Recent content by JmsNxn

By the way you seem to phrase it, I'm going to go with 'no'. I guess there requires more work in solving the residue of poles defined in this manner? I'm sorry, but being to new to complex analysis affords me little more reduction of the idea. I still think 'no' though, as hard as I think.

Hi, I was wondering about how to determine the residue of a pole that is written in the form: f(z) = \frac{1}{(1 + t^r)^{\frac{m}{r}}} Here: m \in \mathbb{N}\,\,\,\,\;\,\,\,\,r \in \mathbb{R} And if it's possible, r could be complex. Would the order of the pole be m? Implying that...