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tr2os8x

tr2os8x

Answered question

2022-06-23

How to calculate integral 0 x ( e 2 π x 1 ) ( x 2 + 1 ) 2 d x ?

Answer & Explanation

knolsaadme

knolsaadme

Beginner2022-06-24Added 16 answers

Recall Binet's second ln Γ formula:
0 arctan ( t z ) e 2 π t 1 d t = 1 2 ln Γ ( 1 z ) + 1 2 ( 1 z 1 2 ) ln ( z ) + 1 2 z 1 4 ln ( 2 π )
Consider the following integral:
t ( e 2 π t 1 ) ( 1 + t 2 z 2 ) 2 d z = t z 2 ( 1 + t 2 z 2 ) ( e 2 π t 1 ) + arctan ( t z ) 2 ( e 2 π t 1 )
Since
t z 2 ( 1 + t 2 z 2 ) ( e 2 π t 1 ) = z 2 z ( arctan ( t z ) e 2 π t 1 )
0 t ( e 2 π t 1 ) ( 1 + t 2 z 2 ) 2 d z d t = 0 z 2 z ( arctan ( t z ) e 2 π t 1 ) d t + 0 arctan ( t z ) 2 ( e 2 π t 1 ) d t
Using Binet's formula we determine then:
0 t ( e 2 π t 1 ) ( 1 + t 2 z 2 ) 2 d z d t = 1 4 z 1 8 ln ( 2 π z ) ψ ( 1 z ) 4 z + 1 4 ln ( Γ ( 1 z ) ) 1 8
where ψ is the digamma function.
Taking the derivative with respect to z then the limit as z 1 we determine:
0 x ( e 2 π x 1 ) ( x 2 + 1 ) 2 d x = π 2 24 3 8
Feinsn

Feinsn

Beginner2022-06-25Added 8 answers

0 x ( e 2 π x 1 ) ( x 2 + 1 ) 2 d x =   1 4 [ 2 0 ( [ 1 + i x ] 2 ) e 2 π x 1 d x ]
The brackets-[] enclosed expression can be evaluated with the Abel-Plana Formula. Namely,
0 x ( e 2 π x 1 ) ( x 2 + 1 ) 2 d x =   1 4 [ n = 0 1 ( 1 + n ) 2 0 d n ( 1 + n ) 2 1 2 1 ( 1 + n ) 2 | n   =   0 ] = 1 4 ( π 2 6 1 1 2 ) = π 2 24 3 8 0.0362

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