Chapter 2: Problem 2
Let \(f_{1 \mid 2}\left(x_{1} \mid x_{2}\right)=c_{1} x_{1} / x_{2}^{2},
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Chapter 2: Problem 2
Let \(f_{1 \mid 2}\left(x_{1} \mid x_{2}\right)=c_{1} x_{1} / x_{2}^{2},
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Get started for freeLet \(X_{1}\) and \(X_{2}\) have the joint pmf \(p\left(x_{1}, x_{2}\right)\) described as follows: $$\begin{array}{c|cccccc}\left(x_{1}, x_{2}\right) & (0,0) & (0,1) & (1,0) & (1,1) & (2,0) & (2,1) \\ \hline p\left(x_{1}, x_{2}\right) & \frac{1}{18} & \frac{3}{18} & \frac{4}{18} & \frac{3}{18} & \frac{6}{18} & \frac{1}{18} \end{array}$$ and \(p\left(x_{1}, x_{2}\right)\) is equal to zero elsewhere. Find the two marginal probability density functions and the two conditional means.
Let \(X\) and \(Y\) have the joint pdf \(f(x, y)=2 \exp \\{-(x+y)\\},
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Let \(p\left(x_{1}, x_{2}\right)=\frac{1}{16}, x_{1}=1,2,3,4\), and \(x_{2}=1,2,3,4\), zero elsewhere, be the joint pmf of \(X_{1}\) and \(X_{2}\). Show that \(X_{1}\) and \(X_{2}\) are independent.
Let \(X_{1}, X_{2}\) be two random variables with joint \(\mathrm{pmf} p\left(x_{1}, x_{2}\right)=\left(x_{1}+x_{2}\right) / 12\), for \(x_{1}=1,2, x_{2}=1,2\), zero elsewhere. Compute \(E\left(X_{1}\right), E\left(X_{1}^{2}\right), E\left(X_{2}\right), E\left(X_{2}^{2}\right)\), and \(E\left(X_{1} X_{2}\right) .\) Is \(E\left(X_{1} X_{2}\right)=E\left(X_{1}\right) E\left(X_{2}\right) ?\) Find \(E\left(2 X_{1}-6 X_{2}^{2}+7 X_{1} X_{2}\right)\)
Let 13 cards be talsen, at random and without replacement, from an ordinary deck of playing cards. If \(X\) is the number of spades in these 13 cards, find the pmf of \(X\). If, in addition, \(Y\) is the number of hearts in these 13 cards, find the probability \(P(X=2, Y=5) .\) What is the joint pmf of \(X\) and \(Y ?\)
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