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Perimeter of Ellipse
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01-19-2020, 03:56 AM
Post: #17
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RE: Perimeter of Ellipse
(12-29-2019 07:58 PM)Gerson W. Barbosa Wrote: We can do better: We can simplify this a bit. Let \(\large c = \sqrt{1+\frac{3h}{8-3h\sqrt{2}}}\quad → p ≈ \pi(a+b)\Large\left({3ch^2 + 12(c-1)h - 64 \over 4(3c+1)h-64}\,\right) \) If \(\large c = 1\), above simplified to: \(\quad\large p ≈ \pi(a+b)\Large\left({3h^2 - 64 \over 16h-64}\,\right) \) This matched ellipse perimeter Pade [2,1] approximation. |
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