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82. Let X1,X2,... be independent continuous random variables with a common distribution function F and density f

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82. Let X1,X2,... be independent continuous random variables with a common distribution function F and density f = F

, and for k 1 let Nk = min{n k: Xn = kth largest of X1,...,Xn}

(a) Show that P{Nk = n} = k−1 n(n−1),n k.

(b) Argue that?

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