Focalizing Neutral Concentrator

Also "focalizing chord", focalizing induction.

"I will try to make comprehensible the computation of the number (even to infinity) of the corpuscular oscillations, induced on the introductory ninths, over their normal standard. The molecules of all visible masses, when not influenced by surrounding acoustic vibratory impulses, move at a rate of 20,000 oscillations per second, one third of their diameters. We have before us one of these masses, either a silver dollar, a pound weight, a horseshoe, or any other metallic medium, which I associate to one of my nodal transmitters, the other end of which is attached to the clustered thirds (or third octave) of my focalizing neutral concentrator. Another transmitter, of gold, silver and platina sections, is attached to the sixth cluster of same disk, the other end of which is connected to resonating sphere on my compound instrument, all of which must be brought to a state of complete rest. Then, a slight tap, with a vulcanite rubber hammer on the Chladni resonating disk, will accelerate the 20,000 molecular oscillations to 180,000 per second, an increase of nine times the normal number. The nine nodes each touching the extreme end, next the mass operated upon, in this arrangement, silver, gold, platina, make up the nine. When I associate the seventh, I start with gold and end with platina, always on the triplets. Silver represents the lowest introductory third, gold the next and platina the highest. If we start with a gold node, the multiplication on oscillation will be nine times nine or 81 times the 20,000 which is 1,620,000 per second. Each node represents one wave length of a certain number of vibrations when shifted along the transmitter, over the section representing its opposite metal. The shifting of the gold one over the silver extreme section will hold the corpuscular range of the mass velocity at 1,620,000 per second, the introductory chord being set at B third octave. It requires an accelerated oscillation on the molecules of a soft steel mass, at that chord, of a transmissive multiplication of the full nine, in order to induce rotary action on the neutral center, indicator of focalizing disk, which, by computation, means, per second, 156,057,552,198,220,000 corpuscular intermittent oscillations to move the disk 110 revolutions per second. This represents the multiplication on the first nodal dissociator of the ninth. The second transition, on the same would mean this number multiplied by itself, and the residue (product) of each multiplication by itself 81 times progressively. This throws us infinitely far beyond computation leaving us only on the second of the full ninth, towards reaching the sympathetic corpuscular velocity attending the high luminiferous. I have induced rotation up to 123 revolutions per second to accomplish, but even this vibration represents only a minute fraction of the conditions governing the sympathetic vitality which exists in the far luminous centers." [Keely and His Discoveries]

He describes an experiment in vibratory transmission as follows: "''I attach a nodal transmitter to a soft steel mass and the other end to the clustered thirds (3:6:9 in three octaves) of my focalizing neutral concentrator." [MAGNETIC ENGINE - Snell]

"All hollow spheres, of certain diameters, represent, as per diameters, and their volumes of molecular mass, pure, unadulterated, sympathetic resonation towards the enharmonic and diatonic thirds of any, and in fact all, concordant sounds. In tubes it is adversely different, requiring a definite number of them so graduated as to represent a confliction by thirds, sixths and ninths, as towards the harmonic scale. When the conditions are established, the acoustic result of this combination, when focalized, represents concordant harmony, as between the chord mass of the instrument to be operated and the chord mass of the tubes of resonation. Therefore the shortest way towards establishing pure concordance, between any number of resonating mediums, is by the position that Nature herself assumes in her multitudinous arrangements of the varied forms and volumes of matter - the spherical. The great difficulty to overcome, in order to get a revolution of the same sphere, exists in equating the interior adjuncts of same. In other words, the differentiation induced must be so equated as to harmonize and make their conditions purely concordant to the molecular mass of the sphere. Example: Suppose the chord of the sphere mass represents B flat, or any other chord, and the internal adjuncts by displacement of atmospheric volume differentiates the volume one-twentieth, this displacement in the shell's atmospheric volume would represent an antagonistic twentieth against the shell's mass concordance, to equate which it would be necessary to so graduate the shell's internal adjuncts as to get at the same chord; an octave or any number of octaves that comes nearest to the concordance of the shell's atmospheric volume. No intermediates between the octaves would ever reach sympathetic union. [Snell Manuscript]

See Also

clustered thirds
focalizing discs
Polar and depolar intermittent accumulator
resonating sphere
Table 15.01 - Negative Radiating Focalizing Bar

Created by Dale Pond. Last Modification: Wednesday October 23, 2019 02:47:48 MDT by dale.