Let Y be a random variable with PDF
F(y) = {(1/2)(1-y) -1≤ y ≤ 1
{ 0 elsewhere
a) Find the density function of X = 1 - 2Y
b) Find the density function of U = Y^2
Given, pdf f(y) = (1-y)/2 ; -1y 1
To find the density function of the respective transformations, the distribution function method is employed.
Let Y be a random variable with PDF F(y) = {(1/2)(1-y) -1≤ y ≤ 1 {...
Let Y be a random variable with probability density function, pdf, f(y) = 2e-2y, y > 0. Determine f (U), the pdf of U = VY.
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