Use the Cauchy Integral formula to evaluate foC (closed curve) f(z) dz,
where C is oriented anticlockwise, for f(z) = (z + i)^2 / (z + 3 - 2i)^3
and C is the circle |z + 2| = 5.
Use the Cauchy Integral formula to evaluate foC (closed curve) f(z) dz,
where C is oriented anticlockwise, for f(z) = (z + i)^2 / (z + 3 - 2i)^3
and C is the circle |z + 2| = 5.
Thanks.
The only point in the boundary which is a pole is z=-3+2i.