alt.sci.physics.new-theories

moving along the toral spiral geometry of the universe

torus is a surface given with global radius D[1] and local radius
D[2]. the vector sum R=D[1]+D[2] is the position of the weight on the
torus. now to describe how weights move along toral spiral geometry of
the universe we pick D[1] from the origin to right coupled with
normatively same force F[1] pointing from the pick of D[1] towards
behind the screen and D[2] from the pick of D[1] towards up coupled
with normatively same force F[2] pointing from the pick of D[2]
towards right. this means that D[2] and F[1] are normal to D[1] and
F[2] is normal to D[2] and F[1]. now F[1] and D[1] spin by beta and
F[2] and D[2] spin by alpha such that beginning from old_alpha=0 and
delta_alpha=const<>0, new_alpha and new_beta are given with:

new_alpha:= old_alpha + delta_alpha*(|n|-|m|*sin(old_alpha))
new_beta:= A * (old_alpha + delta_alpha*(|n|-|m|*cos(pld_alpha));

where |n|>|m| while A>0 stands for how many local circles are done
within completion of one global circle. to spin F[1] and D[1] by beta
you simply do the following:

F[1]:=F[1]cos(beta)-D[1]sin(beta),
D[1]:=F[1]sin(beta)+D[1]cos(beta).

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