Find all Taylor and Laurent series with
Chapter 16, Problem 16.1.16(choose chapter or problem)
Expand the given function in a Laurent series that converges for 0 < |z - z| < R and determine the precise region of convergence. (Show details.)
\(\frac{\sin z}{\left(z-\frac{1}{4} \pi\right)^{3}} \quad z_{0}=\frac{1}{4} \pi\)
Text Transcription:
sin z / (z- 1 / 4 pi)^3 z_{0} = 1 / 4 pi
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