the problem with base 10
1,1,2,3,5,8,1' where 1' is 5 more than 8,2' where 2' is 8 more than1',3' where 3 is1' more than 2', etc. The spacing and not the numbers is critical to the f-series analysis so you have:
11,22,33,55,88,1'1',2'2', etc to get a better feel for how the system works outside of a human based number analysis which screws up the picture of the F-series.
It is an interesting irony because the base 10 system was brought to Europe in its current form by the same Italian who brought the F-series to us. The power of the universe.
Conceptually the build out of the universe is envisioned as a single algorithm built on a single variable change using variations that are built into the algorithm. That is there are no dues ex machina in the universe.
The building allows for tremendous variety.
1,11,111,1111,11111 representing to transition from space,photonic,wave energy, matter, black hole/ct5. The application of this, however is a much more complicated than just matching clock time states because it follows an equation as n=1,2,3,4,5 as a "stable form of minimum particle as Fseries^2^n where the F-series is 0,1,1;1,1,2;1,2,3;2,3,5;3,5,8 for each state.
This in turn suggests that each "stable" series is stable as a function of a specific set of equations for each type of state, matter being the 2,3,5 curves. Opposing this is the term of stability observed which suggests that states at the inflection point of our universe (post big bang inflection) has each state of matter being largely stable for a period of billion years which means that "stability" is another factor in the equation, a countdown clock built into the equation. While there are many ways to arrive at this division by zero is a good starting point since a transition (or inflection point) has to occur at any number divided by zero. Alternatively, this suggests that "stability" is a function of an inflection point type equation. These two equations can be represented by:
1/x-n and sin(pi/n2).
1/(x-n) as n approaches x leads to an equation where stability is defined by a variable x that is set somewhere in the equation and n approaches x in the equation.
These can be put together in several ways:
e.g. [1/(x-n)]sin(pi/n2) or sin(pi/2(n-x)
The exact methodology is some variation.
If I didn't have to fight constantly and if I had just a little support this would go quicker.
No comments:
Post a Comment