Also known as 24-hedron
{| class=wikitable align=right |- align=center |200pxTriakis octahedron |200pxTetrakis hexahedron |- align=center |200pxDeltoidal icositetrahedron |200pxPentagonal icositetrahedron |} In geometry, an icositetrahedron refers to a polyhedron with 24 faces, none of which are regular polyhedra. However, many are composed of regular polygons, such as the triaugmented dodecahedron and the disphenocingulum. Some icositetrahedra are near-spherical, but are not composed of regular polygons. A minimum of 14 vertices is required to form a icositetahedron.
{| class=wikitable align=right |- align=center |200pxTriakis octahedron |200pxTetrakis hexahedron |- align=center |200pxDeltoidal icositetrahedron |200pxPentagonal icositetrahedron |} In geometry, an icositetrahedron refers to a polyhedron with 24 faces, none of which are regular polyhedra. However, many are composed of regular polygons, such as the triaugmented dodecahedron and the disphenocingulum. Some icositetrahedra are near-spherical, but are not composed of regular polygons. A minimum of 14 vertices is required to form a icositetahedron.
== Symmetry == There are many symmetric forms, and the ones with highest symmetry have chiral icosahedral symmetry:
Discovered by embedding cosine similarity (sentence-transformers MiniLM, 384-dim).