What is the antiderivative of ln x?

1 Answer
Ken C.
Jun 29, 2016

intlnxdx=xlnx-x+C

Explanation:

The integral (antiderivative) of lnx is an interesting one, because the process to find it is not what you'd expect.

We will be using integration by parts to find intlnxdx:
intudv=uv-intvdu
Where u and v are functions of x.

Here, we let:
u=lnx->(du)/dx=1/x->du=1/xdx and dv=dx->intdv=intdx->v=x

Making necessary substitutions into the integration by parts formula, we have:
intlnxdx=(lnx)(x)-int(x)(1/xdx)
->(lnx)(x)-intcancel(x)(1/cancelxdx)
=xlnx-int1dx
=xlnx-x+C-> (don't forget the constant of integration!)

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