# Data Matters: Conceptual Statistics for a Random World

ISBN: 978-0-470-41228-2

Jun 2008

625 pages

Select type: Paperback

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\$151.95

## Description

With an analytical approach that emphasizes concepts and comprehension, Data Matters provides a crucial introduction to statistics by preparing students to think critically about the most common statistics found in the natural and social sciences.  Real data and events taken from the daily news media bring relevance to the subject and turn the general reader into a critical and capable consumer of everyday statistics.   With its pleasant, conversational style, Data Matters  engages and interests students while it covers the basics and lays a foundation for further study in statistics.

This text fits into most non-major statistics courses—those intended primarily for the liberal arts or the humanities, or for quantitative literacy or quantitative reasoning courses. Perfect for students in non-mathematically oriented majors or for general education elective courses, Data Matters is also ideal for continuing education or adult education courses.

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Foreword by George Cobb vii
Preface
To the Instructor ix
To the Student xiii
Acknowledgments xiv
Introduction: Why Data Matters 1
Part I Statistics in the News 7
Basic Concepts of Statistical Thinking Presented
in the Context of Categorical Data
Chapter 1 Proportions in Samples, Proportions in Populations 8
1.1 The Most Popular News Statistics 9
Percentage, Proportions, Raw Counts, Pie Charts, Bar Charts
1.2 How Many People Are There? 36
U.S. and World Populations, Population Growth,
Proportional Changes, The Unemployment Rate, X-Y Plots
1.3 Things Vary, and Small Samples Vary the Most 54
The Law of Large Numbers
Chapter 2 The Pattern in Random Sample Proportions 73
2.1 Taking a Good Sample of a Population 74
Representative and Biased Samples, Random Sampling,
Self-Selected Samples
2.2 How Samples Vary 94
Histograms, Bell Curves
2.3 How Widely Samples Vary 111
The Standard Error of a Proportion, The Normal Distribution
Chapter 3 Making Inferences 132
3.1 Forecasting the Future 133
Prediction Intervals for Sample Proportions
3.2 What a Sample Reveals About a Population 150
Confidence Intervals for Proportions in Populations
3.3 The Story of Statistical Inference 170
Null Hypothesis, P-Value, Alpha, Significance
Chapter 4 Testing Locations and Differences of Proportions 194
4.1 Testing Where a Proportion Is 195
The Z-Test
4.2 How to Look for Differences in Chances 213
Cross-Tabulations, Correlation, The Null Hypothesis
of the Chi-Square Test
4.3 Checking for No Correlation with the Chi-Square Test 234
Chi-Square Distribution, Degrees of Freedom,
Correlation Is Not Causation
Chapter 5 Averages and Other Number Line Statistics in the News 257
5.1 Incomes and Other Quantities 258
Medians, Number Line Observations,Means
5.2 Which Tells the Truth—The Mean, the Median . . . or 281
the Weighted Mean?
5.3 Inflation and the Consumer Price Index 302
Part II Statistics in Science 317
Descriptive and Inferential Statistics for Continuous Data
Chapter 6 What Sample Data Distribution Reveals About the Population 318
6.1 Exploratory Data Analysis 319
Histograms, Stem-and-Leaf Plots, Box Plots
6.2 Describing Number Line Variation 338
Standard Deviation of Samples,Variance
6.3 How to See the Future 360
Prediction Intervals for Number Line Observations
and Sample Means, Standard Error of Means, Confidence
Intervals for Population Means, Central Limit Theorem
Chapter 7 Testing Treatments 378
7.1 A Cautionary Tale 380
William Gosset’s Troubles with the Z-Test and the T-Distribution,
The T-Test
7.2 How to Test Whether a Treatment Works 399
The Logic of Experiments, Correlational Studies
7.3 Variances Between and Within 413
Estimating the Population Variance from Variation
Within Groups and from Variation Between Group Means
Chapter 8 Analysis of Variance 431
8.1 Fisher’s Analysis of Variance 432
Calculating Fisher’s F-Value
8.2 What If the Data Are Not Normally Distributed? 451
The Effect of Nonconstant Variances and Non-normality on
ANOVA, Nonparametric Tests
8.3 American Counties 471
Correlation, Scatter Plots
Chapter 9 Best Lines 495
9.1 Lines 496
How to Calculate the Equation of a Line
9.2 Finding Best-Fitting Lines 512
The Least Squares Line
9.3 An Excellent Line 522
Calculating the Slope of the Regression Equation,
Standard Error and Confidence Interval for the Regression Equation
Chapter 10 Tests of Regression 544
10.1 How to Test the Regression Models 545
R2, Pearson’s r, A T-Test for the Regression Slope
10.2 What If the Assumptions of the Regression Test Are Not Valid? 568
Spearman’s Rho, Effect of Nonconstant Variances on
Correlation Tests, Effect of Non-normality on
Correlation Tests, Nonlinear Regression
Postscript: A Statistical Life 592
References 599
Index 609
Some Useful Equations 624
• Conversational tone: “talks” students through the development of statistical ideas using common, everyday language.
• Builds on common ideas (like how to buy a house) to teach even the most number-phobic student how to think quantitatively.
• Uses a logical mathematic progression to teach students how to think effectively.
• Each chapter contains a section called “Avoiding Common Misunderstandings” that takes Maxwell’s practical experience in a class room and enables students to avoid making common mistakes in the first place and to understand why.
• Each section includes exercises to reinforce the concepts introduced and includes answers to odd-numbered exercises.