This essay proposes a shift in the fundamental ontology of mathematics: replacing the structureless point with the right isosceles triangle (RIT) having leg 1 and hypotenuse √2 as the atomic unit of number. It is shown that the classical ontology of pure quantity cannot explain the "strength" of prime numbers or the nature of irrationality. The new ontology endows numbers wi internal geometry, binding energy, and asymmetry. A prime number is reinterpreted as an uncuttable monolithic mosaic; a composite number as a conglomerate of blocks. Irrationality ceases to be a problem and becomes the source of connectivity – the "cement" of arithmetic. Geometric reinterpretations of the abc conjecture (as a law of conservation of a "library of forms") and the Beal conjecture (as a prohibition of incompatible fractal rhythms) are presented, with explicit involvement of the spectral gap λ₁ = 1 − √2/2. The approach opens the way to a constructive, dynamic, and engineering‑oriented number theory.
Alexey (KAMAZ) Petrov (Sat,) studied this question.