The opposite identities manifested in the
evolution of the sexes, probably at a location in
the field of space-time where there is resonance.
Let
point P=(r,0,0)
point Q=(-r,0,0)
r=infinity.
P starts out as a spaceless point, expanding
into a sphere of infinite radius. The sphere
intersects the plane x=r at a set of points
making up a circle, dividing the sphere into
hemispheres. The hemisphere of points such
that 0<x<r meet the plane of x=0 at a circle.
For points -r<x<0, the circular plane starts
contracting on Q, forming a hemisphere in the
domain of -r<x<0.
However, the plane of z=0 is really the surface
of another sphere; hence for points x>r, the
expanding hemisphere of point P goes around the
clock and contracts from x<-r.
The process turns P inside-out about point Q.
<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<<
Point P and point Q both expand about the domain
-r<x<r, and their two hemispheres meet in the
plane of x=0 as a plane circle. There, the
identities of each mingle in resonance.
If P and Q have the same identities, at x=0
there is the greatest stability for an identity
the same as P and Q, and the greatest instability
for an identity opposite to P and Q.
If P and Q have opposite identities, at x=0
there is greatest stability for a neutral
identity, and a draw to either P or Q for
homogeneous identities of either P or Q.
The same holds for hemispheres expanding in
the domains x<-r and x>r for Q and P, when
they meet on the spherical surface of the
xy plane, where (0,0) is as Greenwich and the
equator.
If P an Q are opposite, they strive for lower
potential, which consumes their identities.
They naturally draw to each other.
- Pawnking
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