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Question 8.23: Find a transformation that maps the real axis in the w plane...

Find a transformation that maps the real axis in the w plane onto the ellipse \left(x^{2} / a^{2}\right)+\left(y^{2} / b^{2}\right)=1 in the z plane.

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A set of parametric equations for the ellipse is given by x=a \cos t, y=b \sin t where a>0, b>0. Then, by Problem 8.22, the required transformation is z=a \cos w+i b \sin w.

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