How do you find the derivative of f(x)=xe^(-(x^2)/2)

1 Answer
GiĆ³
Feb 22, 2015

You can use the Product Rule where:

if f(x)=g(x)*h(x)

f'(x)=g'(x)h(x)+g(x)h'(x)

in your case g(x)=x but h(x)=e^(-x^2/2) which needs the Chain Rule to be derived (here you derive the e as it is and multiply times the derivative of the exponent).

So you get:
g(x)=x
g'(x)=1
h(x)=e^(-x^2/2)
h'(x)=e^(-x^2/2)(-2x/2)

and finally your derivative:

f'(x)=1e^(-x^2/2)+xe^(-x^2/2)(-2x/2)=
=e^(-x^2/2)(1-x^2)

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