For a\in\mathbb{R}, show that \sum_{k\geq0}\frac{1}{k^2+k-\alpha}=\frac{\pi}{\sqrt{4\alpha+1}}\tan(\frac{1}{2}\pi\sqrt{4\alpha+1})

Carly Shannon

Carly Shannon

Answered question

2022-01-23

For aR, show that k01k2+kα=π4α+1tan(12π4α+1)

Answer & Explanation

Aiden Cooper

Aiden Cooper

Beginner2022-01-24Added 14 answers

First we note that
S=k01k2+kα=k01(k+12)24a+14=4k01(2k+1)2a2
where a=4α+1, and so
S=4m odd1m2a2
Now we use the well-known contangent identity
πcot(aπ)=1a+m=12aa2m2 (1)
Replacing a by a/2 and dividing by 2 gives
12πcot(aπ2)=1a+m=12aa2(2m)2 (2)
Subtracting (2) from (1) gives
πcot(aπ)12πcot(aπ2)=m=1, odd m2aa2m2
but cot(θ)12cot(θ2)=12tan(θ2) and so
π4atan(aπ2)=m odd1m2a2
from which the result follows setting a=4α+1

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