Division of an angle into equal parts and construction of regular polygons by multi-fold origami

Abstract

This article analyses geometric constructions by origami when up to n simultaneous folds may be done at each step. It shows that any arbitrary angle can be m-sected if the largest prime factor of m is p n+2. Also, the regular m-gon can be constructed if the largest prime factor of φ(m) is q n+2, where φ is Euler's totient function.