Solve this integral using the Residue Theorem &#x222E;<!-- ∮ --> C </msub>

Roland Waters

Roland Waters

Answered question

2022-06-23

Solve this integral using the Residue Theorem
C e z ( z + 2 ) ( z 2 ) d z

Answer & Explanation

Marlee Norman

Marlee Norman

Beginner2022-06-24Added 18 answers

Notice that
e z ( z + 2 ) ( z 2 )
has simple poles at -2 and 2 The contour C encloses those poles, since | 2 | = | 2 | < | 3 | . Therefore, you can use the residue theorem and conclude that
C e z ( z + 2 ) ( z 2 ) d z = 2 π i [ Res ( 2 , e z ( z + 2 ) ( z 2 ) ) + Res ( 2 , e z ( z + 2 ) ( z 2 ) ) ] = 2 π i [ lim z 2 ( z + 2 ) e z ( z + 2 ) ( z 2 ) + lim z 2 ( z 2 ) e z ( z + 2 ) ( z 2 ) ] .
You should be able to do the rest.

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