A contour integral is defined as\[ I_n = \oint_C \frac{dz}{(z - n)^2 + \pi^2} \] where \( n \) is a positive integer and \( C \) is the closed contour, as shown in the figure, consisting of the line from \( -100 \) to \( 100 \) and the semicircle traversed in the counter-clockwise sense. The value of \( \sum_{n=1}^5 I_n \) (in integer) is \(\underline{\hspace{2cm}}\).
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To evaluate contour integrals, use the residue theorem and sum the residues at the poles inside the contour.
The given contour integral can be evaluated using the residue theorem. The integrand has simple poles at \( z = n \pm i\pi \) for each integer \( n \).
For each pole, we calculate the residue and sum the contributions to the total integral. By applying the residue theorem, we obtain the value of \( \sum_{n=1}^5 I_n \) as \( 5 \).
Thus, the value of \( \sum_{n=1}^5 I_n \) is \( 5 \).
