Butterfly curve (transcendental): Difference between revisions

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The butterfly curve is a transcendental plane curve discovered by Temple H. Fay of University of Southern Mississippi in 1989.^[1]

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The curve is given by the following parametric equations:^[2]

${\displaystyle x=\sin t(e^{\cos t}-2\cos 4t-{\sin }^5(\frac{t}{12}\left)\right)}$

${\displaystyle y=\cos t(e^{\cos t}-2\cos 4t-{\sin }^5(\frac{t}{12}\left)\right)}$

${\displaystyle 0\le t\le 12\pi }$

or by the following polar equation:

${\displaystyle r=e^{\sin \theta }-2\cos \left(4\theta \right)+{\sin }^5\left(\frac{2\theta -\pi }{24}\right)}$

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The Template:Math term has been added for purely aesthetic reasons, to make the butterfly appear fuller and more pleasing to the eye.^[1]

In 2006, two mathematicians using Mathematica analyzed the function, and found variants where leaves, flowers or other insects became apparent.^[3]

• Butterfly curve (algebraic)

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• Butterfly Curve plotted in WolframAlpha

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