Fermat cubic

From Wikipedia, the free encyclopedia

You have new messages (last change).

In geometry, the Fermat cubic, named after Pierre de Fermat, is a surface defined by

$x^3 + y^3 + z^3 = 1. \$

Methods of algebraic geometry provide the following parametrization of Fermat's cubic:

$x(s,t) = {3 t - {1\over 3} (s^2 + s t + t^2)^2 \over t (s^2 + s t + t^2) - 3}$

$y(s,t) = {3 s + 3 t + {1\over 3} (s^2 + s t + t^2)^2 \over t (s^2 + s t + t^2) - 3}$

$z(s,t) = {-3 - (s^2 + s t + t^2) (s + t) \over t (s^2 + s t + t^2) - 3}.$

Fermat cubic surface.

Retrieved from "http://en.wikipedia.org../../../f/e/r/Fermat_cubic.html"

Category: Algebraic surfaces

Views

interaction

Search

In other languages

Esperanto