Top Pages Related to: Regular Polyhedra
=> Divine Theophanies and the Five Divine Presences... with the various categories that we have discussed earlier, such as the four elements and their Quintessence, the five quantum fields, the dimensions of complex-time geometry, and the five regular polyhedra. To understand these connections, that we shall elucidate further in the book, it ...
=> ULTIMATE SYMMETRY - IV.3.4 The Icosahedron... welve vertices, and thirty edges. A regular Icosahedron consists of twenty equilateral triangles, with five of those triangles meeting at each vertex. The Icosahedron is the only one of the regular polyhedra to have a dihedral angle with a magnitude greater than one hundred and twenty degr ...
=> ULTIMATE SYMMETRY - IV.3.3 The Octahedron... r faces, six vertices, and twelve edges. A regular Octahedron consists of eight equilateral triangles, with four of those triangles meeting at each vertex. It is in fact the only one of the regular polyhedra to have an even number of faces meeting at a single vertex. Various minerals have ...
=> ULTIMATE SYMMETRY - IV.1.5 Divine Theophanies and the Five
Planes of Existence... with the various categories that we have discussed earlier, such as the four elements and their Quintessence, the five quantum fields, the dimensions of complex-time geometry, and the five regular polyhedra. To understand these connections, that we shall elucidate further in the book, it ...
=> ULTIMATE SYMMETRY - Contents... ry IV.2.2 The Mathematical One-to-Many Relation IV.2.3 The Real-Through-Whom-Things-Are-Created IV.2.4 The Seven Heavens and the Inner Levels of Time IV.3 Complex-Time Geometry and the Five Regular Polyhedra IV.3.1 The Tetrahedron IV.3.2 The Hexahedron IV.3.3 The Octahedron IV.3.4 The Icos ...
=> Message from the Author... original complex-scaler field. These four/five fundamental levels of geometry are reflected in Nature on many levels, such as the four classical elements (and their quintessence) , the five regular Polyhedra (known as the Platonic Solids), the Kaaba (with its cubic shape and four cardinal ...
=> TIME CHEST - Contents... r 3: Complex-Time Geometry and Ultimate Symmetry 3.1 The Duality of Time Postulate 3.2 The Classical Elements and Quantum Field Theory 3.2.1 The Five Fundamental Interactions 3.2.2 The Five Regular Polyhedra 3.2.3 Least Action and the Principle of Love 3.3 The Logical Interpretation of Qua ...
=> ULTIMATE SYMMETRY - IV.3 Complex-Time Geometry and the
Five Regular Polyhedra... on General Relativity and Quantum Mechanics ...
=> TIME CHEST - 3.2.2 The Five Regular Polyhedra... ences on General Relativity and Quantum Mechanics ...
=> ULTIMATE SYMMETRY - IV.3.5 The Dodecahedron... e Quintessence that corresponds to the Tetrahedron as we mentioned above. As we also said, the dual of the Dodecahedron is the Icosahedron which corresponds to the Earth state . If the five regular polyhedra are built with same volume, the regular Dodecahedron has the shortest edges, and t ...
=> Ultimate Symmetry... in (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... t is so different from the other polyhedra, in virtue of its pentagonal faces. Timaeus contains a very detailed discussion of virtually all aspects of physical existence, including biology, cosmology, geography, chemistry, physics, psychological perceptions, all expressed in terms of these ...
... roups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
... geometric solids whose faces are regular and identical polygons meeting at equal three-dimensional angles. These five regular polyhedra are the only solid shapes with this sort of complete symmetry. Many philosophers wondered why there cannot be more, or fewer, so perfectly symmetrical sh ...
... mmetry groups are twice as much again (24, 48, and 120). All regular polyhedra except the Tetrahedron are centrally symmetric, meaning they are preserved under reflection through the origin. ...
The science of Time is a noble science, that reveals the secret of Eternity. Only the Elites of Sages may ever come to know this secret. It is called the First Age, or the Age of ages, from which time is emerging.
