# Julia Set Animation Part 3 – degree 4 polynomial Julia sets

The Julia Set fractal is generated differently than other famous fractals such as the Koch’s Snowflake or the Sierpinski’s Triangle. This fractal is generated by representing each pixel as a complex number and then calculating a color value based off of an iterated function system. Here is the another Julia Set animation.

This Julia Set animation is created from a set of 4320 different Julia Sets on the equation $z_{n+1} = z_n^4 + c$ rather then the famous $z_{n+1} = z_n^2 + c$, and here the values of $c = .75 \cos(x) + .75 i \sin (x)$

Here are selected images at higher resolutions:

For more Fractals images visit the Fractal Corner of the Fun Corner.