Butterfly curve (transcendental)

The butterfly curve.

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

Equation

An animated construction gives an idea of the complexity of the curve (Click for enlarged version).

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

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

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

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

or by the following polar equation:

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

The sin term has been added for purely aesthetic reasons.^[1]

Developments

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

See also

• Butterfly curve (algebraic)
• Oscar’s Butterfly Polar Equation

r= (cos50)^2 + sin30 + .3 A Polar equation discovered by Oscar Ramirez a UCLA student in the fall of 1991. https://books.google.com/books?id=laXgAAAAMAAJ&q=Oscar%27s+Butterfly+polar+math+equation+by+David+Cohen+inauthor:David+inauthor:Cohen&dq=Oscar%27s+Butterfly+polar+math+equation+by+David+Cohen+inauthor:David+inauthor:Cohen&hl=en&sa=X&ved=2ahUKEwjf1bPwqJ3uAhVKJzQIHTvUDfMQ6AEwAHoECAAQAg

References

1. Fay, Temple H. (May 1989). "The Butterfly Curve". Amer. Math. Monthly. 96 (5): 442–443. doi:10.2307/2325155. JSTOR 2325155.
2. Weisstein, Eric W. "Butterfly Curve". MathWorld.
3. "On the analysis and construction of the butterfly curve using Mathematica". International Journal of Mathematical Education in Science and Technology. 39 (5): 670–678. June 2008. doi:10.1080/00207390801923240.

External links

• Butterfly Curve plotted in WolframAlpha