CNKI
A Projection of the Regular Polytope with 24 Octahedral Cells
How may the total surface of a sphere be divided into the largest possible number of congruent pieces, if each side of each piece is an arc of a great circle less than a quadrant?
Expected Distance between the Vertices of a Dodecahedron
If the five Platonic solids are inscribed in the unit sphere, the one having the greatest volume is the dodecahedron. Sho\v this. Is this also true for surface area?
Kepler's Echinus
Rhombic dodecahedron is a space-filling polyhedron
formation of the rhombic dodecahedron influence the action of the bee in the construction of its cell
William Hamilton's Icosian Game cannot be done for the rhombic dodecahedron
Stellations of the Rhombic Dodecahedron
The King's Chamber and the Geometry of the Sphere
Connections with the Regular Octohedron