Homework Answers
Answer:
Given that:
Assume that X is Poisson distributed with expected value E(X) = 3, and that the conditional expectations and variance of Y given X = x are E(Y | x) = x/2 and Var(Y | x) = (x + 1)/3.
Since X~Poisson(3) ,E(X)=3 and V(X)=3
(a) Find E(Y).
E(Y)=E(E(Y|X)) =E(X/2)
E(Y)=3/2
b) Find Var(Y).
Var(Y) = E[V(Y|X)]+V[E(Y|X)]
Var(Y) = E[(X+1)/3]+V[X/2]
Var(Y) = 4/3 +3/4
Var(Y) = 25/12
Var(Y) = 2.0833
c) Find E(XY).
E(XY) = E[E(XY|X)]=E[XE(Y|X)]
E(XY) = E[X2/2]
E(XY) = 1/2 E[X2]
E(XY) = 1/2 (V(X)+E2(X))=3+32 /2=6
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