DBpedia – Linked Data Fragments

Matches in DBpedia 2016-04 for { ?s ?p "A hemi-cuboctahedron is an abstract polyhedron, containing half the faces of a semiregular cuboctahedron.It has 4 triangular faces and 3 square faces, 12 edges, and 6 vertices. It can be seen as a rectified hemi-octahedron or rectified hemi-cube. It can be realized as a projective polyhedron (a tessellation of the real projective plane by 4 triangles and 3 square), which can be visualized by constructing the projective plane as a hemisphere where opposite points along the boundary are connected."@en }

• Hemi-cuboctahedron abstract "A hemi-cuboctahedron is an abstract polyhedron, containing half the faces of a semiregular cuboctahedron.It has 4 triangular faces and 3 square faces, 12 edges, and 6 vertices. It can be seen as a rectified hemi-octahedron or rectified hemi-cube. It can be realized as a projective polyhedron (a tessellation of the real projective plane by 4 triangles and 3 square), which can be visualized by constructing the projective plane as a hemisphere where opposite points along the boundary are connected.".
• Q19597418 abstract "A hemi-cuboctahedron is an abstract polyhedron, containing half the faces of a semiregular cuboctahedron.It has 4 triangular faces and 3 square faces, 12 edges, and 6 vertices. It can be seen as a rectified hemi-octahedron or rectified hemi-cube. It can be realized as a projective polyhedron (a tessellation of the real projective plane by 4 triangles and 3 square), which can be visualized by constructing the projective plane as a hemisphere where opposite points along the boundary are connected.".
• Hemi-cuboctahedron comment "A hemi-cuboctahedron is an abstract polyhedron, containing half the faces of a semiregular cuboctahedron.It has 4 triangular faces and 3 square faces, 12 edges, and 6 vertices. It can be seen as a rectified hemi-octahedron or rectified hemi-cube. It can be realized as a projective polyhedron (a tessellation of the real projective plane by 4 triangles and 3 square), which can be visualized by constructing the projective plane as a hemisphere where opposite points along the boundary are connected.".
• Q19597418 comment "A hemi-cuboctahedron is an abstract polyhedron, containing half the faces of a semiregular cuboctahedron.It has 4 triangular faces and 3 square faces, 12 edges, and 6 vertices. It can be seen as a rectified hemi-octahedron or rectified hemi-cube. It can be realized as a projective polyhedron (a tessellation of the real projective plane by 4 triangles and 3 square), which can be visualized by constructing the projective plane as a hemisphere where opposite points along the boundary are connected.".