Astrology
Black
Holes do not
experience
everlasting
contraction
In most
essays concerning Black Holes is read; To make a Black
Hole, it must become dense in a location. This matter
describes a wonderful object holding distortion and
concentration, such as space (unlimited distortion and
density) bearing unclear time inside it. In any case, it
is believed that a phenomenon may stop final devastation
process. Ofcourse, this process is time stopping, which
can prevent from these special problems. Assume a star,
which is described by its internal density distribution.
A location of it is considered in comparison to total
volume of star. In this case, time is stopped throughout
the volume of the star (this phenomenon occurs in the
volume of sphere not in its surface). Therefore, atomic
decay does not occur from this time, even neutrons’
pressure still exists and their fusion has occurred
before. Meanwhile, if distribution of density occurs in a
dying star, devastation and as a consequence, time are
stopped. In order to obtain this distribution, internal
gravitational force of a star is equal to gravitation
resulting from deletion of some parts of the sphere
located upper than this point (measurement point). Hence,
calculations are for the star’s surface and can only be
used for the points lower than measurement point. Then
the relationship M’/r’ (equation ?) must be constant for
total volume of star. M’ is a spherical object holding a
radius of r’ from the star’s center. Therefore; M’:r’=
c²:2G =k and mass is calculated as follows; M’=kr’.
Besides, final mass of the star is
equal to total value of mass differential. In fact, mass
differential is equal to density [σ(X)²]
multiplied by volume differential. This is also equal to
area of sphere multiplied by radial differential.
Therefore, mass is equal to density of integral
relationship between zero and r’.
Kr’=M’= ∫
σ(X)dv = ∫.y’σ(X)4πx²dx
An
obvious way to calculate
σ(X) is the
result of Kr’.
σ(X)
= K: 4πx² = c²: 8 πGx²
X is
under study point of star. For deeper areas, more density
is required and it is proportional to the reverse of
radius square. This fact indicates an unlimited density
in star’s center, but radius and mass have a tendency
toward zero. This type of Black Hole is very common in
the space because neutron fusion occurs in star’s center
during stellar explosion. When time is stopped in the
star’s center, it prevents from more fusion of material in
that location. This stopping which occurs outwards is
from a layer to another. As calculated, density
distribution produces an internal collapsing in a Black
Hole.
1.It
means, a sphere of the star is considered in which the
under study point is on the surface.
2.Volume
differential, which is a very small part of the sphere, is
similar to a spherical point.
