| apothem -
03-22-2006, 02:00 PM
Is there a universal apothem? Exists locally? Exists globally? Is the local apothem the same as the Planck length? Apothem could be defined as the closest distance two equal local infinitesimal orthogonal forces are separated from each other. Generally, the distances between other equal orthogonal forces are all multiples of this fundamental minimum length. If the distances between orthogonal forces are not multiples of this apothem then these forces are secondary forces and consequently they should attract each other. On the other hand, if the distances are multiples of the apothem then the forces are primary forces and therefore they all should repel each other.
This fundamental apothem could now be used to define a quantum of length which can only be applied to the existence of local infinitesimal primary orthogonal forces.
Time independence: [∂E(g)]²=[∂F(a)×∂r(a)]·[∂F(b)×∂r(b)] and Mass independence: ¶a(t)·¶r(t)=c²
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Linear Mode
