this case and is preferred. However, if ρ0 ≠ 0, then the one-sample z test is very sensitive to

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460   C H A P T E R 11 

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Figure 11.16

Computation of the p-value for the one-sample z test for a correlation coefficient If � ≤ 0, then p = 2 × Φ(�). � = (z – z0) n – 3

Frequency

N(0, 1) distribution

p/2

0 Value

If � > 0, then p = 2 × [1 – Φ(�)].

Frequency

N(0, 1) distribution

p/2

0 Value

non-normality of either x or y. This is also true for the two-sample correlation test presented later in this section (see p. 464).

Interval Estimation for Correlation Coefficients In the previous two sections, we learned how to estimate a correlation coefficient ρ and how to perform appropriate hypothesis tests concerning ρ. It is also of interest to obtain confidence limits for ρ. An easy method for obtaining confidence limits for p can be derived based on the approximate normality of Fisher’s z transformation of r. This method is given as follows.

Equation 11.23

Interval Estimation of a Correlation Coefficient (ρ)  Suppose we have a sample correlation coefficient r based on a sample of n pairs of observations. To obtain a two-sided 100% × (1 − α) confidence interval for the population correlation coefficient (ρ): 1 1+ r (1) Compute Fisher’s z transformation of r = z = ln  . 2 1− r (2) Let zρ = Fisher’s z transformation of ρ =

1  1 + ρ ln . 2  1 − ρ 

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11.8  ■  Statistical Inference for Correlation Coefficients   461

A two-sided 100% × (1 − α) confidence interval is given for zρ = (z1, z2) where z1 = z − z1− α / 2 n − 3

z2 = z + z1− α /2

and z1-  α/2 = 100% × (1 − α/2) percentile of an N(0, 1) distribution

n−3

(3) A two-sided 100% × (1 − α) confidence interval for ρ is then given by (ρ1, ρ2) where

e 2 z1 − 1 e 2 z1 + 1 e 2 z2 − 1 ρ2 = 2 z e 2 +1 ρ1 =

The interval (z1, z2) in Equation 11.23 can be derived in a similar manner to the confidence interval for the mean of a normal distribution with known variance (see Equation 6.7), which is given by

Equation 11.24

( z1 , z2 ) = z ± z1−α /2

n−3

We then solve Equation 11.23 for r in terms of z, whereby

Equation 11.25

r=

e2 z − 1 e2 z + 1

We now substitute the confidence limits for zρ—that is, (z1, z2) in Equation 11.24— into Equation 11.25 to obtain the corresponding confidence limits for ρ given by (ρ1, ρ2) in Equation 11.23.

Example 11.32

In Example 11.29, a sample correlation coefficient of .38 was obtained between the body weights of 100 pairs of fathers (x) and first-born sons (y). Provide a 95% confidence interval for the underlying correlation coefficient ρ.

Solution

From Example 11.31, the z transformation of r = 0.400. From step 2 of Equation 11.23, a 95% confidence interval for zρ is given by (z1, z2), where

z1 = 0.400 − 1.96 / 97 = 0.400 − 0.199 = 0.201

z2 = 0.400 + 1.96 / 97 = 0.400 + 0.199 = 0.599 From step 3 of Equation 11.23, a 95% confidence interval for ρ is given by (ρ1, ρ2) where

e 2( 0.201) − 1 e 2( 0.201) + 1 e.402 − 1 = .402 +1 e 4950 − 1 1.4 = 1.4950 + 1 0.4950 = = .198 2.4950

ρ1 =

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462   C H A P T E R 11 

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e 2 (.599) − 1 e 2 (.599) + 1 e1.198 − 1 = 1.198 +1 e 3139 2.3 = .536 = 4.3139

ρ2 =

Thus a 95% confidence interval for ρ = (.198, .536). Notice that the confidence interval for zρ, given by (z1, z2) = (0.201, 0.599), is symmetric about z (0.400). However, when the confidence limits are transformed back to the original scale (the scale of ρ) the corresponding confidence limits for ρ are given by (ρ1, ρ2) = (.198, .536), which are not symmetric around r = .380. The reason for this is that Fisher’s z transformation is a nonlinear function of r, which only becomes approximately linear when r is small (i.e., |r| ≤ .2).

Sample-Size Estimation for Correlation Coefficients

Example 11.33

Nutrition  Suppose a new dietary questionnaire is constructed to be administered over the Internet, based on dietary recall over the past 24 hours. To validate this questionnaire, participants are given 3 days’ worth of food diaries, in which they fill out in real time exactly what they eat for 3 days, spaced about 1 month apart. The average intake over 3 days will be considered a gold standard. The correlation between the 24-hour recall and the gold standard will be an index of validity. How large a sample is needed to have 80% power to detect a significant correlation between these measures, if it is expected that the true correlation is .5 and a one-sided test is used with α = .05? To address this question, we use the Fisher’s z-transform approach. Specifically, we want to test the hypothesis H0: ρ = 0 vs. H1: ρ = ρ0 > 0. Under H0,

z ~ N[ 0,1 / (n − 3)] We will reject H0 at level α if z n − 3 > z1− α . Suppose z0 is the Fisher’s z transform of ρ0. If we subtract z0 n − 3 from both sides of the equation, it follows that

λ = n − 3 ( z − z0 ) > z1− α − z0 n − 3 Furthermore, under H1, λ ~ N(0, 1). Therefore,

)

(

(

Pr λ > z1− α − z0 n − 3 = 1 − Φ z1− α − z0 n − 3

(

= Φ z0 n − 3 − z1− α

)

)

If we require a power of 1 − β, then we set the right-hand side to 1 − β or, equivalently,

z0 n − 3 − z1− α = z1− β If follows that

(

Power = 1 − β = Φ z0 n − 3 − z1− α

)

The corresponding sample-size estimate is obtained by solving for n, whereby

(

n =  z1− α + z1− β 

)

2

z02  + 3 

The procedure is summarized as follows.

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11.8  ■  Statistical Inference for Correlation Coefficients   463

Equation 11.26

Power and Sample-Size Estimation for Correlation Coefficients  Suppose we wish to test the hypothesis H0: ρ = 0 vs. H1: ρ = ρ0 > 0. For the specific alternative ρ = ρ0, to test the hypothesis with a one-sided significance level of α and specified sample size n, the power is given by

(

Power = Φ z0 n − 3 − z1− α

)

For the specific alternative ρ = ρ0, to test the hypothesis with a one-sided significance level of α and specified power of 1 − β, we require a sample size of

Solution to Example 11.33

(

n =  z1− α + z1− β 

)

z02  + 3 

In this case, we have ρ0 = .5. Therefore, from Table 13 in the Appendix, z0 = .549. Also, α = .05, 1 − β = .80. Thus, from Equation 11.26, we have n = ( z.95 + z.80 ) 

2

2

.5492  + 3 

= (1.645 + 0.84 ) .5492  + 3 2

= 23.5 Therefore, to have 80% power, we need 24 participants in the validation study.

Example 11.34

Solution

Nutrition  Suppose that 50 participants are actually enrolled in the validation study. What power will the study have if the true correlation is .5 and a one-sided test is used with α = .05? We have α = .05, ρ0 = .50, z0 = .549, n = 50. Thus, from Equation 11.26,

(

Power = Φ .549 47 − z.95 = Φ ( 3.764 − 1.645)

)

= Φ ( 2.12 ) = .983

Therefore, the study will have 98.3% power.

Two-Sample Test for Correlations The use of Fisher’s z transformation can be extended to two-sample problems.

Example 11.35

Hypertension  Suppose there are two groups of children. Children in one group live with their natural parents, whereas children in the other group live with adoptive parents. One question that arises is whether or not the correlation between the blood pressure of a mother and a child is different in these two groups. A different correlation would suggest a genetic effect on blood pressure. Suppose there are 1000 mother−child pairs in the first group, with correlation .35, and 100 mother– child pairs in the second group, with correlation .06. How can this question be answered? We want to test the hypothesis H0: ρ1 = ρ2 vs. H1: ρ1 ≠ ρ2. It is reasonable to base the test on the difference between the z’s in the two samples. If |z1 − z2| is large, then H0 will be rejected; otherwise, H0 will be accepted. This principle suggests the following test procedure for a two-sided level α test.

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464   C H A P T E R 11 

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Fisher’s z Test for Comparing Two Correlation Coefficients  To test the hypothesis H0: ρ1 = ρ2 vs. H1: ρ1 ≠ ρ2, use the following procedure:

Equation 11.27

(1) Compute the sample correlation coefficients (r1, r2) and Fisher’s z transformation (z1, z2) for each of the two samples.

(2) Compute the test statistic λ=

z1 − z2 ∼ N ( 0,1) under H 0 1 1 + n1 − 3 n2 − 3

(3) If  λ > z1−α/2  or  λ < −z1−α/2  reject H0.

If  −z1−α/2 ≤ λ ≤ z1−α/2  accept H0.

(4) The exact p-value is given by

p = 2 Φ( λ )

p = 2 × [1 − Φ( λ )]

if λ ≤ 0 if λ > 0

(5) Assume an underlying normal distribution for each of the random variables used to compute r1, r2 and z1, z2.

The acceptance and rejection regions for this test are shown in Figure 11.17. Computation of the p-value is illustrated in Figure 11.18.

Figure 11.17

Acceptance and rejection regions for Fisher’s z test for comparing two correlation coefficients

Frequency

�=

z1 – z2 1 1 + n1 – 3 n2 – 3

� < –z1 – �/2 Rejection region

Example 11.36

Solution

N(0, 1) distribution

–z1 – �/2 ≤ � ≤ z1 – �/2 Acceptance region

–z1 – �/2

0 Value

� > z1 – �/2 Rejection region

z1 – �/2

Perform a significance test for the data in Example 11.35.

r1 = .35

n1 = 1000

r2 = .06

n2 = 100

Thus, from Table 13 in the Appendix,

z1 = 0.365 and   λ =

z2 = 0.060

0.365 − 0.060 = 9.402 ( 0.305) = 2.87 ∼ N ( 0,1) under H0 1 1 + 997 97

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11.8  ■  Statistical Inference for Correlation Coefficients   465

Figure 11.18

Computation of the p-value for Fisher’s z test for comparing two correlation coefficients If � ≤ 0, then p = 2 Φ(�).

z1 – z2

�=

1 1 + n1 – 3 n2 – 3

Frequency

N(0, 1) distribution

p/2

0 Value

If � > 0, p = 2 × [1 – Φ(�)].

Frequency

N(0, 1) distribution

p/2

0 Value

Hence the p-value is given by

2 × [1 − Φ ( 2.87)] = .004 Therefore, there is a significant difference between the mother−child correlations in the two groups, implying a significant genetic effect on blood pressure.

Comparison of Dependent Correlation Coefficients The methods in Equation 11.27 pertain to the comparison of correlation coefficients obtained from two independent samples. In some cases, we are interested in comparing two correlation coefficients obtained from the same subjects.

Example 11.37

Hypertension  In Data Set INFANTBP.DAT on the Companion Website, we have collected information on response to the taste of salt and sugar, respectively, as well as the blood pressure of the infants. The primary focus of the study was to assess whether the magnitude of the salt-taste response was related to blood pressure. The magnitude of the sugar-taste response was used as a control. To be more specific, we let

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466   C H A P T E R 11 

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X = mean sucks per burst (MSB) on exposure to high doses (15%) of salt (mean of trials 7 and 8 in the salt-taste component of the study) minus MSB on response to water (mean of trials 5 and 6 in the salt-taste component of the study)

Y = MSB on exposure to 15% sucrose (trial 4 in the sugar-taste component of the study) minus MSB on exposure to water (trial 2 in the sugar-taste component of the study)

Z = diastolic blood pressure (DBP) The main goal of the study was to test the salt-taste hypothesis: that the correlation between X and Z was 0, or H0: ρXZ = 0 vs. H1: ρXZ ≠ 0. We could also test the sugartaste hypothesis: H0: ρYZ = 0 vs. H1: ρYZ ≠ 0. Each of these hypotheses can be tested using the one-sample t test for correlation in Equation 11.20. However, if we specifically want to assess whether the effect of exposure to salt on DBP differs from the effect of exposure to sugar on DBP, then we might want to test the hypothesis H0: ρXZ = ρYZ vs. H1: ρXZ ≠ ρYZ. Unfortunately, we cannot use the two-sample correlation test in Equation 11.27 because this test assumes these two correlations are obtained from two independent samples, whereas the estimates of ρXZ and ρYZ are from the same subjects. To address this issue, we use the method of Wolfe [6]. Specifically, we assume σX = σY and use the following procedure. Equation 11.28

olfe’s Test for Comparing Dependent Correlation Coefficients W Suppose we want to test the hypothesis H0: ρXZ = ρYZ vs. H1: ρXZ ≠ ρYZ, where X, Y, and Z are obtained from the same subjects. We assume σX = σY. Under this assumption, these hypotheses are equivalent to the hypothesis: H0: ρX−Y,Z = 0 vs. H1: ρX−Y,Z ≠ 0. Hence,

(1) We use the one-sample t test for correlation in Equation 11.20 based on the following test statistic:

(2) We reject H0 if t > tn−2,1−α/2 or if t < tn−2,α/2. We accept H0 if tn−2,α/2 ≤ t ≤ t n−2,1−α/2.

1 − r 2 ∼ t n − 2 under H 0

where r = Corr(Xi − Yi, Zi).

t =r n−2

(3) The p-value is given by

2 × Pr (t n − 2 > t )

if t ≥ 0,

2 × Pr (t n − 2 < t )

if t < 0.

To see why this formulation works, we write

ρXZ = Cov( X, Z ) / ( σX σ Z ) ρYZ = Cov(Y, Z ) / ( σY σ Z ). If σ X = σY , then Cov( X, Z ) − Cov(Y, Z ) Cov( X − Y, Z ) = σX σ Z σX σ Z Cov( X − Y, Z ) = ( σ X −Y σ X ) = ρX −Y ,Z ( σ X −Y σ X ) σX −Y σ Z

ρXZ − ρYZ =

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11.8  ■  Statistical Inference for Correlation Coefficients   467

However, because σX−Y/σX ≠ 0, it follows that ρXZ − ρYZ = 0 if and only if ρX−Y,Z = 0. Thus, as with the paired t-test, we have reduced a two-sample problem with dependent correlation coefficients to an equivalent one-sample problem based on Corr(X − Y, Z). Solution to Example 11.37 We compute X and Y from Data Set INFANTBP (n = 100). There are 96 subjects who had nonmissing values for X, Y, and Z. The mean and sd for each of these variables is given in Table 11.8. We wish to test the hypothesis H0: ρXZ = ρYZ vs. H1: ρXZ ≠ ρYZ. Because X and Y have different standard deviations we compute standardized scores for each of the variables, where Score( Xi ) = [ Xi − mean( Xi )] / sd ( Xi )

Table 11.8

Score(Yi ) = [Yi − mean(Yi )] / sd (Yi ) Salt and sugar taste data

X (salt taste)

Y (sugar taste)

Z (DBP)

−2.77 6.85 96

6.53 26.44 96

42.62 7.31 96

Mean sd n

By the definition of Score(Xi) and Score(Yi), each score variable has mean = 0 and sd = 1. Also, the linear transformation from X to Score(X) and Y to Score(Y) will not affect the correlation of each variable, respectively, with Z; that is, Corr(X, Z) = Corr[Score (X), Z] and Corr(Y, Z) = Corr[Score(Y), Z]. Thus we can restate the hypotheses in the form H 0: Corr[ Score( X ), Z ] = Corr[ Score(Y ), Z ] vs. H1: Corr[ Score( X ), Z ] ≠ Corr[ Score(Y ), Z ]

We compute Corr[Score (X), Z] = .299, Corr[Score(Y), Z] = .224. Thus, to test whether each correlation coefficient is significantly different from 0, we use the one-sample t-test for correlation, where

t X = 0.299 94

1 − .2992 = 3.066 ∼ t 94 , p = .003

and tY = 0.244 94

1 − .2442 = 2.248 ∼ t 94 , p = .027

Hence, both the salt-taste and sugar-taste variables are significantly correlated with DBP. However, to determine if these correlation coefficients differ significantly from each other, we compute: Corr[Score(X) − Score(Y), Z] = .052. From Equation 11.28, the test statistic is t = .052 94

1 − .052 2 = 0.51 ∼ t 94

The p-value = 2 × Pr(t94 > 0.51) = .61. Thus there is no significant difference between these two correlations. Therefore, it is possible that there is some other factor (such as obesity) related to both the salt-taste and sugar-taste scores causing the positive associations of each score with DBP.

1

What is the difference between the one-sample t test for correlation coefficients and the one-sample z test for correlation coefficients?

2

Refer to the data in Table 2.11.

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REVIEW

REVIEW QUESTIONS 11C

468   C H A P T E R 11 

  Regression and Correlation Methods

(a) What test can be used to assess whether there is a significant association between the first white-blood count following admission and the duration of hospital stay?

(b) Implement the test in Review Question 11C.2a, and report a two-tailed p-value.

(c) Provide a 95% confidence interval for the correlation coefficient in Review Question 11C.2a.

3

Refer to the data in Table 2.11.

(a) Suppose we want to compare the correlation coefficient between duration of hospital stay and white-blood count for males vs. females. What test can we use to accomplish this?

(b) Perform the test in Review Question 11C.3a, and report a two-tailed p-value.

4

What is the difference between the two-sample correlation tests in Equations 11.27 and 11.28? When do we use each?

11.9 Multiple Regression In Sections 11.2 through 11.6 problems in linear-regression analysis in which there is one independent variable (x), one dependent variable (y), and a linear relationship between x and y were discussed. In practice, there is often more than one independent variable and we would like to look at the relationship between each of the independent variables (x1,…, xk) and the dependent variable (y) after taking into account the remaining independent variables. This type of problem is the subject matter of multiple-regression analysis.

Example 11.38

Hypertension, Pediatrics  A topic of interest in hypertension research is how the relationship between the blood-pressure levels of newborns and infants relate to subsequent adult blood pressure. One problem that arises is that the blood pressure of a newborn is affected by several extraneous factors that make this relationship difficult to study. In particular, newborn blood pressures are affected by (1) birthweight and (2) the day of life on which blood pressure is measured. In this study, the infants were weighed at the time of the blood-pressure measurements. We refer to this weight as the “birthweight,” although it differs somewhat from their actual weight at birth. Because the infants grow in the first few days of life, we would expect that infants seen at 5 days of life would on average have a greater weight than those seen at 2 days of life. We would like to be able to adjust the observed blood pressure for these two factors before we look at other factors that may influence newborn blood pressure.

Estimation of the Regression Equation Suppose a relationship is postulated between systolic blood pressure (SBP) (y), birthweight (x1), and age in days (x2), of the form

Equation 11.29

y = α + β1x1 + β2 x2 + e where e is an error term that is normally distributed with mean 0 and variance σ2. We would like to estimate the parameters of this model and test various hypotheses concerning it. The same method of least squares that was introduced in Section 11.3

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11.9  ■  Multiple Regression   469

for simple linear regression will be used to fit the parameters of this multipleregression model. In particular, α, β1, β2 will be estimated by a, b1 and b2, respectively, where we choose a, b1 and b2 to minimize the sum of

[ y − (a + b1x1 + b2 x2 )]2

over all the data points. In general, if we have k independent variables x1,…, xk, then a linear-regression model relating y to x1,…, xk, is of the form

Equation 11.30

k

y = α + ∑ β j xj + e j =1

where e is an error term that is normally distributed with mean 0 and variance σ2.

We estimate α, β1,…, βk by a, b1,…, bk using the method of least squares, where we minimize the sum of k     y −  a + ∑ bj x j       j =1

Example 11.39

Table 11.9

Solution

2

Hypertension, Pediatrics  Suppose SBP, birthweight (oz), and age (days) are measured for 16 infants and the data are as shown in Table 11.9. Estimate the parameters of the multiple-regression model in Equation 11.29. Sample data for infant blood pressure, age, and birthweight for 16 infants i

Birthweight (oz) (x1)

Age (days) (x2)

SBP (mm Hg) (y)

  1   2   3   4   5   6   7   8   9 10 11 12 13 14 15 16

135 120 100 105 130 125 125 105 120 90 120 95 120 150 160 125

3 4 3 2 4 5 2 3 5 4 2 3 3 4 3 3

89 90 83 77 92 98 82 85 96 95 80 79 86 97 92 88

Use the SAS PROC REG program to obtain the least-squares estimates. The results are given in Table 11.10. According to the parameter-estimate column, the regression equation is given by y = 53.45 + 0.126 x1 + 5.89x2

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470   C H A P T E R 11 

  Regression and Correlation Methods

Table 11.10 Least-squares estimates of the regression parameters for the newborn blood-pressure data in Table 11.9 using the SAS PROC REG program Model:  MODEL1 Dependent Variable: sysbp Number of Observations Read Number of Observations Used

The REG Procedure

16 16

Analysis of Variance

Source

DF

Sum of Squares

Mean Square

Model Error Corrected Total

2 13 15

591.03564 79.90186 670.93750

295.51782 6.14630

Root MSE Dependent Mean Coeff Var

2.47917 88.06250 2.81524

R-Square Adj R-Sq

F Value

Pr > F

48.08

|t| Estimate Intercept brthwgt agedys

1 1 1

53.45019 0.12558 5.88772

4.53189 0.03434 0.68021

11.79 3.66 8.66

F).

The acceptance and rejection regions for this test procedure are shown in Figure 11.19. Computation of the exact p-value is illustrated in Figure 11.20.

Example 11.44

Solution

Hypertension, Pediatrics  Test the hypothesis H0: β1 = β2 = 0 vs. H1: either β1 ≠ 0 or β2 ≠ 0 using the data in Tables 11.9 and 11.10. Refer to Table 11.10 and note that Reg SS = 591.04 (called Model SS) Reg MS = 591.04/2 = 295.52 (called Model MS) Res SS = 79.90 (called Error SS) Res MS = 79.90/13 = 6.146 (called Error MS) F = Reg MS/Res MS = 48.08 ~ F2,13 under H0 Because F2,13,.999 < F2,12,.999 = 12.97 < 48.08 = F it follows that

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11.9  ■  Multiple Regression   473

Figure 11.19

Acceptance and rejection regions for testing the hypothesis H0: β1 = β2 = . . . = βk = 0 vs. H1: at least one of the βj ≠ 0 in multiple linear regression f (x)

Frequency

F = Reg MS/Res MS

F ≤ Fk, n – k – 1, 1 – � Acceptance region

F > Fk, n – k – 1, 1 – � Rejection region

Fk, n – k – 1, 1 – �

x

Value

Figure 11.20

Computation of the p-value for testing the hypothesis H0: β1 = β2 = . . . = βk = 0 vs. H1: at least one of the βj ≠ 0 in multiple linear regression f (x)

Frequency

p = Pr (Fk, n – k – 1 > F ), where F = Reg MS/Res MS

Fk, n – k – 1 distribution

p

F

x Value

p < .001. Thus we can conclude that the two variables, when considered together, are significant predictors of blood pressure. The significant p-value for this test could be attributed to either variable. We would like to perform significance tests to identify the independent contributions of each variable. How can this be done? In particular, to assess the independent contribution of birthweight, we assume age is making a contribution under either hypothesis, and we test the hypothesis H0: β1 = 0, β2 ≠ 0 vs. H1: β1 ≠ 0, β2 ≠ 0. Similarly, to assess the independent contribution of age, we assume birthweight is making a contribution under either hypothesis and test the hypothesis H0: β2 = 0, β1 ≠ 0 vs. H1: β2 ≠ 0, β1 ≠ 0. In general, if we have k independent variables, then to assess the specific effect of the lth independent variable (xl), on y after controlling for the effects of all other variables, we wish to test the hypothesis H0: βℓ = 0, all other βj ≠ 0 vs. H1: all βj ≠ 0. We focus on assessing the independent contribution of birthweight. Our approach is to compute the standard error of the partial-regression coefficient for birthweight and base our test on t = bℓ /se(bℓ), which will follow a t distribution with n − k − 1 df under H0. Specifically, the following test procedure for a level α test is used. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

474   C H A P T E R 11 

  Regression and Correlation Methods

Equation 11.32

t Test for Testing the Hypothesis H0: βl = 0, All Other βj ≠ 0 vs. H1: βl ≠ 0, All Other βj ≠ 0 in Multiple Linear Regression (1) Compute

t = bl se( bl )

which should follow a t distribution with n − k − 1 df under H0.

(2) If t < tn−k−1,α/2

If tn−k−1,α/2 ≤ t ≤ tn−k−1,1−α/2 then accept H0

t > tn−k−1,1−α/2 then reject H0

or

(3) The exact p-value is given by

2 × Pr (t n − k −1 > t )

if t ≥ 0

2 × Pr (t n − k −1 ≤ t )

if t < 0

The acceptance and rejection regions for this test are depicted in Figure 11.21. The computation of the exact p-value is illustrated in Figure 11.22.

Figure 11.21

Acceptance and rejection regions for the t test for multiple linear regression tn – k –1, �/2 ≤ t ≤ tn – k – 1, 1 – �/2 Acceptance region

Frequency

tn – k – 1 distribution t = b�/se(b�) t < tn – k – 1, �/2 Rejection region

0 tn – k – 1, �/2

Figure 11.22

t > tn – k – 1, 1 – �/2 Rejection region

tn – k – 1, 1 – �/2

Value

Computation of the exact p-value for the t test for multiple linear regression t = bl/se(bl)

t = bl/se(bl)

tn – k – 1 distribution Frequency

Frequency

tn – k – 1 distribution

p/2

p/2

t

0 Value

(a) If t < 0, then p = 2 × (area to the left of t under a tn – k – 1 distribution).

0 t Value (b) If t ≥ 0, then p = 2 × (area to the right of t under a tn – k – 1 distribution).

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11.9  ■  Multiple Regression   475

Example 11.45

Solution

Hypertension, Pediatrics  Test for the independent contributions of birthweight and age in predicting SBP in infants, using the output in Table 11.10. From Table 11.10, b1 = 0.1256 se( b1 ) = 0.0343 t ( birthweight ) = b1 / se( b1 ) = 3.66 p = 2 × Pr (t13 > 3.66) = .003

b2 = 5.888 se( b2 ) = 0.6802 t (age) = b2 / se( b2 ) = 8.66 p = 2 × Pr (t13 > 8.66) < .001 Therefore, both birthweight and age have highly significant associations with SBP, even after controlling for the other variable. It is possible that an independent variable (x1) will seem to have an important effect on a dependent variable (y) when considered by itself but will not be significant after adjusting for another independent variable (x2). This usually occurs when x1 and x2 are strongly related to each other and when x2 is also related to y. We refer to x2 as a confounder of the relationship between y and x1. We discuss confounding in more detail in Chapter 13. Indeed, one of the advantages of multiple-regression analysis is that it lets us identify which few variables among a large set of independent variables have a significant relationship to the dependent variable after adjusting for other important variables.

Example 11.46

Hypertension, Pediatrics  Suppose we consider the two independent variables, x 1 = birthweight, x 2 = body length and try to use these variables to predict SBP in newborns (y). Perhaps both x 1 and x 2, when considered separately in a simple linear-regression model as given in Equation 11.2, have a significant relationship to blood pressure. However, because birthweight and body length are closely related to each other, after adjusting for birthweight, body length may not be significantly related to blood pressure based on the test procedure in Equation 11.32. One possible interpretation of this result is that the effect of body length on blood pressure can be explained by its strong relationship to birthweight. In some instances, two strongly related variables are entered into the same multiple-regression model and, after controlling for the effect of the other variable, neither variable is significant. Such variables are referred to as collinear. It is best to avoid using highly collinear variables in the same multiple-regression model because their simultaneous presence can make it impossible to identify the specific effects of each variable.

Example 11.47

Hypertension  A commonly used measure of obesity is body-mass index (BMI), which is defined as weight/(height)2. It is well known that both weight and BMI, considered separately, are strongly related to level of blood pressure. However, if they are entered simultaneously in the same multiple-regression model, then it is

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476   C H A P T E R 11 

  Regression and Correlation Methods

possible that neither will be significant because they are strongly related to each other. Thus, if we control for weight, there may be no additional predictive power for BMI, and vice versa. In Equation 11.32, we have considered the test of the hypothesis H0: that a specific partial-regression coefficient β ℓ = 0 vs. the alternative hypothesis H 1: that βℓ ≠ 0. Under both H0 and H1, all other partial-regression coefficients are allowed to be different from 0. We used a t statistic to test these hypotheses. Another way to perform this test is in the form of a partial F test, which is given as follows.

Equation 11.33

Partial F Test for Partial-Regression Coefficients in Multiple Linear Regression  To test the hypothesis H0: βℓ = 0, all other βj ≠ 0 vs. H1: βℓ ≠ 0, all other βj ≠ 0 in multiple linear regression, we (1) Compute F=

Regr SSfull model − Regr SSall variables exceptt βl in the model Res MSfull model

which should follow an F1,n−k−1 distribution under H0.

(2) The exact p-value is given by Pr(F1,n−k−1 > F).

(3) It can be shown that the p-value from using the partial F test given in (2) is the same as the p-value obtained from using the t test in Equation 11.32. Many statistical packages use variable selection strategies such as forward and backward selection based on a succession of partial F tests. A complete discussion of variable selection strategies is provided in [4] and [5].

Criteria for Goodness of Fit In Section 11.6, we discussed criteria for goodness of fit in simple linear-regression models, based on residual analysis. Similar criteria can be used in a multiple-regression setting.

Example 11.48

Hypertension, Pediatrics  Assess the goodness of fit of the multiple-regression model in Table 11.10 fitted to the infant blood-pressure data in Table 11.9.

Solution

We compute the residual for each of the 16 sample points in Table 11.9. The standard error of each of the fitted residuals is different and depends on the distance of the corresponding sample point from the average of the sample points used in fitting the regression line. Thus we will usually be interested in the Studentized residuals = STUDENT(i) = êi/sd(êi). (See [4] or [5] for the formulas used to compute sd(êi) in a multiple-regression setting.) We have plotted the Studentized residuals against the predicted blood pressure (Figure 11.23a) and each of the independent variables (Figures 11.23b and 11.23c). This lets us identify any outlying values as well as violations of the linearity and equal-variance assumptions in the multiple-regression model.

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11.9  ■  Multiple Regression   477

Figure 11.23a

Plot of Studentized residuals vs. predicted values of SBP for the multipleregression model in Table 11.10 The SAS System STUDENT 3.5 1 3.0

2.5

2.0

Studentized Residual

1.5

1.0

0.5

1

1 1

0.0

1

1

1

1

1

1

1 –0.5

1

1 1

–1.0

1

–1.5 1 –2.0 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 Predicted Value of SYSBP PRED

There seems to be a possible outlying value with a Studentized residual ≅ 3.0 corresponding to a birthweight of 90 oz and an age in days = 4.0 (observation 10). To focus more clearly on outlying values, some computer packages let the user delete an observation, recompute the regression model from the remaining data points, and compute the residual of the deleted observation based on the recomputed regression. The rationale for this procedure is that the outlying value may have affected the estimates of the regression parameters. Let

y = a(i ) + b1(i ) x1 + L + bk(i ) xk denote the estimated regression model with the ith sample point deleted. The residual of the deleted point from this regression line is

eˆ(i ) = yi −  a(i ) + b1(i ) xi1 + L + bk(i ) xik 

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478   C H A P T E R 11 

Figure 11.23b

Plot of Studentized residuals vs. birthweight for the multiple-regression model in Table 11.10 The SAS System STUDENT 3.5 1 3.0

2.5

2.0

1.5 Studentized Residual

  Regression and Correlation Methods

1.0

2

0.5

1

1 0.0

1 1 1

–0.5

1

1

1 1

1 2

–1.0

–1.5 1 –2.0 90

95

100 105 110 115 120 125 130 135 140 145 150 155 160 BRTHWGT

with standard error sd(ê (i) ). The corresponding Studentized residual is ê(i)/sd(ê(i)) and is denoted by RSTUDENT(i). It is sometimes called an externally Studentized residual because the ith data point was not used in estimating the regression parameters, as opposed to STUDENT(i), which is sometimes called an internally Studentized residual because the ith data point was used in estimating the regression parameters. We have plotted the externally Studentized residuals [RSTUDENT(i)] against the predicted blood pressure (Figure 11.24a) and each of the independent variables (Figures 11.24b and 11.24c). These plots really highlight the outlying value. Data point 10 has a value of RSTUDENT that is approximately 7 standard deviations above zero, which indicates a gross outlier. The plots in Figures 11.24a−11.24c do not really reflect the multivariate nature of the data. Specifically, under the multiple-regression model in Equation 11.30, the relationship between y and a specific independent variable xℓ is characterized as follows.

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11.9  ■  Multiple Regression   479

Figure 11.23c

Plot of Studentized residuals vs. age in days for the multiple-regression model in Table 11.10 The SAS System STUDENT 3.5 1 3.0

2.5

2.0

Studentized Residual

1.5

1.0

0.5

1 2 1

1

0.0

1

1

1

1

1 –0.5

1

1

1

–1.0

1

–1.5 1 –2.0 2.0

Equation 11.34

2.2

2.4

2.6

2.8

3.0

3.2

3.4 3.6 AGEDYS

3.8

4.0

4.2

4.4

4.6

4.8

5.0

y is normally distributed with expected value = αℓ + βℓxℓ and variance σ2 where α l = α + β1x1 + L + β l −1xl −1 + β l +1xl +1 + L + β k xk Thus, given the values of all other independent variables (x1,…, xℓ−1, xℓ+1,…, xk), (1) The average value of y is linearly related to xℓ. (2) The variance of y is constant (i.e., σ2). (3) y is normally distributed. A partial-residual plot is a good way to check the validity of the assumptions in Equation 11.34.

Definition 11.18

A partial-residual plot characterizing the relationship between the dependent variable y and a specific independent variable xℓ in a multiple-regression setting is constructed as follows:

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480   C H A P T E R 11 

Figure 11.24a

Plot of RSTUDENT vs. the predicted SBP for the multiple-regression model in Table 11.10 The SAS System RSTUDENT 7 1

6

5 Studentized Residual without Current Obs

  Regression and Correlation Methods

4

3

2

1 1 0

1

1

1

1

1

1

1

1

1

1

1 1

–1

–2

1

1 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 Predicted Value of SYSBP PRED

(1) A multiple regression is performed of y on all predictors other than xℓ (i.e., x1,…, xℓ−1, xℓ+1,…, xk), and the residuals are saved. (2) A multiple regression is performed of xℓ on all other predictors (i.e., x1,…, xℓ−1, xℓ+1,…, xk), and the residuals are saved. (3) The partial-residual plot is a scatter plot of the residuals in step 1 on the y-axis against the residuals in step 2 on the x-axis. Many computer packages compute partial-residual plots as an option in their multipleregression routines, so the user need not perform the individual steps 1 to 3. The partial-residual plot reflects the relationship between y and xℓ after each variable is adjusted for all other predictors in the multiple-regression model, which is a primary goal of performing a multiple-regression analysis. It can be shown that if the multipleregression model in Equation 11.30 holds, then the residuals in step 1 should be linearly related to the residuals in step 2 with slope = βℓ (i.e., the partial-regression coefficient pertaining to xℓ in the multiple-regression model in Equation 11.30) and Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

11.9  ■  Multiple Regression   481

Figure 11.24b

Plot of RSTUDENT vs. birthweight for the multiple-regression model in Table 11.10 The SAS System RSTUDENT 7 1 6

Studentized Residual without Current Obs

5

4

3

2

1 2

1 0

2

1

1

1

1

1 1

1 2

–1

1

–2 90

95

100 105 110 115 120 125 130 135 140 145 150 155 160 BRTHWGT

constant residual variance σ2. A separate partial-residual plot can be constructed relating y to each predictor x1,…, xk.

Example 11.49

Hypertension, Pediatrics  Construct a separate partial-residual plot relating SBP to birthweight and age for the data in Table 11.9.

Solution

We refer to the SAS output in Figures 11.25a and 11.25b. The y-axis in Figure 11.25a corresponds to residuals of SBP after adjusting for age in days. The x-axis corresponds to residuals of birthweight after adjusting for age in days. Figure 11.25b is defined similarly. Hence, the x- and y-axes correspond to residuals and are not in the familiar units of blood pressure and birthweight in Figure 11.25a, for example. In Figure 11.25a, we notice that the relationship between SBP and birthweight is approximately linear (perhaps slightly curvilinear) with the exception of observation 10, which we previously identified as an outlier. In Figure 11.25b, the relationship between SBP and age appears to be linear with the exception of observation 10.

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482   C H A P T E R 11 

Figure 11.24c

Plot of RSTUDENT vs. age in days for the multiple-regression model in Table 11.10 The SAS System RSTUDENT 7 1 6

5 Studentized Residual without Current Obs

  Regression and Correlation Methods

4

3

2

1

1

3 1

1

1 1

1

1 1

1

1

–1

–2

1

1 2.0

2.2

2.4

2.6

2.8

3.0

3.2

3.4 3.6 AGEDYS

3.8

4.0

4.2

4.4

4.6

4.8

5.0

­ otice that the three x values clustered in the lower left of the plot all correspond to N age = 2 days. However, they have different abscissas in this plot because they reflect the residual of age after correcting for birthweight and the three birthweights are all different (see observations 4, 7, and 11 with birthweights = 105, 125, and 120 oz, respectively). In these data, the fitted regression line of age on birthweight is given by age = 2.66 + 0.0054 × birthweight. Because we identified observation 10 as an outlier, we deleted this observation and reran the regression analysis based on the reduced sample of size 15. The regression model is given in Table 11.11 and the partial-residual plots in Figures 11.26a and 11.26b. The estimated multiple-regression model is

y = 47.94 + 0.183 × birthweight + 5.28 × age which differs considerably from the multiple-regression model in Table 11.10 (y = 53.45 + 0.126 × birthweight + 5.89 × age), particularly for the estimated regression coefficient for birthweight, which increased by about 50%. No outliers are evident in either of the partial-residual plots in Figure 11.26. There is only a slight hint of curvilinearity in Figure 11.26a, which relates SBP to birthweight (after controlling for age).

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11.9  ■  Multiple Regression   483

Figure 11.25a

Partial-residual plot of SBP vs. birthweight for the model in Table 11.10 The SAS System Partial Regression Residual Plot SYSBP

6

1

5

1

4 3

1

1

2

1

1

1 0

1

–1

1 1

1

1

–2 1 –3

1

1

1

–4 –5 –6 –7

1

–8

–35 –30 –25 –20 –15 –10

–5

0 5 10 BRTHWGT

15

20

25

30

35

40

45

REVIEW QUESTIONS 11D

1

What is the difference between a univariate-regression model and a multiple- regression model?

2

What is the difference between a simple-regression coefficient and a partialregression coefficient?

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REVIEW

In Section 11.9, we were introduced to multiple linear regression. This technique is used when we wish to relate a normally distributed outcome variable y (called the dependent variable) to several (more than one) independent variables x1,…, xk. The independent variables need not be normally distributed. Indeed, the independent variables can even be categorical, as discussed further in the Case Study in Sections 11.10 and 12.5. On the flowchart at the end of this chapter (Figure 11.32, p. 503), we answer no to (1) interested in relationships between two variables? and we answer continuous to (2) outcome variable continuous or binary? This leads us to the box labeled “multiple-regression methods.”

484   C H A P T E R 11 

  Regression and Correlation Methods

Figure 11.25b

Partial-residual plot of SBP vs. age in days for the model in Table 11.10 The SAS System Partial Regression Residual Plot SYSBP 12

1

10 1 8

1

6 1

4

1

2

1

0 1 1 1 –2

1

1 1

–4 1 –6 1 –8

1 1

–10 –1.4 –1.2 –1.0 –0.8 –0.6 –0.4 –0.2 0.0 0.2 0.4 AGEDYS

0.6

0.8

1.0

1.2

1.4

1.6

1.8

3

Refer to the data in Table 2.11.

(a)  Run a multiple-regression model of ln(duration of hospital stay) on age, sex, and white-blood count on admission to the hospital and service (1 = medical/2 = surgical).

(b)  Interpret the results in a meaningful way.

11.10 Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children In Table 8.13, we compared the mean finger-wrist tapping score (MAXFWT) between exposed and control children using a two-sample t test. However, another approach would be to use regression methods to compare the two groups using dummy-variable coding to denote group membership.

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11.10  ■  Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children   485

Figure 11.26a

Partial-residual plot of SBP vs. birthweight based on the data in Table 11.9 after deleting one outlier (observation 10) (n = 15) The SAS System Partial Regression Residual Plot SYSBP 6

1 1

5 4 1

3 2

1

1

1 1 1

1 1

1

–1

1

1

–30 –25 –20 –15 –10

–5

–2 1

–3

1

–4 –5 –6 –7

1 0 5 10 BRTHWGT

15

20

25

30

35

40

Definition 11.19

A dummy variable is a binary variable used to represent a categorical variable with two categories (say A and B). The dummy variable is set to the value c1 if a subject is in category A and to c2 if a subject is in category B. The most common choices for the values c1 and c2 are 1 and 0, respectively.

Example 11.50

Environmental Health, Pediatrics Use regression methods to compare the mean MAXFWT between exposed and control children.

Solution

We will represent group membership by the dummy variable CSCN2 defined by 1 if child is exposed CSCN2 =   0 if child is control We then can run a simple linear-regression model of the following form.

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486   C H A P T E R 11 

  Regression and Correlation Methods

Figure 11.26b

Partial-residual plot of SBP vs. age in days based on the data in Table 11.9 after deleting one outlier (observation 10) (n = 15) The SAS System Partial Regression Residual Plot SYSBP 10

1 1

8

6

4

1 2

1

1

1 1

1 1 1

–2

1

–4 1 –6

1

1 1

–8 –1.4 –1.2 –1.0 –0.8 –0.6 –0.4 –0.2 0.0 0.2 0.4 AGEDYS

Equation 11.35

0.6

0.8

1.0

1.2

1.4

1.6

1.8

MAXFWT = α + β × CSCN2 + e What do the parameters of this model mean? If a child is in the exposed group, then the average value of MAXFWT for that child is α + β; if a child is in the control group, then the average value of MAXFWT for that child is α. Thus β represents the difference between the average value of MAXFWT for children in the exposed group vs. the control group. Our best estimate of α + β is given by the sample mean of MAXFWT for children in the exposed group; our best estimate of α is given by the sample mean of MAXFWT for children in the control group. Thus our best estimate of β is given by the mean difference in MAXFWT between the exposed and control groups. Another way to interpret β is as the average increase in MAXFWT per 1-unit increase in CSCN2. However, a 1-unit increase in CSCN2 corresponds to the difference between the exposed and control groups for CSCN2. We have run the regression model in Equation 11.35 using the SAS PROC

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11.10  ■  Case Study: Effects of Lead Exposure on Neurologic and Psychological Function in Children   487

Table 11.11 Multiple-regression model of SBP on birthweight and age based on data in Table 11.9 after deleting one outlier (observation 10) (n = 15) The REG Procedure Model: MODEL1 Dependent Variable: sysbp Number of Observations Read Number of Observations Used

15 15

Analysis of Variance Source Model Error Corrected Total Root MSE Dependent Mean Coeff Var

DF 2 12 14

Sum of Squares 602.96782 16.63218 619.60000 1.17729 87.60000 1.34394

Mean Square 301.48391 1.38601

R-Square Adj R-Sq

F Value 217.52

Pr > F |t| XMH )

(8) Use this test only if the variance V is ≥ 5. 2 (9) Which row or column is designated as first is arbitrary. The test statistic XMH and the assessment of significance are the same regardless of the order of the rows and columns.

The acceptance and rejection regions for the Mantel-Haenszel test are shown in Figure 13.1. The computation of the p-value for the Mantel-Haenszel test is illustrated in Figure 13.2.

Figure 13.1

Acceptance and rejection regions for the Mantel-Haenszel test

Frequency

2 XMH =

(|O – E| – .5)2 V

�12 distribution 2

XMH ≤ �1,2 1 – � Acceptance region

2

2 XMH > �1, 1–� Rejection region

2 �1, 1–�

Value

Figure 13.2

Computation of the p-value for the Mantel-Haenszel test

Frequency

2 XMH =

(|O – E| – .5)2 V

�12 distribution

p

2 XMH

Value

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616   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Example 13.24

Solution

Cancer  Assess the relationship between passive smoking and cancer risk using the data stratified by personal smoking status in Tables 13.11 and 13.12. Denote the nonsmokers as stratum 1 and the smokers as stratum 2. O1 = observed number of nonsmoking cases who are passive smokers = 120 O2 = observed number of smoking cases who are passive smokers = 161 Furthermore, E1 =

231 × 200 = 99.1 466

  E = 278 × 291 = 152.1 2 532 Thus the total observed and expected numbers of cases who are passive smokers are, respectively,

O = O1 + O2 = 120 + 161 = 281 E = E1 + E2 = 99.1 + 152.1 = 251.2 Therefore, more cases are passive smokers than would be expected based on their personal smoking habits. Now compute the variance to assess whether this difference is statistically significant.

V1 =

231 × 235 × 200 × 266 = 28.60 4662 × 465

V2 =

278 × 254 × 291 × 241 = 32.95 532 2 × 531

Therefore  V = V1 + V2 = 28.60 + 32.95 = 61.55 2 Thus the test statistic XMH is given by

2 XMH =

(| 281 − 251.2 | −.5)2 61.55

=

858.17 = 13.9 94 ~ χ12 under H0 61.55

2 Because χ12,.999 = 10.83 < 13.94 = XMH , it follows that p < .001. Thus there is a highly significant positive association between case–control status and passive-smoking exposure, even after controlling for personal cigarette-smoking habit.

Estimation of the Odds Ratio for Stratified Data The Mantel-Haenszel method tests significance of the relationship between disease and exposure. However, it does not measure the strength of the association. Ideally, we would like a measure similar to the OR presented for a single 2 × 2 contingency table in Definition 13.6. Assuming that the underlying OR is the same for each stratum, an estimate of the common underlying OR is provided by the Mantel-Haenszel estimator as follows.

Equation 13.17

Mantel-Haenszel Estimator of the Common Odds Ratio for Stratified Data In a collection of k 2 × 2 contingency tables, where the table corresponding to the ith stratum is denoted as in Table 13.13, the Mantel-Haenszel estimator of the common OR is given by

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13.6  ■  Methods of Inference for Stratified Categorical Data—The Mantel-Haenszel Test    617

k

^

ORMH =

Example 13.25

Solution

i =1 k

∑ bici / ni i =1

Cancer  Estimate the OR in favor of being a passive smoker for cancer cases vs. controls after controlling for personal smoking habit. From Equation 13.17, Table 13.11, and Table 13.12, ^

∑ ai di / ni

ORMH =

(120 × 155 / 466) + (161 × 124 / 532 ) 77.44 = = 1.63 (80 × 111 / 466) + (130 × 117 / 532 ) 47.65

Thus the odds in favor of being a passive smoker for a cancer case is 1.6 times as large as that for a control. Because cancer is relatively rare, we can also interpret these results as indicating that risk of cancer for a passive smoker is 1.6 times as great as for a nonpassive smoker, even after controlling for personal smoking habit. We are also interested in estimating confidence limits for the OR in Equation ^ 13.17. A variance estimate of ln(ORMH ) has been provided by Robins et al. [5], which is accurate under a wide range of conditions, particularly if there are many strata with small numbers of subjects in each stratum. This variance estimate can be used to obtain confidence limits for ln(OR). We can then take the antilog of each of the confidence limits for ln(OR) to obtain confidence limits for OR. This procedure is summarized as follows.

Equation 13.18

Interval Estimate for the Common Odds Ratio from a Collection of k 2 × 2 Contingency Tables A two-sided 100% × (1 − α) CI for the common OR from a collection of k 2 × 2 tables is given by ^

^     exp  ln OR MH ± z1− α / 2 Var (ln ORMH ) 

where

∑ i =1 Pi Ri + ∑ i =1 ( Pi Si + Qi Ri ) + ∑ i =1 Qi Si Var (ln OR MH ) = 2 2 k k k 2 ( ∑ i =1 Ri ) ( ∑ i =1 Si ) 2 ( ∑ k Si ) 2 ( ∑ i =1 Ri ) i =1 k

k

k

^

≡ A+ B+C

where A, B, and C correspond to the first, second, and third terms on the right^ hand side of Var (lnOR MH ), and

Pi =

bc ad ai + di b +c , Qi = i i , Ri = i i , Si = i i ni ni ni ni

Example 13.26

Cancer  Estimate 95% confidence limits for the common OR using the data in Tables 13.11 and 13.12.

Solution

Note from Example 13.25 that the point estimate of the OR = ORMH = 1.63. To obtain confidence limits, we first compute Pi, Qi, Ri, and Si as follows:

^

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618   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

P1 =

120 + 155 = .590, Q1 = 1 − P1 = .410 466

R1 =

80(111) 120(155) = 39.91, S1 = = 19.06 466 466

P2 =

161 + 124 = .536, Q2 = 1 − P2 = .464 532

R2 =

130 (117) 161 (124 ) = 37.53, S2 = = 28.59 532 532

Thus

Var ( ln ORMH ) = A + B + C ^

where A=

B=

C=

.590 ( 39.91) + .536 ( 37.53) 2 ( 39.91 + 37.53)

2

= 0.00364

.590 (19.06 ) + .410 ( 39.91) + .536 ( 28.59) + .464 ( 37 7.53) = 0.00818 2 ( 39.91 + 37.53) (19.06 + 28.59) .410 (19.06 ) + .464 ( 28.59) 2 (19.06 + 28.59)

2

= 0.00464

Thus Var ( ln OR MH ) = 0.00364 + 0.00818 + 0.00464 = 0.01646. The 95% CI for ln(OR) is ^

ln (1.63) ± 1.96 0.01646 = ( 0.234, 0.737)

The 95% CI for OR is

( e 0.234 , e 0.737 ) = (1.26, 2.09) Effect Modification One assumption made in the estimation of a common OR in Equation 13.17 is that the strength of association is the same in each stratum. If the underlying OR is different in the various strata, then it makes little sense to estimate a common OR.

Definition 13.16

Suppose we are interested in studying the association between a disease variable D and an exposure variable E but are concerned about the possible confounding effect of another variable C. We stratify the study population into g strata according to the variable C and compute the OR relating disease to exposure in each stratum. If the underlying (true) OR is different across the g strata, then there is said to be interaction or effect modification between E and C, and the variable C is called an effect modifier.

In other words, if C is an effect modifier, then the relationship between disease and exposure differs for different levels of C.

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13.6  ■  Methods of Inference for Stratified Categorical Data—The Mantel-Haenszel Test    619

Example 13.27

Cancer  Consider the data in Tables 13.11 and 13.12. We estimated that the OR relating cancer and passive smoking is 2.1 for nonsmokers and 1.3 for smokers. If these were the underlying ORs in these strata, then personal smoking would be an effect modifier. Specifically, the relationship between passive smoking and cancer is much stronger for nonsmokers than for smokers. The rationale for this is that the home environment of active smokers already contains cigarette smoke and the extra degradation of the environment by spousal smoking may not be that meaningful. The issue remains, how can we detect whether another variable C is an effect modifier? We use a generalization of the Woolf procedure for obtaining confidence limits for a single OR given in Equation 13.11. Specifically, we want to test the hypothesis H 0 : OR1 = . . . = ORk vs. H1 : at least two of the ORi differ from each other.

(

We base our test on the test statistic X 2 = ∑ wi ln ORi − ln OR i =1 k

^

)2 where ln OR = the ^

i

estimated log OR relating disease to exposure in the ith stratum of the potential effect modifier, C, ln OR = the estimated “weighted average” log OR over all strata, and ^ w is a weight that is inversely proportional to the variance of ln ORi. The purpose of the weighting is to weight strata with lower variance (which usually correspond to strata with more subjects) more heavily. If H0 is true, then X2 will be small because each of the stratum-specific log ORs will be relatively close to each other and to the “average” log OR. Conversely, if H1 is true, then X2 will be large. Under H0, it can be shown that X2 follows a chi-square distribution with k − 1 df. Thus we will reject H0 if X 2 > χ2k −1,1− α and accept H0 otherwise. This procedure is summarized as follows.

Equation 13.19

Chi-Square Test for Homogeneity of ORs over Different Strata (Woolf Method) Suppose we have a dichotomous disease variable D and exposure variable E. We stratify our study population into k strata according to a confounding variable C. Let ORi = underlying OR in the ith stratum. To test the hypothesis H0: OR1 = . . . = ORk vs. H1: at least two of the ORi are different with a significance level α, use the following procedure: k

(

2 = ∑ wi ln OR − ln OR (1) Compute the test statistic XHOM i =1

^

)

2

∼ χ2k −1 under H 0

where ln ORi = estimated ln OR in the ith stratum = ln  ai di ( bi ci ) and ai , bi , ci , di are the cells of the 2 × 2 table relating disease to exposure in the ith stratum as shown in Table 13.13.      −1 1 1 1 1 wi =  + + +   ai bi ci di  ^

(1a) An alternative computational form of the test statistic is

k  k ^ 2 ^  2 X = w ln − ( OR ) ∑ HOM i  ∑ wi ln ORi i        i =1  i =1

2

k

∑ wi i =1

2 (2) If XHOM > χ2k −1,1− α , then reject H 0 , 2 If XHOM ≤ χ2k −1,1− α , then accept H 0 .

(

2 2 (3) The exact p-value = Pr χ k −1 > X

)

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620   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Example 13.28

Cancer  Assess whether the ORs relating passive smoking to cancer are different for smokers vs. nonsmokers, using the data in Tables 13.11 and 13.12.

Solution

Let stratum 1 refer to nonsmokers and stratum 2 to smokers. Referring to Tables 13.11 and 13.12, we see that  120 × 155  ^ lnOR1 = ln  = ln ( 2.095) = 0.739  80 × 111  1 1 1   1 w1 =  + + +  120 111 80 155 

−1

= ( 0.036 )

−1

= 27.55

 161 × 124  ^ ln OR2= ln  = ln (1.313) = 0.272  130 × 117 

1 1 1   1 w2 =  + + +  161 117 130 124 

−1

= ( 0.031)

−1

= 32.77

Thus, based on step 1a in Equation 13.19, the test statistic is given by 2 XHOM = 27.55 ( 0.739) + 32.77 ( 0.272 ) − 27.55( 0.739) + 32.77 ( 0.272 )  2

2

2

(27.55 + 32.77)

= 17.486 − ( 29.284 ) 60.32 2

= 17.486 − 14.216 = 3.27 ∼ χ12 under H 0 Referring to Table 6 in the Appendix, we note that χ12,.90 = 2.71, χ12,.95 = 3.84. Because 2.71 < 3.27 < 3.84, it follows that .05 < p < .10. Thus there is no significant effect modification; that is, the ORs in the two strata are not significantly different. In general, it is important to test for homogeneity of the stratum-specific ORs. If the true ORs are significantly different, then it makes no sense to obtain a pooled-OR estimate such as given by the Mantel-Haenszel estimator in Equation 13.17. Instead, separate ORs should be reported.

Estimation of the OR in Matched-Pair Studies There is a close connection between McNemar’s test for matched-pair data in Equation 10.12 and the Mantel-Haenszel test procedure for stratified categorical data in Equation 13.16. Matched pairs are a special case of stratification in which each matched pair corresponds to a separate stratum of size 2. It can be shown that McNemar’s test is a special case of the Mantel-Haenszel test for strata of size 2. Furn ^ thermore, the Mantel-Haenszel OR estimator in Equation 13.17 reduces to OR = A nB for matched-pair data, where nA = number of discordant pairs of type A and nB = number of discordant pairs of type B. Also, it can be shown that the variance of ^ 1 ln(OR) for a matched-pair study is given by Var[ln(OR)] = , where n = total number ˆˆ npq of discordant pairs = nA + nB , pˆ = proportion of discordant pairs of type A = nA/(nA + nB), qˆ = 1 − pˆ . This leads to the following technique for estimating the disease–exposure OR in matched-pair studies.

Equation 13.20

Estimation of the OR in Matched-Pair Studies Suppose we want to study the relationship between a dichotomous disease and exposure variable, in a case–control design. We control for confounding by

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13.6  ■  Methods of Inference for Stratified Categorical Data—The Mantel-Haenszel Test    621

forming matched pairs of subjects with disease (cases) and subjects without disease (controls), where the two subjects in a matched pair are the same or similar on one or more confounding variables. (1) The OR relating disease to exposure is estimated by

^     (OR ) = nA nB

where nA = number of matched pairs in which the case is exposed and the control is not exposed nB = number of matched pairs in which the case is not exposed and the control is exposed (2) A two-sided 100% × (1 − α) CI for OR is given by ( e c1 , e c2 ), where ^

c1 = ln(OR ) − z1− α /2 ^

c2 = ln(OR ) + z1− α / 2

1 ˆˆ npq 1 ˆˆ npq

n = nA + nB    

pˆ =

nA , qˆ = 1 − pˆ nA + nB

(3) The same methodology can be used for prospective or cross-sectional studies in which exposed and unexposed individuals are matched on one or more confounding variables and disease outcomes are compared between exposed and unexposed individuals. In this setting, nA = number of matched pairs in which the exposed subject has disease and the unexposed subject does not nB = n umber of matched pairs in which the exposed subject does not have disease and the unexposed subject does and steps 1 and 2 are as just indicated (4) This method should only be used if n = number of discordant pairs is ≥20.

Example 13.29

Solution

Cancer  Estimate the OR relating type of treatment to 5-year mortality using the matched-pair data in Table 10.14. We have from Table 10.14 that

nA = number of matched pairs in which the treatment A patient dies within 5 years and the treatment B patient survives for 5 years = 5

nB = number of matched pairs in which the treatment B patient dies within 5 years and the treatment A patient survives for 5 years = 16 ^

Thus (OR) = 5 / 16 = 0.31. To obtain a 95% CI we see that n = 21, pˆ = 5 / 21 = .238, ^ ^ ˆ ˆ = 3.81. Thus ln(OR) = −1.163, Var[ln(OR )] = 1 / 3.81 = 0.263, and a qˆ = .762, and npq 95% CI for ln(OR) is ( −1.163 − 1.96 0.263 , − 1.163 + 1.96 0.263 ) = ( −2.167,, − 0.159). The corresponding 95% CI for OR is (e−2.167, e−0.159) = (0.11, 0.85).

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622   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Testing for Trend in the Presence of Confounding— Mantel-Extension Test

Example 13.30

Table 13.14

Sleep Disorders  Sleep-disordered breathing is very common among adults. To estimate the prevalence of this disorder, a questionnaire concerning sleep habits was mailed to 3513 individuals 30–60 years of age who worked for three large state agencies in Wisconsin [6]. Subjects were classified as habitual snorers if they reported either (1) snoring, snorting, or breathing pauses every night or almost every nightor (2) extremely loud snoring. The results are given by age and sex group in Table 13.14. Prevalence of habitual snoring by age and sex group

Women

Men

Yes

No

Total

Yes

No

Total

30–39 40–49 50–60

196 223 103

603 486 232

799 709 335

188 313 232

348 383 206

536 696 438

Total

522

1321

1843

733

937

1670

Age

We would like to assess whether the prevalence of habitual snoring increases with age. In this study, we want to assess whether there is a trend in the prevalence rates with age after controlling for sex. To address this issue, we need to generalize the chi-square test for trend given in Equation 10.24 to allow for stratification of our study sample by relevant confounding variables. We can also describe this problem as a generalization of the Mantel-Haenszel test given in Equation 13.16 in which we are combining results from several 2 × k tables (rather than just 2 × 2 tables). Suppose we have s strata and k ordered categories for the exposure variable. Consider the 2 × k table relating the dichotomous disease variable D to the ordered categorical exposure variable E for subjects in the ith stratum (see Table 13.15). We assume there is a score for the jth exposure category denoted by xj, j = 1, . . . , k.

Table 13.15

Relationship of disease to exposure in the i th stratum, i = 1, . . . , s

Exposure

1

Disease

Score

2

. . .

k

+

ni1

ni2

. . .

nik

ni

mi1

mi2

. . .

mik

mi

ti1 x1

ti2 x 2

. . . . . .

tik xk

Ni

k

The total observed score among subjects with disease in the ith stratum = Oi = ∑ nij x j . The j =1

expected score among diseased subjects in the ith stratum under the null hypothesis that the average score for subjects with and without disease in a stratum is the

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13.6  ■  Methods of Inference for Stratified Categorical Data—The Mantel-Haenszel Test    623

 k  n same = Ei =  ∑ t ij x j  i . If diseased subjects tend to have higher exposure scores on average  j =1  Ni than nondiseased subjects, then Oi will be greater than Ei for most strata. If diseased subjects tend to have lower exposure scores than nondiseased subjects, then Oi will be less than Ei for most strata. Therefore, we will base our test on O – E where S

S

i =1

i =1

O = ∑ Oi , E = ∑ Ei . The test procedure is given as follows.

Equation 13.21

Chi-Square Test for Trend-Multiple Strata (Mantel Extension Test) (1) Suppose we have s strata. In each stratum, we have a 2 × k table relating disease (2 categories) to exposure (k ordered categories) with score for the jth category = xj as shown in Table 13.15. (2) Let pij = proportion of subjects with disease among subjects in the ith stratum and jth exposure category To test the hypothesis H0: β = 0 vs. H1: β ≠ 0, where

    pij = α i + βx j We compute the test statistic 2 = ( O − E − 0.5) V ∼ χ12 under H 0     XTR 2

where s

s

k

O = ∑ Oi = ∑ ∑ nij x j i =1

i =1 j =1

s s  k  n  E = ∑ Ei = ∑   ∑ t ij x j  i   Ni  i =1 i =1    j =1 s

ni mi ( Ni s2i − s12i ) Ni2 ( Ni − 1) i =1 s

V = ∑ Vi = ∑ i =1 k

s1i = ∑ t ij x j , i = 1, . . . , s j =1 k

s2i = ∑ t ij x 2j , i = 1, . . . , s j =1

2 > χ12,1− α,  we reject H0. (3) If  XTR 2 ≤ χ12,1− α,  we accept H0. If  XTR 2 2 (4) The exact p-value = Pr ( χ1 > XTR ).

(5) This test should only be used if V ≥ 5.

Example 13.31

Use the data in Table 13.14 to assess whether the prevalence of habitual snoring increases with age, after controlling for sex.

Solution

In this example, we have two strata, corresponding to women (i = 1) and men (i = 2), respectively. We will use scores of 1, 2, 3 for the three age groups. We have

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624   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

O1 = 196(1) + 223(2 ) + 103(3) = 951 O2 = 188(1) + 313(2 ) + 232(3) = 1510 O = 951 + 1510 = 2461 E1 = [799(1) + 709(2 ) + 335(3)]522 1843 = 912.6

E2 = [ 536(1) + 696(2 ) + 438(3)]733 1670 = 1423.0

E = 912.6 + 1423.0 = 2335.6 s11 = 799(1) + 709(2 ) + 335(3) = 3222 s21 = 799(12 ) + 709(2 2 ) + 335(32 ) = 6650 s12 = 536(1) + 696(2 ) + 438(3) = 3242 s22 = 536(12 ) + 696(2 2 ) + 438(32 ) = 7262 V1 =

522(1321) 1843(6650 ) − 3222 2  18432 (1842 )

= 206.61

733(937)[1670(7262 ) − 3242 2 ] = 238.59 1670 2 (1669) V = 206.61 + 238.59 = 445.21

V2 =

Thus the test statistic is given by

2 XTR =

( 2461 − 2335.6 − .5)2 445.21

=

124.92 = 35.06 ∼ χ12 445.21

2 Because χ12,.999 = 10.83 and XTR = 35.06 > 10.83, it follows that p < .001. Therefore, there is a significant association between the prevalence of habitual snoring and age, with older subjects snoring more frequently. This analysis was performed while controlling for the possible confounding effects of sex.

In this section, we have learned about analytic techniques for controlling for confounding in epidemiologic studies. If we have a dichotomous disease variable (D), a dichotomous exposure variable (E), and a categorical confounder (C), then we can use the Mantel-Haenszel test to assess the association between D and E while controlling for C. On the master flowchart in the back of the book (p. 846), starting at 6 , we answer yes to (1) 2 × 2 contingency table? and at A arrive at the box labeled “Use two-sample test for binomial proportions, or 2 × 2 contingency-table methods if no confounding is present, or the Mantel-Haenszel test if confounding is present.” If E is categorical but has more than two categories, then we can use the Mantel Extension test for this purpose. Referring to the master flowchart again, we answer no to (1) 2 × 2 contingency table? yes to (2) 2 × k contingency table? and yes to (3) interested in trend over k proportions? This leads us to the box labeled “Use chi-square test for trend if no confounding is present, or the Mantel Extension test if confounding is present.”

REVIEW

REVIEW QUESTIONS 13C

1

What is the purpose of the Mantel-Haenszel test? How does it differ from the ordinary chi-square test for 2 × 2 tables?

2

A case–control study was performed relating environmental arsenic exposure to nonmelanoma skin cancer. Distance of a residence from a power station was

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13.7  ■  Power and Sample-Size Estimation for Stratified Categorical Data   625

­ onsidered as an indirect measure of arsenic exposure [7]). The data, presented by c gender, are shown in Table 13.16.

Table 13.16

(a) Use the Mantel-Haenszel test to assess the association between case–control status and distance to the power station.

(b) Estimate the OR between case–control status and distance to the power station, and provide a 95% CI around this estimate.

(c) Assess the homogeneity of the preceding ORs for males vs. females.

3

What is the difference between the Mantel Extension test and the Mantel-Haenszel test?

Association between nonmelanoma skin cancer and distance of residence from a power station

Table 13.17

Females

Distance to power station

Distance to power station

< 5 km

> 10 km

< 5 km

> 10 km

Cases

15

30

21

50

Controls

23

38

19

52

4

Males

The complete distribution of distance to the power station × case–control status for the study mentioned in Review Question 13C.2 is given in Table 13.17.

Association between nonmelanoma skin cancer and distance of residence from a power station Males

Females

Distance to power station

Distance to power station

< 5 km

5−10 km

> 10 km

< 5 km

5−10 km

> 10 km

Cases

15

84

30

21

64

50

Controls

23

81

38

19

73

52

Use the Mantel Extension test to assess whether distance to the power station is associated with case–control status after controlling for gender.

13.7 Power and Sample-Size Estimation for Stratified Categorical Data Example 13.32

Cancer  A study was performed [8] based on a sample of 106,330 women enrolled in the Nurses’ Health Study (NHS) relating ever use of OCs at baseline (in 1976) to breast-cancer incidence from 1976 to 1980. Because both OC use and breast cancer are related to age, the data were stratified by 5-year age groups and the Mantel­Haenszel test was employed to test for this association. The results supported the null ^ hypothesis. The estimated OR ( ORMH ) was 1.0 with 95% CI = (0.8, 1.3). Whatpower did the study have to detect a significant difference if the underlying OR = 1.3?

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626   C H A P T E R 13 

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The power formulas given in Section 10.5 are not applicable because a stratified analysis was used rather than a simple comparison of binomial proportions. However, an approximate power formula is available [9]. To use this formula, we need to know (1) the proportion of exposed subjects in each stratum, (2) the proportion of diseased subjects in each stratum, (3) the proportion of subjects in each stratum of the total study population, and (4) the size of the total study population. The power formula is given as follows.

Equation 13.22

Power Estimation for a Collection of 2 × 2 Tables Based on the Mantel-Haenszel Test

S uppose we wish to relate a dichotomous disease variable D to a dichotomous exposure variable E and want to control for a categorical confounding variable C. We subdivide the study population into k strata, where the 2 × 2 table in the ith stratum is given by Exposure

Disease

+ −

+

ai

bi

N1i

ci

di

N2i

M1i

M2i

Ni

We wish to test the hypothesis H0: OR = 1 vs. H1: OR = exp(γ) for γ ≠ 0, where OR is the underlying stratum-specific OR relating disease to exposure that is assumed to be the same in each stratum. Let N = size of the total study population ri = proportion of exposed subjects in stratum i si = proportion of diseased subjects in stratum i ti = proportion of total study population in stratum i If we use the Mantel-Haenszel test with a significance level of α, then the power is given by    γ2  B2  − z1− α / 2 B1   N  γB1 + 2    Power = Φ    ( B1 + γB2 )1/2     where k

B1 = ∑ B1i i =1

B1i = ri sit i (1 − ri )(1 − si ) k

B2 = ∑ B2 i i =1

B2 i = B1i (1 − 2ri )(1 − 2 si )

Example 13.33

Cancer  Estimate the power of the study described in Example 13.32 for the alternative hypothesis that OR = 1.3.

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13.7  ■  Power and Sample-Size Estimation for Stratified Categorical Data   627

Solution

The data were stratified by 5-year age groups. The age-specific proportion of ever OCusers (ri), the age-specific 4-year incidence of breast cancer (si), and the age ­distribution of the total study population (ti) are given in Table 13.18 together with B1 and B2. We see that the proportion of ever OC users goes down sharply with age and breast-cancer incidence rises sharply with age. Thus there is evidence of strong negative confounding and a stratified analysis is essential. To compute power, we note that N = 106,330, γ = ln(1.3) = 0.262, z1−α/2 = z.975 = 1.96. Thus

( (

)

 106,330  0.262 × 1.06 × 10 −3 + 0.262 2 2.32 × 10 −4 2  − 1.96 1.06 × 10 −3      Power = Φ   12 − 4 − 3 1.06 × 10 + 0.262 2.32 × 10         0.0296  = Φ ( 0.882 ) = .81 = Φ  0.0335 

)

Thus the study had 81% power to detect a true OR of 1.3. An alternative (and simpler) method for computing power would be to pool data over all strata and compute crude power based on the overall 2 × 2 table relating disease to exposure. Generally, if there is positive confounding, then the true power (i.e., the power based on the Mantel-Haenszel test—Equation 13.16) is lower that the crude power; if there is negative confounding (as was the case in Example 13.33), then the true power is greater than the crude power.

Table 13.18

Power calculation for studying the association between breast-cancer incidence and OC use based on NHS data Age group

Proportion ever OC use (ri)

4-year incidence of breast cancera (si)

Proportion of total study population (ti)

B1i

B2i

.771 .629 .465 .308 .178

160 350 530 770 830

.188 .195 .209 .199 .209

5.30 × 10−5b 1.59 × 10−4 2.74 × 10−4 3.24 × 10−4 2.52 × 10−4

−2.86 × 10−5b −4.07 × 10−5 1.90 × 10−5 1.23 × 10−4 1.59 × 10−4

Total

1.06 × 10−3

2.32 × 10−4

(B1)

(B2)

30–34 35–39 40–44 45–49 50–55

× 10−5. e.g., B11 = .771 × 160 × 10−5 × .188 × (1 − .771) × (1 − 160 × 10−5) = 5.30 × 10−5    B21  = 5.30 × 10−5 × [1 − 2(.771)] × [1 − 2(160 × 10−5)] = −2.86 × 10−5

a

b

Alternatively, before a study begins we may want to specify the power and compute the size of the total study population needed to achieve that level of power, given that we know the distribution of the study population by stratum and the

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628   C H A P T E R 13 

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overall exposure and disease rates within each stratum. The appropriate sample-size formula is given by

ample-Size Estimation for a Collection of 2 × 2 Tables S Based on the Mantel-Haenszel Test

Equation 13.23

N = total number of subjects in the entire study needed for a stratified design using the Mantel-Haenszel test as the method of analysis

(

= z1− α /2 B1 + z1− β B1 + γB2

)

2

 γ2   γB1 + 2 B2 

2

 where α = type I error, 1 − β = power, γ = ln(OR) under H1, and B1 and B2 are defined in Equation 13.22.

REVIEW

REVIEW QUESTION 13D

1

Consider the study in Review Question 13.C2. How much power did the study have to detect an OR of 1.5 for the association between distance to power station and nonmelanoma skin cancer, assuming that the exposure prevalence, disease prevalence, and gender distribution are the same as in Table 13.16? (Hint: Use Equation 13.22.)

13.8 Multiple Logistic Regression Introduction In Section 13.6, we learned about the Mantel-Haenszel test and the Mantel Extension test, which are techniques for controlling for a single categorical covariate C while assessing the association between a dichotomous disease variable D and a categorical exposure variable E. If (1) E is continuous (2) or C is continuous (3) or there are several confounding variables C1, C2, . . . , each of which may be either categorical or continuous then it is either difficult or impossible to use the preceding methods to control for confounding. In this section, we will learn about the technique of multiple logistic regression, which can handle all the situations in Section 13.6 as well as those in (1), (2), and (3) above. Multiple logistic regression can be thought of as an analog to multiple linear regression, discussed in Chapter 11, where the outcome (or dependent) variable is binary as opposed to normally distributed.

General Model

Example 13.34

Infectious Disease  Chlamydia trachomatis is a microorganism that has been established as an important cause of nongonococcal urethritis, pelvic inflammatory disease, and other infectious diseases. A study of risk factors for C. trachomatis was conducted in a population of 431 female college students [10]. Because multiple risk

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13.8  ■  Multiple Logistic Regression   629

f actors may be involved, several risk factors must be controlled for simultaneously in analyzing variables associated with C. trachomatis. A model of the following form might be considered.

p = α + β1x1 + . . . + β k xk

Equation 13.24

where p = probability of disease. However, because the right-hand side of Equation 13.24 could be less than 0 or greater than 1 for certain values of x1, . . . , xk, predicted probabilities that are either less than 0 or greater than 1 could be obtained, which is impossible. Instead, the logit (logistic) transformation of p is often used as the dependent variable.

Definition 13.17

The logit transformation logit(p) is defined as logit( p ) = ln [ p / (1 − p )]

Unlike p, the logit transformation can take on any value from −∞ to +∞.

Example 13.35

Solution

Compute logit(.1), logit(.95).

logit(.1) = ln (.1 / .9) = ln(1 / 9) = − ln(9) = −2.20

logit(.95) = ln (.95 / .05) = ln(19) = 2.94

If logit(p) is modeled as a linear function of the independent variables xl, . . . , xk, then the following multiple logistic-regression model is obtained.

Equation 13.25

Multiple Logistic-Regression Model I f xl, . . . , xk are a collection of independent variables and y is a binomial-outcome variable with probability of success = p, then the multiple logistic-regression model is given by  p  = α + β1x1 + . . . + β k xk logit( p ) = ln   1 − p    or, equivalently, if we solve for p, then the model can be expressed in the form ...

p=

e α + β1x1 + + βk xk ... 1 + e α + β1x1 + + βk xk

In the second form of the model, we see that p must always lie between 0 and 1 regardless of the values of xl, . . . , xk. Complex numeric algorithms are generally required to fit the parameters of the model in Equation 13.25. The best-fitting model relating the prevalence of C. trachomatis to the risk factors (1) race and (2) the lifetime number of sexual partners is presented in Table 13.19.

Interpretation of Regression Parameters How can the regression coefficients in Table 13.19 be interpreted? The regression coefficients in Table 13.19 play a role similar to that played by partial-regression

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630   C H A P T E R 13 

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coefficients in multiple linear regression (See Definition 11.17). Specifically, suppose we consider two individuals with different values of the independent variables as shown in Table 13.20, where the jth independent variable is a binary variable. If we refer to the independent variables as exposure variables, then individuals A and B are the same on all risk factors in the model except for the jth exposure variable, where individual A is exposed (coded as 1) and individual B is not exposed (coded as 0). According to Equation 13.25, the logit of the probability of success for individuals A and B, denoted by logit(pA), and logit(pB), are given by

Equation 13.26

Table 13.19

logit( pA ) = α + β1x1 + . . . + β j −1x j −1 + β j (1) + β j +1x j +1 + . . . + β k xk logit( pB ) = α + β1x1 + . . . + β j −1x j −1 + β j ( 0 ) + β j +1x j +1 + . . . + β k xk

Multiple logistic-regression model relating prevalence of C. trachomatis to race and number of lifetime sexual partners

Regression coefficient

Risk factor Constant Black race Lifetime number of sexual partners among users of nonbarriera methods of contraceptionb

(βˆ )

Standard error

j

se βˆ j

βˆ / se βˆ  j   j

−1.637 +2.242 +0.102

0.529 0.040

+4.24 +2.55

( )

z

( )

Barrier methods of contraception include diaphragm, diaphragm and foam, and condom; nonbarrier methods include all other forms of contraception or no contraception. This variable is defined as 0 for users of barrier methods of contraception.

a

b

Source: From McCormack, et al., “Infection with Chlamydia Trachomatis in Female College Students,” American Journal of Epidemiology, 1985 121: 107–115. Reprinted by permission of Oxford University Press.

Table 13.20

Two hypothetical subjects with different values for a binary independent variable (xj) and the same values for all other variables in a multiple logistic-regression model

Independent variable

Individual

1

2

. . .

j − 1

j

j+1...k

A B

x1 x1

x2 x2

. . . . . .

xj−1 xj−1

1 0

xj+1 . . . xk xj+1 . . . xk

If we subtract logit(pB) from logit(pA) in Equation 13.26, we obtain

logit( p A ) − logit( pB ) = β j

Equation 13.27

However, from Definition 13.17, logit(pA) = ln[pA/(1 − pA)], logit(pB) = ln[pB/(1 − pB)]. Therefore, on substituting into Equation 13.27, we obtain

ln [ pA / (1 − pA )] − ln [ pB / (1 − pB )] = β j or

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13.8  ■  Multiple Logistic Regression   631

Equation 13.28

 p / (1 − pA )  ln  A  = βj  pB / (1 − pB ) 

If we take the antilog of each side of Equation 13.28, then we have

Equation 13.29

pA / (1 − pA ) β =e j pB / (1 − pB )

However, from the definition of an OR (Definition 13.6), we know the odds in favor of success for subject A (denoted by OddsA) is given by OddsA = pA/(1 − pA). Similarly, Odds B = p B  /(1 − p B ). Therefore, we can rewrite Equation 13.29 as follows.

Equation 13.30

Odds A β =e j Odds B Thus, in words, the odds in favor of disease for subject A divided by the odds in faβ vor of disease for subject B = e j . However, we can also think of OddsA/OddsB as the OR relating disease to the jth exposure variable for two hypothetical individuals, one of whom is exposed for the jth exposure variable (subject A) and the other of whom is not exposed for the jth exposure variable (subject B), where the individuals are the same for all other risk factors considered in the model. Thus this OR is an OR relating disease to the jth exposure variable, adjusted for the levels of all other risk factors in our model. This is summarized as follows.

Equation 13.31

stimation of ORs in Multiple Logistic Regression for Dichotomous Independent E Variables  Suppose there is a dichotomous exposure variable (xj), which is coded as 1 if present and 0 if absent. For the multiple logistic-regression model in Equation 13.25, the OR relating this exposure variable to the dependent variable is estimated by ˆ

^ β    OR = e j

 This relationship expresses the odds in favor of success if xj = 1 divided by the odds in favor of success if xj = 0 (i.e., the disease–exposure OR) after controlling for all other variables in the logistic-regression model. Furthermore, a two-sided 100% × (1 − α) CI for the true OR is given by

Example 13.36

 eβˆ j − z1− α / 2 se (βˆ j ) , eβˆ j + z1− α / 2se(βˆ j )   

Infectious Disease  Estimate the odds in favor of infection with C. trachomatis for black women compared with white women after controlling for previous sexual experience, and provide a 95% CI about this estimate.

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632   C H A P T E R 13 

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Solution

From Table 13.19, ^

 OR = e 2.242 = 9.4 Thus the odds in favor of infection for black women are nine times as great as those for white women after controlling for previous sexual experience. Furthermore, because z1−α/2 = z.975 = 1.96 and se(βˆ j ) = 0.529, a 95% CI for OR is given by

 e 2.242 −1.96( 0.529) , e 2.242 +1.96( 0.529)  = ( e1.205 , e 3.279 ) = (3.3, 26.5)   We can also use Equation 13.31 to make a connection between logistic regression and contingency-table analysis for 2 × 2 tables given in Chapter 10. Specifically, suppose there is only one risk factor in the model, which we denote by E and which takes the value 1 if exposed and 0 if unexposed, and we have a dichotomous disease variable D. We can relate D to E using the logistic-regression model.

Equation 13.32

log [ p / (1 − p )] = α + βE

where p = probability of disease given a specific exposure status E. Therefore, the probability of disease among the unexposed = eα/(1 + eα) and among the exposed = eα+β/(1 + eα+β). Also, from Equation 13.31, eβ represents the OR relating D to E and is the same OR [ad/(bc)] obtained from the 2 × 2 table in Table 10.7 relating D to E. We have formulated the models in Equations 13.25 and 13.32 under the assumption that we have conducted either a prospective study or a cross-sectional study (i.e., that our study population is representative of the general population and we have not oversampled cases in our study population, as would be true in a case–control study). However, logistic regression is applicable to data from case–control studies as well. Suppose we have a case–control study in which there is a disease variable D and an exposure variable E and no other covariates. If we use the logistic-regression model in Equation 13.32—that is, D as the outcome variable and E as the independent (or predictor) variable—then the probability of disease among the unexposed [eα/(1 + eα)] and the exposed [eα+β/(1 + eα+β)] will not be generalizable to the reference population because they are derived from a selected sample with a greater proportion of cases than in the reference population. However, the OR eβ will be generalizable to the reference population. Thus we can estimate ORs from case–control studies, but we cannot estimate probabilities of disease. This statement is also true if there are multiple exposure variables in a logistic-regression model derived from data from a case–control study. The relationships between logistic-regression analysis and contingency-table analysis are summarized as follows.

Equation 13.33

elationship Between Logistic-Regression Analysis and Contingency-Table Analysis  R Suppose we have a dichotomous disease variable D and a single dichotomous exposure variable E, derived from either a prospective, cross-sectional, or case–control study design, and that the 2 × 2 table relating disease to exposure is given by E

D

+ −

+

a c

b d

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13.8  ■  Multiple Logistic Regression   633

(1) We can estimate the OR relating D to E in either of two equivalent ways: (a)  We can compute the OR directly from the 2 × 2 table = ad/bc (b)  We can set up a logistic-regression model of the form ln [ p (1 − p )] = α + βE

where p = probability of disease D given exposure status E and where we estimate the OR by eβ. (2) For prospective or cross-sectional studies, we can estimate the probability of disease among exposed (pE) subjects and unexposed ( pE ) subjects in either of two equivalent ways: (a)  From the 2 × 2 table, we have      pE = a / ( a + c ), pE = b / ( b + d ) (b)  From the logistic-regression model,    ˆ ˆ pE = e αˆ + β (1 + e αˆ + β ), pE = e αˆ 1 + e αˆ

(

)

ˆ βˆ are the estimated parameters from the logistic-regression where α, model. (3) For case–control studies, it is impossible to estimate absolute probabilities of disease unless the sampling fraction of cases and controls from the reference population is known, which is almost always not the case.

Example 13.37

Assess the relationship between mother’s age at first birth and breast-cancer incidence based on the data in Table 10.1 using logistic-regression analysis.

Solution We will use the logistic-regression model ln[ p / (1 − p )] = α + β × AGEGE 30 where p = probability of breast cancer AGEGE 30 = 1 if age at first birth ≥ 30 = 0 otherwise The results using the SAS PROC LOGISTIC program are given in Table 13.21. We see that the estimated OR relating breast-cancer incidence to AGEGE30 = e0.4526 = 1.57. This is identical to the OR estimated using contingency-table methods given in Example 13.10. Notice that although there are actually 13,465 subjects in the study, PROC LOGISTIC tells us there are two observations. The reason is that the program allows us to enter data in grouped form with all observations with the same combination of independent variables entered as one record. In this case, there is only one covariate (AGEGE30), which only has two possible values (0 or 1); thus there are two “observations.” For each level of AGEGE30, we need to provide the number of cases (i.e., successes) and the number of trials (i.e., observations). Entering the data in grouped form usually reduces the computer time needed to fit a logistic-regression model (in some data sets dramatically, if the number of covariate patterns is small relative to the number of subjects).

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634   C H A P T E R 13 

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Table 13.21

Association between age at first birth and breast-cancer incidence based on the data in Table 10.1 using the SAS PROC LOGISTIC procedure Case/Trials Model (recommended instead of freq) Logistic Regression The LOGISTIC Procedure Model Information Data Set Response Variable (Events) Response Variable (Trials) Model Optimization Technique Number Number Sum of Sum of

W0RK.AFB1 cases trials binary logit Fisher’s scoring

of Observations Read of Observations Used Frequencies Read Frequencies Used

2 2 13465 13465

Response Profile Binary Total Outcome Frequency

Ordered Value 1 2

Event Nonevent

3220 10245

Model Convergence Status Convergence criterion (GC0NV=1E-8) satisfied. Model Fit Statistics

Criterion

Intercept Only

Intercept and Covariates

AIC SC -2 Log L

14815.785 14823.293 14813.785

14743.181 14758.197 14739.181

Testing Global N u l l Hypothesis: BETA=0 Test

Chi-Square

DF

Pr > ChiSq

74.6042 78.3698 77.5782

1 1 1

14). Other covariates controlled for in the analysis were age (continuous), sex, and faculty/staff status. The results were as shown in Table 13.27.

Common cold vs. average red-wine consumption (data) Red-wine consumption (drinks per week)

Beta

se

(ref.a)

1−7 8−14 >14

−0.416 −0.527 −0.892

0.132 0.238 0.341

Reference group.

a 

(a) What is the OR for red-wine consumption of 1−7 drinks per week vs. 0 drinks per week?

(b) What does it mean?

(c) Provide a 95% CI for this OR.

13.9 Extensions to Logistic Regression Matched Logistic Regression In some instances, we have a categorical outcome, but the units of analysis have been selected using a matched design, and thus are not independent. Ordinary logistic regression methods are not appropriate here, but an extension of logistic regression called conditional logistic regression can be employed.

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REVIEW

REVIEW QUESTIONS 13E

650   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Example 13.44

Cancer  In 1989−1990, 32,826 NHS participants provided a blood sample for research purposes. The blood was frozen and stored for future analyses. In general, it is too expensive to analyze the blood for all participants. Instead, a nested case–control design is typically used. For example, estradiol is a hormone that has been related to breast cancer in several other studies. To study this question using NHS data, 235 women with breast cancer occurring between 1990 and 2000 and after blood collection were identified. One or two controls were selected per case, yielding a total of 346 controls. The controls were matched on age, time of day of blood draw, fasting status of blood draw, and previous use of post-menopausal hormones. All cases and controls were postmenopausal at the time of the blood draw (1989−1990). Because of possible lab drift, the matched sets (case and 1 or 2 controls) were analyzed at the same time for a number of analytes, including plasma estradiol. How should the association between plasma estradiol and breast cancer be assessed? Ideally we would like to use logistic regression to predict breast cancer as a function of plasma estradiol and other breast cancer risk factors. However, we need to account for the dependence between women in the same matched set. Conditional logistic regression can be used for this purpose.

Equation 13.41

Conditional Logistic Regression Suppose we wish to assess the association between the incidence of breast cancer ( D ) and plasma estradiol ( x ) but wish to control for other covariates ( z1 , z2 , . . ., zk ), denoted in summary by z~. Examples of other covariates include age, parity (i.e., number of children), family history of breast cancer, and others. Suppose we subdivide the data into S matched sets (i = 1,… , S ). The ith matched set consists of a single case and ni controls, where ni ≥ 1 and ni may vary among matched sets. Let Dij = case status of the jth subject in the ith matched set. We use a logistic model of the form logit[ Pr ( Dij = 1)] = α i + βxij + γ 1z1,ij + … + γ k zk ,ij ≡ α i + βxij + γzij where ai = indicator variable for being in the ith matched set, which = 1 if a subject is in the ith matched set and = 0 otherwise. The problem is that we cannot determine α i because the matched sets are small and purposely selected in such a way as to have 1 case and 1 or more controls. Thus, we cannot use logistic regression to determine the absolute probability of disease because of the way the samples are selected. However, we can determine the conditional probability that the jth member of a matched set is a case given that there is exactly one case in the matched set, denoted by pij, or Pr ( Dij = 1)

ni

pij = Pr ( Dij = 1 | ∑ Dik = 1) =

ni

ni

k =1,k ≠ j ni

Pr ( Dik = 0 )

∑ Pr( Dil = 1)∏ Pr( Dik = 0 )

k =1

l =1

k ≠l

ni

=

exp(α i + βxij + γ z~ ij ) / ∏ [1 + exp(α i + βxik + γ z~ ik )] % % k =1 ni

ni

∑ exp(αi + βxil + γ z~ il ) / ∏ [1 + exp(αi + βxik + γ z~ ik )] l =1

%

k =1

%

ni

= exp(βxij + γ z~ ij ) / ∑ exp(βxil + γ z~ il ) % % l =1

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13.9  ■  Extensions to Logistic Regression    651

If the jth subject of the ith matched set is the case, then the expression in equation 13.41 is referred to as the contribution to the conditional likelihood for the ith matched set. We can use maximum likelihood methods to find estimates of β and γ ∼ S which maximize L = ∏ piji , where ji = case in the ith matched set. These are called i =1

conditional likelihood methods and the model is referred to as a conditional logistic regression model.

Equation 13.42

I nterpretation of Parameters in a Conditional Logistic Regression Model  To interpret the parameters of the conditional logistic regression model in equation 13.41, we consider two subjects j and l in the ith matched set, one of whom is a case and the other a control. We assume these subjects have the same value for all other covariates, that is, z~ ij = z~ il, but differ by one unit on the primary exposure variable, that is, xij = xil + 1. The relative risk that the subject with the higher exposure is the case, is given by RR = Pr ( Dij = 1) / Pr ( Dil = 1) = exp(β ) A similar interpretation holds for the other regression coefficients.

Example 13.45

Cancer  Estimate the association between breast cancer incidence and plasma estradiol using the matched design in Example 13.44.

Solution

For this example, we had a total of 235 breast cancer cases and 346 controls. A conditional logistic regression model was fit to the data with a single primary exposure variable ln estradiol (x) and several other breast cancer risk predictors using the SAS procedure PROC PHREG. This is the same algorithm used to fit proportional hazards survival models in SAS, a topic we will discuss in Chapter 14. The results are given in Table 13.28.

Table 13.28

Use of SAS PROC PHREG to perform conditional logistic regression on the breast cancer data

proc phreg; model cscn*case(0)=tmtl b4a b4b x5 tmtbm bbd b21 b22 b23 dur3 dur4 dur8 curpmh pstpmh sumbmi2a sumbmi3a sumhgt2a sumhgt3a sumalcl sumalc2 sumalc3 famhx lestradl; strata matchid; Convergence Status Convergence criterion (GCONV=lE-8) satisfied.

Criterion

-2 LOG L AIC SBC

Model Fit Statistics Without With Covariates Covariates 407.529 407.529 407.529

361.237 407.237 486.808

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652   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Table 13.28

Use of SAS PROC PHREG to perform conditional logistic regression on the breast cancer data (Continued ) Testing Global Null Hypothesis: BETA=0 Chi-Square DF Pr > ChiSq

Test

Likelihood Ratio Score Wald

46.2917 43.2239 36.6232

23 23 23

0.0028 0.0065 0.0356

Analysis of Maximum Likelihood Estimates Variable DF tmtl b4a b4b x5 tmtbm bbd b21 b22 b23

Parameter Estimate

1 0.00617 1 -0.00661 1 -0.03637 1 -0.0006087 1 0.0007292 1 -0.07291 1 0.09160 1 -0.01387 1 0.0006671

Standard Error Chi-Square Pr > ChiSq 0.08160 0.08770 0.08894 0.02125 0.00281 3.28786 0.13953 0.05787 0.04040

0.0057 0.0057 0.1672 0.0008 0.0672 0.0005 0.4310 0.0575 0.0003

0.9398 0.9399 0.6826 0.9771 0.7954 0.9823 0.5115 0.8105 0.9868

Hazard Ratio 1.006 0.993 0.964 0.999 1.001 0.930 1.096 0.986 1.001

The PHREG Procedure Analysis of Maximum Likelihood Estimates

Variable DF

Parameter Estimate

dur3 dur4 dur8 curpmh pstpmh sumbmi2a sumbmi3a sumhgt2a sumhgt3a sumalcl sumalc2 sumalc3 famhx lestradl

-0.01543 0.06945 0.20479 0.11699 0.08135 0.07618 -0.15969 0.38707 -0.06442 0.25656 -0.00105 0.00129 0.0009756 0.00215 -0.00325 0.00232 0.00212 0.00638 0.0006666 0.0004087 0.00676 0.00380 -0.00130 0.0008548 0.60465 0.25490 0.73944 0.21913

1 1 1 l l 1 1 1 1 1 1 1 1 1

Standard Error Chi-Square Pr > ChiSq 0.0494 3.0640 1.1403 0.1702 0.0630 0.6628 0.2065 1.9627 0.1105 2.6600 3.1621 2.3242 5.6270 11.3866

0.8242 0.0800 0.2856 0.6799 0.8017 0.4156 0.6495 0.1612 0.7396 0.1029 0.0754 0.1274 0.0177 0.0007

Hazard Ratio 0.985 1.227 1.085 0.852 0.938 0.999 1.001 0.997 1.002 1.001 1.007 0.999 1.831 2.095

The actual model fit was as follows. 22  pij  ln  = α i + βxij + ∑ γ k zijk   1 − pij  k =1 where i = m atched pair, j = subject within the matched pair, and the variables are defined as follows: xij = ln(estradiol) −2.36 (ln pg mL) zij1 = tmt1 = age at menopause − age at menarche ≡ premenopausal time zij2 = b4a = age − age at menopause if natural menopause, = 0 otherwise zij3 = b4b = age − age at menopause if bilateral oophorectomy, = 0 otherwise zij4 = x5 = age at first birth − age at menarche if parous, = 0 if nulliparous b

zij5 = tmtbm = birth index = ∑ (age at menopause − age at ith birth) if i =1

parous, = 0 if nulliparous where b = parity (number of children) Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

13.9  ■  Extensions to Logistic Regression    653

zij6 = bbd = 1 if benign breast disease, = 0 otherwise zij7 = b21 = bbd × age at menarche zij8 = b22 = bbd × tmt1 zij9 = b23 = bbd × (age − age at menopause) zij10 = dur3 = duration of estrogen use (yrs) zij11 = dur4 = duration of estrogen + progesterone use (yrs) zij12 = dur8 = duration of use of other postmenopausal hormones (PMH) (yrs) zij13 = curpmh = current use of PMH = 1 if yes/= 0 if no = = = = = = =

pstpmh = past use of PMH = 1 if yes/= 0 if no sumbmi2a = average BMI pre-menopause × tmt1 sumbmi3a = average BMI post-menopause × (age − age at menopause) sumhgt2a = height × tmt1 sumhgt3a = height × (age − age at menopause) sumalc1 = average alcohol intake pre-menopause (g) × tmt1 sumalc2 = average alcohol intake post-menopause while on PMH × duration PMH use zij21 = sumalc3 = average alcohol intake post-menopause while not on PMH × (age − age at menopause − duration PMH use) zij22 = famhx = family history of breast cancer (1 = yes/0 = no)

zij14 zij15 zij16 zij17 zij18 zij19 zij20

We see that there is a significant association between breast cancer incidence and ln(estradiol) (Beta = 0.739 ± 0.219, p < .001) . The relative risk (listed under the Hazard Ratio column) is 2.1( = e 0.73944 ). This implies that if we have two women in a matched pair, one with breast cancer and the other without breast cancer, whose ln(estradiol) levels differ by 1 ln unit and who are the same for all other breast cancer risk factors, the woman with the higher estradiol is 2.1 times as likely to be the case than the woman with the lower estradiol. Note that a difference of 1 ln unit is equivalent to a ratio of e1 = 2.7. Thus, the woman with higher estradiol has a plasma estradiol level that is 2.7 times as high as that of the lower estradiol woman. To obtain 95% confidence limits for β, we compute ( e c1 , e c2 ), where (c , c ) = βˆ ± 1.96se(βˆ ). In 1

2

this case, we have (c1 , c2 ) = 0.739 ± 1.96( 0.219) = ( 0.310,1.168) and the 95% CI = ( e 0.310 , e1.168 ) = (1.4, 3.2 ). We will discuss hazard ratios in more detail when we study proportional hazards regression models in Chapter 14. In the context of conditional logistic regression, we can consider the hazard ratio as a ratio of incidence rates for the higher vs. lower estradiol woman. Note that there is only one other predictor that is a significant risk factor for breast cancer in this example, that is, family history of breast cancer (famHx), with an RR of 1.8 and a p-value of .018. Several other breast cancer risk factors (dur4 = duration of estrogen + progesterone use, p = .08 and sumalc2 = total alcohol consumption while using PMH, p = .075) show a trend toward statistical significance. Actually, all the risk factors in the model have been shown to be significant risk factors for breast cancer in large data sets (see Colditz et al. [14] for more details about the variables used for breast cancer modeling). Conditional logistic regression can also be extended to allow for more than one case and/or more than one control in a matched pair (see Breslow and Day [15] for more details about conditional logistic regression).

Polychotomous Logistic Regression In some cases, we have a categorical outcome variable with more than two categories. Often we might have a single control group to be compared with multiple case groups or a single case group to be compared with multiple control groups. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

654   C H A P T E R 13 

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Example 13.46

Cancer  Breast cancers are commonly typed using a biochemical assay to determine estrogen receptor (ER) and progesterone receptor (PR) status. Tumors can be jointly classified as having ER positive (ER+) vs. ER negative (ER−) status and PR positive (PR+) vs. PR negative (PR−) status. This distinction is important because different treatments are used according to ER/PR status. A study was performed within the NHS to determine risk factor profiles for specific types of breast cancer according to ER/PR status [14]. There were 2096 incident cases of breast cancer from 1980−2000, of which 1281 were ER+/PR+, 417 were ER−/PR−, 318 were ER+/PR−, and 80 were ER−/PR+. There was a common control group for all types of breast cancers. How should the data be analyzed? It is tempting to perform separate logistic regression analyses of each case group vs. the control group. This is a valid approach but will not allow us to compare regression coefficients for the same risk factor between different types of breast cancer. Instead, we analyze all the data simultaneously using polychotomous logistic regression (PLR). We can generalize logistic regression in this setting as follows. Suppose there are Q outcome categories, where group 1 is a control group and groups 2, . . .,Q are different case groups. Suppose also that there are k exposure variables. The PLR model is given as follows.

Equation 13.43

Polychotomous Logistic Regression Pr(1st outcome category ) =

r =2

Pr( qth outcome category ) =

k =1

Q

K   1 + ∑ exp  α r + ∑ βrk xk    r =2

odds q , A =

, q = 2, . . ., Q

k =1

Pr (subject A is in the qth outcome category) Pr (subject A is in the 1st outcome category (control group))

K k −1   = exp α q + ∑ β ql xl + β qk ( xk + 1) + ∑ β ql xl  l = k +1 l =1  

k =1

K   exp  α q + ∑ β qk xk   

Interpretation of Parameters in PLR  Suppose we have 2 individuals who differ by 1 unit on the kth exposure variable and are the same on all other exposure variables. We will call the individual with the higher exposure ( xk + 1) subject A and the subject with the lower exposure ( xk ) subject B. Based on equation 13.43,

Equation 13.44

1 K   1 + ∑ exp  α r + ∑ βrk xk    Q

odds q , B =

Pr (subject B is in the qth outcome category) Pr (subject B is in the 1st outcome category)

K k −1   = exp α q + ∑ β ql xl + β qk ( xk ) + ∑ β ql xl  l = k +1 l =1  

Hence,   the OR for being in category q vs. category 1 for subject A vs. subject B odds q , A = = exp(β qk ) ≡ ORqk odds q , B

A 100% × (1 − α ) CI for ORqk is given by ( e c1 , e c2 ) , where (c , c ) = βˆ ± z se(βˆ ) 1

2

q ,k

1− α / 2

q ,k

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13.9  ■  Extensions to Logistic Regression    655

Note that a special case of PLR is when Q = 2, in which case there is one control group and one case group and PLR is the same as ordinary logistic regression. Another capability of PLR is to compare the strength of association of the same variable for 2 different case categories. For example, we might be interested in whether a breast cancer risk factor had the same OR for 2 different types of breast cancer. In general, the OR for being in outcome category q1 vs. outcome category q2 for subject A compared with subject B is given by exp(β q1 ,k − β q2 ,k ) with 95% confidence limits given by ( e c1 , e c2 ), where (c , c ) = βˆ − βˆ ±z se(βˆ − βˆ ) . In gen1

2

q1 ,k

q2 ,k

1− α / 2

q1 ,k

q2 ,k

eral, βˆ q1 ,k and βˆ q2 ,k will be correlated because a common control group is used to estimate each OR. Hence, se(βˆ q1 ,k − βˆ q2 ,k ) =  var(βˆ q1 ,k ) + var(βˆ q2 ,k ) − 2cov(βˆ q1 ,k , βˆ q2 ,k )

1/ 2

The covariance between estimated regression parameters is available in most computer packages that implement PLR.

Example 13.47

Assess the effect of alcohol use before menopause on different types of breast cancer based on the data set described in Example 13.46.

Solution

We have fitted the PLR model in Equation 13.43 to the breast cancer data described in Example 13.46. There were a total of 5 groups (one control group and 4 case groups). There were a total of 22 variables in the model. Hence, if the control group is the reference group, there are a total of 88 regression parameters to be estimated plus 4 separate intercept terms. The results for alcohol consumption before menopause (adjusted for the other 21 variables in the model) are given in Table 13.29.

Table 13.29

Effect of alcohol consumption before menopausea on different types of breast cancer, NHS data, 1980−2000 Group

Beta

se

p-value

no breast cancer ER+/PR+

(ref) 0.00029

0.00009

0.001

ER+/PR−

0.00022

0.00017

0.20

ER−/PR+

0.00015

0.00037

0.68

ER−/PR−

-0.00003

0.00017

0.86

RRb (95% CI)

1.0 1.12 (1.04−1.20) 1.09 (0.96−1.24) 1.06 (0.80−1.40) 0.99 (0.87−1.12)

Number of cases

1281 318 80 417

Cumulative grams of alcohol before menopause (g/day × years).

a

The relative risk for 1 drink per day of alcohol from age 18 to age 50 ≅ 12 grams alcohol/drink ×  32 years = 384 gram-years × Beta after controlling for 21 other breast cancer risk factors. b 

We see that there is a significant effect of alcohol for ER+/PR+ breast cancer but not for any other type of   breast cancer. The RR for 1 g/day = 384 g-years/day = exp[ 0.00029(384)] = 1.12 exp[ 0.00029(384)] = 1.12 . The 95%  CI = ( e c1 , e c2 ), where (c1 , c2 ) = 384[ 0.00029 ± 1.96( 0.00009)]. Thus, the 95% CI = (1.04 - 1.20). In addition, results for ER−/PR− breast cancer are almost completely null. The model in equation 13.43 forces the regression parameters for all variables for different case groups to be different (i.e., a total of 92 parameters to be estimated

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656   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

in Example 13.47). It is possible to extend PLR to allow for parameter estimates for some variables to be the same over all case groups and parameter estimates for other variables to be different. This allows one to test whether the effects of a risk factor are significantly heterogeneous among all case groups. Details for this approach are given in Marshall and Chisholm [16].

Ordinal Logistic Regression

Example 13.48

Sports Medicine  In the data set TENNIS1.DAT (on the Companion Website) we have data from an observational study among about 400 members of several tennis clubs in the Boston area. The objective of the study was to examine risk factors for tennis elbow. Subjects were asked how many current or previous episodes of tennis elbow they had. The distribution ranged from 0 to 8 and was very skewed. Hence, we elected to categorize the number of episodes into 3 categories (0/1/2+). We could treat these 3 categories as nominal categorical data and use PLR, but this type of analysis would lose the ordering of the categories in the above scale. Instead, we used a technique called ordinal logistic regression to relate the number of episodes of tennis elbow to age, sex, and the material of the racquet.

Ordinal Logistic Regression  Suppose an outcome variable y has c ordered categories (c ≥ 2), which we arbitrarily refer to as 1, . . . ,c. Suppose also there are k covariates x1, . . . , xk. An ordinal logistic regression model is defined by  

Equation 13.45

log[ Pr ( y ≤ j ) / Pr ( y ≥ j + 1)] = α j + β1x1 + . . . + β k xk , j = 1, . . ., c − 1. The regression coefficients βq have a similar interpretation as for ordinary logistic regression. Specifically,   e    

βq

= (odds that y ≤ j | xq = x) / (odds that y ≤ j | xq = x − 1), q = 1, . . . , k;

j = 2, . . . , c   ≡ odds ratio for y ≤ j given xq = x vs. xq = x − 1   holding all other variables constant Note that if c = 2, then the ordinal logistic regression model reduces to ordinary logistic regression. β Note also that in ordinal regression, e q is assumed to be the same for each value of j. This type of ordinal regression model is called a cumulative odds or proportional odds ordinal logistic regression model.

Example 13.49

Sports Medicine  Apply the ordinal logistic regression model in Equation 13.45 to the tennis elbow data in Example 13.48.

Solution

We applied the ordinal regression model to the tennis elbow data. For this purpose we categorized the outcome variable ( y ) in terms of the number of episodes of tennis elbow (0/1/2+), which was coded as (0/1/2). Note that the program will work equally well with any numeric values for y; the computer will identify the number of unique values of y and will order these values into ordered categories before performing the analysis. The predictor variables were age, sex (1 = M / 2 = F ), and the material of the racquet [1 = wood (reference)/2 = metal (i.e., either aluminum or steel)/3 = fiberglass, graphite, or composite]. The results are given in Table 13.30.

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13.9  ■  Extensions to Logistic Regression    657

Table 13.30

Application of the MINITAB ordinal logistic regression program to the tennis elbow data Ordinal Logistic Regression: num_epis(0/1/2+) vs. Age, Sex, material_cur Link Function: Logit Response Information Variable

Value

Count

num_epis (0/1/2+)

167

1

150

2 Total

116 433

* NOTE * 433 cases were used * NOTE * 9 cases contained missing values

Logistic Regression Table Odds Predictor

Const(1)

Coef

SE Coef

Z

P

Ratio

95% CI Lower

Upper

2.85057

0.592981

4.81

0.000

Const(2) 4.42467 Age −0.0580569 Sex* −0.393689 material_current   2+ −0.319725   3+ −0.589181

0.615680 0.0107481 0.186264

7.19 −5.40 −2.11

0.000 0.000 0.035

0.94 0.67

0.92 0.47

0.96 0.97

0.228137 0.246255

−1.40 −2.39

0.161 0.017

0.73 0.55

0.46 0.34

1.14 0.90

Log-Likelihood = -451.974 Test that all slopes are zero: G = 37.877, DF = 4, p-value = 0.000 *1 = M/2 = F. category 1 = wood (reference)/category 2 = metal (aluminum or steel)/category 3 = fiberglass, graphite, or composite.

We see that there are significant effects of age (OR = 0.94 , p < .001) and gender (1 = M / 2 = F ), (females vs. males) (OR = 0.67, p = .035). Thus, older players and females are likely to have more episodes of tennis elbow. In addition, we categorized the material of the current racquet into 3 categories (1 = wood = reference/2 = metal = aluminum or steel/3 = composite, fiberglass, or graphite). We see that the OR comparing metal to wood is 0.73 (95% CI = 0.46, 1.14 ) but is not statistically significant ( p = .16). However, the OR comparing fiberglass, graphite, or composite with wood is 0.55 (95% CI = 0.34, 0.90), which is statistically significant ( p = .017) even after controlling for age and sex. Furthermore, exp[const(1)] is an estimate of the odds of 0 episodes vs. 1+ episodes and exp[const(2)] is an estimate of the odds of ≤1 episode vs. 2+ episodes, both for subjects with all x’s equal to zero. In general, users of wood racquets have the least number of episodes of tennis elbow, and users of composite racquets have the greatest; users of metal racquets are in between.

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658   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

13.10 Meta-Analysis In the previous sections of this chapter, and in all previous chapters, we have examined methods of analysis for a single study. However, often more than one investigation is performed to study a particular research question, often by different research groups. In some instances, results are seemingly contradictory, with some research groups reporting significant differences for a particular finding and other research groups reporting no significant differences.

Example 13.50

Table 13.31

Renal Disease  In Data Set NEPHRO.DAT (on the Companion Website), we present data from a literature search comparing the nephrotoxicity (development of abnormal kidney function) of several different aminoglycosides [17]. In Table 13.31, we focus on a subset of eight studies that compared two of the aminoglycosides— gentamicin and tobramycin. In seven of eight studies, the OR for tobramycin in comparison with gentamicin is less than 1, implying that there are fewer nephrotoxic side effects for tobramycin than for gentamicin. However, many of the studies are small and individually are likely to yield nonsignificant results. The question is, What is the appropriate way to combine evidence across all the studies so as to reduce sampling error and increase the power of the investigation and, in some instances, to resolve the inconsistencies among the study results? The technique for accomplishing this is called meta-analysis. In this section, we will present the methods of DerSimonian and Laird [18] for addressing this problem.

Comparison of nephrotoxicity of gentamicin vs. tobramycin in NEPHRO.DAT Gentamicin Study

1. Walker 2. Wade 3. Greene 4. Smith 5. Fong 6. Brown 7. Feig 8. Matzke

Tobramycin

No. of subjects

No. of positivesa

No. of subjects

No. of positivesa

Odds ratiob

40 43 11 72 102 103 25 99

7 13 2 19 18 5 10 9

40 47 15 74 103 96 29 97

2 11 2 9 15 2 8 17

0.25 0.71 0.69 0.39 0.80 0.42 0.57 2.13

yi c

−1.394 −0.349 −0.368 −0.951 −0.229 −0.875 −0.560 +0.754

wi d

1.430 4.367 0.842 5.051 6.873 1.387 2.947 5.167

e w*  i

1.191 2.709 0.753 2.957 3.500 1.161 2.086 2.996

Number who developed nephrotoxicity.

a

Odds in favor of nephrotoxicity for tobramycin patients / odds in favor of nephrotoxicity for gentamicin patients.

b

yi = ln(ORi ).

c

wi = (1/ai + 1/bi + 1/ci + 1/di )–1

d

ˆ 2  )–1] . wi* = [(1/wi + ∆

e

Suppose there is an underlying log odds ratio θi for the ith study, which is estiˆ ) i = 1, . . ., 8, where the estimated OR are given in Table 13.31 in mated by yi = ln(OR i i the Odds ratio column. We assume there is within-study variation of yi about θi, where the variance of yi is

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13.10  ■  Meta-Analysis   659

si2 =

1 1 1 1 1 + + + ≡ ai bi ci di wi

and ai, bi, ci, and di are the cell counts in the 2 × 2 table for the ith study. We also assume that there is between-study variation of ∆i about an average true log OR µ over all studies so that

θi = µ + di and Var(∆i) = ∆2 This is similar to the random-effects analysis of variance (ANOVA) model presented in Section 12.8. To estimate µ, we calculate a weighted average of the study-specific log ORs given by k

k

ˆ = ∑ wi* yi µ

∑ wi*

i =1

i =1

where

ˆ 2 )−1 wi* = ( si2 + ∆ i.e., the weight for the ith study is inversely proportional to the total variance for that study (which equals si2 + ∆2), and  k  ˆ ) = 1  ∑ wi*  se(µ  i =1 

1/ 2

It can be shown that the best estimate of ∆2 is given by

  k  k ˆ 2 = max  0,[Q − ( k − 1)]  ∑ w − ∑ wi2 ∆ w i   i =1  i =1 

k

  

∑ wi    i =1

 

where

k

Q w = ∑ wi ( yi − y w )2 i =1

and k

y w = ∑ wi yi i =1

k

∑ wi i =1

This procedure is summarized as follows.

Equation 13.46

M eta-Analysis, Random-Effects Model  Suppose we have k studies, each with the goal of estimating an OR = exp(µ) defined as the odds of disease in a treated group compared with the odds of disease in a control group. (1) The best estimate of the average study-specific log OR from the k studies is given by k

ˆ = ∑ wi* yi µ i =1

k

∑ wi* i =1

where yi = estimated log OR for the ith study

(

* 2 ˆ2     wi = si + ∆

)

−1

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660   C H A P T E R 13 

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    1 / wi = si2 =

1 1 1 1 + + + = within-study variance ai bi ci di

and ai, bi, ci, and di are the cell counts for the 2 × 2 table for the ith study.   k  k ˆ 2 = max  0, [Q w − ( k − 1)]  ∑ wi − ∑ wi2 ∆   i =1      i =1      Q w =

k

k

i =1

i =1

k

∑ wi ( yi − yw )2 = ∑ wi yi2 −  ∑ wi yi 

2

i =1

k

  

∑ wi    i =1

 

k

∑ wi i =1

and k

    y w = ∑ wi yi i =1

k

∑ wi i =1

The corresponding point estimate of the OR = exp (ˆ µ). 1/ 2 k   ˆ ) =  1 ∑ wi*  ˆ = is given by se(µ (2) The standard error of µ  i =1  (3) A 100% × (1 - α) CI for µ is given by ˆ ± z1− α / 2 se(µ ˆ ) = (µ1 , µ 2 )      µ The corresponding 100% × (1 − α) CI for OR is [exp(µ1), exp(µ2)]. (4) To test the hypothesis H0: µ = 0 vs. H1: µ ≠ 0 (or equivalently to test H0: OR = 1 vs. H1: OR ≠ 1), we use the test statistic      ˆ / se(µ ˆ) z=µ hich under H0 follows an N(0, 1) distribution. The two-sided p-value is w given by 2 × [1 – Φ(|z|)].

Example 13.51

Renal Disease  Estimate the combined nephrotoxicity OR comparing tobramycin with gentamicin based on the data in Table 13.31. Obtain a 95% CI, and provide a two-sided p-value for the hypothesis that the two treatments have equal rates of nephrotoxicity.

Solution

We first compute the study-specific log OR (yi) and weight wi = (1/ai + 1/bi + 1/ci + 1/di)-1, which are shown in Table 13.31. ˆ 2 . We have Next we compute the estimated between-study variance ∆ 8

∑ wi = 1.430 + . . . + 5.167 = 28.0646 i =1 8

∑ wi yi = 1.430( −1.394) + . . . + 5.167(0.754) = −9.1740 i =1 8

∑ wi yi2 = 1.430( −1.394)2 + . . . + 5.167(0.754)2 = 13.2750 i =1

Hence, Q w = 13.2750 − ( −9.1740 )2 / 28.0646 = 10.276 Furthermore, 8

∑ wi2 = 1.4302 + . . . + 5.1672 = 131.889 i =1

ˆ 2 = (10.276 − 7) / (28.0646 − 131.889 / 28.0646) ∆ = 0.140 = betweeen- study variance

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13.10  ■  Meta-Analysis   661

Hence,

ˆ 2 )−1 wi* = (1 / wi + ∆ as shown in Table 13.31. Finally, 8

∑ wi* yi = 1.191( −1.394) + . . . + 2.996(0.754) = −6.421 i =1 8

∑ wi* = 1.191 + . . . + 2.996 = 17.3526

i =1

and

ˆ = −6.421 / 17.3526 = −0.370 µ with standard error given by

ˆ ) = (1 / 17.3526)1/ 2 = 0.240 se(µ Hence, the point estimate of the overall OR = exp(µ) is given by exp(−0.370) = 0.69. A 95% CI for exp(µ) is given by exp[−0.370 ± 1.96(0.240)] = (0.43, 1.11). To test the hypothesis H0: µ = 0 vs. H1: µ ≠ 0, we use the test statistic

ˆ / se(µ ˆ) z=µ = −0.370 / 0.240 = −1.542 with corresponding two-sided p-value given by p = 2 × [1 − Φ(1.542)] = .123. Hence the OR, although less than 1, does not significantly differ from 1.

Test of Homogeneity of Odds Ratios Some investigators feel the procedure in Equation 13.46 should only be used if there is not significant heterogeneity among the k study-specific ORs. To test the hypothesis H 0 : θ1 = . . . = θk vs. H1: at least two θi’s are different, we use Equation 13.47.

Equation 13.47

Test of Homogeneity of Study-Specific ORs in Meta-Analysis  To test the hypothesis H 0 : θ1 = . . . = θk vs. H1: at least two θi’s are different, where θi = estimated log OR in the ith study, we use the test statistic k

Q w = ∑ wi ( yi − y w )2 i =1

as defined in Equation 13.46. It can be shown under H0 that Qw ~ χ2k-1. Hence, to obtain the p-value, we compute

Example 13.52

Solution

(

p -value = Pr χ2k −1 > Q w

)

Renal Disease  Test for the homogeneity of the ORs in Table 13.31. From the solution to Example 13.51, we have Qw = 10.276 ~ χ72 under H0. Because χ72,.75 = 9.04 and χ72,.90 = 12.02 and 9.04 < 10.276 < 12.02, it follows that 1 − .90 < p < 1 − .75 or .10 < p < .25. Hence there is not significant heterogeneity among the study-specific ORs.

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662   C H A P T E R 13 

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It is controversial among research workers whether a fixed- or random-effects model should be used when performing a meta-analysis. Under a fixed-effects model, the between-study variance (∆2) is ignored in computing the study weights and only the within-study variance is considered. Hence one uses wi for the weights in Equation 13.46 instead of w*. Some statisticians argue that if there is substantial i variation among the study-specific ORs, then one should investigate the source of the heterogeneity (different study designs, etc.) and not report an overall pooled estimate of the OR as given in Equation 13.46. Others feel that between-study variation should always be considered in meta-analyses. Generally speaking, using a fixed-effects model results in tighter confidence limits and more significant results. However, note that the fixed-effects model and the random-effects model give different relative weights to the individual studies. A fixed-effects model only considers within-study variation. A random-effects model considers both betweenand within-study variation. If the between-study variation is substantial relative to the within-study variation (as is sometimes the case), then larger studies will get proportionally more weight under a fixed-effects model than under a random-effects model. Hence the summary ORs under these two models may also differ. This is indeed the case in Table 13.31, where the relative weight of larger studies compared with smaller studies is greater for the fixed-effects model weights (wi) than for the random-effects model weights (w*). For example, for the data in Table 13.31, if one i uses the wi for weights instead of w*, one obtains a point estimate for the overall OR i [exp(ˆ )] of 0.72 with 95% confidence limits of (0.50, 1.04) with p-value = .083 for µ testing H0: OR = 1 vs. H1: OR ≠ 1, compared with an OR of 0.69 with 95% confidence limits of (0.43, 1.11) for the random-effects model. One drawback to the random-effects approach is that one cannot use studies with zero events in either treatment group. Under a fixed-effects model such studies get 0 weight. However, under a random-effects model such studies get nonzero weight if the between-study variance is greater than 0. This is problematic because the log OR is either +∞ or −∞ unless both groups have no events. We excluded one small study in our survey in Table 13.31 for this reason [19], where there were 11 gentamicin patients who experienced 0 events and 11 tobramycin patients who experienced two events. A reasonable compromise might be to check for significant heterogeneity among the study-specific ORs using Equation 13.47 and use the decision rule in Table 13.32. Table 13.32

Models used for meta-analysis p-Value for heterogeneity

Type of model used

≥.5 .05 ≤ p < .5 t n

1 1  n + n  1 2

1 + n 2 − 2 ,1− α / 2

If t n

1 + n 2 − 2 ,α / 2

or t < t n

1 + n 2 − 2 ,α / 2

≤ t ≤ tn

1 + n2

, then reject H0.

− 2 ,1− α / 2 , then accept H0.

(5) The exact p-value is given by     2 × area to the left of t under a t n

1 + n2 − 2

distribution if t ≤ 0

or     2 × area to the right of t under a t n

1 + n2 − 2

distribution if t > 0

(6) A 100% × (1 − α) CI for the underlying treatment effect ∆ is given by    

d ± tn

1 + n 2 − 2 ,1− α / 2

sd2,pooled  1 1  n + n  4 1 2

Example 13.57

Sports Medicine  Test for whether overall degree of pain as compared with baseline is different for patients while on Motrin than while on placebo. Estimate a 95% CI for improvement in degree of pain while on Motrin vs. placebo.

Solution

There are 88 participants in the data set, 44 in group A and 44 in group B. However, 2 participants in each group had missing pain scores in one or both periods. Hence, 42 participants are available for analysis in each group. We first present the mean pain score vs. baseline for patients in each group during each period as well as the mean difference in pain scores (Motrin – placebo) and the average pain relief score over the two periods (see Table 13.33). The overall measure of drug efficacy is

d=

0.071 + 1.357 = 0.714 2

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670   C H A P T E R 13 

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Table 13.33  Summary statistics of overall impression of drug efficacy compared with baseline (n = 84)

Group

A

B

Motrin

Placebo

Differencea

Averageb

Motrin

Placebo

Differencea

Averageb

Mean sd n

3.833 1.188 42

3.762 1.574 42

0.071 1.813 42

3.798 1.060 42

4.214 1.353 42

2.857 1.160 42

1.357 1.376 42

3.536 1.056 42

Note: The data are obtained from Data Set TENNIS2.DAT (on the Companion Website) using variable 22 for overall impression of drug efficacy during period 1 and variable 43 for overall impression of drug efficacy during period 2. a Pain score on Motrin – pain score on placebo b Average of (pain score on Motrin, and pain score on placebo)

To compute the standard error of d , we first compute the pooled variance estimate given by sd2,pooled = ( n1 − 1) sd21 + ( n2 − 1) sd22  ( n1 + n2 − 2 ) =

41 (1.813) + 41 (1.376 ) = 2.590 82 2

2

The standard error of d is se( d ) =

2.590  1 1 +   = 0.176 4 42 42 

The test statistic is

t=

0.714 = 4.07 ~ t 82 under H0 0.176

The exact p-value = 2 × Pr(t82 > 4.07). Because 4.07 > t60,.9995 = 3.460 > t82,.9995, it follows that p < 2 × (1 − .9995) or p < .001. Thus there is a highly significant difference in the mean pain score on Motrin vs. the mean pain score on placebo, with patients experiencing less pain when on Motrin. A 95% CI for the treatment benefit ∆ is

d ± tn

1 + n 2 − 2 ,.975

se( d )

= 0.714 ± t 82 ,.975 ( 0.176 ) Using Excel, we estimate t 82,.975 = 1.989. Therefore the 95% CI for ∆ = 0.714 ± 1.989(0.176) = (0.365, 1.063). Thus the treatment benefit is likely to be between 1/3 of a unit and 1 unit on the pain scale.

Assessment of Carry-Over Effects In the preceding section, when we computed the overall estimate of the treatment effect in Equation 13.55, we assumed there was no carry-over effect. A carry-over effect is present when the true treatment effect is different for subjects in group A than for subjects in group B. Copyright 2010 Cengage Learning, Inc. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part.

13.12  ■  The Cross-Over Design   671

Example 13.58

Sports Medicine  Suppose Motrin is very effective in relieving pain from tennis elbow and the pain relief is long-lasting (relief continues even after the patients stop taking the medication, whereas placebo has no effect on pain). In this case, the difference between Motrin- and placebo-treated patients is greater during the first treatment period than during the second treatment period. Another way of stating this is that the difference between Motrin and placebo is smaller for patients in group A than for patients in group B. This is because of the carry-over effect of Motrin taken in the first period into the second period. How can we identify such carry-over effects? Notice that in Example 13.58, if there is a carry-over effect, then the average response for patients in group A over the two periods will be greater than for patients in group B. This forms the basis for our test for identifying carry-over effects.

Equation 13.56

Assessment of Carry-Over Effects in Cross-Over Studies Let xijk represent the score for the jth patient in the ith group during the kth period. Define xij = ( xij1 + xij 2 ) 2 = average response over both periods for the jth ni

patient in the ith group and xi = ∑ xij ni = average response over all patients in j =1

the ith group over both treatment periods. We assume that xij ~ N (µi , σ 2 ) , i = 1, 2; j = 1, . . ., ni. To test the hypothesis H0: µ1 = µ2 vs. H1: µ1 ≠ µ2: (1) We compute the test statistic x1 − x2

t=

1 1 s2  +   n1 n2 

    where s2 =

(n1 − 1) s12 + (n2 − 1) s22 n1 + n2 − 2

and ni

si2 = ∑ ( xij − xi )2 (ni − 1), i = 1, 2

j =1

(2) If t > t n If t n

1 + n 2 − 2 ,1− α / 2

1 + n 2 − 2 ,α / 2

or t < t n

1 + n 2 − 2 ,α / 2

≤ t ≤ tn

1 + n 2 − 2 ,1− α / 2

we reject H0.

, we accept H0.

(3) The exact p-value = 2 × Pr (t n1 + n2 − 2 > t ) if t > 0 = 2 × Pr (t n1 + n2 − 2 < t ) if t ≤ 0

Example 13.59

Solution

Assess whether there are any carry-over effects, using the tennis-elbow data in Example 13.58. We refer to Table 13.33 and note that x1 = 3.798, s1 = 1.060, n1 = 42 x2 = 3.536, s2 = 1.056, n2 = 42

s2 =

41 (1.060 ) + 41 (1.056 ) = 1.119 82 2

2

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672   C H A P T E R 13 

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Therefore, the test statistic is given by t=

3.798 − 3.536

1  1 + 1.119   42 42  0.262 = = 1.135 ~ t 82 under H 0 0.231

Because t > 1.046 = t60, .85 > t82, .85, it follows that p < 2 × (1 − .85) = .30. Because t < 1.289 = t120, .90 < t82, .90, it follows that p > 2 × (1 − .90) = .20. Therefore, .20 < p < .30, and there is no significant carry-over effect. We can also gain some insight into possible carryover effects by referring to Table 13.33. We see the treatment benefit during period 1 is 3.833 − 2.857 = 0.976, whereas the treatment benefit during period 2 is 4.214 − 3.762 = 0.452. Thus, there is some treatment benefit during each period. The degree of benefit is larger in period 1 but is not significantly larger. In general, the power of the test to detect carry-over effects is not great. Also, the effect of possible carry-over effects on the ability to identify overall treatment benefit can be large. Therefore, some authors [25] recommend that the p-value for declaring significant carry-over effects be set at .10 rather than the usual .05. Even with this more relaxed criterion for achieving statistical significance, we still don’t declare a significant carry-over effect with the tennis-elbow data. Another important insight into the data is revealed by looking for period effects. For example, in Table 13.33 the effect of period 2 vs. period 1 is 4.214 − 3.833 = 0.381 while subjects were on Motrin and 3.762 − 2.857 = 0.905 while subjects were on placebo. Thus subjects are experiencing less pain in period 2 compared with period 1 regardless of which medication they are taking. What can we do if we identify a significant carry-over effect using Equation 13.56? In this case, the second-period data are not useful to us because they provide a biased estimate of treatment effects, particularly for subjects who were on active drug in the first period and on placebo in the second period, and we must base our comparison of treatment efficacy on first-period data only. We can use an ordinary two-sample t test for independent samples based on the first-period data. This test usually has less power than the cross-over efficacy test in Equation 13.55, or requires a greater sample size to achieve a given level of power (see Example 13.60).

Sample-Size Estimation for Cross-Over Studies A major advantage of cross-over studies is that they usually require many fewer subjects than the usual randomized clinical trials (which have only 1 period), if no carry-over effect is present. The sample-size formula is as follows.

Equation 13.57

Sample-Size Estimation for Cross-Over Studies Suppose we want to test the hypothesis H 0 : ∆ = 0 vs. H 1 : ∆ ≠ 0 using a two-sided test with significance level α, where ∆ = underlying treatment benefit for treatment 1 vs. treatment 2 using a cross-over study. If we require a power of 1 − β, and we expect to randomize an equal number of subjects to each group (group A receives treatment 1 in period 1 and treatment 2 in period 2; group B receives treatment 2 in period 1 and treatment 1 in period 2), then the appropriate sample size per group = n, where

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13.12  ■  The Cross-Over Design   673

n=

(

σ 2d z1− α /2 + z1− β 2 ∆2

)

2

and σ d2 = variance of difference scores = variance of (response on treatment 1 – response on treatment 2). This sample-size formula is only applicable if no carry-over effects (as defined in Definition 13.21) are present.

Example 13.60

Hypertension  Suppose we want to study the effect of postmenopausal hormone (PMH) use on level of diastolic blood pressure (DBP). We intend to enroll n postmenopausal women per group. Women in group A will get PMH pills in period 1 (4 weeks) and placebo pills in period 2 (4 weeks). Women in group B will get placebo pills in period 1 and PMH pills in period 2. There will be a 2-week washout period between each 4-week active-treatment period. Women will have their blood pressure measured at the end of each active-treatment period based on a mean of 3 readings at a single visit. If we anticipate a 2-mm Hg treatment benefit and the within-subject variance of the difference in mean DBP between the two periods is estimated to be 31, based on pilot-study results, and we require 80% power, then how many participants need to be enrolled in each group?

Solution

We have σd2 = 31, α = .05, β = .20, ∆ = 2. Thus, from Equation 13.57, we have z1−α/2 = z.975 = 1.96, z1−β = z.80 = 0.84 and 31 (1.96 + 0.84 ) 2( 4 ) 31(7.84) = = 30.4 8

n=

2

Thus we need to enroll 31 participants per group, or 62 participants overall, to achieve an 80% power using this design, if no carry-over effect is present. An alternative design for such a study is the so-called parallel-group design, in which we randomize participants to either PMH or placebo, measure their DBP at baseline and at the end of 4 weeks of follow-up, and base the measure of efficacy for an individual patient on (mean DBP at follow-up – mean DBP at baseline). The sample size needed for such a study is given in Equation 8.27 by n = sample size per group =

2 σ 2d ( z1− α / 2 + z1− β )2

∆2 = 4 × sample size per group for cross-over study = 4(30.4) = 121.5 = 122 participants per group or 244 partiicipants overall

σd2 is the within-subject variance of the difference in mean DBP (i.e., mean DBP follow-up – mean DBP baseline) = 31. Clearly, the cross-over design is much more efficient, if the assumption of no carry-over effects is viable. It is important in planning cross-over studies to include a baseline measurement prior to the active-treatment period. Although the baseline measurement is usually not useful in analyzing crossover studies, it can be very useful if it is subsequently found that a carry-over effect is present. In this case, one could use a parallel-group design based on the difference between period 1 scores and baseline as the outcome measure, rather than simply

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674   C H A P T E R 13 

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the period 1 scores. The difference score generally has less variability than the period 1 score because it represents within-person variability rather than both betweenperson and within-person variability as represented by the period 1 score. In this section, we have examined cross-over designs. Under a cross-over design, each subject receives both treatments but at different times. Randomization determines treatment order for individual subjects. A cross-over design can be more efficient (i.e., require fewer subjects) than a traditional parallel-group design if no carry-over effects are present but will be underpowered if unanticipated carry-over effects are present because the second-period data cannot be validly used. In the latter case, the power can be somewhat improved if a baseline score is obtained before subjects receive either treatment. It is useful to consider the types of studies in which a cross-over design may be appropriate. In particular, studies based on objective endpoints such as blood pressure, in which the anticipated period of drug efficacy occurs over a short time (i.e., weeks rather than years) and is not long-lasting after drug is withdrawn, are best suited for a cross-over design. However, most phase III clinical trials (i.e., definitive studies used by the FDA as a basis for establishing drug efficacy for new pharmaceutical products or existing products being tested for a new indication) are long-term studies that violate one or more of the preceding principles. Thus, in general, phase III clinical trials usually use the more traditional parallel-group design.

REVIEW

REVIEW QUESTIONS 13H

1

What is the difference between a cross-over design and a parallel-group design?

2

What is a carry-over effect?

3

Suppose there is no carry-over effect. Which design requires a larger sample size, a cross-over design or a parallel-group design?

13.13 Clustered Binary Data Introduction The two-sample test for the comparison of binomial proportions, discussed in Section 10.2, is one of the most frequently cited statistical procedures in applied research. An important assumption underlying this methodology is that the observations within the respective samples are statistically independent.

Example 13.61

Infectious Disease, Dermatology  Rowe et al. [26] reported on a clinical trial of topically applied 3% vidarbine vs. placebo in treating recurrent herpes labialis. During the medication phase of the trial, the characteristics of 53 lesions observed on 31 patients receiving vidarbine were compared with the characteristics of 69 lesions observed on 39 patients receiving placebo. A question of interest is whether the proportion of lesions showing significant shrinkage in the two groups is the same after 7 days. This requires development of a test procedure that adjusts for dependencies in response among lesions observed on the same patient.

Hypothesis Testing We assume the sample data arise from two groups of individuals, n1 individuals in group 1 and n2 individuals in group 2. Suppose that individual j in group i (i = 1, 2)

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13.13  ■  Clustered Binary Data   675

contributes mij observations to the analysis, j = 1, 2, . . ., ni and M i = ∑ j =i 1 mij denotes n

the total number of observations in group i, each classified as either a success or a failure. Let aij denote the observed number of successes for individual j in group i, and define Ai = ∑ j =i 1 aij . Then the overall proportion of successes in group i may be n

n denoted by pˆi = Ai / M i = ∑ j =i 1 mij pˆij / M i , where pˆij = aij / mij denotes the observed

success rate for individual j in group i. We further denote the total number of individuals as N = n1 + n2 and the total number of observations as M = M1 + M2. Let pi denote the underlying success rate among observations in group i, i = 1, 2. Then we want to test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2, assuming the samples are large enough that the normal approximation to the binomial distribution is valid. An estimate of the degree of clustering within individuals is given by the intra­ class correlation for clustered binary data. This is computed in a similar manner as for normally distributed data as given in Section 12.9. The mean square errors between and within individuals, respectively, are given in this case by 2

ni

(

MSB = ∑ ∑ mij pˆij − pˆi i =1 j =1 2

ni

(

MSW = ∑ ∑ aij 1 − pˆij i =1 j =1

)

2

(N − 2)

) (M − N )

The resulting estimate of intraclass correlation is given by

ˆ = ( MSB − MSW ) /[ MSB + (mA − 1) MSW ] ρ where

2  ni   mA =  M − ∑  ∑ mij2 / M i      i =1  j =1

(N − 2) ni

The clustering correction factor in group i may now be defined as Ci = ∑ mijCij / M i , j =1 ˆ. where Cij = 1 + mij − 1 ρ The clustering correction factor is sometimes called the design effect. Notice that if the intraclass correlation coefficient is 0, then no clustering is present and the design effects in the two samples are each 1. If the intraclass correlation coefficient is > 0, then the design effects are > 1. The design effects in the two samples (C1, C2) are used as correction factors to modify the standard test statistic comparing two binomial proportions (Equation 10.3) for clustering effects. We have the following test procedure.

(

Equation 13.58

)

Two-Sample Test for Binomial Proportions (Clustered Data Case) Suppose we have two samples consisting of n1 and n2 individuals, respectively, where the jth individual in the ith group contributes mij observations to the analysis, of which aij are successes. To test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2, (1) We compute the test statistic

  C C  z =  pˆ1 − pˆ2 −  1 + 2    2 M1 2 M 2       

ˆ ˆ(C1 / M1 + C2 / M 2 ) pq

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676   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

where pˆij = aij mij ni

pˆi = ∑ aij j =1 2

ni

ni

ni

∑ mij = ∑ mij pˆij ∑ mij j =1

ni

j =1

2

pˆ = ∑ ∑ aij

ni

j =1

2

2

i =1

i =1

∑ ∑ mij = ∑ Mi pˆi ∑ Mi , qˆ = 1 − pˆ

i =1 j =1

i =1 j =1

ni

M i = ∑ mij j =1 ni

Ci = ∑ mijCij M i j =1

)

(

ˆ Cij = 1 + mij − 1 ρ ˆ = ( MSB − MSW )  MSB + ( mA − 1) MSW  ρ 2

ni

(

MSB = ∑ ∑ mij pˆij − pˆi i =1 j =1 2

ni

(

    MSW = ∑ ∑ aij 1 − pˆij i =1 j =1

)

)

2

(N − 2)

(M − N )

2  ni   mA =  M − ∑  ∑ mij2 / M i      i =1  j =1

(N − 2)

2

N = ∑ ni i =1

(2) To test for significance, we reject H0 if |z| > z1−α/2, where z1−α/2 is the upper α/2 percentile of a standard normal distribution. (3) An approximate 100% × (1 − α) CI for p1 − p2 is given by pˆ1 − pˆ2 − [C1 (2 M1 ) + C2 (2 M 2 )] ± z1−α 2 pˆ1qˆ1 C1 M1 + pˆ2 qˆ2 C2 M 2 if pˆ1 > pˆ2     pˆ1 − pˆ2 + [C1 (2 M1 ) + C2 (2 M 2 )] ± z1− α 2 pˆ1qˆ1 C1 M1 + pˆ2 qˆ2 C2 M 2 if pˆ1 ≤ pˆ2 ˆ ˆ / C1 ≥ 5 and M 2 pq ˆ ˆ / C2 ≥ 5 . (4) This test should only be used if M1 pq

Example 13.62

Dentistry  A longitudinal study of caries lesions on the exposed roots of teeth was reported in the literature [27]. Forty chronically ill subjects were followed for development of root lesions over a 1-year period. The data are given in Table 13.34. Assess whether the male patients had a higher incidence of surfaces with root lesions than did female patients over this time period.

Solution

We note that 6 of 27 (22.2%) surfaces among 11 male patients developed root lesions compared with 6 of 99 (6.1%) surfaces among 29 female patients. The standard normal deviate test statistic (Equation 10.3) for comparing these two proportions is given by

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13.13  ■  Clustered Binary Data   677

  1 1  z =  pˆ1 − pˆ2 −  +  M M 2 2  1 2  

ˆ ˆ(1 / M1 + 1 / M 2 ) pq

  1 1   =  .2222 − .0606 −  + (12 / 126 ) (114 / 126 ) (1 / 27 + 1 / 99)    2 ( 27) 2 ( 99)   = .1380 / .0637 = 2.166 ~ N ( 0,1) under H 0 which yields a p-value of 2 × [1 − Φ(2.166)] = .030. However, application of this test procedure ignores the dependency of responses on different surfaces within the same patient. To incorporate this dependency, we use the test procedure in Equation ˆ, which is given as follows: 13.58. We must compute the intraclass correlation ρ

ˆ = ( MSB − MSW ) / [ MSB + (mA − 1) MSW ] ρ where 2 2 2 2 MSB = 4 ( 0 4 − .2222 ) + . . . + 2 ( 0 2 − .2222 ) + 2 (1 2 − .0606 ) + . . . + 2 ( 0 2 − .0606 )  38   = 6.170 / 38 = 0.1624

MSW =  0 (1 − 0 4 ) + . . . + 0 (1 − 0 2 ) ( 27 + 99 − 40 ) = 4.133 86 = 0.0481 mA = 126 − (77 27 + 403 99) ( 40 − 2 ) = (126 − 6.923) 38 = 119.077 38 = 3.134

ˆ = ( 0.1624 − 0.0481) [ 0.1624 + ( 3.134 − 1) 0.0481] ρ

= 0.1143 0.2649 = .431 To compute the adjusted test statistic, we need to estimate C1, C2, where 2.294 ( 4 ) + . . . + 1.431 ( 2 ) 4+ . . . +2 48.573 799 = = 1.7 27 1.431 ( 2 ) + . . . + 1.431 ( 2 ) C2 = 2+ . . . +2 230.166 = 2.325 = 99 C1 =

Thus we have the adjusted test statistic  1.799 2.325  .2222 − .0606 −  +   2 ( 27) 2 ( 99)  z= (12 126 ) (114 126 ) (1.799 27 + 2.325 99) =

=

.1166 .08617 (.09011) .1166 = 1.323 .0881

This yields a two-tailed p-value of 2 × [1 − Φ(1.323)] = 2 × (.0930) = .186, which is not statistically significant. Thus the significance level attained from an analysis that ignores the dependency among surfaces within the same patient (p = .030)

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678   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Table 13.34

Longitudinal data on development of caries lesions over a 1-year period

ID

Age

Sex

Lesions

Males

1 5 6 7 8 11 15 18 30 32 35

71 70 65 53 71 74 81 64 40 78 79

M M M M M M M M M M M

0 1 2 0 2 0 0 0 0 1 0

4 1 2 2 4 3 3 3 1 2 2

Total Females

11 2 3 4 9 10 12 13 14 16 17 19 20 21 22 23 24 25 26 27 28 29 31 33 34 36 37 38 39 40

80 83 86 69 59 88 36 60 71 80 59 65 85 72 58 65 59 45 71 82 48 67 80 69 85 77 71 85 52

F F F F F F F F F F F F F F F F F F F F F F F F F F F F F

6 1 1 0 1 0 0 1 0 0 0 0 0 0 0 0 0 0 0 0 2 0 0 0 0 0 0 0 0 0

27

Total

29

6

99

Surfaces

2 6 8 5 4 4 2 4 4 4 6 2 4 4 2 3 2 2 4 2 2 2 2 4 4 4 3 2 2

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13.13  ■  Clustered Binary Data   679

is considerably lower than the true significance level attained from the procedure in Equation 13.58, which accounts for the dependence. The existence of such dependence is biologically sensible, given the common factors that affect the surfaces within a mouth, such as nutrition, saliva production, and dietary habits [28]. Using Equation 13.58, we can also develop a 95% CI for p1 − p2 = true difference in 1-year incidence of root caries between males and females, which is given as follows: .2222 (.7778) (1.799) .0606 (.9394 ) ( 2.325) + 27 99 = .1166 ± 1.96 (.1134 )

.1166 ± 1.96

= .1166 ± .2222 = ( −.106, .339)

Note that the inference procedure in Equation 13.58 reduces to the standard ˆ = 0 (i.e., Equation 10.3), or when mij = 1, j = 1, two-sample inference procedure when ρ 2, . . . , ni; i = 1, 2. Finally, note that if all individuals in each group contribute exactly the same number of sites (m), then the test procedure in Equation 13.58 reduces as follows:

Equation 13.59

Two-Sample Test for Binomial Proportions (Equal Number of Sites per Individual) If each individual in each of two groups contributes m observations, then to test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2, perform the following procedure: (1) Let

[1 + (m − 1) ρˆ ]  1 + 1  pˆ1 − pˆ2 −  M 2 M 2  1 1 z= × ˆ ˆ 1 + (m − 1)ρ pqˆ (1 M1 + 1 M 2 )     ˆ are defined in Equation 13.58. where Mi = ni m, i = 1, 2, and pˆi, i = 1, 2, and ρ (2) To test for significance, we reject H0 if |z| > z1− α/2, where z1− α/2 is the upper α/2 percentile of a standard normal distribution. (3) An approximate 100% × (1 − α) CI for p1 − p2 is given by  [1 + (m − 1) ρˆ ] (1 M + 1 M ) ± z  pˆ1 − pˆ2 − 1 2 1− α 2 2  if pˆ1 > pˆ2

 [1 + (m − 1) ρˆ ] (1 M + 1 M ) ± z  pˆ1 − pˆ2 + 1 2 1− α 2 2  if pˆ1 ≤ pˆ2

[1 + (m − 1) ρˆ ] ( pˆ1qˆ1

 M1 + pˆ2 qˆ2 M 2  

[1 + (m − 1) ρˆ ] ( pˆ1qˆ1

 M1 + pˆ2 qˆ2 M 2  

)

)

ˆ ˆ [1 + ( m − 1) ρ ˆ ] ≥ 5 and (4) This test should only be used if M1 pq ˆ ˆ [1 + ( m − 1) ρ ˆ ] ≥ 5. M 2 pq

Power and Sample Size Estimation for Clustered Binary Data Suppose we want to test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2. If we assume there is independence among the observations within an individual and there are n1 observations in group 1 and n2 observations in group 2, then the power is given by Φ(z1 − β ), where

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680   C H A P T E R 13 

  Design and Analysis Techniques for Epidemiologic Studies

Equation 13.60

z1− β = p1 − p2

p1q1 n1 + p2 q2 n2 − z1− α 2 pq (1 n1 + 1 n2 )

(Also see Equation 10.15.) In the case of clustered binary data, we replace n1 and n2 by the effective number of independent observations per group, or

Equation 13.61

ni = M i Ci , i = 1, 2

where Ci is defined in Equation 13.58. To compute sample size, we specify 1 − β and solve for n1 and n2 as a function of 1 − β. The results are summarized as follows.

Equation 13.62

Power and Sample Size Estimation for Comparing Binomial Proportions Obtained from Clustered Binary Data  Suppose we wish to test the hypothesis H0: p1 = p2 vs. H1: p1 ≠ p2. If we intend to use a two-sided test with significance level α and have available ni individuals from the ith group, i = 1, 2, where each individual contributes m observations with intraclass correlation = ρ, then the power of the study given by Φ(z1 − β ), where z1−β = p1 − p2

− z1−α 2

C ( p1q1 M1 + p2 q2 M 2 ) p q (1 M1 + 1 M 2 )

p1q1 M1 + p2 q2 M 2

where C = 1 + (m − 1) ρ, Mi = ni m and p = (n1 p1 + n2  p2)/(n1 + n2). If we require a given level of power = 1 − β and it is anticipated that n2 = kn1, then the required sample size in each group is given by n1 = C  z1−α /2 pq (1 + 1 k ) + z1−β p1q1 + p2 q2 k     

2

(m p − p ), n = kn 2

1

2

2

1

Example 13.63

Dentistry  A clinical trial is planned of a new therapeutic modality for the treatment of periodontal disease. The unit of observation is the surface within the patient’s mouth. Two groups of patients, one randomly assigned to the new modality and the other randomly assigned to a standard treatment, will be monitored at 6 months after therapy to compare the percentage of surfaces over all patients that lose attachment of teeth to the gum surface. It is anticipated from previous studies that approximately two-thirds of teeth from surfaces treated with the standard modality will lose attachment, and a reduction of this proportion to half would be considered clinically significant. Sup