A Puzzle of Particle Properties, Determining Integrals of Quantization for Non-cyclic Field Formulae

A puzzle on the bench...

Is the property of particle SPIN a result of angular force or linear?
..is the property a linear or angular force axis?
..relative to what?

I strongly suspect linear, I need ways to confirm.

What if fluctuations in charge can yield angular force instead of SPIN ..draw a line through the property of spin, temporarily.

Focal point of contemplation for the consideration of ..V.

..two segments declared in three points ..for a total savings of one whole coordinate.

The remainders? ..MASS and CHARGE

MASS is the result of an interferent force that does not belong to the particle in all conditions ..draw a line though MASS as well.

Our particle now possesses only one property (CHARGE) which we can crudely visualize in it's two-dimensional projection. A spherical object expressing charge will emanate omni-directionally.

The particle has properties other than charge, it helps to consider the fundamental perspectives individually.

The declaration of two segments using three coordinates omits the need of one value. What limitation has this compression of coordinate values caused?

Both segments must emanate from a shared point, the vectors cannot be parallel nor can they intersect as spherically expressed about a finite point in space.

..or is this is the same segment, an angular iteration of the first. As though we could declare V = [segment ] + [∆t(radians)]

The field expressed by a charged source, the spherical expression of a linear spectrum. Either [(+) -> 0], [(-) -> 0].

Now we have non-cyclic field quanta @ 0 Hz.

Deterministic quantization of non-cyclic field strength by proximity in relation to the charged source in space.

Force of field at point x,y,r = Source charge in eV ÷ quanta of Planck units (distance from source).