Generalizations of the Fundamental Theorem of Calculus (Part I)

Using Green's theorem to Reduce a Surface Integration to a Path Integral

The Potential over a Triangular Charged Surface Patch: Example of Green's theorem and Faster Integration

Representations of Surfaces (part 1):  z=f(x,y)

Representations of Surfaces (part 2):  z=f(x,y)

Representations of Surfaces:  z=f(x,y) (Frivolous—and somewhat advanced—Examples) Floating Pixels

Representations of Surfaces:  z=f(x,y) (Frivolous—and somewhat advanced—Examples) Morphing and Warping Images

Surface of the form: (x(u,v), y(u,v), z(u,v))

Surface of the form: (F(x,y,z) = constant)

Surface Integration

Created by Wolfram Mathematica 6.0  (28 September 2007)