Introduction to Mathematical StatisticsThe fifth edition of text offers a careful presentation of the probability needed for mathematical statistics and the mathematics of statistical inference. Offering a background for those who wish to go on to study statistical applications or more advanced theory, this text presents a thorough treatment of the mathematics of statistics. |
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Page 157
... random sample from the normal distribution under consideration . Once the holes have been drilled and the diameters measured , the 20 numbers may be used , as will be seen later , to elicit information about μ and o2 The term " random ...
... random sample from the normal distribution under consideration . Once the holes have been drilled and the diameters measured , the 20 numbers may be used , as will be seen later , to elicit information about μ and o2 The term " random ...
Page 158
... sample of size n from a distribution that has p.d.f. f ( x ) = p2 ( 1 − p ) ... random sample from a given distribution . Next , we define two important statistics of this ... random 158 Distributions of Functions of Random Variables [ Ch . 4.
... sample of size n from a distribution that has p.d.f. f ( x ) = p2 ( 1 − p ) ... random sample from a given distribution . Next , we define two important statistics of this ... random 158 Distributions of Functions of Random Variables [ Ch . 4.
Page 201
... random sample of size 4 from the distribution having p.d.f. f ( x ) = e ̄ , 0 < x < ∞o , zero elsewhere . Find Pr ( 3 Y1 ) . 4.57 . Let X1 , X2 , X3 be a random sample from a distribution of the continuous type having p.d.f. f ( x ) ...
... random sample of size 4 from the distribution having p.d.f. f ( x ) = e ̄ , 0 < x < ∞o , zero elsewhere . Find Pr ( 3 Y1 ) . 4.57 . Let X1 , X2 , X3 be a random sample from a distribution of the continuous type having p.d.f. f ( x ) ...
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Common terms and phrases
A₁ A₂ Accordingly approximate best critical region C₁ C₂ chi-square distribution complete sufficient statistic conditional p.d.f. confidence interval Consider continuous type converges in probability correlation coefficient critical region defined degrees of freedom denote a random discrete type distribution function F(x distribution with mean distribution with p.d.f. distribution with parameters dx₁ equation Example Exercise g₁(y₁ gamma distribution given H₁ Hint hypothesis H independent random variables integral Let the random Let X1 Let Y₁ limiting distribution marginal p.d.f. matrix mean µ moment-generating function order statistics p.d.f. of Y₁ P(C₁ p₁ percent confidence interval Poisson distribution positive integer probability density functions probability set function r₁ random experiment random sample respectively sample space Section Show significance level simple hypothesis sufficient statistic t-distribution t₂ theorem unbiased estimator variance o² X₁ X₂ Y₁ Y₂ zero elsewhere μ₁ Σ Σ σ²