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Original - Mandelbrot zoom in. Reason Simply an epic animation and a fantastic representation of the multiple layers of complexity and chaos that make up the Mandelbrot set. The user Slaunger suggested that a scaled up version of an earlier animation, made by user Zom-B would probably be worthy of being a featured image.
False color Buddhabrot Zoom in which the red, green and blue channels had max iteration values of 5000, 500, and 50 respectively. A 20,000 x 25,000 pixel rendering of a Buddhabrot. Mathematically, the Mandelbrot set consists of the set of points in the complex plane for which the iteratively defined sequence
The main image in the set is Mandel zoom 00 mandelbrot set.jpg. If you have a different image of similar quality, be sure to upload it using the proper free license tag , add it to a relevant article, and nominate it .
XaoS is an interactive fractal zoomer program.It allows the user to continuously zoom in or out of a fractal in real-time. XaoS is licensed under GPL.The program is cross-platform, and is available for a variety of operating systems, including Linux, Windows, Mac OS X, BeOS and others.
A zoom-in to the lower left of the Burning Ship fractal, showing a "burning ship" and self-similarity to the complete fractal A zoom-in to line on the left of the fractal, showing nested repetition (a different colour scheme is used here)
A zoom sequence illustrating the set of complex numbers termed the Mandelbrot set. Images of the set, which was defined and named by Adrien Douady in tribute to the mathematician Benoit Mandelbrot , may be created by sampling the complex numbers and determining whether the result of iterating for each sample point c {\displaystyle c} goes to ...
Because the Mandelbrot set is full, [12] any point enclosed by a closed shape whose borders lie entirely within the Mandelbrot set must itself be in the Mandelbrot set. Border tracing works by following the lemniscates of the various iteration levels (colored bands) all around the set, and then filling the entire band at once.
The quaternion (4-dimensional) Mandelbrot set is simply a solid of revolution of the 2-dimensional Mandelbrot set (in the j-k plane), and is therefore uninteresting to look at. [44] Taking a 3-dimensional cross section at d = 0 ( q = a + b i + c j + d k ) {\displaystyle d=0\ (q=a+bi+cj+dk)} results in a solid of revolution of the 2-dimensional ...