If we say the largest whole number the vacuum can count before hitting the density of free space, then what is the next whole number up? In other words, what is the next Shannon N such that:
(2^N)-1 = Signal/Noise
That number is (3/2)^127, corresponding to the Compton error of .0091507. I call that Higgs. I can count fractions down from there, but no whole numbers.
They tell me Avogadro is .037 below 2^79. So, I take my Higgs, convert to twos binary and get, log2((3/2)^127) = 74.29, which just happens to be .038 shy of 2^79. The percent is off by 10, but close.
Avogrado is simply the optimum size of a sphere when packed with finite sized things.My error should be 2^-8, instead is it 2^-5. But that is likely because the sphere is packed with three different finite sized things. So we are back to packing theory.
What is happening? My theories are confused, numbers often inverted, I am always missing things. But there are limited combinations way up at the limit of light, so fumbling around often works. Think like a vacuum.
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