| 31. | My preferred method works by finding the poles of the function in the complex plane.
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| 32. | The function is extended to the complex plane ( except 1 ) by analytic continuation.
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| 33. | Not all such systems have efficient algorithms for the evaluation, especially in the complex plane.
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| 34. | Start with a unix circle on the complex plane.
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| 35. | The eigenvalues of the circle system plotted in the complex plane form a trefoil shape.
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| 36. | See Exponential _ function # On the complex plane.
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| 37. | The modular group of transformations of the complex plane maps Ford circles to other Ford circles.
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| 38. | These zeros thus form a regular lattice in the complex plane as the poles also will.
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| 39. | The series converges for | a | and can be analytically continued in the complex plane.
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| 40. | I recently picked up on some ideas brought up with Imaginary time and the complex plane.
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