Master Appendix: Unified Restoration of the Circle (Ki = 3,15) Author: Miljko Tijanić (Kiki)Date: December 18, 2025Principal Authority: The Divine Unity Architectural Framework Based on Measurements and Geometric ConstructionsNow 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 Triangle Side (a) Circle Diameter (R) Context 5,25 cm 3,035 cm Minimal unit 10,5 cm 6,07 cm Base unit (3/6/9/12) 15,75 cm 9,105 cm Hexagram protocol 21 cm 12,14 cm Matrix scalability 31,5 cm 18,21 cm 3a verification 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.