As it happens, these four lines can serve as a perfect metaphor for the infinitely detailed, "self-similar" nature of fractals. In this interactive, zoom deep into a Mandelbrot set, the most ...
These images are of the 'Mandelbrot' sets for polynomials z d + c for various d (for d=2 we have the Mandelbrot set). These images were drawn with the XAOS software. This software will also compute ...
The Mandelbrot set, according to Wikipedia ... [Scott] used the Atari800Win-PLus emulator to zoom in on a variety of locations on the fractal curve and recorded the results over a weekend.
Topics include: What is a chaotic system? What makes a system chaotic? Fractals; drawing fractals, fractal dimension. Strange attractors. Julia sets. The Mandelbrot set. - And more. Along the way we ...
The image of the Mandelbrot set is one of the most recognizable representations of a fractal. But what's behind the entrancing picture? In this interactive, learn a bit about how we generated our ...
It is no exaggeration to say that Mandelbrot is one of the greatest masterminds of our era. Thanks to his work, visual images ...
But once you zoom in, you can see lots of small irregularities that were previously invisible ... The community recognised ...