![]() ![]() Self-similar Waveįrom Thomas Hull’s book Project Origami, this is a self-similar origami model and can go on as long as your paper, and skill, permits. When used on somewhat rigid paper, the Miura Map Fold lets you unfold (and refold) your paper by just pulling (and pushing) on a pair of opposite corners.įor more details, visit. Koryo Miura, professor emeritus at the University of Tokyo, developed this fold in the 1970s, as a way of folding things like solar panel arrays so that they could be easily opened and closed for use in spacecraft. A few of the models you will see are listed below, and I will create some more detailed blog posts here for a few of them too, if you would like to learn more. Most of the models were constructed by members of the Association for Women in Mathematics student chapter at UVic and their friends. We hope our mathematical art brightens your December exam period! Visit the classroom wing of the Elliot Building to see a display of mathematical origami starting in early December 2022. It is harder to properly three-colour the triakis icosahedron, though! For the triakis octahedron and the triakis icosahedron, three colours suffice (the triakis icosahedron pictured below is properly three-coloured).An icosahedron has 20 faces, each of which is replaced by a trio of Sonobe units, and each unit participates in two faces, so you need 30 pieces of paper. ![]()
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