The Theorem of Constants Co-Derivation
Authors/Creators
Description
The Theorem of Constants Co-Derivation proves that math was discovered, not invented. This theorem shows that the fundamental constants of mathematics do not exist as independent axioms. Instead, they are co-defined and are mutually interdependent. The premise is simple: if math was discovered, it must have irreducible first principles—baseline concepts defining the mathematical structures. These principles must co-define one another; otherwise, their values would be arbitrary. I identified hundreds of exact, nontrivial, and asymmetric equations that establish these co-derived, mutually interdependent first principles. Altering a single constant collapses the entire framework. This theorem further reveals a new algebraic property called “isolation resistance,” in which you cannot isolate a constant because its values do not derive independently. Given that the constants are measurements of existence, this theorem proves that mathematics is the discovered operating system of existence and reveals that a Grand Unified Theory of Everything must exist.
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Leaflet 7.pdf
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(298.8 kB)
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Additional details
Identifiers
- ISBN
- 978-1-969426-02-5
- ISBN
- 978-1-969426-03-2