Chapter 7 the
unbalanced information arm
The answer is that we take two
positives or two negatives before we perform the expansion along the two arms
for 0,1,1. That is we have -1,0,1,1 or
we have -1,-1,0,1. Why?
(2)^2^0 for
the first arm times (-1)^2^0 for the second arm yields 2. What this means is that the unbalance of the
universe which we see as infinite series, expanding(f(n) and 2^n) and
contracting (pi) (1/1-x) begin from this process of imbalance which is
necessary to the 2^n results.
If you have
an offsetting negative state, you still get the same answer once you get past
non-dimensional space.
-1,-1=-2 and
-2^2^0=-2. -2*1^2^0=-2.
However….
When you get to the next arm you are
doing the second 2^2^1= arm.
The first arm is -2 or 2 generated
in the fashion shown, and then this arm is squared. -2^2 or 2^2 yields a positive result which
carries forward.
This
suggestions that ct1 solutions F(n)(2^0) are the first arm of the F(n)(2^1)
drawing. This looks accurate because at
ct2 (photon) appears to use one changing ct1 states (space) where one comes in
and another goes out before turning the arm and this is where your 1:256
solution to light speed comes from.
In the next post
we show the steps in this process.
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