Probability and statistical inference for engineers : a first course / Cyrus Derman and Morton Klein.
Series University texts in the mathematical sciencesEditor: New York : Oxford University Press, c1959Descripción: xii, 144 p. : il. ; 20 cmTema(s): Probabilities | Mathematical statisticsOtra clasificación: 60-01 (62-01 62P30)Elements of set theory. Functions. Sum and product notations. The sample space. Random variables. Probability. Distribution functions. Distributions of special interest. Distributions of functions of random variables. Some descriptive properties of distributions. Joint distribution functions. Conditional probability. Statistical independence. The binomial distribution. Independent random variables. The law of large numbers. The central limit theorem. Approximations to distributions. Decisions with known distributions. Decisions with unknown distributions. Estimation. Decision rules. Principles of choice. Tests of hypotheses. Confidence interval estimation. Tables of the normal, $t$, and chi-square distributions.
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Libros | Instituto de Matemática, CONICET-UNS | Libros ordenados por tema | 60 D435 (Browse shelf) | Available | A-2590 |
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60 D313 Probability, induction and statistics : | 60 D313t Theory of probability : | 60 D313t Theory of probability : | 60 D435 Probability and statistical inference for engineers : | 60 D691 Stochastic processes / | 60 D814 How to gamble if you must ; | 60 D821 Problèmes d'optimisation en calcul des probabilités / |
Elements of set theory. Functions. Sum and product notations. The sample space. Random variables. Probability. Distribution functions. Distributions of special interest. Distributions of functions of random variables. Some descriptive properties of distributions. Joint distribution functions. Conditional probability. Statistical independence. The binomial distribution. Independent random variables. The law of large numbers. The central limit theorem. Approximations to distributions. Decisions with known distributions. Decisions with unknown distributions. Estimation. Decision rules. Principles of choice. Tests of hypotheses. Confidence interval estimation. Tables of the normal, $t$, and chi-square distributions.
MR, 21 #3036
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