(0,24,12,0,0,0,8,6)-deltahedron consisting of 12 modules containing 1 sphere of valency 5, and 2 spheres of valency 4, on top of a rhombic dodecahedron. As a result of connecting everything 8 spheres have a valency of 9, and 6 spheres have a valency of 10. The smallest angle between the rods is about 53.9°, which is quite close to the limit. Because of the shape of the modules, a fitting name (see also here) is a wedge-deltified rhombic dodecahedron. It is completely rigid, and highly reminiscent of Alain Lobel's frames.
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| - (0,24,12,0,0,0,8,6)-deltahedron
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| - (0,24,12,0,0,0,8,6)-deltahedron consisting of 12 modules containing 1 sphere of valency 5, and 2 spheres of valency 4, on top of a rhombic dodecahedron. As a result of connecting everything 8 spheres have a valency of 9, and 6 spheres have a valency of 10. The smallest angle between the rods is about 53.9°, which is quite close to the limit. Because of the shape of the modules, a fitting name (see also here) is a wedge-deltified rhombic dodecahedron. It is completely rigid, and highly reminiscent of Alain Lobel's frames.
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| - Wedge-deltified rhombic dodecahedron
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abstract
| - (0,24,12,0,0,0,8,6)-deltahedron consisting of 12 modules containing 1 sphere of valency 5, and 2 spheres of valency 4, on top of a rhombic dodecahedron. As a result of connecting everything 8 spheres have a valency of 9, and 6 spheres have a valency of 10. The smallest angle between the rods is about 53.9°, which is quite close to the limit. Because of the shape of the modules, a fitting name (see also here) is a wedge-deltified rhombic dodecahedron. It is completely rigid, and highly reminiscent of Alain Lobel's frames.
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