Answer to Question #308381 in Complex Analysis for Nivedita

The poles of "f(z)=\\dfrac {z^2+2z}{(z+1)^2(z+4)}" are obtained from "(z+1)^2(z+4) = 0".

We get, "z = -1" is a pole of order 2 and "z = -4" is a simple pole.

"\\begin{aligned}\nRes\\{f(z),-1\\} &= \\lim_{z=-1}\\dfrac{d}{dz}\\left\\{(z+1)^2~f(z)\\right\\}\\\\\n&=\\lim_{z=-1}\\dfrac{d}{dz}\\left\\{(z+1)^2 \\dfrac{(z^2+2z)}{(z+1)^2(z+4)}\\right\\}\\\\\n&=\\lim_{z=-1}\\dfrac{d}{dz}\\left\\{ \\dfrac{z^2+2z}{z+4}\\right\\}\\\\\n&=\\lim_{z=-1} \\left\\{\\dfrac{z^2+8z+8}{(z+4)^2}\\right\\}\\\\\n&= \\frac{1}{9}\\\\\nRes\\{f(z),-4\\} &= \\lim_{z=-4}\\left\\{(z+4)~f(z)\\right\\}\\\\\n&=\\lim_{z=-4}\\left\\{(z+4) \\dfrac{(z^2+2z)}{(z+1)^2(z+4)}\\right\\}\\\\\n&=\\lim_{z=-4}\\left\\{ \\dfrac{z^2+2z}{(z+1)^2}\\right\\}\\\\\n&= 0\n\\end{aligned}"