Mathematics Asked by punkindrublic on December 5, 2021
Part 1 is easy, but struggling to see how it helps with Part 2.
Part 1
Find $frac{dy}{dx}$ if $y=xe^{-x}$.
Part 2
Hence show that $int xe^{-x}dx=-xe^{-x}-e^{-x}+c$ .
$y' = e^{-x} - xe^{-x}$
That is part I. How can we use that information to to find $xe^{-x}$
Integrate both sides. Let's isolate $xe^{-x}$ on one side of the equation before integrating.
$xe^{-x} = e^{-x} - y'\ int xe^{-x} dx = int e^{-x} dx - int y' dx\ int xe^{-x} dx = -e^{-x} - y+C\ int xe^{-x} dx = -e^{-x} - xe^{-x}+C$
Answered by Doug M on December 5, 2021
Remember that one way to show that $$int xe^{-x}dx=-xe^{-x}-e^{-x}+c$$ is to show that $$frac{d}{dx}left(-xe^{-x}-e^{-x}+cright) = xe^{-x}.$$ The first step in doing that is knowing how to differentiate $xe^{-x}$, which you presumably already did in Part 1.
Answered by DMcMor on December 5, 2021
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