Here’s a simple origami experiment to try. Start with a long strip of paper with different colors on the two sidesâ€”e.g., Orange (`O`

) on one side, Indigo (`I`

) on the other. Now fold the strip in quarters to form a flat “S-shape” as illustrated here (creases are drawn slightly rounded for ease of viewing):

As you look through the four layers from top to bottom, write down the colors you encounter, in order: the first layer shows Indigo (`I`

), the second layer has Orange (`O`

), and so on. The full order is `IOOI`

, which looks suspiciously like the start of the Thue-Morse sequence. (This sequence was introduced last week.)

To continue the experiment, treat this figure as a single strip and fold the same flat S-shape again. There will be 16 layers down the middle:

Sure enough, the order of colors encountered is `IOOI OIIO OIIO IOOI`

, which is the first 16 digits of the Thue-Morse sequence. This pattern will continue forever (or at least until the paper gets too thick to fold): every time you fold another S-shape, you quadruple the number of digits of the Thue-Morse sequence (can you see why?). Try to fold a third iteration! It looks like this (click for larger image):

But wait, there’s more! Now that we have these creased strips, what happens when we unfold them? Specifically, follow the existing creases and lay out the strips so that each crease makes a 90-degree angle. What shapes do we get? Surprisingly, they exactly fill triangular grids of squares:

Can you figure out why this pattern continues?