This probably doesn't help much
Sorry Breckmin, but I've read your post three times and I still can't work out what it is you're saying. Could you try phrasing your argument differently?
You are asking for a series of really long posts here...
Suppose you are a three dimensional being observing an
imaginary two
dimensional being on an imaginary two dimensional x,y graph traveling from
one point on the graph to another point. Suppose also there are an infinite
amount of mathematical equations between the two points which can be
graphed and you know all of them; and this imaginary being, no matter what
random path they choose (even if they go backwards and come back around
again), is going to be on a path which can be mathematically determined
based on an equation which is unknown to such imaginary being. but is
known to you because you have already seen the imaginary being finish
and reach the final destination. Suppose you can go back in time during
this imaginary beings journey on this infinitely complex mathematical
equation which this imaginary being is traveling on with full knowledge of
the finishing point that you observed when you were in the future.
Suppose also that there are "random" factors from other imaginary two
dimensional beings which interacted with the imaginary being you were
following which contributed to them following along the infinitely complex
mathematical equation which you had calculated because you had been
in the future and seen the finished product.
The problem with this analogy is that "you" are a three dimensional being
and you have to travel in time to the future to see the final destination
of the imaginary being and chart its path mathematically, and then go
back in time during the imaginary beings point of travel and observe the
course which this being has "traveled" (from the POV of the future) but
is actually still in the process of traveling. The point is, YOU know the
infinitely complex mathematical equation which the two dimensional
being is traveling to go from point A to point B. The imaginary two
dimensional being does NOT know the path he/she is on because they
do not know the finish line (future) NOR do they know what "random"
factors will contribute to them traveling the course of this infinitely
complex mathematical equation which can be graphed on the x,y axis.
It is completely random to the imaginary two dimensional being because
he/she does not see point B, NOR does he/she know the infinitely
complex mathematical equation he/she is traveling along. To YOU,
you know the equation, because you were in the "future" and saw the
imaginary two dimensional being reach the destination of point B, and
then you calculated the infinitely complex mathematical equation, and
went back in time to observe the imaginary two dimensional being
traveling along on it.
Choices that are made now, no matter what the reasons, affect
choices of others that will be made tomorrow. If we were in the future
and we saw the end results of such choices, we would claim that they
were inevitable because they HAVE TO take place to get to the final
destination we are AT (in the future). Not so when you are making
such choices with NO knowledge of the "final destination" of where
those choices are leading.
I know I have a lot more to explain regarding the two dimensional
example given above, but the "point" is that once point B is reached
and then you go back and calculate it in retrospect, you CAN make
a mathematical equation which graphs that exact line of travel.
Then, once it has an infinitely complex mathematical equation
which plots its line of travel, we no longer think of it as random.
The issue is the POV and the difference of the POV of the three
dimensional being who could observe the finish line, and the limited
two dimensional being who could only "experience" the path chosen
and could NOT step out into the Z of the x,y,z axis and see point
B from the third dimension.
M
I started writing it before you made that post. But then the board started giving me errors (saying there were too many simultaneous connections) and I gave up for a while. When I came back, I didn't read the rest of the thread before posting.