This model has a regular pentagon on the top, a round of five equilateral triangles, a round of five regular pentagons and five equilateral triangles, a round of ten squares, and a regular decagon on the bottom. Hence its faces total of six regular pentagons, ten equilateral triangles, ten squares, and a regular decagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The bottom of this model is a regular decagon, the top a regular pentagon. Above the decagon are twenty triangular faces. Above these are five squares which alternate with five triangles. Hence the faces are twenty-five equilateral triangles, five squares, one regular pentagon, and one regular decagonal.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has a square top, four squares and four equilateral triangles in next layer, eight squares in next layer, and a regular octagon on bottom. Thus its faces total four equilateral triangles, thirteen squares, and one regular octagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has a regular hexagon on the base, an equilateral triangle on top, and three squares and three equilateral triangles around the sides. TIn sum, the faces are four equilateral triangles, three squares, and one regular hexagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The base of this model is a regular octagon, the top a square. Above the octagon is a round of sixteen equilateral triangles, alternating in orientation. Above the triangles is a round of four squares and four triangles. The model has a total of twenty equilateral triangles, four squares, and one regular octagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has a square top and bottom, as well as eight equilateral triangles and eight squares on the sides. The faces total of eight equilateral triangles and ten squares.The model is not identical to 1978.1065.48.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has a regular decagon on the bottom and a regular pentagon on the top. Above the decagon are twenty triangles. Above the triangles are five pentagons alternating with five sets of two triangles. This comes to a total of thirty equilateral triangles, six regular pentagons, and one regular decagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
One of the decagonal faces of a truncated dodecahedron has been replaced by a surface with one regular pentagon, five squares, and five triangles. The faces of model total twenty-five equilateral triangles, five squares, one regular pentagon, and eleven regular decagons.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top and bottom faces of this model are regular pentagons. Ten additional regular pentagons and twenty equilateral triangles form the sides. Hence in total the faces are are twelve pentagons and twenty triangles.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top of this model is a regular decagon. Other faces are fifteen equilateral triangles, twenty-five squares, and eleven regular pentagons. One pentagon is the base. Compare 1978.1065.098.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has squares top and bottom faces. A ring of four squares and four equilateral triangles is below top square and another such ring is above bottom square. An additional ring of eight squares around is center. Hence the model has a total of eighteen square faces and eight triangular faces.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
The top (or bottom) of this model is a regular decagon. Opposite it is a regular pentagon. In sum, the faces are thirteen equilateral triangles, twenty-five squares, twelve regular pentagons, and a regular decagon.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model has a regular pentagon on top and bottom and includes two regular decagons as faces. Half of the model mirror image of the other, if one selects the right halves. The faces total ten equilateral triangles, twenty squares, ten regular pentagons, and two regular decagons.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.
This model is an "augmentation" of a truncated dodecahedron. On three decagonal faces, the decagon serves as the base of a figure with a regular pentagon on top and five square and five triangular sides. The faces of the model total of thirty-five equilateral triangles faces, fifteen squares, three regular pentagons, and nine regular decagons.
On Berman's models of regular-faced convex polyhedra, see 1978.1065.01.