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- Compound_of_twelve_tetrahedra_with_rotational_freedom abstract "This uniform polyhedron compound is a symmetric arrangement of 12 tetrahedra, considered as antiprisms. It can be constructed by superimposing six identical copies of the stella octangula, and then rotating them in pairs about the three axes that pass through the centres of two opposite cubic faces. Each stella octangula is rotated by an equal (and opposite, within a pair) angle θ. Equivalently, a stella octangula may be inscribed within each cube in the compound of six cubes with rotational freedom, which has the same vertices as this compound. When θ=0, all six stella octangula coincide. When θ is 45 degrees, the stella octangula coincide in pairs yielding (two superimposed copies of) the compound of six tetrahedra.".
- Compound_of_twelve_tetrahedra_with_rotational_freedom thumbnail UC02-12_tetrahedra.png?width=300.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageID "14892761".
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageLength "1807".
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageOutDegree "20".
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageRevisionID "575382169".
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Antiprism.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Category:Polyhedral_compounds.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Compound_of_six_cubes_with_rotational_freedom.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Compound_of_six_tetrahedra.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Cube.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Cyclic_symmetry_in_three_dimensions.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Octahedral_symmetry.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Stellated_octahedron.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Subgroup.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Symmetry_group.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Tetrahedron.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Triangle.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink Uniform_polyhedron_compound.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLink File:UC02-12_tetrahedra.png.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageWikiLinkText "Compound of twelve tetrahedra with rotational freedom".
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageUsesTemplate Template:Citation.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wikiPageUsesTemplate Template:Polyhedron-stub.
- Compound_of_twelve_tetrahedra_with_rotational_freedom subject Category:Polyhedral_compounds.
- Compound_of_twelve_tetrahedra_with_rotational_freedom hypernym Arrangement.
- Compound_of_twelve_tetrahedra_with_rotational_freedom type MusicalWork.
- Compound_of_twelve_tetrahedra_with_rotational_freedom comment "This uniform polyhedron compound is a symmetric arrangement of 12 tetrahedra, considered as antiprisms. It can be constructed by superimposing six identical copies of the stella octangula, and then rotating them in pairs about the three axes that pass through the centres of two opposite cubic faces. Each stella octangula is rotated by an equal (and opposite, within a pair) angle θ.".
- Compound_of_twelve_tetrahedra_with_rotational_freedom label "Compound of twelve tetrahedra with rotational freedom".
- Compound_of_twelve_tetrahedra_with_rotational_freedom sameAs Q5156903.
- Compound_of_twelve_tetrahedra_with_rotational_freedom sameAs Kombinaĵo_de_12_kvaredroj_kun_turna_libereco.
- Compound_of_twelve_tetrahedra_with_rotational_freedom sameAs m.03h0pqh.
- Compound_of_twelve_tetrahedra_with_rotational_freedom sameAs Q5156903.
- Compound_of_twelve_tetrahedra_with_rotational_freedom wasDerivedFrom Compound_of_twelve_tetrahedra_with_rotational_freedom?oldid=575382169.
- Compound_of_twelve_tetrahedra_with_rotational_freedom depiction UC02-12_tetrahedra.png.
- Compound_of_twelve_tetrahedra_with_rotational_freedom isPrimaryTopicOf Compound_of_twelve_tetrahedra_with_rotational_freedom.