The conditional probability distribution of Y given X x is FY X(y) XExy for y 0 and the marginal probability distribution of X is a continuous uniform distribution over 0 to 10 (a) Graph is FY X(y) XExy for y 0 for several values of x Determine (b) P(Y 2 X 2) (c) E(Y X 2) (d) E(Y X x) (e) Fxy(x, y) (f) fY(y)

Question: The conditional probability distribution of Y given X = x is FY|X(y) = XExy for y > 0 and the marginal probability distribution of X

The conditional probability of Y given X = x is FY|X(y) = XE–xy for y > 0 and the marginal probability of X is a continuous uniform over 0 to 10.
(a) Graph is FY|X(y) = XE–xy for y > 0 for several values of x. Determine
(b) P(Y < 2|X = 2)
(c) E(Y|X = 2)
(d) E(Y|X = x)
(e) Fxy(x, y)
(f) fY(y)

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