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Find an integral formula for the solution of the differential equation

\delta (\delta-1)(\delta-2) \cdots(\delta -n +1) y= f(x), \;\;\, x\geq 1,

for

y

as a function of

f

satisfying the initial conditions

y(1)=y'(1)=\ldots= y^{(n-1)}(1)=0

, where

f

is continuous and

\delta

is the differential operator

x \frac{d}{dx}.

Problem Statement