Algebra is Contradictory in Nature through the Number Line.
Posted: Wed Jan 23, 2019 12:26 pm
The contradictory nature of algebra.
1. Algebra is dependent upon variables. These variables are infinite in number.
2. The statement x+y=z observes an infinite number of variables.
3. Each variable effectively exists as a number line.
A. (1,2,3,4...)+(2,3,4,5...)=(3,5,7,9...)
B. (-1,0,1...)+(1,2,3...)=(0,2,4...)
....
4. Where each variable exists as a number line each variable is a localization of the same number line.
5. Hence each variable is in a state of superposition where x=y=z eventually and the equation is merely an approximation of the number line where x,y,z will always equal eachother and "1" as "1" series in themselves.
A. (X,Y,Z)= 1(3,5,7,9...)
B. (X,Y,Z)= 1(0,2,4,6...)
6. X,Y,Z will always simultaneously not equal eachother because of there positions, hence algebra is premised on the contradictory oppositions between number lines.
1. Algebra is dependent upon variables. These variables are infinite in number.
2. The statement x+y=z observes an infinite number of variables.
3. Each variable effectively exists as a number line.
A. (1,2,3,4...)+(2,3,4,5...)=(3,5,7,9...)
B. (-1,0,1...)+(1,2,3...)=(0,2,4...)
....
4. Where each variable exists as a number line each variable is a localization of the same number line.
5. Hence each variable is in a state of superposition where x=y=z eventually and the equation is merely an approximation of the number line where x,y,z will always equal eachother and "1" as "1" series in themselves.
A. (X,Y,Z)= 1(3,5,7,9...)
B. (X,Y,Z)= 1(0,2,4,6...)
6. X,Y,Z will always simultaneously not equal eachother because of there positions, hence algebra is premised on the contradictory oppositions between number lines.