Quantum Spin an Artist Animation - Geometrical Explanation for Pauli Exclusion Principle

Quantum Spin can be explained by a process of spherical symmetry forming and breaking with the process relative to the spherical surface. The electron is a half spin particle because the process is relative to the radius that is half the diameter of the sphere. It is because we have to square the radius r² to find the spherical surface area that so many properties are squared in the mathematics as in t², c², e², ψ² and velocity v² as in kinetic Eₖ=½mv² energy. This would be easier to see if we did not use the reduced Planck Constant ħ or h bar but instead used ħ=h/2π. We would then have 2π representing the spherical diameter with the spacing between spin states being h bar. Because an interior of a sphere 4π is naturally three dimensional at any given moment in time, these spin states can be thought of as a combination pointing in each of our three dimensions. When the electron is not interacting with anything, and we are n