My artistic nephew is making a lamp which involves using the largest possible number of
regular tetrahedra — solid bodies with four faces, each an equilateral triangle — whose faces will be painted with various colours.
For example, a simple eternal object, say a «particular shade of green,» can be incorporated in «another eternal object of the lowest complex grade,» say «three definite colors with the spatio - temporal relatedness to each other of three faces of
a regular tetrahedron, anywhere at any time» (SMW 166).
George E. Smith says: March 8, 2011 at 4:18 pm So I had always pictured those two bond pairs as being perpendicular to each other as are any two pairs of vertices on
a regular Tetrahedron.
So I had always pictured those two bond pairs as being perpendicular to each other as are any two pairs of vertices on
a regular Tetrahedron.
Not exact matches
The hovering guests include five
regular, convex polyhedrons comprised of identically sided, congruent faces: the
tetrahedron, cube, octahedron, dodecahedron and icosahedron.
All of them were in the form of
regular geometric solids: spheres,
tetrahedrons, cubes, cones and so on... There were tori, solid crosses, and even something that looked like a Mobius strip... the solids filled more than half the sky, as though a giant child had emptied a box of building blocks... Then, all the geometric solids began to deform.