The seven (7) principles of the theory conjectured on thus far:
1. Frames of reference exist other than found in physics.
For Example: the following series of numbers can be defined as a frame of reference:
{1, 3, 5, 7, 9}.
2. A point of reference can be defined for all frames of reference found outside of physics.
For Example: the following series of numbers
{1, 3, 5, 7, 9},
could have the following point of reference:
5.
Number 3 and 4:
Update: Jan 27 '03:
3: Frames can be static. Outside of math and inside sci, a static frame is called nonaccelerating.
Example:
Frame X {1, 3, 5, 6, 8}and Frame Y {-9, -7, -5, -3, -1},
4: Frames can be Nonstatic inside math, or inside sci "moving" or "accelerating".
Example:
The most famous Nonstatic Frames are from Dr. Mr. E=MC2.
Frames Consolidation Technique 1:
5. Consolidation
Related frames of reference can be consolidated by consolidating their respective points of reference.
For Example: the frame of reference x:
{1, 3, 5, 7, 9},
with the point of reference x being
5
and the frame of reference y:
{-9, -7, -5, -3, -1}
with the point of reference y being
-5,
both frames of reference could be defined in terms referenced by and relative to a point of reference of:
-25.
The relationship for Principle 5:
F(x*y)= Px * Py
Frames of reference, (x "combined with" y) is equal to Point of reference x of Frame x multiplied by Point of reference y of Frame y.
Where:
F = Frame of reference
P = Point of reference
Sub x,y = specific frame and respective point of reference.
Number 6:
Update: Jan 27 '03:
Frames Consolidation Technique 2:
6: Redefination
For "related" Frames of Reference X and Y: Frame of Reference Y can be redefined in terms referenced by the Point of Reference of Frame X.
Example:
Frame X {1, 3, 5, 7, 9} and
Frame Y {-9, -7, -5, -3, -1},
Frame Y can be defineed in terms of the Point of Reference for Frame X: 5.
5*(-9/5)=-9, 5*(-7/5)=-7, 5*(-1)=-5, ect., ect., ect.,...
Number 7:
Update: Jul 15, '06
Frames Consolidation Technique 3:
7: Commonality
Frames = Frames of Reference. Reference Point = Point of Reference For related frames x and y, if a point exists common to both frame x and y, both frame x and frame y can be definded in terms of the common point. The common point becomes the reference point for both frame x and frame y. The common reference point can be used to consolidate, combine, and unite both frame x and frame y into one (1) single frame.
Example:
Linear and Nonlinear can be defined as "math frames". Both linear frame and nonlinear frame have a common point. A linear straight line is a nonlinear curved line of zero (0) degrees of arc. Therefore, linear frame and nonlinear frame can be defined and conbined in terms of the common reference point.
William Charles Simpson
San Jose, CA, USA
1st Update: Fri, Aug 1, '97.
2nd Update: Sat, Aug 2, '97.
3rd Update: Mon, Jan 27, '03.
4th Update: Sat, Jul 15, '06.
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