10.04 Tetrahedron and Planck's length edges
In simple terms, the tetrahedron is the simplest polyhedron structure in the universe. As a result, its edge is the shortest of any polyhedron. This implies that the edge could be Planck's length, giving the tetrahedron the smallest volume of any polyhedron. The outerside of this smallest volume polyhedron represents a coherent universe with no space, time, or distance, while the inside represents our classical universe, which is decoherent.
The Planck length is a unit of length in physics, denoted by "ℓP," and is approximately equal to 1.616 × 10^(-35) meters.
Let's proceed with the calculation assuming a regular tetrahedron with an edge length of the Planck length. The formula to calculate the volume of a regular tetrahedron with edge length "a" is given by:
V = (a^3) / (6√2)
Substituting the Planck length (ℓP) for "a," we have:
V = (ℓP^3) / (6√2)
Calculating this expression, we find:
V ≈ 3.67 × 10^(-105) cubic meters
What is outside the smallest tetrahedron? The coherent universe. No time and No space and No distance.
What is inside a the smallest tetrahedron? The decoherent classical universe (no longer ONE).
What is entanglement? Entanglement occurs when two or more tetrahedrons interact in a way that their quantum states become entangled, resulting in a shared state that is described by a mathematical combination of the individual states. These tetrahedrons can become instantaneously correlated, regardless of the distance between them.
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