| Description |
1 online resource |
| Series |
Wiley Series in Probability and Statistics |
| Contents |
1.6.5 Transformations1.7 JOINT DISTRIBUTIONS, CONDITIONAL DISTRIBUTIONS AND INDEPENDENCE; 1.7.1 Joint Distributions; 1.7.2 Conditional Expectations: General Definition; 1.7.3 Independence; 1.8 MOMENTS AND RELATED FUNCTIONALS; 1.9 MODES OF CONVERGENCE; 1.10 WEAK CONVERGENCE; 1.11 LAWS OF LARGE NUMBERS; 1.11.1 The Weak Law of Large Numbers (WLLN); 1.11.2 The Strong Law of Large Numbers (SLLN); 1.12 CENTRAL LIMIT THEOREM; 1.13 MISCELLANEOUS RESULTS; 1.13.1 Law of the Iterated Logarithm; 1.13.2 Uniform Integrability; 1.13.3 Inequalities; 1.13.4 The Delta Method; 1.13.5 The Symbols op and Op |
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1.13.6 The Empirical Distribution and Sample QuantilesPART II: EXAMPLES; PART III: PROBLEMS; PART IV: SOLUTIONS TO SELECTED PROBLEMS; 2 Statistical Distributions; PART I: THEORY; 2.1 INTRODUCTORY REMARKS; 2.2 FAMILIES OF DISCRETE DISTRIBUTIONS; 2.2.1 Binomial Distributions; 2.2.2 Hypergeometric Distributions; 2.2.3 Poisson Distributions; 2.2.4 Geometric, Pascal, and Negative Binomial Distributions; 2.3 SOME FAMILIES OF CONTINUOUS DISTRIBUTIONS; 2.3.1 Rectangular Distributions; 2.3.2 Beta Distributions; 2.3.3 Gamma Distributions; 2.3.4 Weibull and Extreme Value Distributions |
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2.3.5 Normal Distributions2.3.6 Normal Approximations; 2.4 TRANSFORMATIONS; 2.4.1 One-to-One Transformations of Several Variables; 2.4.2 Distribution of Sums; 2.4.3 Distribution of Ratios; 2.5 VARIANCES AND COVARIANCES OF SAMPLE MOMENTS; 2.6 DISCRETE MULTIVARIATE DISTRIBUTIONS; 2.6.1 The Multinomial Distribution; 2.6.2 Multivariate Negative Binomial; 2.6.3 Multivariate Hypergeometric Distributions; 2.7 MULTINORMAL DISTRIBUTIONS; 2.7.1 Basic Theory; 2.7.2 Distribution of Subvectors and Distributions of Linear Forms; 2.7.3 Independence of Linear Forms |
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2.8 DISTRIBUTIONS OF SYMMETRIC QUADRATIC FORMS OF NORMAL VARIABLES2.9 INDEPENDENCE OF LINEAR AND QUADRATIC FORMS OF NORMAL VARIABLES; 2.10 THE ORDER STATISTICS; 2.11 t-DISTRIBUTIONS; 2.12 F-DISTRIBUTIONS; 2.13 THE DISTRIBUTION OF THE SAMPLE CORRELATION; 2.14 EXPONENTIAL TYPE FAMILIES; 2.15 APPROXIMATING THE DISTRIBUTION OF THE SAMPLE MEAN: EDGEWORTH AND SADDLEPOINT APPROXIMATIONS; 2.15.1 Edgeworth Expansion; 2.15.2 Saddlepoint Approximation; PART II: EXAMPLES; PART III: PROBLEMS; PART IV: SOLUTIONS TO SELECTED PROBLEMS; 3 Sufficient Statistics and the Information in Samples; PART I: THEORY |
| Summary |
"This book presents examples that illustrate the theory of mathematical statistics and details how to apply the methods for solving problems"-- Provided by publisher |
| Bibliography |
Includes bibliographical references and index |
| Notes |
Print version record and CIP data provided by publisher |
| Subject |
Mathematical statistics -- Problems, exercises, etc
|
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MATHEMATICS -- Probability & Statistics -- General.
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Mathematical statistics
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| Genre/Form |
Problems and exercises
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| Form |
Electronic book
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| LC no. |
2013035576 |
| ISBN |
9781118605837 |
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1118605837 |
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9781118606001 |
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1118606000 |
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1118605500 |
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9781118605509 |
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