Expand the given function in a Laurent series that converges for 0 < Id < R and
Chapter 16, Problem 16.1.3(choose chapter or problem)
Find all Taylor and Laurent series with center \(z= {z}_{0}\) and determine the precise regions of convergence.
\(\frac{z^{3}-2 i z^{2}}{(z-i)^{2}}, \quad {z}_{0}=i\)
Text Transcription:
z = z_0
z^3 - 2iz^2 / (z - i)^2, z_0 = i
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