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Folder: Extras/figure-and-table-pages
213 items under this folder.
Apr 16, 2026
1033.192 Table - Prime Number Consequences of Spin-halving of Tetrahedrons Volumetric Domain Unity
management/note
Apr 16, 2026
943.00 Table - Synergetics Quanta Module Hierarchy
management/note
Apr 16, 2026
Chart 415.03
Apr 16, 2026
Drawing 1
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Drawing 2
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Drawing 3
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Drawing 4
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Drawing 5
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Drawing 6
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Fig 1009.57A Critical Proximity Crimping-in of Local Wave Coil-spring
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Fig 466.00 Energy-valve Functions of Closest Sphere Packing
Apr 16, 2026
Fig 938.15 Two Tetrahedra Open Three Petal Faces and Precess to Rejoin as Octahedron.
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Fig. 100.103
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Fig. 100.120
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Fig. 100.51
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Fig. 1005.15 Omnidirectional Intersystem Precessional Effects - Volume and Area Progressions
Apr 16, 2026
Fig. 1006.32 Duo-Tet Star Polyhedron Defines Vector Equilibrium Involvement Domain
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Fig. 1007.30 View of Tetrahedron from Above
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Fig. 1009.57B Big Orbit Passing through Little Orbit
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Fig. 1012.14A Indig Octave System of Four Positive, Four Negative and Zero-Nine Wave Pattern of Experiential Number
Apr 16, 2026
Fig. 1012.14B Wave, Quanta, Indigs, Unity-Is-Plural Bow Ties
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Fig. 1032.12 Convex and Concave Sphere Packing Voids
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Fig. 1032.30 Space Filling of Octahedron and Vector Equilibrium
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Fig. 1032.31
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Fig. 1033.019 Circuit Pattern Tensegrity
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Fig. 1033.11 Electromagnetic Field of Closest-packed spheres
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Fig. 1033.111 B-D
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Fig. 1033.111A
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Fig. 1033.43
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Fig. 1053.37
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Fig. 1073.10 Cosmic Inherency - Four Kinds of Twoness
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Fig. 1074.13 Nuclear Structural Systems
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Fig. 108.01
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Fig. 110
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Fig. 1132.01B Composite of Vector Equilibrium and Icosahedron Great Circle Sets
Apr 16, 2026
Fig. 1132.01C Net Diagram of Angles and Edges for Basic Equilibrium 48 LCD Triangle in VE-icosa Grid
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Fig. 222.01
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Fig. 222.30
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Fig. 260.211 Humans' Range-finding Optical System
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Fig. 321.01 Universe as 'A Minimum of Two Pictures'
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Fig. 400.30 Topological relationships of faces, vertexes, and edges of various polyhedra
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Fig. 401.00 Tensegrity Tetrahedron with 'Me' Ball Suspended at Center of Volume of the Tetrahedron
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Fig. 401.01 Four Vectors of Restraint Define Minimum System
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Fig. 401.05
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Fig. 411.05 Four Spheres Lock as Tetrahedron
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Fig. 415.17 Nucleated Cube
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Fig. 415.22 Rational Volumes of Tetrahedroning
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Fig. 415.55 Tetrahedral Closest Packing of Spheres - Nucleus and Nestable Configurations
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Fig. 416.01 Tetrahedral Precession of Closest Packed Spheres
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Fig. 417.01 Precession of Two Sets of 60 Closest-Packed Spheres as Seven-Frequency Tetrahedron
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Fig. 419.03
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Fig. 419.30 Realized Nucleus Appears at Fifth Shell Layer
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Fig. 420.02
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Fig. 445.13
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Fig. 450.11A Axes of Rotation of Vector Equilibrium
Apr 16, 2026
Fig. 450.11B Projection of 25 Great-Circle Planes in Vector Equilibrium Systems 1
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Fig. 450.11B Projection of 25 Great-Circle Planes in Vector Equilibrium Systems
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Fig. 453.01 Great Circles of Vector Equilibrium Define Lowest Common Multiple Triangle
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Fig. 453.02 Inside-Outing of Triangle
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Fig. 454.01A
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Fig. 454.01B
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Fig. 454.01C
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Fig. 454.06 Definition of Spherical Polyhedra in 25-Great-Circle Vector Equilibrium System
Apr 16, 2026
Fig. 455.11 Folding of Great Circles into Spherical Cube or Rhombic Dodecahedron and Vector Equilibrium
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Fig. 455.20
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Fig. 457.30A Axes of Rotation of Icosahedron
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Fig. 457.30B Projection of 31 Great-Circle Planes in Icosahedron System
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Fig. 457.40 Definition of Spherical Polyhedra in 31-Great-Circle Icosahedron System
Apr 16, 2026
Fig. 458.12 Folding of Great Circles into the Icosahedron System
Apr 16, 2026
Fig. 459.01 Great Circle Foldabilities of Icosahedron
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Fig. 460.08 Symmetrical Contraction of Vector Equilibrium
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Fig. 461.08 Jitterbug System Collapses into Tetrahedron
Apr 16, 2026
Fig. 462.00 The triangle formed by connecting diagonals of three adjacent faces of the cube is the face of the tetrahedron within the cube
Apr 16, 2026
Fig. 463.01 There are no straight lines, only waves resembling them
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Fig. 464.01 Triangle in Cube as Energetic Model
Apr 16, 2026
Fig. 465.00 Note that the eight triangular faces of the vector equilibrium are disposed about four-sided openings, i.e. square faces
Apr 16, 2026
Fig. 465.01 Four Axes of Vector Equilibrium with Rotating Wheels or Triangular Cams
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Fig. 465.03 Rotation of Four Axes of Vector Equilibrium
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Fig. 465.10 The vector equilibrium with wheels
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Fig. 466.01 Reciprocal Motion of Nine Internal Spheres Propagates Wave by Diagonal Elongation
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Fig. 466.13
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Fig. 466.31 Nuclear Tetrahedra Pairs
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Fig. 470.02A Role of Tetrahedra and Octahedra in Vector Equilibrium
Apr 16, 2026
Fig. 470.02B Relationship of Vector Equilibrium to Cube and Octahedron
Apr 16, 2026
Fig. 470.02C Transformation of Vector Equilibrium and Octahedron as Space-Filling Jitterbug
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Fig. 470.02D Reciprocity of Vector Equilibrium and Octahedra in Space-Filling Jitterbug
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Fig. 511.10 Two Triangular Energy Events Make Tetrahedron
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Fig. 511.20 One Energy Event
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Fig. 516.03 Frequency
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Fig. 517.10 Interference Phenomena
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Fig. 521.30 Omnidirectional Lines of Forces
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Fig. 522.09 The Deliberately Nonstraight Line
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Fig. 527.08 Assembly by Convergence and Divergence
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Fig. 527.09 Convergent Integration and Divergent Disintegration in the Language of Electricity
Apr 16, 2026
Fig. 527.703 Imaginary Three Dimensionality
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Fig. 530.07 Simultaneous and Instant Are Nondemonstrable
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Fig. 536.03 Domains of Vertexes, Faces, and Edges of Systems
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Fig. 537.10 Six Vectors for Every Point
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Fig. 540.30 Hyperbolic Paraboloid
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Fig. 541.30H
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Fig. 541.30M
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Fig. 542.02 Tetrahedral Analysis of Plato's Triad
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Fig. 608.01 Instability of Six Vectors Except as Tetrahedron
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Fig. 608.23 Mariner's Compass Rose
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Fig. 610.20 The Three Basic Structural Systems in Nature with Three, Four or Five Triangles at Each Vertex
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Fig. 618.01
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Fig. 620.06 Tetrahedron as Vectorial Model of Quantum
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Fig. 621.01 Constant Properties of the Tetrahedron
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Fig. 621.10 Falling Sticks
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Fig. 640.20 Compression Members Under Stress
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Fig. 640.41A Stabilization of tension
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Fig. 640.41B Minimum of Twelve Spokes Oppose Torque
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Fig. 641.01 Tension Members Tend Toward Arcs of Ever Greater Radius
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Fig. 717.01 Single and Double Bonding of Members in Tensegrity Spheres
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Fig. 724.10
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Fig. 725.02 Transformation of Six-Strut Tensegrity Structures
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Fig. 730.11 Functions of Positive and Negative Tetrahedra in Tensegrity Stacked Cubes
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Fig. 730.12 Stabilization of Tension in Tensegrity Column
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Fig. 740.21 Tensegrity Masts as Struts
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Fig. 762.01 Chordal Ricochet Pattern in Stretch Action of a Balloon Net
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Fig. 765.02 Stabilization of Three-Way-Grid Tensegrity Sphere
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Fig. 770.11 System Turbining in Tensegrity Structures
Apr 16, 2026
Fig. 791.01(3) Diagram of Equal Area Planetary Sweepouts
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Fig. 812.03
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Fig. 826 02A Hammer Throw
Apr 16, 2026
Fig. 841.30 Trisection by Inherent Axial Spin
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Fig. 901.03 Basic Right Triangle of Geodesic Sphere
Apr 16, 2026
Fig. 901.03 The Basic Disequilibrium 120 LCD Triangle
Apr 16, 2026
Fig. 913.01 Division of the Quarter-Tetrahedron into Six Parts
Apr 16, 2026
Fig. 913.01
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Fig. 916.01 Division of Eighth-Octahedron into Six Parts
Apr 16, 2026
Fig. 923.10 Constant Volume of A and B Quanta Modules
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Fig. 930.11
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Fig. 933.01
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Fig. 935.23 Proton and Neutron Three-vector Teams
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Fig. 936.12 Octahedron as Conservation and Annihilation Model
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Fig. 936.16 Iceland Spar Crystal
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Fig. 936.19 Tetrahedral Quantum is Lost and Reappears in Transformation between Octahedron and Three-tetra-arc Tetrahelix
Apr 16, 2026
Fig. 937.20 Six-great-circle Spherical Octahedron
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Fig. 938.13 Six Vectors of Additional Quantum Vanish and Reappear in Jitterbug Transformation Between Vector Equilibrium and Icosahedron
Apr 16, 2026
Fig. 938.16 Octahedron Produced from Precessed Edges of Tetrahedron
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Fig. 943.00A
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Fig. 943.00B Hierarchy of Quanta Module Orientations
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Fig. 950.12 Three Self-Packing, Allspace-Filling Irregular Tetrahedra
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Fig. 954.00A A and B Quanta Module Orientations.
Apr 16, 2026
Fig. 954.00B Mites and Couplers
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Fig. 966.05 Tetrahedral Modelability of 2nd, 3rd, 4th, and 5th Power Relationships
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Fig. 970.20 Basic Vector Equilibrium Concentric Shell Structure
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Fig. 982.58
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Fig. 982.61 Synergetics Isometric of the Isotropic Vector Matrix
Apr 16, 2026
Fig. 986.052 Robot Camera Photograph of Tetrahedra on Mars
Apr 16, 2026
Fig. 986.061 Truncation of Tetrahedra
Apr 16, 2026
Fig. 986.062 Truncated Tetrahedron within Five-frequency Tetra Grid
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Fig. 986.076 Diagram of Verrazano Bridge
Apr 16, 2026
Fig. 986.096 4-D Symbol
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Fig. 986.161 Diametric Unity
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Fig. 986.210 Diagonal of Cube as Unity in Synergetic Geometry
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Fig. 986.314
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Fig. 986.405
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Fig. 986.411A T and E Quanta Modules Lengths
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Fig. 986.411B T and E Quanta Module Angles
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Fig. 986.411C
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Fig. 986.413
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Fig. 986.419
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Fig. 986.421
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Fig. 986.422 MITE
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Fig. 986.427 Bite, Rite, Lite
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Fig. 986.429 Kate, Kat
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Fig. 986.430 OCTET
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Fig. 986.431 COUPLER
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Fig. 986.432 CUBE
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Fig. 986.433 RHOMBIC DODECAHEDRON
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Fig. 986.471
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Fig. 986.502
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Fig. 986.504
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Fig. 986.505
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Fig. 986.508 Six Intertangent Great-circle Discs
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Fig. 986.515
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Fig. 986.561 T and E Modules - Minimod Nestabilities
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Fig. 986.726
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Fig. 986.816
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Fig. 987.081 Trivalent Bonding of Vertexial Spheres Form Rigids
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Fig. 987.132E Composite of Primary and Secondary Icosahedron Greate Circle Sets
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Fig. 987.132F Net Diagram of Angles and Edges for Basic Disequilibrium 120 LCD Triangle
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Fig. 987.137B Composite of Primary and Secondary Vector Equilibrium Great Circle Sets
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Fig. 987.137C
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Fig. 987.210 Subdivision of Tetrahedral Unity
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Fig. 987.221 Four-great-circle Systems of Octahedron and Vector Equilibrium
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Fig. 987.230 Subdivision of Tetrahedral Unity
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Fig. 987.240 Subdivision of Tetrahedral Unity
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Fig. 987.241 Subdivision of Tetrahedral Unity
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Fig. 987.242 Evolution of Duo-Tet Cube and Hourglass Polyhedron
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Fig. 987.312 Rhombic Dodecahedron
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Fig. 987.326 Stellated Rhombic Dodecahedron
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Fig. 987.412
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Fig. 988.00 Polyhedral Evolution
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Fig. 988.100 Octa-Icosa Matrix
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Fig. 988.12 Icosahedron Inscribed Within Octahedron
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Fig. 988.13A S Quanta Module Edge Lengths
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Fig. 988.13B S Quanta Module Angles
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Fig. 988.13C S Quanta Module in Context of Icosahedron and Octahedron
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Fig. 995.03 Vector Models of Atomic Nuclei
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Fig. 995.03A Vector Models of Atomic Nuclei
Apr 16, 2026
Fig. 995.31A Reverse Peaks in Descending Isotope Curve
Apr 16, 2026
Fig.1101.02 The projection system of the Dymaxion Airocean World Map
Apr 16, 2026
Fig.1130.24 Reality is Spiro-orbital
Apr 16, 2026
Figs. 267.02A-B Observer as Tetrasystem
Apr 16, 2026
Table 1232.21 Cancellation of 'Leftward Spillover' to Disclose Basic Reflection Symmetry of Successive Powers of the Scheherazade Numbers
Apr 16, 2026
Table 224.70A Tetrahedral Mensuration Applied to Well-Known Polyhedra.
Apr 16, 2026
Table 924.20 Tetrahedral Functions of A and B Quanta Modules
Apr 16, 2026
Table 943.00 Synergetics Quanta Module Hierarchy
Apr 16, 2026
Table 963.10 Dymaxion Energetic Geometry, 1950.
Apr 16, 2026
VE symbol SVG code