A contour integral is defined as dz 1, = 6 C Z-n 4 + (u– 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. YA z = x+iy -100 100 The value of >I, (in integer) is

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A contour integral is defined as dz I, = P. + 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. y. z = x+iy -100 100 The value of E1, (in integer) is n=1