3/16/2023 0 Comments Modular origamiI graduated in 2008 with honors from Moscow state Lomonosov university as a mathematician an programmer I always dreamed to become an architect, but I became a mathematician. When I was a child, I liked to read the book “entertaining math”, architecture catalogs and art encyclopedias I first played these games when I was around 20 years old… My parents forbade me playing with puzzle and Tetris (they think it’s too silly). (the very bad thing about them is that you never have enough parts!) I always liked solving conundrums and playing with construction sets Origami Designer's Secrets: Ekaterina Lukasheva.Make Beautiful Modular Origami Kusudamas.Indeed, it’s easy, when you have the right mood. This understanding guides me when I create new models. It was a breakthrough to me, cause I understood, that it was easy! So easy! I talked to my chef and was playing with a note paper.Īn suddenly I understood that it can be turned to an origami module! It was simple and elegant! In 2008 I discovered my first glue-less unit. (I’m a fan of Transport Tycoon and Civilization). Origami had to compete with my other hobbies: drawing, photographing, modeling and computer strategy games And I tried to make some “my own” things.Īctually my own creations were rare, ugly and paper-consuming. I was born in the family of scientists, so from the cradle I got the feeling, that man must create something new. I thought I would never be able to create something as genius as Sonobe unit. I was totally stunned by the models that require neither glue nor thread to hold together. It was the time, when I got an access to internet, so I could find more models to fold. I had to enter the university, so I spent 2 years to learning mathematics and geometry for the entrance exams.Īfter three years I was able to remember this hobby. It was the fact that has bound me with kusudamas tightly. These positive notes rescued me from total fail with geometry notes. I need to say here, that I had been a lazy pupil and I didn’t make my homework. We folded few of them for a school contest and were granted some positive notes for geometry. With my friend we tried to fold some of the balls. One day, around 2001, our mathematics teacher brought us origami magazine, that contained kusudamas. When I was 14, I was very fond of gluing paper models of buildings in my school. This one is a dodecahedron-shaped (30 units), but a 90-unit truncated icosahedron should also be possible.As I was a pupil I knew origami only in a sense of folding paper airplanes. I only learnt this after I started making these structures, so not all of them have this optimal colouring! The same 3-colour rule is true for the other Platonic solids, and also for the truncated icosahedron.įrancesco Mancini’s star-holes kusudama uses a similar module to the PHiZZ, but with a little back-bend that gives a nice 3D star effect. It’s fairly easy to work out which edge in the 2D diagram correspond to which edge in the thing you’re building.If you colour alternate edges of the Hamiltonian circuit in two of your chosen colours, and the rest of the edges in the third, then you’ll avoid having any colour-clashes. The diagram is a projection of a dodecahedron: imagine taking a wireframe of the dodecahedron and shining a torch through it: the Schlegel diagram is the 2D shadow this 3D polyhedron casts on the wall. You’ll notice that every vertex has one of each of the three coloured edges. The red and purple edges form the Hamiltonian circuit the grey edges are what is left over. Hamiltonian circuit through the Schlegel diagram of a dodecahedron.
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