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• Portal to Polyhedra
  | '''[[Portal to Polyhedra]]''' | A series on polyhedra and associated tensegrities
  899 bytes (86 words) - 22:21, 11 April 2022
• Mapping solid polyhedra to tensegrity structures
  Lutz Golbs found so far two methods to 'tensegrify' regular, symmetrical polyhedra. One seems universally applicable, the other works only for the icosahedron [[Category:Portal to polyhedra]]
  7 KB (969 words) - 22:23, 11 April 2022

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• Portal to Polyhedra
  | '''[[Portal to Polyhedra]]''' | A series on polyhedra and associated tensegrities
  899 bytes (86 words) - 22:21, 11 April 2022
• Dodecahedron
  The dodecahedron is one of the Platonic polyhedra. Its dual is the icosahedron. [[Category:Portal to polyhedra]]
  477 bytes (62 words) - 22:22, 11 April 2022
• 11 struts
  11 struts outline unpredictable forms that do not conform with any regular polyhedra. [[Category:portal to polyhedra]]
  560 bytes (78 words) - 22:22, 11 April 2022
• Rossiter, Adrian
  Adrian Rossiter maintains the Antiprism polyhedra visualization software, website and email list. He resides in El Puerto de .... The photos are on his website. He often names the tensegrities after the polyhedra that their outline conforms to.
  2 KB (239 words) - 22:22, 11 April 2022
• T-icosa
  See [[Portal to polyhedra]].
  122 bytes (13 words) - 22:22, 11 April 2022
• Tricontahedron
  [[Category:Portal to polyhedra]]
  394 bytes (49 words) - 22:22, 11 April 2022
• Cuboctahedron
  The cuboctahedron is one of the Archimedean [[Portal to polyhedra|polyhedra]]. It can be conceived as formed of truncating a [[cube|cube]] or [[octahed ...ables of the diamond pattern tensegrities. Several regular and semiregular polyhedra can be built related to this class, e.g. cuboctahedron, icosidodecahedron,
  3 KB (418 words) - 22:22, 11 April 2022
• 30 struts
  [[Category:portal to polyhedra]]
  563 bytes (72 words) - 22:22, 11 April 2022
• Cube
  The cube is one of the Platonic polyhedra. Also known as the hexahedron, it is the dual of the [[Octahedron|octahedro Link: [[http://www.pendred.net/Polyhedra/six_sticks.htm]]
  3 KB (409 words) - 22:22, 11 April 2022
• Stella Octangula
  ...known to earlier geometers. It is the simplest of five regular [[Portal to polyhedra|polyhedral]]compounds. [[Category:Portal to polyhedra]]
  2 KB (281 words) - 22:22, 11 April 2022
• 15 struts
  [[Category:portal to polyhedra]]
  746 bytes (95 words) - 22:22, 11 April 2022
• Rhombic Dodecahedron
  [[Category:Portal To Polyhedra]]
  642 bytes (90 words) - 22:22, 11 April 2022
• 60 Struts
  [[Category:portal to polyhedra]]
  1,000 bytes (134 words) - 22:22, 11 April 2022
• 9 Struts
  [[Category:Portal To Polyhedra]]
  933 bytes (126 words) - 22:22, 11 April 2022
• Tetrahedron
  ...ahedron|octahedron]], [[icosahedron]], and the other [[Portal to polyhedra|polyhedra]]. [[Category:Portal to polyhedra]][[Category:polyhedron]]
  5 KB (742 words) - 22:22, 11 April 2022
• Octahedron
  The octahedron is one of the Platonic polyhedra. [[Category:Portal to polyhedra]]
  3 KB (445 words) - 22:22, 11 April 2022
• Jitterbug
  ...anipulations that instantiate rotational symmetries and formation of other polyhedra including the [[icosahedron]], [[octahedron]] and [[tetrahedron]]. [[Category:Portal to polyhedra]]
  3 KB (467 words) - 22:22, 11 April 2022
• 12 struts
  [[Category:portal to polyhedra]]
  1,006 bytes (143 words) - 22:22, 11 April 2022
• Cardboard Model Building
  Construct a cardboard model of the target regular polyhedra. In [[Connelly, Robert|Connelly's]] article, he shows a cube constructed of
  1 KB (172 words) - 22:22, 11 April 2022
• 8 struts
  [[Category:Portal To Polyhedra]]
  1 KB (183 words) - 22:22, 11 April 2022

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