Mar 22, 2020, 3:34 PM
Math? … It’s not so much math. I don’t really think that way. Instead, I understand the grammars. I understand math is the most simple possible Formal grammar. That programming the next grammar, and that law the next grammar. And so I illustrate concepts with the most simple possible grammar: math. The more I do this the more ‘trivial’ or “simple’ the language of mathematics is, and how mathematical rues (proofs) or deductions are just the simplest possible theory -with the added benefit that since math is scale independent, we don’t have to think about limits.
- Formal Grammar (logics)
- Laws of Nature Grammar (Natural/physical Sciences)
- Natural Laws Grammar (Cognitive, Behavioral, and Social Science)
Identity (category)
Sets (multiple categories)
Association (pairing off, pebbles etc.)
Ordering (positional naming, numbers)
Counting(Arithmetic)
Balances (Accounting)
Ratios (Math)
Lines (Geometry)
Curves (Calculus (change))
Waves ( Wave Functions (competition) )
Models (Manifolds, topology, geometries, n-dimesional geometries)
Simulation (…)
All grammars follow this same evolution.
All language is open to geometric representation.