Question: The complex exponential also provides a convenient way to work with circles. Every circle in the complex plane can be parameterized in the form c

The complex exponential also provides a convenient way to work with circles. Every circle in the complex plane can be parameterized in the form c re^i , where is the complex number representing the center of the circle, and is a real number representing the circle's radius. Find a parametric equation in complex numbers for the circle (x-3)^2 (y-4)^2 = 9

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