Let X be a random variable with distribution function mx (x) defined by mx (-1) = 1/5, mx (0) = 1/5, mx (1) = 2/5, mx (2) = 1/5. (a) Let Y be the random variable defined by the equation Y = X + 3. Find the distribution function mY (y) of Y. (b) Let Z be the random variable defined by the equation Z = X^2. Find the distribution function mZ (z) of Z.
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