Spiral is Recursion of Isomorphisms Resulting in Variables and Forms
Posted: Tue Jan 14, 2020 3:04 am
Degrees are fractal circles, a curved line progresses to the original point at 1/360 of the circumferance. The line changes in it progression by the length of one degree in its rotation as 360 circles within circles. The degree exists as 1/360 of a line when the circumference of a 360 agon is straighten into a line.
The progression of a line, in a spiral, results in the line changing direction of 360 degrees for each segment of the spiral when aligned from it's original point. The spiral is thus a rotation within a rotation as recursive fractals of a circle. The spiral is recursion.
All recursion is isomorphic dualisms in nature:
1. It is a progression away from the variable as "multiple variables" through recursion:
A-->(A-->A)-->(A-->A-->A)
2. It requires a change of direction of the variable into a new "variable type":
A-->B-->C
It is the isomorphism of isomorphism that sets the foundation of recursion. Isomorphism being the inversion of one state into a seperate symmetrical state, then into another symmetrical state again. Isomorphism is the inversion of one form into another through formlessness.
The progression of a line, in a spiral, results in the line changing direction of 360 degrees for each segment of the spiral when aligned from it's original point. The spiral is thus a rotation within a rotation as recursive fractals of a circle. The spiral is recursion.
All recursion is isomorphic dualisms in nature:
1. It is a progression away from the variable as "multiple variables" through recursion:
A-->(A-->A)-->(A-->A-->A)
2. It requires a change of direction of the variable into a new "variable type":
A-->B-->C
It is the isomorphism of isomorphism that sets the foundation of recursion. Isomorphism being the inversion of one state into a seperate symmetrical state, then into another symmetrical state again. Isomorphism is the inversion of one form into another through formlessness.