The above unconventional manner of telling a scientific story may not be true to text book form but more of scientific, philosophic and moral truth can be gleaned from it than many times that space could tell in more conventional lesson form.
It is a good preliminary to the more detailed analysis of the radial cube-sphere universe of wave motion which man has not yet begun to fathom. It also graphically states that man is in the midst of a universe of law and order which he may violate to any extent he chooses, but at his own cost, or he may find the glory and ecstasy of working with the law and order which surrounds him when he at last sees the Light which leads him out of the dark.
Having had, and enjoyed this allegory or descriptive interlude let us now return to lesson form to better understand that our physical universe of motion consists of cube-sphere wave-fields within wave-fields, both majestic and microscopic, one within the other and without the other throughout a shapeless, boundless infinity of imagined space which is as unreal as the cosmic cinema illusions which are forever being cast upon it.
It may be that you are not yet sufficiently advanced to understand the illusion of it, but you certainly are sufficiently advanced to understand the mechanics of it.
Let us begin to make this fact of Nature comprehensible by a very simple example of how a curved wave universe rises from flat planes of zero curvature, and how two-way motion simultaneously springs from an unchanging state of rest.
Although this fact has been graphically exemplified in relation to the fulcrum and lever in Figures 89 to 92, and in other places during these lessons where motion has been divided by equators where no motion is, let us exemplify this question in another way.
Let us sit together beside a quiet lake whose surface is completely at rest. As we look down upon it we realize its unchanging aspect. It is all the same in every direction, no matter where we look. One could not locate a point upon it and again relocate that point.
Why is this? It is because the stillness â€” or equilibrium â€” or balance which characterizes that surface has not yet been divided by desire to manifest motion by exerting some force to disturb that stillness.
The instant the motion of the stone begins in your hand you have begun to divide the undivided universe into a series of nine equators which not only control the disturbance of universal balance at every point of its path but the wave-fields which bound these equators are surveyed and measured by Godâ€™s magnetic Light for repetition all over His universe at the rate of 186,400 miles per second, which is seven times around this earth every second. It seems incredible that such an unimportant event should be recorded in our sun seven seconds later, or in our nearest star nine years later, but such is the fact.
In figure 95 the water surface is marked A and B, the stone is marked C and the place of impact upon the water surface is marked D. In Figure 96 the harmonic tones for sequential waves are marked E, all extended from D.
Figures 97â€”98â€”99 and 100 exemplify the building up of the octave wave caused by the falling stone and the sequential repetitions of it upon the lakeâ€™s surface. It is important to note that every wave is repeated in reverse to its neighbor which divides it by its cube system of nine equators. It then mirrors it in reverse to its neighboring wave-fields." Home Study Course
3.02 - The Dispersion Mind Field
3.8 - There are no Waves
3.9 - Nodes Travel Faster Than Waves or Light
8.3 - Conventional View of Wave Motion
8.4 - Wave types and metaphors
8.5 - Wave Motion Observables
8.6 - Wave Form Components
8.8 - Water Wave Model
9.2 - Wave Velocity Propagation Questions
9.30 - Eighteen Attributes of a Wave
9.31 - Oscillatory Motion creating Waveforms
9.34 - Wave Propagation
9.35 - Wave Flow
12.05 - Three Main Parts of a Wave
14.01 - Hints from Bloomfield-Moore
16.06 - Electric Waves are Sound Waves
Compression Wave Velocity
Dissociating Water with Microwave
Figure 6.10 - Wave Dynamics between Cube Corners
Figure 6.9 - Russell depicts his waves in two ways
Figure 7.1 - Step 1 - Wave Vortex Crests at Maximum Polarization
Figure 8.1 - Russells Painting of Wave Form Dynamics
Figure 8.10 - Each Phase of a Wave as Discrete Steps
Figure 8.11 - Four Fundamental Phases of a Wave
Figure 8.14 - Some Basic Waveforms and their constituent Aliquot Parts
Figure 8.2 - Compression Wave Phase Illustration
Figure 8.3 - Coiled Spring showing Longitudinal Wave
Figure 8.4 - Transverse Wave
Figure 9.10 - Phases of a Wave as series of Expansions and Contractions
Figure 9.11 - Compression Wave with expanded and contracted Orbits
Figure 9.13 - Wave Flow as function of Periodic Attraction and Dispersion
Figure 9.14 - Wave Flow and Phase as function of Particle Rotation
Figure 9.15 - Wave Flow and Wave Length as function of Particle Oscillatory Rotation
Figure 9.5 - Phases of a Wave as series of Expansions and Contractions
Figure 9.9 - Wave Disturbance from 0 Center to 0 Center
Figure 10.03 - Zero Planes of Depolar Inertia
Figure 12.10 - Russells Locked Potential Wave
Figure 12.12 - Russells Multiple Octave Waves as Fibonacci Spirals
Figure 13.13 - Gravity Syntropic and Radiative Entropic Waves
Figure 14.07 - Love Principle: Two sympathetic waves expanding from two points have one coincident centering locus
Figure 15.01 - Cavitation Bubbles Collapse in Sound Field
In the Wave lies the Secret of Creation
Letter from Bloomfield-Moore to Cornelia
Letter from Bloomfield-Moore to Dickson
Letter from Bloomfield-Moore to Leidy
Letter from Keely to Bloomfield-Moore
Letter from Keely to Bloomfield-Moore2
Letter from Keely to Bloomfield-Moore3
Letter from Keely to Bloomfield-Moore4
Letter from Keely to Bloomfield-Moore5
Letter from Keely to Bloomfield-Moore6
Letter from Keely to Bloomfield-Moore7
Letter from Kegan Paul to Bloomfield-Moore
Longitudinal Waves in Vacuum
Mrs. Bloomfield-Moore Dead
nine octave harp
One More Step Toward Building The Cube-Sphere Wave-Field
Table 12.02.01 - Wavelengths and Frequencies
Tachyon Field Theory
Three Main Parts of a Wave
We Now Build the Nine Equators of Cube-Sphere Wave-Fields