I am supposed to evaluate this infinite series using contour integration. However, since a and b can't be integers, I'm assuming the denominator can never vanish, so I'm not sure if the idea of residues would apply here. Just need a push in the right direction to get started. Thanks.
$\sum_{- \infty}^{\infty} \frac{1}{(n+a)(n+b)} $ where $ a \neq b$ and $a,b \notin Z $
Going from Phillipe's hint, the basic result for sums of this type (rational function of $n$) is
$$\sum_{n=-\infty}^{\infty} f(n) = -\sum_{k=1}^N \operatorname*{Res}_{z=z_k} \pi \, \cot{(\pi z)} \, f(z)$$
In your case, $f(z)=1/[(z-a)(z-b)]$. This is fairly simple because the poles of $f$ are non-integral and simple. We then have
$$\sum_{n=-\infty}^{\infty} \frac{1}{(n-a)(n-b)} = -\pi \left [\frac{\cot{(\pi a)}}{a-b} + \frac{\cot{(\pi b)}}{b-a} \right ] =-\pi \frac{\cot{(\pi b)}-\cot{(\pi a)}}{b-a} $$
Note that when $a=b$, the sum approaches $\pi^2 \csc^2{(\pi a)}$.
Hint : Use the residue theorem with the meromorphic function $f:z\mapsto \dfrac{\pi\cot(\pi z)}{(z+a)(z+b)}$ and the contour $C_n=\partial D\left(0,n+\dfrac 12\right)$, and let $n$ tends to $+\infty$
Also check my message here if needed : Closed form for $\sum_{n=-\infty}^{\infty} \frac{1}{n^4+a^4}$
