FOUNDATION

The κ Constant

The ONE input from which all geometry derives

κ = 2π/180

= 0.034906585039886...

"In CEDGA, we don't assume geometry. We DERIVE it. And the only input we allow ourselves is κ = 2π/180."

What is κ?

Kappa (κ) is the fundamental angular unit of the Epoch Model. It represents one degree expressed in radians - the smallest meaningful angular step in the geometric framework. Everything in CEDGA must trace back to this single constant.

The Derivation Chain

Start with κ

κ = 2π/180 ≈ 0.0349 radians

This is the ONLY assumed input.

Derive the tetrahelix period

180 steps = 180 × κ = π radians

180 κ-steps complete a half-toroidal rotation.

Derive the four-fold symmetry

180 = 4 × 45 positions

The tetrahelix naturally divides into 4 transforms at diagonal positions.

Derive the Balance Law

τ₁ + τ₂ + τ₃ + τ₄ = 0

Four torsions at 45° intervals MUST sum to zero. Mathematical necessity.

Derive the tetrahedron angle

cos(BC) = 2/3 → 48.19°

The tetrahelix edge-to-edge angle emerges from geometric constraint.

Why 2π/180?

The choice isn't arbitrary. 180 is the number of degrees in a half-circle (π radians). This makes κ the bridge between degree-based and radian-based geometry - the conversion factor that allows us to work in either system.

More importantly, 180 = 4 × 45 = 2 × 90 = 3 × 60. These divisions give us:

Four-fold symmetry (180/4)

The four transforms T₁, T₂, T₃, T₄ at 45° diagonal positions.

Two-fold inversion (180/2)

The [1 = -1] principle - facing and inverted views sum to zero.

Three-fold structure (180/3)

Connection to base-60 mathematics: 60 = 180/3 = 2² × 3 × 5.

The silent fourth

Three visible + one compensating. τ₄ = -(τ₁+τ₂+τ₃).

Learn About Balance Law → Explore Tetrahelix →