Question: 9. Let X be a continuous random variable with set of possible values {x: 0 f. Using integration by parts, prove the following special case

9. Let X be a continuous random variable with set of possible values {x: 0

f. Using integration by parts, prove the following special case of Theorem 6.2.

E(X) = [1 = [1-F(t)] dt. 0

E(X) = [1 = [1-F(t)] dt. 0

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