Answer to Question #235596 in Complex Analysis for Fozia Sayda

Question #235596

Find the laurent series about the indicated singularity for the function e^2z/(z-1)³ at z=1

Expert's answer

"f(z)=\\frac {e^{2z}}{(z-1)^3}" ,

Let the given complex function be analytic in an annulus "r<|z\u22121|<R" Then "f(z)" can be expanded into Laurent's series about "z=1"

Let "z-1 =u" , then "z = u+1," Putting in "f(z)" and expanding

"f(z)=\\frac {1}{u^3}[1+2(u+1)+2(u+1)^2+...]"

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