"If you should cause an explosion in the very center of a perfectly spherical room you would form spherical layers of increasingly dense pressures with maximum density at the surface of the sphere. The center of the sphere would be maximum in vacuity. The explosion would be symmetrically radial. The reaction to that explosion would also be its reverse. The reflections which would return by radar from the spherical walls of that room would collide at its very center. Compression would then be exerted from the outside and density would increase in the direction of the center. Nature does not work that way, however. Nature causes her explosions to take place as though they were confined within the flat walls of a room of four or many walls of such shapes as we see in crystals. If you caused such an explosion in your six sided room the outward expansion would no longer be even. It would not even be spherical because of the four corners, which would have to be filled. The outward explosion could no longer produce straight radial lines, which would reflect back in straight radial lines. Every radial line would have to curve in the direction of its corners, and as they approached those corners their curvature would twist and increase in speed as they approached the corners. In a sphere all radial lines are equal, but in a cube the diagonals are longer than the diameters. This fact accounts for the curvature, the spin and the shaft. It also accounts for the disappearance of all curvature." [Atomic Suicide, page 289]
See Also
Dead Lines
discipline
Etheric Line of Retraction
Explosion
Figure 10.07 - Corner Vortices and Vectors
Figure 10.08 - Sympathetic Streams entering and exiting Corners
Figure 6.10 - Wave Dynamics between Cube Corners
Figure 6.11 - Cube Corner Reflectors Dissipating and Concentrating
Figure 7B.19 - Magnetic Lines of Force developed from Induction of Current Flow
Fraunhofer Lines
isoclinal lines
Law of Linear Dimensions
ley line
Light Rings formed at 90 Degrees to Magnetic Center Line
Line
lineage
linear
lines of force
magnetic lines of force
neutral line
Positive Line of Variation or Retraction
Propositions Demonstrating the Relative Properties of Straight and Curved Lines
Radial Center
radial cube
Radial Forces
Wavy Lines
6.6 - Cube Corner Retroreflectors
6.7 - Corner receivers from corners of cubes
6.9 - Crystalline Space