hyper-dimensionality. Recessed hexagons resemble

a tunnel through an elaborate bee-hive. Here I

depict various levels of recessed hexagons, and

some tentative data for metaphysical analysis.

RECESSED HEXAGON 0Sides: 12, Unity: 2Order = 14 (12 Sides + 2 Unity) Transcendent = 12 (10 Lines + 2 Quadrants) Hierarchy = 23 (10 Lines + 2 Quadrants + 11 defined Points) Degrees Removed = 2 (first digit of 23) Ambition = 3 (second digit of 23) Transformative # = 23 (10 Lines + 2 Quadrants + 11 defined Points + 0 Extending points) Levels = 2 Paths = 3 Transforms to Recessed Hexagon 1 or reverses to Hexagon 0. RECESSED HEXAGON 1Sides: 18, Unity: 3Order = 21 (18 Sides + 3 Unity) Transcendent = 17 (14 Lines + 3 Quadrants) Hierarchy = 33 (14 Lines + 3 Quadrants + 16 defined Points) Degrees Removed = 3 (first digit of 33) Ambition = 3 (second digit of 33) Transformative # = 33 (14 Lines + 3 Quadrants + 16 defined Points + 0 Extending points) Levels = 3 Paths = 3 Transforms to Recessed Hexagon 2 or reverses to Recessed Hexagon 0. RECESSED HEXAGON 2Sides: 24, Unity: 4Order = 28 (24 Sides + 4 Unity) Transcendent = 22 (18 Lines + 4 Quadrants) Hierarchy = 43 (18 Lines + 4 Quadrants + 21 defined Points) Degrees Removed = 4 (first digit of 43) Ambition = 3 (second digit of 43) Transformative # = 43 (18 Lines + 4 Quadrants + 21 defined Points + 0 Extending points) Levels = 4 Paths = 3 Transforms to Recessed Hexagon 3 or reverses to Recessed Hexagon 1. |