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Question

The value of the integral

( 6 z 2 z 4 3 z 3 + 7 z 2 3 z + 5 ) d z

evaluated over a counter-clockwise circular contour in the complex plane enclosing only the pole 𝑧 = 𝑖, where 𝑖 is the imaginary unit, is

Options :

  1. (−1 + 𝑖) π

  2. (1 + 𝑖) π

  3. 2(1 - 𝑖) π

  4. (2 + 𝑖) π

Show Answer

Answer :

(−1 + 𝑖) π

Solution :

( 6 z 2 z 4 3 z 3 + 7 z 2 3 z + 5 ) d z
pole z = i

Check for singularity at pole z = i

f(z) = 2z4 - 3z3 + 7z2 - 3z + 5

f(i) = 2(i)4 - 3(i)3 + 7(i)2 - 3i + 5

f(i) = 2 ×1 - 3(-i) - 7 - 3i + 5 = 0 since, f(i) = 0 ⇒ z = i is a singular point From Residue theorem:

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