The stochastic variables X and Y are independent and Gaussian distributed with first moment (x) = (y)

Question:

The stochastic variables X and Y are independent and Gaussian distributed with first moment (x) = (y) = 0 and standard deviations x=oy = 1. Find the characteristic function for the random variable Z = x + y, and compute the moments (z), (2), and (z). Find the first three cumulants.

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