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How do you evaluate the integral #int lnx/xdx#?

1 Answer

Jan 11, 2017

#int lnx/x dx = 1/2(lnx)^2+C#

Explanation:

We have that:

#d/(dx) (lnx) = 1/x#

so:

#int lnx/x dx = int lnx d(lnx) = 1/2(lnx)^2+C#

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