► From the relation
V =
√(G M/λ) =
λplanck
/ Tm
we can observe the speed
V that results for each particle (and it is
faster when is more
its mass, until maximum c for the mass Μplanck)
this speed results with the stable length λplanck
but in different time/period Τ.
An example.
For mass of one electron is results :
V = √G M /λ →
(6,6725 x10^{11} ) x (9,10938 x10^{31} ) / 0,24263 x10^{11} = 250,5145 x10^{31} → √25,05145 x10^{30} = 5,0051 x10^{15} m/sec
The same speed result from the relation V = λplanck
/ Tm
→
0,40508 x10^{34} / 0,809329 x10^{20} =
5,0051 x10^{15} m/sec
► When, however, we put the length λ
witch we find from the
relations λ = h / M c = c / fe
= 0,24263 x10^{11} m
then the speed results the maximum c
for all particles always, independently from their mass. That is to say λe
/ Te = c
Even a person that is not a physicist can be to observe a lot of relations and to advance in order to
correlate them with all combinations. The natural constants c, h and G are connected between them and appeared in the sub atomic world with same decisive role.
The gravitational force (that is expressed from the constant G and was considered that is the weaker force), it is required in order to are result the known
numbers of the physics. The constant G is appears as a decisive phenomenon such as is decisive the phenomena of acceleration/deceleration ±a and
the speed V. With an offhand mathematical investigation, somebody can be observe, that the constants c, h and G are connected obligatorily from each
other and that they are presented as result by such changes, in according with certain insuperable and immutable limits.
The dimensional content of the constant G (that reflects a
regular rhythm in change of speed in function with the gravitational force and the distance) :
Length^{3} / Mass x
Time^{2}  or in units m^{3}
/ kg sec^{2}
With what length l, what speed V^{2} or what acceleration
±a, the gravitational constant G results according to the previous "fracture " of the constant G ?
For facilitation in the expression we will take for sample the data of electron.
Answer: If we take like length
(l) the length λ (compton) = h / M c
then
V^{2} = G M / λM
For example: V^{2}
= G 9,10938 x10^{31} / 2,4263 x10^{12} = 25,0514 x10^{30} m^{2}/sec^{2}
G =
λ V^{2} / M = 2,4263 x10^{12}
x 25,0514 x10^{30} / 9,10938 x10^{31}
If we take acceleration a = c^{2} / λ = λ
f^{2} then the length l^{2}
it must length λ (compton) of
Mpl Planck's mass, that is to say λpl =
h / Mpl c = 0,40508 x10^{34} m.
For example: a = c^{2} /
2,4263 x10^{12} = 3,7042 x10^{28}
G = ae
λpl^{2}
/ Me = 3,7042 x10^{28} x 0,164089 x10^{68}
/ 9,10938 x10^{31}
ή G =
λpl
c^{2} / Mpl = 0,40508 x10^{34} x c^{2}
/ 5,45624 x10^{8}
applied the relation
ae
λpl^{2}
/ Me = λpl
c^{2} / Mpl
Finally,
in order to the gravitational constant G remains
(same) in the Newtonian
types, when the Newtonian types are applied in microscopic dimensions and without are
violated the other constants h
and c, it should the sizes change accordingly with the following types.
<•> A minimum length λ_{pl} = h/M_{pl}
c = 0,40508 x10^{34} m or correspondingly
a
maximum quantity M_{pl} = 5,45624 x10^{8}
kg
are hided back of all
relations in that appeared the gravitational constant G
G = 6,6725·10^{11} m^{3}
/kg·s^{2}
These relations claim the following relations :
All the above relations and multitude of other relations
are need and
lead to the immediately previous simple linear relation of Evangelos Karamicha.
This natural relation, thus as it was formulated with the simplest mathematic
relation is important in the presentation here, and not the numbers and relations, that are acquaintances from their separate
use.
From the above relations, we can see that the
maximal mass Mplanck
results for highest speed c and, according to the equations, when the speed is c then the
length λ is minimal. If we search more, then we will find that the previous
relations do not
conflict with the
famous
Einstein's equation for the
relation between mass with speed
[Μ = mo
/ √1  (v^{2}/c^{2})], but on the contrary
they correct this equation, putting minimal and maximum limits in the change of speed and mass.
However, where is found the socalled Planck's
mass [Mpl
=√(h c /G) =
5,45624 x10^{8} kg] that results theoretically since three natural constants c, h and G?
Is it a quantity of mass that exists really? The investigation
for the answer in this question, reveals the close
relation between phenomenon of mass with the energy of electromagnetic waves
and the change in their own motion…
