
Fractal - Wikipedia
Fractal fluency is a neuroscience model that proposes that, through exposure to nature's fractal scenery, people's visual systems have adapted to efficiently process fractals with ease.
Fractal Design Gaming & PC Hardware
Fractal Design is a leading designer and manufacturer of premium PC hardware including cases, cooling, power supplies and accessories.
What are Fractals? - Fractal Foundation
What are Fractals? A fractal is a never-ending pattern. Fractals are infinitely complex patterns that are self-similar across different scales. They are created by repeating a simple process over and over in …
Fractal Audio Systems - Amp Modeling and Effects Processor …
Fractal Audio gives me their uniquely great sounding examples of popular and desired guitar amps, cabs, and effects in one box. Plus I can deep dive and tweak to my heart’s content.
Fractal Playground - Interactive Fractal Visualizer
Create, explore, and share beautiful mathematical fractals in real-time. Interactive WebGL-powered fractal visualizer with custom formulas, animations, and color gradients.
Fractal Explorer
Fractal Explorer — interactive HTML5 canvas for exploring Mandelbrot, Burning Ship, Buffalo and custom hybrids like Not Mandelship, Mandelindicular and What Mandelbrot. Real-time zoom, …
Visnos: Online Fractal Creator (Sierinski, Trees, Snowflakes)
Interactive Fractal Tree The fractal explorer shows how a simple pattern, when repeated, can produce an incredible range of images. With a bit of practice, you’ll be able to create many interesting forms, …
Fractal Explorer - cesoid
Explore mesmerizing fractals with this interactive tool, offering a unique experience to delve into the world of mathematical beauty and patterns.
Fractals – Mathigon
A fractal is a geometric shape that has a fractional dimension. Many famous fractals are self-similar, which means that they consist of smaller copies of themselves. Fractals contain patterns at every …
Fractal Garden
Explore interactive fractals, mathematical patterns, and shareable visualizations across classic sets, L-systems, and 3D recursive forms.