- #1
Edwin
- 162
- 0
How might one evaluate an integral equation like the following:
I = lim k-> 0+ {ClosedContourIntegral around y [1/(z^2 + k^2)]}, where the contour y is a simple, closed, and positively oriented curve that encloses the simple pole at z = i*K?
Is it possible to evaluate integrals of this form?
Inquisitively,
Edwin
I = lim k-> 0+ {ClosedContourIntegral around y [1/(z^2 + k^2)]}, where the contour y is a simple, closed, and positively oriented curve that encloses the simple pole at z = i*K?
Is it possible to evaluate integrals of this form?
Inquisitively,
Edwin