An interactive zoom into the Mandelbrot Set, the famously fabulous fractal. ———————————————————————— Instructions: -Click anywhere on the screen to zoom in -Iterate: (top left) choose how detailed the set is *1 is least detailed but also least laggy *3 is most detailed but most laggy (works best on Turbowarp: https://turbowarp.org/1072782607 -Zoom: (top right) select how much you want to zoom in *2 is the largest zoom *0 is no zoom (just moves the screen) *-1 is zoom out -Enter Coords (bottom right) click to enter coordinates to send you to a specific position. If you find anything interesting, post its coordinates in the comments!
The Mandelbrot Set is an infinitely complex shape (a fractal) made up of a 2d set of numbers which do not become infinity when put into the mathematical function: ‘f(z) = z^2 +c’ ————————————————————————— Example coordinates: -Mini Mandelbrot: X= -0.16 Y= 1.035 Zoom= 8 -Very mini Mandelbrot: X= -1.9855 Y= 0 Zoom= 11 -Leafy spirals: X= 0.28 Y= 0.009 Zoom= 9 -Eye: X= -0.173458 Y= 1.071929 Z= 15 (iterate 2) ————————————————————————— TurboWarp link: https://turbowarp.org/1072782607 -Music from world of goo #animations
