[Redbook5:222-223][19880724:1443g]{The
Sphere [continued
(7)]}[24th
July 1988]
19880724.1443
[continued]
*Pascal’s
Triangle and the Octet Rule** (Stability of 8)[:]
(1)
Although each level
is relatively stable, being 8 or a multiple/factor, the cumulative
total at each level is always one short of 8, encouraging a change to
the next (or last!) level.
(BUT
(2) It is arguable that 8 (level n=3) is the most stable and that
other levels will always tend up or down towards that.
There
is, I believe, some kind of qualitative change in the nature of the
expansion (in the context considered) which occurs at about n=4 ((n=3
gives 8)).
Big
Pascal:
(Amended
880725ff)
[{cf
III.220} from level n=3-4 above]***
[{VI.152}
from level n=3-4 above]****
[Text
on the ms rough working diagram shown above is too complex and has
been too much amended to be properly represented in tables here at
present.]
*(ref
[[Redbook5:221][19880724:1443e]{The
Sphere [continued (5)]}[24th July 1988]]
221)
**[See
last previous entry]
***{III.[[Redbook3:217-222][19870502:1025](EVOLUTION
OF PATTERNS OF SYMBOLS)([&] DIAGONAL PERSONALITIES) [2nd May
1987],]
220
****{VI.[]
152}
[continues]
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