Elementary statistics : a step by step approach : a brief version /
Allan G. Bluman, professor emeritus, Community College of Allegheny County.
- Seventh edition.
- 1 volume (various pagings) : illustrations ; 26 cm
Includes index About the Author
Allan G. Bluman is a professor emeritus at the Community College of Allegheny County, South Campus, near Pittsburgh. He has taught mathematics and statistics for over 35 years. He received an Apple for the Teacher award in recognition of his bringing excellence to the learning environment at South Campus. He has also taught statistics for Penn State University at the Greater Allegheny (McKeesport) Campus and at the Monroeville Center. He received his master's and doctor's degrees from the University of Pittsburgh.
Chapter 1: The Nature of Probability and Statistics 1.1, Descriptive and Inferential Statistics 1.2, Variables and Types of Data 1.3, Data Collection and Sampling Techniques 1.4, Observational and Experimental Studies 1.5, Uses and Misuses of Statistics 1.6, Computers and Calculators Chapter 2: Frequency Distributions and Graphs 2.1, Organizing Data 2.2, Histograms, Frequency Polygons, and Ogives 2.3, Other Types of Graphs 2.4, Paired Data and Scatter Plots Chapter 3: Data Description 3.1, Measures of Central Tendency 3.2, Measures of Variation 3.3, Measures of Position 3.4, Exploratory Data Analysis Chapter 4: Probability and Counting Rules 4.1, Sample Spaces and Probability 4.2, The Addition Rules for Probability 4.3, The Multiplication Rules and Conditional Probability 4.4, Counting Rules 4.5, Probability and Counting Rules Chapter 5: Discrete Probability Distributions 5.1, Probability Distributions 5.2, Mean, Variance, Standard Deviation, and Expectation 5.3, The Binomial Distribution Chapter 6: The Normal Distribution 6.1, Normal Distributions 6.2, Applications of the Normal Distributions 6.3, The Central Limit Theorem 6.4, The Normal Approximation to the Binomial Distribution Chapter 7: Confidence Intervals and Sample Size 7.1, Confidence Intervals for the Mean When σ Is Known 7.2, Confidence Intervals for the Mean When σ Is Unknown 7.3, Confidence Intervals and Sample Size for Proportions 7.4, Confidence Intervals for Variances and Standard Deviations Chapter 8: Hypothesis Testing 8.1, Steps in Hypothesis Testing ? Traditional Method 8.2, z Test for a Mean 8.3, t Test for a Mean 8.4, z Test for a Proportion 8.5, Chi-Square Test for a Variance or Standard Deviation 8.6, Confidence Intervals and Hypothesis Testing Chapter 9: Testing the Difference Between Two Means, Two Proportions, and Two Variances 9.1, Testing the Difference Between Two Means: Using the z Test 9.2, Testing the Difference Between Two Means of Independent Samples: Using the t Test 9.3, Testing the Difference Between Two Means: Dependent Samples 9.4, Testing the Difference Between Two Variances Chapter 10: Correlation and Regression 10.1, Correlation 10.2, Regression 10.3, Coefficient of Determination and Standard Error of the Estimate Chapter 11: Chi-Square and Analysis of Variance (ANOVA) 11.1, Test for Goodness of Fit 11.2, Test Using Contingency Tables 11.3, Analysis of Variance (ANOVA) Appendix A: Tables Appendix B: Data Bank Appendix C: Glossary Appendix D: Photo Credits Appendix E: Selected Answers