Question: Please help with this 15. Let the continuous random variable X have cumulative distribution function F (r) and den- sity fx (x). The distribution function

Please help with this

15. Let the continuous random variable X have cumulative distribution function F (r) and den- sity fx (x). The distribution function is strictly increasing on a single interval (which could be infinite), so that the inverse function F (y) is defined in the natural way. Let Y = F. (U), where U is a continuous uniform random variable on the interval from zero to one. Find the cumulative distribution function and density of Y

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