Trigonal orthobicupolic ring (EntityTopic, 17)
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The '''triangular orthobicupolic ring''' is a [[CRF polychoron]] discovered by [[Keiji]]. It is a member of the family of [[bicupolic ring]]s, which contains eight other similar polychora. It is formed by attaching two [[triangular cupola]]e by their [[hexagon]]al faces, folding them into the fourth dimension with their [[triangular]] ends connected by a [[triangular prism]], and then filling in the gaps with 3 [[tetrahedron|tetrahedra]] and 3 triangular prisms. For faces, it contains one hexagon, 9 squares and 14 [[triangle]]s. | The '''triangular orthobicupolic ring''' is a [[CRF polychoron]] discovered by [[Keiji]]. It is a member of the family of [[bicupolic ring]]s, which contains eight other similar polychora. It is formed by attaching two [[triangular cupola]]e by their [[hexagon]]al faces, folding them into the fourth dimension with their [[triangular]] ends connected by a [[triangular prism]], and then filling in the gaps with 3 [[tetrahedron|tetrahedra]] and 3 triangular prisms. For faces, it contains one hexagon, 9 squares and 14 [[triangle]]s. | ||
Revision as of 23:31, 27 August 2012
The triangular orthobicupolic ring is a CRF polychoron discovered by Keiji. It is a member of the family of bicupolic rings, which contains eight other similar polychora. It is formed by attaching two triangular cupolae by their hexagonal faces, folding them into the fourth dimension with their triangular ends connected by a triangular prism, and then filling in the gaps with 3 tetrahedra and 3 triangular prisms. For faces, it contains one hexagon, 9 squares and 14 triangles.
