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102年 - 102 淡江大學 轉學考 機率與統計學#53094
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題組內容
4. (20%) Let X
1
, •••, X
n
be a random sample from the uniform distribution over the interval
I
.
(b) + 1]. Find the MLE for 6.
其他申論題
(a) Determine the joint and marginal probability distributions of U and V.
#193243
(b) Find out whether U and V are dependent or independent.
#193244
3. (15%) Suppose we choose arbitrarily a point from the square with corners at (2,1), (3,1), (2,2), and (3,2). The random variable X is the area of the triangle with its corners at (2,1), (3,1), and the chosen point. Compute E[X],
#193245
(a) IF I = [a,β] (with a andβunknown, a <β. Find the maximum likelihood estimates (MLEs) for a and β.
#193246
(a) Find the decision rule with the approximate size a of the test.
#193248
(b) Find the approximate power function of the test.
#193249
【已刪除】6. (15%) Suppose we have a dataset x1,...,xn that may be modeled as the realization of a random sample X1, • • •, Xn from an Exp distribution, where A is unknown. LetS n = X1+••• . + Xn. Construct a 90% confidence interval for A when n = 20. (The quantiles of the Gamrna(20,1) distribution are qo.o5 = 13.25 andqo.95 — 27.88. Denote the value of the sample mean by 亍20).
#193250
沒有 【段考】高二英文上學期 權限,請先開通.
#193251
沒有 【段考】高二英文上學期 權限,請先開通.
#193252
沒有 【段考】高二英文上學期 權限,請先開通.
#193253
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