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How do you integrate #x^2 e^-x#?

1 Answer

Konstantinos Michailidis

Oct 26, 2015

It is

#int x^2*e^-xdx=-e^-x*x^2+int e^-x2xdx=-x^2*e^-x-2x*e^-x+2*int e^-xdx=-e^-x*(x^2+2x+2)+c#

We used integration by parts

#int f'(x)*g(x)dx=f(x)*g(x)-intf(x)*g'(x)dx#

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