It's been a long time since I've posted an origami puzzle!

An origami puzzle is solved with some thickness $x$ iff it can be folded into a rectangle (possibly a square) with thickness $x$ everywhere.

Identify a puzzle in the official ORIGAMI PUZZLES that can be solved with some thickness $t'$ that is a non-trivial factor of its labeled thickness $t$ (that is, $t'|t$ and $t'\ne t$) and solve it as such.

Although solutions are not required to be applicable in real life, using an actual sheet of paper is a great visualization tool.

A puzzle for this type of orgami puzzle game made by Ωmega_3301, similar to this question.

  • $\begingroup$ I can fold #14 to thickness 5, #25 to 5, #26 to 7, #27 to 11 and #29 to 12. Does it count as trivial? $\endgroup$
    – Florian F
    Commented May 21 at 6:43
  • $\begingroup$ How does that answer my question? $\endgroup$
    – Sny
    Commented May 21 at 10:35

1 Answer 1


$t = 4$, $t' = 2$:
enter image description here

Found this when originally solving the first few example puzzles.

  • $\begingroup$ Intended, well done $\endgroup$
    – Sny
    Commented May 20 at 23:00

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