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Monday, February 16, 2015

philosophy and NLC cinq Pi and the circle towards singularity.

This is the second to the last post on this subject, although there are volumes remaining to be written on this issue.  I had several dreams last night.  One that sticks with me is that I was kayaking to an old house for some reason, something to do with selling it I think, a house that wasn't on the water.  Once in the middle of a wide, red-mud river swollen by a recent storm it occurred to me that I had forgotten a paddle.  There was something about rapids and the uncertainty of the path which was heavily wooded, not at all neighboroodish and i thought ineffectively of using my hands as paddles or to somehow steer myself, separated forever by the current from where I started my dream, but then there was another person kayaking beside me, whether they had a paddle or not is uncertain and then I came to the house in a line of houses and I drifted right up to the door, or what I thought was the house, because when I went in there were people moving into the house and I began to prevaricate about the reason I was there. I did not question how in the middle of the flooded river I'd come to the door and you would think my gratitude for that, escaping the wildish river, would have been enough, but for some reason I felt compelled to try to stick with the original, very confusing story. And then finally I realized it wasn't the right house and I was lost. There was something about looking for a paddle.
I didn't want to wake up this morning.  The world seemed too hostile. There was another dream about driving and a car with two lovers in it who were paying no attention to where they were going in their infatuation with one another, continually running off the country roads, spinning out into open fields not even seeming to notice what was happening as I drove wondering how to avoid the inevitable crash even as I was compelled by and jealous of their oblivion in the face of one another.
Well, some dreams are more obvious than others and I had to wake up and continue my paddle-less trip to the rapids.

For Non Linear time, we can modify this to add the "missing element" which is discussed in an earlier post which is the multidimensional function of zero.  What we're going to do next is look at the "change" perception of a point which will be referred to merely as a point for ease of typing.

First, note that pi is, like NLC, a function of 2 (4/2^0-4/2^1*2+4/2^1*3 where the transition from 0 to 1 represents a phase transition.  Phase transitions are reflected in time dilation as will be discussed further and have been previously addressed if you look at earlier posts, but I'd wait for the next edition since it will be a slightly more clear discussion.  Using the idea of phase transitions, you can arrive at pi being the sum from n=zero to infinity of 4/(2^n’)*n noting that there may also be a summation of n’ associated with certain changes in n, in this case n=0 to n=1.  There is no reason why there cannot be other phase changes before or after the n’0 to n’1.

STEPPED TRANSITIONS

One question of linearity is why don't forces cancel out the corresponding dimensional aspects and take everything back to a non-linear state?  The best answer is that we exist in a non linear state, but we have linear states at quantum “points”, even if they are largely illusory.  This proposition assumes that at any point in time, we exist with a prepackaged past and future, and that all of these points in time (quantum points, of course) exist at once.

A longer discussion will follow where we see this type of stepped transition in irrational (or non-linear) numbers such as pi which can only be calculated by way of example.  4/1-4/3+4/4/5-4/7.  Nothing this transition is also a function of 2 (4/2^0-4/2^1*2+4/2^1*3 where the transition from 0 to 1 represents a phase transition.  Phase transitions are reflected in time dilation as will be discussed further.  Using the idea of phase transitions, you can arrive at pi being the sum from n=zero to infinity of 4/(2^n’)*n noting that there may also be a summation of n’ associated with certain changes in n, in this case n=0 to n=1.  There is no reason why there cannot be other phase changes before or after the n’0 to n’1.

So now comes the time to apply this to NLC.

One answer suggested by the math is that Forces (F) are from a lower dimensional state.  That is gravity, which effects CT1 dimensional characteristics is a CT0 force, Photonic energy which is a feature of CT2 is a CT1 force characteristic.  Following the model of Non linear numbers (irrational numbers) like pi this would yield an equation for any Point (P)=ct(0)-ct1+ct2-ct3 etc where each clock time represents a number which approaches, but never reaches a solution which is consistent with the approach previously derived by compression also using a factor of 2.  Instead of 4/(2^n’)*n; the equation is loosely seen at x^2^n as n increases from 0 to infinity.
Expanding the equation to take into account non-linear (or irrataional) numbers:
(x/n)*10^2^n-x/n*10^2^n+x/n*10^2^n.   If appropriate n may be replaced by 2 times n.  Likewise, you can have a phase change which would alter the equation.  One place where this could happen is where n=0 in the first part of the equation (x/0)*10^2^0.  In this case, there are two possible solutions present.  The first is that there is, for example, a reverse phase change (from 1 then to match the second n)  An alternative would use the alternate values for zero derived for non-linear time which are discussed below.
Likewise, it could mimic the pi equation:

((x/2^n’)*n)*10^2^n-(x/2^n’)*10^2^n+etc where x is some constant and n’ goes through a phase change at n’=0.  The same type of phase change in such a case is expected at the ct4-ct5 interface based on an analysis of time dilation as will be discussed in more detail below.

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