Do q 3 in detail with explaination 2. Expand f(z) =1in a Laurent series in the region 1 < |z – i| < v5.z² + 2z3. Find the Laurent series of f(z) = Log |for |2| > 1.4. Find the isolates singularities of the following fun ctions, and determine whether they areremovable, poles or essential.

Given function: f(z)=Logz-iz+i To find: Laurent series for f(z) for |z|>1

Answered: 3. Find the Laurent series of f(2) =…

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3. Find the Laurent series of f(2) = Log () for |2| > 1.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.2: Arithmetic Sequences

Problem 67E

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Question

Do q 3 in detail with explaination

2. Expand f(z) =
1
in a Laurent series in the region 1 < |z – i| < v5.
z² + 2z
3. Find the Laurent series of f(z) = Log |
for |2| > 1.
4. Find the isolates singularities of the following fun ctions, and determine whether they are
removable, poles or essential.

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