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 properties and …

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, Mouse and …

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 rectangle to zoom in, …

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 …

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

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.

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 yellow …

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The Mandelbrot Set is defined by a test: each point in the plane is subjected to a geometric transformation over and over again. If the resulting sequence of points all stay close to the origin, no …