The Duality of Time Theory, that results from the Single Monad Model of the Cosmos, explains how physical multiplicity is emerging from absolute (metaphysical) Oneness, at every instance of our normal time! This leads to the Ultimate Symmetry of space and its dynamic formation and breaking into the physical and psychical (supersymmetrical) creations, in orthogonal time directions. General Relativity and Quantum Mechanics are complementary consequences of the Duality of Time Theory, and all the fundamental interactions become properties of the new granular complex-time geometry, at diifferent dimensions. - => Conference Talk [Detailed Presentation]
... ular shape, which is the most perfect shape; it is like letter alif with regard to the rest of letters ... and the first shape that appeared after the circle was the triangle. Then from the equilateral triangle, all shapes in all kinds of bodies can be infinitely generated, but the best an ...
... Gravity by Mohamed Haj Yousef Search Inside this Book IV.3.3 The Octahedron The Octahedron has eight triangular 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 o ...
... by Mohamed Haj Yousef Search Inside this Book IV.3.4 The Icosahedron The Icosahedron has twenty triangular faces, twelve 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 o ...
... etric series are used to measure the perimeter, area, or volume of the self-similar figures. For example, the area inside the Koch snowflake can be described as the union of infinitely many equilateral triangles, whose sides are exactly the size of their parent triangle, and therefor ...
... fect shape; it is like letter alif with regard to the rest of letters (see section 2.6.3 in chapter IV)... and the first shape that appeared after the circle was the triangle. Then from the equilateral triangle, all shapes in all kinds of bodies can be infinitely generated, but the best an ...
... etric series are used to measure the perimeter, area, or volume of the self-similar figures. For example, the area inside the Koch snowflake can be described as the union of infinitely many equilateral triangles, whose sides are exactly the size of their parent triangle, and therefore it h ...
... nics ...
... depending on the Real, all the time, and beyond the circumference is non-existence, or the “impossibleâ€. These three levels of existence, represented in the three points of the equilateral triangle in Figure 7.3, are the two extremes states of vacuum and void, and the multipli ...
... r or five triangles meeting per vertex. If we try to fit six of them, we would give an infinite tiling of the plane. The Tetrahedron A regular Tetrahedron is one in which all four faces are equilateral triangles. It is the simplest of all the ordinary convex polyhedra and the only one that ...
... 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. ...
I have no doubt that this is the most significant discovery in the history of mathematics, physics and philosophy, ever!
By revealing the mystery of the connection between discreteness and contintuity, this novel understanding of the complex (time-time) geometry, will cause a paradigm shift in our knowledge of the fundamental nature of the cosmos and its corporeal and incorporeal structures.
Enjoy reading...
Mohamed Haj Yousef
Check this detailed video presentation on "Deriving the Principles of Special, General and Quantum Relativity Based on the Single Monad Model Cosmos and Duality of Time Theory".
Download the Book "DOT: The Duality of Time Postulate and Its Consequences on General Relativity and Quantum Mechanics" or: READ ONLINE .....>>>>