Question

How do you integrate `int xe^-x` by integration by parts method?

Answer 1

`-e^-x(x+1)+C`

Explanation:

We have the integral `intxe^-xdx`. We want to apply integration by parts, which fits the form `intudv=uv-intdvu`. So for the given integral, let:

`{(u=x,=>,du=dx),(dv=e^-xdx,=>,v=-e^-x):}`

To go from `dv` to `v`, the integration will require a substitution. Think for `inte^-xdx`, let `t=-x`.

So:

`intxe^-xdx=uv-intudv=-xe^-x+inte^-xdx`

We've already done this integral:

`intxe^-xdx=-xe^-x-e^-x`

`intxe^-xdx=-e^-x(x+1)+C`