Consider a random variable Q with a uniform probability densityfunction given as UQ(-1,1) and X=2Q^2+2 a) Find and plot theprobability density function (pdf) of X b) Find and plot thecumulative distribution function (cdf) of X c) Find expected valueand variance of X (E[X] and V[X]) d) Find expected value andvariance of Q (E[Q] and V[Q]) e) Find the correlation of Q andX
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