Question: a) Evaluate the contour integral at infinity, which encloses all the poles and branch cuts, for the complex function A(z )= m With real numbers

a) Evaluate the contour integral at infinity, which encloses all the

poles and branch cuts, for the complex function A(z )= m With

a) Evaluate the contour integral at infinity, which encloses all the poles and branch cuts, for the complex function A(z )= m With real numbers a 2 1 andb 2 1. b) Derive the analytic result for 1 x2 L: (a :00) + x)dx you can consider integrating around a branch cut of Alz), together with the help from part (a)

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