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From: Osher Doctorow on 5 Aug 2010 12:33
From Osher Doctorow

From the previous posts, we have arguably established:

1) PRINCIPLE: Optimal (Probabilistic) Repulsive Sets A Occur For the
Probability of A, P(A), < 0.50 but very close to 0.50 (for example,
0.43 to 0.49).

2) FACT: The ratio of the total length of neurons in the (typical)
human brain to the average distance from the earth to the moon is
approximately 0.43.

What does the average distance from the earth to the moon have to do
with either Repulsion or human brain neurons other than the numerical
coincidence above in (1)? Let us begin with the average distance
from the earth to the moon:

3) A "characteristic planetary number" or "basic planetary number",
should arguably be taken as the average radius of the planet-moon(s)
system taken from the star (sun) because of the "Titius-Bode Law" and
"Dermott's Law" (see Wikipedia's online articles on both). In
Dermott's Law, radius is replaced by period, but they tend to increase
together, and in both laws 0.50 ( = 1/2) and its inverse (2.0) are the
typical nearest neighbor planet or moon ratios, depending on whether
the direction is toward or away from the main planet or sun.

As for human brain neurons, that is the total length of myelinated
nerve fibers in the brain, planetary and moon orbits are arguably in a
balance between attraction and repulsion by either the sun or planet
respectively, and a balance between attraction and repulsion is
especially characterisic of life forms and becomes most controlled and
manipulated at the advanced life level. Here the attraction-repulsion
is between two life-forms.

If the results are correct, especially (1) and its relationship to the
others, then the search for electron-electron or proton-proton
repulsion at the macroscopic level, or between repulsive effects of
macroscopic analogs of the strong or weak interactions, can arguably
be studied in studying human brains. Gravitation is ordinarily
regarded as attractive, although several theories regard it as
repulsive outside galaxies or galactic clusters (clusters of
galaxies).

Osher Doctorow
From: Osher Doctorow on 5 Aug 2010 12:40
From Osher Doctorow

Regarding (3), I should have indicated average distance from the
planet to its own outermost moons being critical when focus is on the
planet-and-its-moons system, which is especially important in
Dermott's law and some of the other laws. When focus is on the star
or sun versus its planets, then the average distane from the sun to
the planet or outermost planet becomes relevant.

Osher Doctorow
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