How to prove: \sum_{n=1}^\infty(\frac{1}{4n+1}-\frac{1}{4n})=\frac{1}{8}(\pi-8+6\ln 2)

Ingrid Senior

Ingrid Senior

Answered question

2022-02-24

How to prove:
n=1(14n+114n)=18(π8+6ln2)

Answer & Explanation

Warenberg56i

Warenberg56i

Beginner2022-02-25Added 8 answers

Another approach is to use the Anti-difference concept.
Since the digamma function is defined as
ψ(z)=ddzlnΓ(z)
its functional equation is
ψ(z)=ψ(z+1)ψ(z)=ddzln(zΓ(z))ddzln(Γ(z))=ddzlnz=1z
It follows that
n=1N1n+a=n=1Nψ(n+a+1)ψ(n+a)=ψ(N+a+1)ψ(1+a)
and therefore
n=1N14n+114n=14n=1N1n+141n
=14(ψ(N+54)ψ(54)ψ(N+1)+ψ(1))
Since ψ(z) is holomorphic for 0<R(z), then
ψ(N+54)ψ(N+1)=ψ(1)(N+1)14+ψ(2)(N+1)2!(14)2+
and since
limNψ(k)(N+1)=0 1k
Therefore
limNn=1N14N+114n=14(ψ(1)ψ(54))=34ln2+π81

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