Question: Transform the following Euler differential equation into a constant coefficient linear differential equation by the substitution z = ln(x) and find the particular solution yp(z)

Transform the following Euler differential equation into a constant coefficient linear differential equation by the substitution z = ln(x) and find the particular solution yp(z) of the transformed equation by the method of undetermined coefficients: x 2 y'' - x y' - 8 y = x4 - 3 ln (x) ; x>0.

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