X-Google-Language: ENGLISH,ASCII-7-bit X-Google-Thread: f996b,2ca64c7b16429617 X-Google-Attributes: gidf996b,public From: JoJo Ro Subject: Re: Request: Geometric Solids Date: 1997/05/29 Message-ID: <338D97D7.5CAF@garnet.acns.fsu.edu>#1/1 X-Deja-AN: 244735791 References: <338C262B.7119@garnet.fsu.edu> Organization: Florida State University Newsgroups: alt.ascii-art In article <338C262B.7119@garnet.fsu.edu>, Michael Naylor writes: >The Platonic, or >perfect, solids are those five shapes with every face a regular polygon, >and having the same number of edges meeting at each vertex... otherwise >known as "D & D dice". Dave Bird Writes: Omigawd. Remind me: terahedron (three triangles meet at each vertex), cube (four squares meet at each vertex), and... Dodecahedron and Icosahedron, one is converse to the other i.e. got by drawing a dot for the centre of each face of the other, then that thing with 60 vertices like the drawing on a football. Hmm. Yes, they might be a bit awkward to draw in ascii. Here they are: Tetrahedron: Four triangular sides, a pyramid with a triangular base (unlike the Egyptian pyramids, which have square bases) Cube: A cube. You, know, six squares, a box. Octahedron: Eight triangular faces, meeting four at a corner. Picture two Eygtian pyramids stuck bottom-to-bottom. Dodecahedron: Twelve pentagonal faces. Sheesh, if you thought drawing a pentacle was tough... The pentagons meet three to a corner. Icosahedron: Twenty triangular faces, meeting five at a corner. Can't think of anything you might have seen before with this shape. It's sort of reminiscent of Epcot, but Epcot is a geodesic dome with hundreds of faces. The 60-vertex monster you're talking about is a truncated icosahedron... that is, an icosahedron with the corners clipped. Each triangular face becomes a hexagon (corners clipped), and at each vertex, where five triangles used to meet, is a pentagon. There are, therefore, 20 hexagons, 12 pentagons, and yes, 60 vertices. This is indeed, a football (or "soccer ball" as we say in the States), and there is even a carbon molecule formed this way known as the "Buckey Ball" after its discoverer, Buckminster Fuller. Anyways, yes, making these shapes in ASCII is a real challenge. Any takers? Michael ---- __ __ () _ _ __ __ _ _ __ __ ___ ___ o | \_|_\ | \/ |--| '(| =| | \| |/o \ " /|_/ O | O ) () o |_|_| | |_\__/_|__|_|_|__| |_|\__|_/\_|_|___|__/|_\_\ o_/||\/ \|__\| Michael Naylor, mnaylor@math.fsu.edu, (904) 644-8433 _/\_