A Regular Icosagon, Split Into 180 Rhombi
A Regular Icosagon, Split Into 180 Rhombi
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A Regular Icosagon, Split Into 180 Rhombi
A Regular Icosagon, Split Into 180 Rhombi
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An Icosagon, With All Sides and Diagonals Shown
An Icosagon, With All Sides and Diagonals Shown
Each segment-length was given its own color.
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Un dragon sans ailes sur un socle icosagonal (vingt côtés).
Juin 2019
A Polyhedron Featuring Icosagons, Kites, and Triangles I made this using Stella 4d, which is available at

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Sketch-a-day, 2016: Day 50: The Lost Temple of d’Twenty! Pen & Ink. #sketchaday2016 #icosagon #d20 #icosahedron
Cat Climbing Trees: I’m Making A Giant Cat Wheel I want to make a cat wheel for my cats who run around all night and wake everybody up. I don’t want to buy one because they are really expensive and there are plenty of other things I could d...
Tarski's circle-squaring problem is the challenge, posed by Alfred Tarski in 1925, to take a disc in the plane, cut it into finitely many pieces, and reassemble the pieces so as to get a square of equal area. This was proven to be possible by Miklós Laczkovich in 1990; the decomposition makes heavy use of the axiom of choice and is therefore non-constructive. By approximating the circle with even-sided polygons, "paper and scissor" dissections become possible. Shown above is the dissection of a icosagon into a square. Read more.