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No. 2 Let H be the distribution function of a random variable Xn (n = 1, 2, ...), and suppose that there exists a function
No. 2 Let H be the distribution function of a random variable Xn (n = 1, 2, ...), and suppose that there exists a function H : R - R such that lim Hn(x) = H(x) for any x ER. Show that {Xn}ner is uniformly tight if lim H(x) = 0, lim H(x) = 1
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