I'm interested in solid geometry (polyhedra, 4-dimensional polytopes) and algebraic varieties (curves, surfaces) and I like to create models of these complex objects. Feel free to ask me also customized designs, for example a polyhedron with given dimensions and features. A polyhedron can be realized in different ways, like ball-and-stick style, solid faces, Leonardo-style, curved edges, and so on. Any one of these objects can be also equipped with a ring and transformed into a pendant or a keyholder. Numbers or labels added to any (suitable) polyhedron turn it into a die.
IMPORTANT: Sort the items by "newest" to see the latest things!
Nearly all models are available also in the new colors. Ask in case.
IMPORTANT: Sort the items by "newest" to see the latest things!
Nearly all models are available also in the new colors. Ask in case.
We found 142 products by friz
by
friz
A set of isohedral hollow dice. Each of them is already available in standalone form. In this bundle:
1) Isohedral trapezoidal hexahedron (6 faces). See rendering, magenta.
2) Isohedral non-regular octahedron (8 faces). See rendering, cyan.
3) Isohedral trapezoidal dodecahedron (12 faces). See rendering, yellow.
4) Pentagonal dipyramid (10 faces). See rendering, blue.
5) Triangular dipyramid (6 faces). See rendering, brown.
.
1) Isohedral trapezoidal hexahedron (6 faces). See rendering, magenta.
2) Isohedral non-regular octahedron (8 faces). See rendering, cyan.
3) Isohedral trapezoidal dodecahedron (12 faces). See rendering, yellow.
4) Pentagonal dipyramid (10 faces). See rendering, blue.
5) Triangular dipyramid (6 faces). See rendering, brown.
.
by
friz
A 16-sided die based on an isohedral "skewed in-out" dipyramid. The faces are identical scalene triangles. Numbering 01-16.
Added an octagonal frame on the equatorial plane to prevent the die from landing on the "flat" edges (e.g. 12-06, see image).
Added an octagonal frame on the equatorial plane to prevent the die from landing on the "flat" edges (e.g. 12-06, see image).
by
friz
A die based on a isohedral trapezoidal hexahedron. In other words, a distorted cube whose 6 faces are identical irregular quadrilateral. Plain version.
by
friz
A 16-sided die based on an isohedral "skewed in-out" dipyramid. The faces of the base polyhedron are identical scalene triangles. The numbering follows the hexadecimal digits 0123456789ABCDEF. The outer polyhedral shell is supported by an inner stick cross.
Added an octagonal frame on the equatorial plane to prevent the die from landing on the "flat" edges (e.g. D-9, see image).
Added an octagonal frame on the equatorial plane to prevent the die from landing on the "flat" edges (e.g. D-9, see image).
by
friz
A 8-sided die based on an isohedral non-regular octahedron. The faces are identical scalene triangles. The number to be read is that on the face which doesn't touch ground. Plain version.
by
friz
A 12-sided die based on an isohedral non-regular dodecahedron. The faces are irregular pentagons with only one axis of symmetry. Plain version.
by
friz
A 10-sided die based on a pentagonal dipyramid (dual of the pentagonal Archimedean prism). When it lies on a face an edge is up. Numbering 0-9. Original design by Kevin Cook.
Solid core version.
Solid core version.
by
friz
A 10-sided die based on a pentagonal dipyramid (dual of the pentagonal Archimedean prism). When it lies on a face an edge is up. Numbering 0-9. Original design by Kevin Cook.
Hollow version.
Hollow version.
by
friz
A 6-sided die based on a dipyramid (a double tetrahedron, not the dual of triangular prism). When it lies on a face an edge is up. Max length = 28 mm. Original design by Kevin Cook.
by
friz
A 12-sided die based on a distorted hexagonal trapezohedon. When it lies on a face an edge is up, numbered 1-12. Original design by Kevin Cook. Plain hollow version.
by
friz
A simple die based on a diakisdodecahedron, an isohedral solid with non-regular pentagonal faces.
by
friz
A pendant or keyholder based on the disdyakisdodecahedron, one of the 13 Catalan polyhedra.
by
friz
A keyholder or pendant based on the Pentagonal Icositetrahedon, one of the 13 Catalan polyhedra.
by
friz
A 6-sided die based on a stella octangula, the regular compound of two dual tetrahedra. Second version, with spherical pips.
by
friz
A tetrahedral die based on a set of four rhombic dodecahedra. The vertices are numbered 0,1,2,3 according to the number of pips.
Monochrome version.
Monochrome version.
by
friz
A 6-sided die based on a stella octangula, the regular compound of two dual tetrahedra. First version, with numbers carved on three crossed prisms.
by
friz
A 24-sided die based on a diakisdodecahedron, an isohedral solid with non-regular pentagonal faces. Monochrome version.
by
friz
A 12-sided die based on an isohedral non-regular dodecahedron. The faces are irregular pentagons with only one axis of symmetry. Monochrome version.
by
friz
A die based on a isohedral trapezoidal hexahedron. In other words, a distorted cube whose 6 faces are identical irregular quadrilateral. The numbers are represented by holes in the windows. Monochrome version.
by
friz
Another tetrahedral die designed for an easy rolling. The numbers are etched on four balls at the tetrahedron vertices. The interior is hollow.
First version, small (maximum size 20 mm) for metal print.
First version, small (maximum size 20 mm) for metal print.
by
friz
A 8-sided die based on an isohedral non-regular octahedron. The faces are identical scalene triangles. The numbers are supported by an inner sphere, in turn fixed to the outer polyhedral shell. The number to be read is that on the face which doesn't touch ground. First version, monochrome.
by
friz
A 12-sided die based on a distorted hexagonal trapezohedon. When it lies on a face an edge is up. A variation on an original design by Kevin Cook.
by
friz
A 6-sided die based on a dipyramid (a double tetrahedron, not the dual of triangular prism). When it lies on a face an edge is up. The numbers are represented by geometric shapes (circle=1, digon=2, triangle=3, etc). Max length = 28 mm. A variation on an original design by Kevin Cook.
by
friz
A 10-sided die based on a pentagonal dipyramid (dual of the pentagonal Archimedean prism). When it lies on a face an edge is up. A variation on an original design by Kevin Cook.
by
friz
A 10-sided die based on a pentagonal dipyramid (dual of the pentagonal Archimedean prism). When it lies on a face an edge is up. A variation on an original design by Kevin Cook.
by
friz
A 6-sided die based on a dipyramid (a double tetrahedron, not the dual of triangular prism). When it lies on a face an edge is up. The numbers are represented by notches. Max length = 28 mm. A variation on an original design by Kevin Cook.
Second version, hollow.
Second version, hollow.
by
friz
A 6-sided die based on a dipyramid (a double tetrahedron, not the dual of triangular prism). When it lies on a face an edge is up. The numbers are represented by notches. Max length = 28 mm. A variation on an original design by Kevin Cook.
First version, solid core.
First version, solid core.
by
friz
A tetrahedral die inspired to a sci-fi starship of the 60s. The numbers are represented by circular slots on the tips, designed in such a way that the center of mass of the die remains at the tetrahedron center.
Second version, colored.
Second version, colored.
by
friz
A 3D projection of the 8-cell, or Hypercube, one of the 6 regular polytopes in four dimensions.
4D Polytopes (or polychora) are the 4-dimensional analogous of the 2D polygons and 3D polyhedra.
Regular polychora are composed of a finite set of cells (polyhedra), all regular and alike, surrounding each edge in an identical way.
We cannot see a 4D polytope, but we can project it in 3D (in the same way as we make a flat drawing of a polyhedron).
The Hypercube is composed of 8 cubes.
This is a special central projection (perspective) of the polytope, in which no cells or edges intersect each other. It is also called a Schlegel diagram.
4D Polytopes (or polychora) are the 4-dimensional analogous of the 2D polygons and 3D polyhedra.
Regular polychora are composed of a finite set of cells (polyhedra), all regular and alike, surrounding each edge in an identical way.
We cannot see a 4D polytope, but we can project it in 3D (in the same way as we make a flat drawing of a polyhedron).
The Hypercube is composed of 8 cubes.
This is a special central projection (perspective) of the polytope, in which no cells or edges intersect each other. It is also called a Schlegel diagram.
Shop Details
