What is the integral of $int ln x / x dx$ ?

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What is the integral of $int ln x / x dx$ ?

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Answer 1 · 2018-03-30T12:48:16

$(1/2)(ln |x|)^2+c$

Explanation:

Integration by parts, with $u=ln x$ , $v=ln x$ , $(du)/(dx)=1/x$ , $(dv)/(dx)=1/x$

$I=int(1/x)ln x dx$
$=(ln x)(ln x)-int(ln x).(1/x)dx$
$=(ln x)(ln x)-I$
So
$2I= ln(x)^2$
$I=(1/2)(ln x)^2+c$

Alternatively, by inspection, the integral is of the form $f'(x)f(x)$ with $f(x)=ln(x)$ , $f'(x)=1/x$ . The integral of $f'(x)f(x)$ is $(1/2)(f(x))^2$

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What is the integral of $int ln x / x dx$ ?

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