Evaluating a complex integral \(\displaystyle\int_{{{\left|{z}\right|}={1}}}{\frac{{{z}^{{{11}}}}}{{{12}{z}^{{{12}}}-{4}{z}^{{9}}+{2}{z}^{{6}}-{4}{z}^{{3}}+{1}}}}{\left.{d}{z}\right.}\)

jisu61hbke

jisu61hbke

Answered question

2022-04-05

Evaluating a complex integral
|z|=1z1112z124z9+2z64z3+1dz

Answer & Explanation

anghoelv1lw

anghoelv1lw

Beginner2022-04-06Added 19 answers

Your integral is off by a factor of -1, since the variable change from z to 1z reverses the orientation of the circle. So what you need is
|w|=11w(w124w9+2w64w3+12)dw
You could use Rouche but you don't have to: If |w|1 then
|w124w9+2w64w3||w|12+4|w|9+2|w|6+4|w|31+4+2+4=11
<12
So the factor w124w9+2w64w3+12 is never zero. As the result the integrand just has the one pole at 2=0 and you can use the residue theorem for just that pole to get the value of the integral. The residue is 1w124w9+2w64w3+12 evaluated at w=0, or 112, and the overall integral is 2πi112=πi6

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