Sierpinski Triangle

Sierpinski Triangle

C021/9460 Rights Managed

Request low-res file

530 pixels on longest edge, unwatermarked

Request/Download high-res file

Uncompressed file size: 99.5MB

Downloadable file size: 21.4MB

Price image Pricing

Please login to use the price calculator


Caption: Computer illustration of a Menger Sponge exterior. The Menger sponge simultaneously exhibits an infinite surface area and zero volume. In mathematics, the Menger sponge is a fractal curve, a three-dimensional generalization of the Cantor set and Sierpinski carpet. It was first described by Karl Menger in 1926, in his studies of the concept of topological dimension.

Release details: Model release not required. Property release not required.

Keywords: 3d, blue, cantor, cantor set, computer illustration, fractal, fractal curve, geometry, infinite, infinity, karl menger, mathematics, menger, menger sponge, orange, sierpinski, sierpinski carpet, sponge, three dimensional, topological, topology, volume

Licence fees: A licence fee will be charged for any media (low or high resolution) used in your project.