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Let X and Y have the joint pdf \(f(x, y)=1,-x

Short Answer

Expert verified
The conditional expectation E(Y|X) is 0, which is a horizontal straight line when plotted against X. On the other hand, the conditional expectation E(X|Y) equals (1+y)/2 when y>0 and (1-y)/2 when y<0, thus forming two different lines when plotted against y, which means it is not a straight line pointwise.

Step by step solution

01

Determine E(Y|X)

Remember that the expectation of Y given X = x is, by definition, the integral of y*f(y|x) dy, where f(y|x) is the conditional pdf of Y given X = x. Here though, Y is uniformly distributed over the interval x to x. So to find this integral, you'll need to take y(x,x), times the conditional pdf 1/(2x), and integrate over the interval x to x. Doing this gives E(Y|X) = 0.
02

Graph E(Y|X)

The conditional expectation found in Step 1, E(Y|X) = 0, does not depend on x. Therefore, if you were to graph E(Y|X) as a function of x, it would just be a horizontal line on the y=0 axis. A horizontal line is in fact a straight line, meeting the criteria set out in the problem.
03

Determine E(X|Y)

First, it must be noted there are two possible regions of support, depending if y>0 or yis <0. Let's find the expectation in each case. When y>0, X is uniformly distributed over the interval (y, 1). Thus E(X|Y=y) is the average of y and 1. This is a non-constant function of y, namely (1+y)/2. When y<0, X is uniformly distributed over the interval (-y, 1). Thus E(X|Y=y) is the average of -y and 1, which gives (1-y)/2.
04

Graph E(X|Y)

Here, the expression for E(X|Y) changes with y. Therefore, if you were to graph E(X|Y) as a function of y, you would get a different line depending on whether y is positive or negative. Thus, the graph of E(X|Y) pointwise is not one straight line.

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