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Acontinous random variable X has a pdf given by p(x) = (5x4 0≤x≤1 0, otherwise) Let Y=X3. Find the probability distribution function ​

User Icepickle
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1 Answer

8 votes
8 votes

I'll use the method of transformations.

If
f_X(x) denotes the PDF of
X, and
y=g(x)=x^3 \iff x=g^(-1)(y) = y^(1/3), we have


f_Y(y) = f_X\left(g^(-1)(y)\right) \left|(dg^(-1))/(dy)\right|


(dg^(-1))/(dy) = \frac13 y^(-2/3)


\implies f_Y(y) = f_X\left(y^(1/3)\right) \left|\frac13 y^(-2/3)\right| = \boxed{\begin{cases} \frac53 y^(2/3) & \text{if } 0 \le y \le 1 \\ 0 & \text{otherwise} \end{cases}}

User Alex Boisvert
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