Now it is time to go into some of the equations which you probably thought were not forthcoming, but only because you fail to realize that despite the incredulous nature of what has already been said, there is more to follow. I cut the poem and am posting separately as it is a bit too far removed from non linear time theory
PART 2 EQUATION: Critical to this (change of time coordinate changes into negative coordinate changes and energy) is that DA-1 does not go positive until DA goes negative. Hence DA must have an equation in it that stays at zero (or in a negative state meaning it is some form of energy) state and goes positive with a similar equation within DA that could well be x-t for y,y-t for z, etc,which would mean that DA approaches zero as D(A-1) goes positive and as t/(t-y) goes to infinity. It complicated conceptually, but allowing for different states (orbits) represented by DA states from x, y, z and u.
PART 2 EQUATION: Critical to this (change of time coordinate changes into negative coordinate changes and energy) is that DA-1 does not go positive until DA goes negative. Hence DA must have an equation in it that stays at zero (or in a negative state meaning it is some form of energy) state and goes positive with a similar equation within DA that could well be x-t for y,y-t for z, etc,which would mean that DA approaches zero as D(A-1) goes positive and as t/(t-y) goes to infinity. It complicated conceptually, but allowing for different states (orbits) represented by DA states from x, y, z and u.
We're going to add one
element to this, the movement from CT0 to CT1 which generates a negative time
coordinate which is different from the others because rather than movement from
one coordinate state to another, it moves from non-linearity to linearity, it
represents the force of gravity and would be added to the others here as
-(DA+1).
The requirements y,x,z
and u represent changes in sets of coordinates (x,y,z) which change and
compress, go linear positively and result in positive equations t-coordinate
and negative equations of t-coordinate with a zero state and a 1/t-x)
transitional point between the two so that the transitions as x approaches t so
that the transition point cannot occur evenly (which is why you cannot
accelerate to the speed of light to turn matter into energy even though the
transition is seen to occur.
The additive quality
reflects the observed phenomena that clock times are conserved. The functions DA to DA-3 represent the
exponential nature of compression changes at transitions. These compressions are referred to as scale
but are important here only to reflect that there are transitional issues other
than just the movement from one clock time to another.
The spin state reflected
above includes what are referred to as “time orbits” which occur without
dimensional characteristics. In this
case you have points equal to dimensional changes and force changes and for
there you move to points equal to dimensional changes less negative dimensional
changes. While the mathematics is not
yet fully resolved, this process assumes that there is merely a negative time
change absent compression.
The equation may look
something like this P=CT1(t/t-x)DA+CT2(t/t-y)D(A+1)(t-x/t)+CT3. To take this through CT5 is a fairly
complicated exercise incorporating the other elements (t-z/t) and (t-u/t) just
to name two. To scale it correctly and
taking out all of the equation specifics it would look something like this: P=CT(0)
+CT1^1/2+CT2^1/4+CT3^1/8+CT4^1/16+CT5^1/32 etc-assuming the sequential nature
of this linearity continues.
No comments:
Post a Comment