On one of the octagonal faces of a truncated cube are five squares and four equilateral triangles. The faces of the model thus are five regular octagons, five squares, and twelve equilateral triangles.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top and bottom faces of this model are regular pentagons. Five equilateral triangles are around the pentagon. Five regular pentagons and five equilateral triangles are below them. Below them are ten squares and below them five squares and five triangles. The faces total seven regular pentagons, fifteen equilateral triangles, and fifteen squares.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has an equilateral triangle on the top and a regular hexagon on the bottom. Six squares rise from the hexagon. Three squares and three equilateral triangles are above these. The model has a total of four equilateral triangles, nine squares, and one regular hexagon for faces.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
Two opposite faces of a truncated cube each have on them four equilateral triangles and five squares. The faces of the model are thus four regular octagons, ten squares, and sixteen equilateral triangles. On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The faces of model include five squares arranged as in the sides of a prism, with pentagonal pyramids of five equilateral triangles each rising from both ends. Its faces total ten equilateral triangles and five squares.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top and bottom faces of this model are regular pentagons and the side faces include pentagons, triangles, and squares. The total number of faces includes thirty-five equilateral triangles, five squares, and seven regular pentagons.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
In this model, one of the hexagonal faces of a truncated tetrahedron has on it four equilateral triangles and three squares. The faces of the model are thus three regular hexagons, three squares, and eight equilateral triangles.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The faces of this model are sixteen equilateral triangles. Four are arranged in pyramid on one end, four in a pyramid at the bottom, and the remainder around the middle as in an antiprism.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has twelve equilateral triangles for faces. Two on top are almost in one plane, as are two at the bottom. The remainig eight triangles form the sides. On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top and bottom of this model are squares. The side faces are eight equilateral triangles and eight squares. Hence the faces total eight equilateral triangles and ten squares.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model is an extension of a truncated dodecahedron. On two of decagonal faces, the decagon serves as the base of a figure with a regular pentagon on top and five squares and fiveequilateral triangles below. These "augmented" sides are opposite one another. The faces of the model total thrity equilateral triangles, ten squares, two regular pentagons, and ten regular decagons.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.