I have unobfuscated and simplified this animation into a jsfiddle available here. Nevertheless, I still don't quite understand the math behind it.
Does someone have any insight explaining the animation?
I have unobfuscated and simplified this animation into a jsfiddle available here. Nevertheless, I still don't quite understand the math behind it. Does someone have any insight explaining the animation? 


Your fiddle link wasn't working for me due to a missing interval speed, should be using Here, I forked it, use this one instead: http://jsfiddle.net/spechackers/hJhCz/ I have also cleaned up the code in your first link:
The result of the code in the two links you provided are very different from one another.
However the logic in the code is quite similar. Both use a forloop to loop through all the characters, a mod operation on a noninteger number, and a How does it all work, well basically all All the logic appears to be some sort of I don't quite follow it myself from a 


Consider that each line, as it sweeps across the rectangular area, is actually a rotation of (4?) lines about a fixed origin. The background appears to "move" according to optical illusion. What actually happens is that the area in between the sweep lines is toggling between two char's as the lines rotate through them. Here is the rotation eq in 2 dimensions: first, visualize an (x,y) coordinate pair in one of the lines, before and after rotation (motion): So, you could make a collection of points for each line and rotate them through arbitrarily sized angles, depending upon how "smooth" you want the animation. 


The answer above me looks at the whole plane being transformed with the given formulae. I tried to simplify it here  The formula above is a trigonometric equation for rotation it is more simply solved with a matrix. x1 is the x coordinate before the the rotation transformation (or operator) acts. same for y1. say the x1 = 0 and y1 = 1. these are the x,y coordinates of of the end of the vector in the xy plane  currently your screen. if you plug any angle you will get new coordinates with the 'tail' of the vector fixes in the same position. If you do it many times (number of times depends on the angle you choose) you will come back to 0 x = 0 and y =1. as for the bitwise operation  I don't have any insight as for why exactly this was used. each iteration there the bitwise operation acts to decide if the point the plane will be drawn or not. note k how the power of k changes the result. Further reading  http://en.wikipedia.org/wiki/Linear_algebra#Linear_transformations http://www.youtube.com/user/khanacademy/videos?query=linear+algebra 

