| 000 | 04133cam a2200205 4500 | ||
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| 001 | 8501 | ||
| 005 | 20181127190116.0 | ||
| 008 | 000215s2001 njua b 001 0 eng | ||
| 020 | _a0139223037 | ||
| 082 | 0 | 0 |
_a519.5 _221 |
| 100 | 1 | _aLarsen, Richard J. | |
| 245 | 1 | 3 |
_aAn introduction to mathematical statistics and its applications / _cRichard J. Larsen, Morris L. Marx. |
| 250 | _a3rd ed. | ||
| 260 |
_aUpper Saddle River, NJ : _bPrentice Hall, _cc2001. |
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| 300 |
_ax, 790 p. : _bill. ; _c24 cm. |
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| 504 | _aIncludes bibliographical references (p. 776-783) and index. | ||
| 505 |
_aCONTENTS : Introduction. A Brief History. Some Examples. A Chapter Summary.2. Probability. Sample Spaces and the Algebra of Sets. The Probability Function. Discrete Probability Functions. Continuous Probability Functions. Conditional Probability. Independence. Repeated Independent Trials. Combinatorics. Combinatorial Probability.3. Random Variables. The Probability Density Function. The Hypergeometric and Binomial Distributions. The Cumulative Distribution Function. Joint Densities. Independent Random Variables. Combining and Transforming Random Variables. Order Statistics. Conditional Densities. Expected Values. Properties of Expected Values. The Variance. Properties of Variances. Chebyshev's Inequality. Higher Moments. Moment-Generating Functions. Appendix 3.A.1: MINITAB Applications.4. Special Distributions. The Poisson Distribution. The Normal Distribution. The Geometric Distribution. The Negative Binomial Distribution. The Gamma Distribution. Appendix 4.A.1: MINITAB Applications. Appendix 4.A.2: A Proof of the Central Limit Theorem.5. Estimation. Estimating Parameters: The Method of Maximum Likelihood and the Method of Moments. Interval Estimation. Properties of Estimators. Minimum-Variance Estimators: The Cramer-Rao Lower Bound. Sufficiency. Consistency. Appendix 5.A.1: MINITAB Applications.6. Hypothesis Testing. The Decision Rule. Testing Binomial Data-H0: p = p 0. Type I and Type II Errors. A Notion of Optimality: The Generalized Likelihood Ratio.7. The Normal Distribution. Point Estimates for ...m and ...s2. The ...c2 Distribution; Inferences about ...s2. The F and t Distributions. Drawing Inferences about ...m. Appendix 7.A.1: MINITAB Applications. Appendix 7.A.2: Some Distribution Results for Y and S 2. Appendix 7.A.3: A Proof of Theorem 7.3.5. A Proof That the One-Sample t Test Is a GLRT.8. Types of Data: A Brief Overview. Classifying Data.9. Two-Sample Problems. Testing H 0: ...mx = ...mY-The Two-Sample t Test. Testing H0: ...s2x = ...s2Y-The F Test. Binomial Data: Testing H 0: px = py. Confidence Intervals for the Two-Sample Problem. Appendix 9.A.1: A Derivation of the Two-Sample t Test (A Proof of Theorem 9.2.2.). Appendix 9.A.2: Power Calculations for a Two-Sample t Test. Appendix 9.A.3: MINITAB Applications.10. Goodness-of-Fit Tests. The Multinomial Distribution. Goodness-of-Fit Tests: All Parameters Known. Goodness-of-Fit Tests: Parameters Unknown. Contingency Tables. Appendix 10.A.1: MINITAB Applications.11. Regression. The Method of Least Squares. The Linear Model. Covariance and Correlation. The Bivariate Normal Distribution. Appendix 11.A.1: MINITAB Applications. Appendix 11.A.2: A Proof of Theorem 11.3.3.12. The Analysis of Variance. The F Test. Multiple Comparisons: Tukey's Method. Testing Subhypotheses with Orthogonal Contrasts. Data Transformations. Appendix 12.A.1: MINITAB Applications. Appendix 12.A.2: A Proof of Theorem 12.2.2. Appendix 12.A.3: The Distribution of <$E{ down 12 SSTR/ up 12 (k-1)} over { down 12 SSE/ up 12 (n- k)}> When H1 Is True.13. Randomized Block Designs. The F Test for a Randomized Block Design. The Paired t Test. Appendix 13.A.1: MINITAB Applications.14. Nonparametric Statistics. The Sign Test. The Wilcoxon Signed Rank Test. The Kruskal-Wallis Test. The Friedman Test. Appendix 14.A.1: MINITAB Applications.Appendix: Statistical Tables. Answers to Selected Odd-Numbered Questions. Bibliography. Index. _g _r _t |
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| 650 | 0 | _aMathematical statistics. | |
| 700 | 1 | _aMarx, Morris L. | |
| 999 |
_c7355 _d7355 |
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