Proof of \(\displaystyle{\sum_{{{n}={1}}}^{\infty}}{\frac{{{1}}}{{{n}^{{3}}}}}{\frac{{{\text{sinh}{\pi}}{n}\sqrt{{{2}}}-{\sin{\pi}}{n}\sqrt{{{2}}}}}{{{\text{cosh}{\pi}}{n}\sqrt{{{2}}}-{\cos{\pi}}{n}\sqrt{{{2}}}}}}={\frac{{\pi^{{3}}}}{{{18}\sqrt{{{2}}}}}}\)

ashes86047xhz

ashes86047xhz

Answered question

2022-03-31

Proof of
n=11n3sinhπn2sinπn2coshπn2cosπn2=π3182

Answer & Explanation

Harry Gibson

Harry Gibson

Beginner2022-04-01Added 13 answers

It is a simple trigonometric exercise to show that
1n3sinhπn2sinπn2coshπn2cosπn2=R(cothπnz0+z02cothπnz0) (1)
with z0=eiπ4
Recall the Ramanujan identity :
n=11n3(cothπnx+x2cothπnx)=π390x(x4+5x2+1) (2)
Combining (1) and (2), we immediately get
n=11n3(sinhπn2sinπn2coshπn2cosπn2)=π390Rz04+5z02+1z0
=π3182

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