Master Appendix: Measurements, Ratios, and Geometric Framework for 252 / 2520 Processors, Author: Miljko Tijanić (Kiki)

Master Appendix: Unified Restoration of the Circle (Ki = 3,15)

Author: Miljko Tijanić (Kiki)
Date: December 18, 2025
Principal Authority: The Divine Unity

Architectural Framework Based on Measurements and Geometric Constructions

Now I will define and explain each drawing in categories. Use labels.

Category 1: Drawing 2.1a – Fundamental Geometric Infrastructure and the 21 cm / 42 cm Grid

Drawing 2.1a shows the direct, measurable relationship between triangles and circles. These are literal constructions, built from a single base radius, producing all circles, triangles, and rectangle grids.

Base radius: 10,5 cm (r)

Derived diameters:

• Small triangle 5,25 cm → circle 3,035 cm diameter (R)

• Large triangle 21 cm → circle 12,14 cm diameter (R)

Other measurements: 6,07 cm, 9,105 cm, 31,5 cm

Purpose: Shows how the triangle’s A side (5,25 / 10,5 / 21 cm) relates to the circles formed by the 21 cm × 42 cm rectangle grid. The focus is on the connection between triangle sides and circles, not abstract formulas.

The rectangle grid naturally demonstrates the 3/6/9/12 counting system:

• 3 = minimal triangle

• 6 = hexagonal symmetry from circle packing

• 9 = triangle height subdivisions

• 12 = full rotational divisions

Every circle, triangle, and rectangle comes directly from this single measurement.

Category 2: Drawing 2.1b – Scalability of the Grid

Drawing 2.1b explains how the rectangle grid can grow or shrink while keeping all relationships consistent.

Rectangle dimensions: 2,625 cm × 2,27625 cm (derived from triangle side × 8 and triangle height × 16)

Meaning:

• Start with the smallest units and scale up to 21 cm, 42 cm, 84 cm, or beyond.

• Triangles, circles, and rectangle connections keep the same proportions.

• Every scaled version behaves exactly like the original, preserving all counting relationships and symmetry.

Importance:

• Scalability allows reproducible grids at any size.

• Provides the geometric foundation for processor design and visual logic systems.

• Built directly from circle centers, not arbitrary or artificial grids.

Simple rule: Start small, scale big, the relationships never break.

Category 3: Drawing 2.1c – David Star Rule and Specular Logic

Drawing 2.1c shows the David Star built from measurements.

Triangle proportions: 27,3 / 15,75 / 31,5 cm

• 31,5 cm = 3 × 10,5 (3a), stabilizing spin

• 15,75 cm = radius + half radius (r + r/2)

Construction: 12 triangles connected with 210° specular logic

Rotation and equilibrium:

• Four opposite triangles spin alternately (1+1+1+1)

• 12 Hexagrams per cycle, alternating odd/even

• Center value = 105, showing equilibrium

Demonstrates circle/sphere rotation, 420° spin, and 3/6/9 counting, all derived from measurable constructions.

Category 4: Drawing 2.1d & 2.1f – 3/6/9 and 12 Secret (Laics)

Step 1: Choose a circle (10,5 cm black or 9,105 cm blue). Use one circle only and replicate. Count centers.

Step 2: Use 10,5 cm as base. Key measurements: 21 cm, 42 cm, 31,5 cm. Rectangles form by connecting:

• Triangle side “a”

• Circle intersection “b” (intersecting 1/3 of diameter, leaving 2/3 intact)

Step 3 – Square Table: Connect all centers → rectangle grid (“square” for teaching). Derived entirely from 21 cm diameter / 10,5 cm radius. Shows naturally why 3, 6, 12, 21 appear. Provides practical sheet measurements for processor and grid construction.

Category 5: Measurement Table for Empirical Reality

Category 6: Drawing 4s.png – Engine of Quadrilateral Opposites and 12 David Stars

Four Opposites (1 unit):

• Four opposite triangles spin together as one complete unit → minimal cycle

12 Equal-Sided Triangles (spin formation):

• Each 4-triangle unit repeated three times → 12 triangles

• Shows use of 4 opposite sides of one triangle in rotational construction

12 David Stars (full Circle demonstration):

• 12 triangles arranged into 12 David Stars

• Alternating colors: 6 odd (blue) and 6 even (red)

• Demonstrates odd/even logic and 1+1 principle in the Circle → equilibrium and continuity

Links triangle geometry, circle construction, and rotational symmetry. Fully reproducible.

Category 7: Drawing ‘Who is 0’ – Zero-Point Activation and Circular Restoration

Circumference Rule: O = 2 × r × Ki (Ki = 3,15)
Length-to-Radius Ratio: O = 6 × L, L = r + r/20

Produces 420° spin, aligns with the rectangle grid, and defines 1260 logic (half-cycle) and 2520 logic (full activation). Fully supports measurable circle-triangle-David Star alignment.

Conclusion

All constructions and measurements derive from a single 10,5 cm radius circle (r), producing:

• Triangle heights

• Inscribed and circumscribed circles

• 21 cm × 42 cm rectangle grid

• David Star

• 3/6/9/12 counts

The Restoration is direct, measurable, verifiable, and scalable, providing the definitive framework for geometric and processor-based constructions.