Consider the following integral: I=\int_0^\infty \frac{x-1}{\sqrt{2^x-1}\ln(2^x-1)}dx

kramtus51

kramtus51

Answered question

2022-01-06

Consider the following integral:
I=0x12x1ln(2x1)dx

Answer & Explanation

Ronnie Schechter

Ronnie Schechter

Beginner2022-01-07Added 27 answers

Sub u=log(2x1). Then x=log(1+eu)log2, dx=(1log2)(du1+eu. The integral then becomes
1log2du1+eulog(1+eu)log21u=12log22
ducosh(u2)log(1+eu)log2u
=12log220ducosh(u2)log(1+eu)log2u+12log220ducosh(u2)log(1+eu)log2u
The nasty pieces of the integral cancel, and we are left with
12log220ducosh(u2)=π2log22
as correctly conjured.
enhebrevz

enhebrevz

Beginner2022-01-08Added 25 answers

I=0x12x1ln(2x1)dx
With the change of variables z2x1x=ln(1+z)ln(2), I is reduced to
I=1ln2(2)0ln(1+z)ln(2)z12(1+z)ln(z)dz
Now, we split the integral from (0,1) and from (1,). In the second one, we makes the change z1z such that we are left with an integration over (0,1):
I=1ln2(2)01ln(1+z)ln(2)z12(1+z)ln(z)dz+1ln2(2)01ln(1+1z)ln(2)z12(1+1z)[ln(z)]dzz2
=1ln2(2)01ln(1+z)ln(2)z12(1+z)ln(z)dz1ln2(2)
01ln(1+z)ln(z)ln(2)z12(1+z)ln(z)dz
karton

karton

Expert2022-01-11Added 613 answers

Substitute (2x1)=t2 to get,
I=1ln220(ln(t2+1)ln2(t2+1)lnt)dt
Substitute t1t
I=1ln220(ln(t2+1)ln2(t2+1)lntdt+2ln220dtt2+1I=I+πln22I=π2ln22

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