The mathematical study of the Mandelbrot set really began with work by the mathematicians Adrien Douady and John H. Hubbard (1985), [19] who established many of its fundamental …

Explore the infinite complexity of the Mandelbrot Set with this online fractal viewer. Zoom in and generate high resolution images.

Intuitive, easy-to-use Mandelbrot set viewer web app. Explore the famous fractal on mobile and desktop. Fast, high resolution Zoom, Nice color themes, Fullscreen, PNG export - Touch, …

The Mandelbrot set is the set of complex values c, in which the result of the iterative function f꜀ (z) never becomes arbitrarily large. The set is plotted in the 2D Complex Plane, where the x …

This is a famous fractal in mathematics, named after Benoit B. Mandelbrot. It is based on a complex number equation (z n+1 = z n2 + c) which is repeated until it: Click and make a …

Mathematician Mandelbrot defined this set in order to study the iteration behavior of the family of quadratic complex functions z f (z) := z*z - c. Here c is a complex constant, the so called family …

After thousands or millions of iterations, you can resolve the finest details in the most complex parts of the fractal. See information on iterations, progress, and coordinates by hovering over …

The Mandelbrot set is defined as all points C for which Z remains finite when iterated forever. It will "orbit" around the origin, spinning around but never moving farther away than a distance of 2.

Explore Mandelbrot and Julia sets by successive zooms in real time.

This website uses cookies.