Question: $16 . $ (b) Define Uniform distribution. If $X$ is a uniform variate over $[1,2]$, find $z$ so that $Pleft[X>z+mu_{x} ight]=frac{1}{4}$. Here $mu_{x}=E[X]$. CS.VS. 1731

$16 . $ (b) Define Uniform distribution. If $X$ is a

$16 . $ (b) Define Uniform distribution. If $X$ is a uniform variate over $[1,2]$, find $z$ so that $P\left[X>z+\mu_{x} ight]=\frac{1}{4}$. Here $\mu_{x}=E[X]$. CS.VS. 1731

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