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Chapter 3: Q14E (page 141)

Question:For the joint pdf in example 3.4.7,determine whether or not X and Y are independent.

Short Answer

Expert verified

X and Y are not independent.

Step by step solution

01

Given information.

Given

\(f\left( {x,y} \right) = \left\{ \begin{array}{l}c{x^2}y for {x^2} \le y \le 1\\0 otherwise\end{array} \right.\)

02

Calculating value of C

Firstly, we will find the value of c

\(\begin{array}{c}\int\limits_{ - \infty }^\infty {\int\limits_{ - \infty }^\infty {f\left( {x,y} \right)dxdy = \int\limits_s {\int {f\left( {x,y} \right)} dxdy} } } \\ = \int\limits_{ - 1}^1 {\int\limits_{{x^2}}^1 {c{x^2}ydydx} } \\ = \frac{4}{{21}}c\\c = \frac{{21}}{4}\end{array}\)

03

Step 3:  Compute the probability

The marginal density of\(X,f\left( x \right)\)is

\(\begin{array}{c}X,f\left( x \right) = \int\limits_0^1 {\frac{{21}}{4}{x^2}ydy} \\ = \frac{{21{x^2}}}{8}.......(1)\end{array}\)

The marginal density of\(Y,f\left( y \right)\)is

\(\begin{array}{c}Y,f\left( y \right) = \int\limits_{{x^2}}^1 {\frac{{21}}{4}{x^2}ydx} \\ = - \frac{7}{4}\left( {{x^6} - 1} \right)y......\left( 2 \right)\end{array}\)

From (1) and (2) we can say that

\(\begin{array}{c}f\left( x \right) \times f\left( y \right) = \frac{{147y\left( {1 - {x^2}} \right){x^6}}}{{32}}\\ \ne f(x,y)\end{array}\)

Hence we can conclude that X and Y are not independent.

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Most popular questions from this chapter

Suppose that the p.d.f. of X is as follows:

\(\begin{aligned}f\left( x \right) &= e{}^{ - x},x > 0\\ &= 0,x \le 0\end{aligned}\)

Determine the p.d.f. of \({\bf{Y = }}{{\bf{X}}^{\frac{{\bf{1}}}{{\bf{2}}}}}\)

Suppose that a random variableXhas the binomial distribution with parametersn=15 andp=0.5. Find Pr(X <6).

Question:In example 3.5.10 verify that X and Y have the same Marginal pdf and that

\({f_1}\left( x \right) = \left\{ \begin{array}{l}2k{x^2}\frac{{{{\left( {1 - {x^2}} \right)}^{\frac{2}{3}}}}}{3} for - 1 \le x \le 1\\0 \,\,\,\,\,\,\,\,\,\,\,\,\,\,otherwise\end{array} \right.\) .

Suppose that\({X_1}...{X_n}\)are independent. Let\(k < n\)and let\({i_1}.....{i_k}\)be distinct integers between 1 and n. Prove that \(X{i_1}.....X{i_k}\)they are independent.

Suppose that the joint distribution of X and Y is uniform over the region in the\({\bf{xy}}\)plane bounded by the four lines\({\bf{x = - 1,x = 1,y = x + 1}}\)and\({\bf{y = x - 1}}\). Determine (a)\({\bf{Pr}}\left( {{\bf{XY > 0}}} \right)\)and (b) the conditional p.d.f. of Y given that\({\bf{X = x}}\).
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