Umbilic torus

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Umbilic Torus

Created by Helaman Ferguson, the umbilic torus is a single-edged 3-dimensional figure. Ferguson created a 27-inch bronze sculpture, Umbilic Torus, and it is his most widely known piece of art. The torus blurs the distinction between mathematics and art forming them into one work of mathematical art. The lone edge goes three times around the ring before returning to the starting point. A cross section of the surface taken from an umbilic torus corresponds with a hypocycloid. The torus is defined by the following set of parametric equations.

$x = \sin u \left(7+\cos\left({u \over 3} - 2v\right) + 2\cos\left({u \over3} + v\right)\right)$

$y = \cos u \left(7 + \cos\left({u \over 3} - 2v\right) + 2\cos\left({u \over 3} + v\right)\right)$

$z = \sin\left({u \over 3} - 2v\right) + 2\sin \left({u \over 3} + v\right)$

$\mbox{for }-\pi \le u \le \pi,\quad -\pi \le v \le \pi. \,$

[edit] See also

[edit] References

Larson, Roland E., et al. Calculus. Ed. Charles Hartford. 6th ed. Boston: Houghton Mifflin Company, 1998.

[edit] External links

Umbilic Torus

Categories: Sculptures | Mathematics and culture

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This page was last modified 21:59, 24 April 2008 by Anonymous user(s) of Wikipedia. Based on work by Wikipedia user(s) JRSpriggs, Safalra, Oleg Alexandrov, AnonMoos, Cmdrjameson, Michael Hardy, Bluebot, CmdrObot, AnOddName and Anti dan.
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