Find out whether infinity is a regular point, an essential singularity, or a pole (and if a pole, of what order) for each of the following functions. Using Problem $1,$ or Problem 2n or ( 8.3 ) , find the residue of each function at infinity. Check your results by computer. 2 z + 3 ( z + 2 ) 2
Find out whether infinity is a regular point, an essential singularity, or a pole (and if a pole, of what order) for each of the following functions. Using Problem $1,$ or Problem 2n or ( 8.3 ) , find the residue of each function at infinity. Check your results by computer. 2 z + 3 ( z + 2 ) 2
Find out whether infinity is a regular point, an essential singularity, or a pole (and if a pole, of what order) for each of the following functions. Using Problem $1,$ or Problem 2n or
(
8.3
)
,
find the residue of each function at infinity. Check your results by computer.
Using and Understanding Mathematics: A Quantitative Reasoning Approach (6th Edition)
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