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Tuesday, February 10, 2015

NLT the solution of pi and exponential, negative compression part 3

As was previously discussed, we can solve for 3/0 in a non-linear universe.  In such a case zero is not nothing, as previously discussed, at least for these purposes, but includes all of linearity, all of the information in the universe.  It is a 10 with so many zeros behind it as to be essentially uncountable, just what we would expect, infinity because all the information in the universe is the location of every quantum point, including the quantum points of space for all time embodied within the universe.
However, it is a number that a god-being in the sense of all knowing and all powerful should be able to comprehend even though we could not do so even if we could calculate what it is (if we give the universe a given term and size, we could calculate an approximate rendition of it just as we were able with relative simplicity to calculate the amount of intelligence in the known universe, past present and future-you'll have to read the Einsten Hologram Universe or dig deep into this blog to find the calcuation, but its there somewhere).
In such an event, 3/0 achieves a value and we can determine at what point the remainder of the equation becomes relevant (at the point where we reach this infinitely small point.
What is signficant about this, if anything is significant about it, is that it gives us a point of reference other than the speed of light to determine Planck length and it is a much smaller length.
The reason that a solution to pi is so important is because it is required to have an infinitely small circumference, quantum space: C=2pi(r) or the chnage in pi=c/2r as r approaches zero or infinity.
Now the question on everyone's mind is whether there will ever be a third edition (NLC) and that relative advanced project has been sidelined by those events which seem to sideline everything, the lack of laboratory in a cave I've been looking for, the distractions of living, the vanishing muse.
Perhaps it will never be finished, in which case, you will have to piece it together from whatever you can find here, in prior editions
and even this may ...


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