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P. K 27. The principle of gravity
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P. K 26
A single point mass MU = 1 kg at a distance of a unit radius rU = 1 m creates a unit gravity GU of magnitude - 6, 672 × 10 -11 m / s2, directed to the center of MU. (K 1. 8) K 26
Compared to the acceleration of gravity g = 9. 81 m /s2, unit gravity is very weak:
GU = 6, 80 × 10 -12 g.
P. K 27. The principle of gravity
Gravity (G) is the intensity of the gravitational field (or several such fields) at some point in space. It has an effect on massive bodies, which is equivalent to the action of acceleration. (K 1. 8) K 27
Any field is a full flow of its intensity. The total flow of the strength of a unit gravitational field (NU) of a material point with a unit mass (MU = 1 kg) can be calculated as the product of the strength of its gravitational field at a distance r = 1 m and the area S of a sphere of the same radius (S = 4pr2), s center at this material point.
NU = GU× S = - 6, 672 × 10 -11 m / s2 × 4 × 3. 142 × 1 m2 = 8, 385 × 10 -10m3 /s2
This is the entire given unit field, although it is represented in the dimensions of ordinary space. This is the central field, since each vector of the strength of this field is directed towards the center of its source. Distortions by other fields are not taken into account, since they do not affect the value of the total flux of its intensity.
P. K 28
The total intensity flux of a unit gravitational field NMU, the source of which is the inertial mass MU = 1 kg, does not depend on the radius of the sphere surrounding this field source. Its value does not depend on the influence of other fields either. (K 1. 8) K 28
It will always be the same for a sphere with a radius of 1 m, and for a sphere with a radius of 1 km. This fully corresponds to the dimension NMU in Table 1.
The intrinsic field of the MU mass always compresses this mass from all sides. And this action is equivalent to the action of acceleration, but from all sides and at once.
P. K 29
The full stream of intensity of any central field is always and necessarily directed towards the center of its source. He necessarily compresses his source. (K 1. 8) K 29
Far from other masses, this field compresses its base equally from all sides. But closely spaced masses make their own changes in this process, they distort the uniform (equal) intensity of the field action on their base, and this action turns out to be unequal from different sides. This is how the forces of gravitational interaction of any masses arise.
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P. K 30. The principle of a unit gravitational field
A single inert mass MU with a magnitude of 1 kg in ordinary physical space is itself, and in hyperspace it is at the same time a unit gravitational field of itself. The magnitude of this field relative to three-dimensional space is 8. 385 × 10-10 m3/s2. (K 1. 8) K 30
A unit mass and its field are always the same entity, but simultaneously located in different spaces.
It seems that the second side of this material entity has the meaning of space moving towards its center with a " volumetric acceleration" of 8. 385 × 10-10 m3/s2. But this is not the case, since space is motionless, and the field is only in hyperspace.
The value of the ratio of the gravitational field to its source is one of the main physical constants. This is the dimensionless coefficient of gravity
kG = g × 4p
kG = g × 4p. = NMU = G × S = g × МU × 4pr2
МU МU r 2 МU
kG = g × 4p. = 6, 6720 × 10 -11 N × m 2/kg 2 × 4 × 3. 142 = 8, 385 × 10 -10 m 3/ s2.
kg
Only now this dimension has its own understandable meaning of the phenomenon that it expresses the ratio of the value of the gravitational field, which has the dimension [m3/s2], to the value of its own material source, which has the dimension [kg].
P. K 31. The principle of the coefficient of gravity
The coefficient of gravitation kГ has no dimension because, for example, 1 kg of inert mass simultaneously exists both in ordinary space and in hyperspace. But in hyperspace it already has the form of a field of 8, 385 × 10 -10 m3/s2. Due to the dimensionless coefficient of gravity, any inert mass can be expressed in the dimension of its own gravitational field and vice versa. (K 1. 8) K 31
After all, the essence is one! Its simultaneous presence in different spaces does not increase or decrease it. The relation of an entity to itself always gives a dimensionless unit (number).
P. K 32
The concept of a unit gravitational field differs from the concept of unit gravity in that the field is an entity from hyperspace, and gravity is a physical quantity (quantity) of the strength of this field at a specific distance from its source. (K 1. 8) K 32
Be careful here. The gravitational forces of interacting bodies are always mediated by their own gravitational fields. The gravitational field of one body cannot directly act on another body, since they are in different spaces.
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P. K 33
Any material or bodily interaction at a distance always and necessarily belongs to one of the types of fundamental interactions. (K 1. 8. ) K 33
We observe the material interaction of massive bodies at a distance in ordinary space. But it directly occurs in hyperspace, and it occurs only by distorting the uniform action of fields on their sources by similar fields of neighboring bodies.
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