¶ Universal Integrity (2)
← Universal Integrity (1) | Universal Integrity (3) →
Index Entry
Universal Integrity: Second-power Congruence of Gravitational and Radiational Constants
"not what it is but something else, the opposite of what you say it is. It could have been stated that the gravitational relationships are in the terms of the second power of the relative distance between the given masses, as stated in the terms of the radius of one of the masses. That is the way you could say it today. We find that the gravitational law is in the terms of the second power of radius and terms are just converting Einstein’s mass phenomena into terms of radius also-- which is the way he did it. We would be able then to know where relative mass was-- how much energy, how many quantum were in it; and you would then suddenly see the gravitational state in terms of the second power, and this relative concentration of the masses.
"The gravitational one, then, is the contractive, quantitative one of second power of relative masses stated in quanta or photons, and the other one is the Einsteinian one, which is the radiation of the other condition.
“You have two main conditions of energy: energy divergent and energy convergent, and we find both of them in the second power. We suddenly find this very neat relationship. It seemed very”
