Prime numbered points quadradic Model - Virtual or real Gaussian points (x, y) Euclidean 2D space intersection points computed using the Euclidean factorization algorithm is used to count the number of factors a 2D representation of the 1D line of successor prime numbered points projecting unto a Cartesian surface a group of points with a matrix that satisfies the axioms of arithmetic up to the definition of a field of arithmetic points with all zero-divisors (intrinsic contradictions) isolated.
Question.....what happens next?
Prime numbers in a quadradic space Model.........
.........What are they?
-Are they Virtual or real Gaussian prime points (x, y) Euclidean 2D space intersection points computed using the Euclidean factorization algorithm is used to count the number of factors a 2D representation of the 1D line of successor prime numbered points projecting unto a Cartesian surface a group of points with a matrix that satisfies the axioms of arithmetic up to the definition of a field of arithmetic points with all zero-divisors (intrinsic contradictions) isolated?
......kind of looks like a physic's surface with free energy FIELDS continuously appearing, popping from the vacuum surface of empty space.
Oh... oh ......looks like Zeno's paradox forces free energy into the number space
for factoring natural numbers n = n + 1 given Pn is the n^th successor prime P
Oh... oh ......looks like Zeno's paradox forces free energy into the number space
