The Theory of Effort
The Theory of Effort forms part of our new concept of 4D maths. Using this powerful technology, we are able to track numbers as they evolve through recursive calculation.
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Solving the Russell Paradox: 2D geometric solution to the continuum hypothesis
The Russell Paradox arises from the fact that all numbers greater than 1 exhibit a reciprocal value. This is resolved by the folding of number space.
The Riemann Hypothesis: A Geometric Solution
The Riemann Hypothesis is the number one mathematical challenge of today. We offer a geometric solution to the problem, that confirms all non-trivial zero will appear on the critical strip.
Zero begins and ends all numbers
By examining the infinite nature in reciprocal numbers, we can ascertain that zero begins and also ends all numbers.
Solving Infinity
By assessing the nature of numbers, base systems, and solving infinity, we lay the foundations for a solution to the Russel paradox, and Continuum Hypothesis, and much more.
4D Squaring
4D squaring demonstrates how dimensionality can be increased through powers, and offers a solution to the 90° orientation of electromagnetism.
8 Infinities on the Number Line
There are 8 distinct infinite boundaries that appear on the number line. Two either side of Zero, four that are
Reciprocal number space
All numbers beyond ONE have a reciprocal representation between the numbers ZERO and ONE. It is this mirror-like nature of
The Infinity of ONE
The Infinity of ONE is revealed by the nature of reiterated root calculations. This divides the number line into reciprocal and whole number space.