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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.
Every pixel that contains a point of the Mandelbrot set is colored black. Every pixel that is colored black is close to the Mandelbrot set. Exterior distance estimate may be used to color whole complement of Mandelbrot set. The upper bound b for the distance estimate of a pixel c (a complex number) from the Mandelbrot set is given by [6] [7] [8]
Support As Set. An amazing set of pictures. Nautica Shad e s 13:51, 11 December 2006 (UTC) Promoted Image:Mandel zoom 00 mandelbrot set.jpg. This is an unusual nom; I'll stick the FP tag on all the images but only put the first one on the FP and FPT pages. I'll also replace Image:Mandelbrot set 2500px.png with this one.
15 & 16 were uploaded by User:Lanthanum-138 in February 2011, sourced from e-mc3's Deviant Art page, but weren't added to Mandelbrot set#Image gallery of a zoom sequence until July 2016 when 49.144.196.203 unsuccessfully attempted to add 15 on 29 July and User:Eleuther properly added them both the following day, remarking "added last 2 images ...
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. [43] 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 ...
The test is whether a change is a nett improvement for a reader. The article title Mandelbrot set (not Mandelbrot fractal) uses terminology "set" that belongs to mathematics, which should be the tone of the article. I agree that one of the zoom animations can go. Keep the deeper one. Cuddlyable3 17:31, 2 March 2010 (UTC)
The difference between this calculation and that for the Mandelbrot set is that the real and imaginary components are set to their respective absolute values before squaring at each iteration. [1] The mapping is non-analytic because its real and imaginary parts do not obey the Cauchy–Riemann equations .
English: This video is comprised of frames illustrating each of the powers of the mandelbrot set from 0.05 to 2, incrementing by 0.05 with each iteration. Date 14 May 2014, 11:41:42