Cook's New Electrogravity
Theory
The NET 09
Finally, now that a large part of essential
electrodynamics is out of the way and
the Electrogravitational frequency
has been brought out in the open in the New
Electrogravity Theory, Mr. Cook
can begin to release the entire mathematical
process of combining Quantum Physics
with Relativity in order to demonstrate
how his model explains the passage of the
electron through quantum leaps in the atom.
While this may be physics widely described
in the scientific community and largely non-disputed,
this approach will open the doors for some
of the most beautiful findings in the NET.
Now pay attention to this page, bookmark
it, study it, argue about it. You really will
regret glossing over it. The essense of nearly
all disputed and unresolved theories of science
from time travel, anti-gravity,
free energy and the like are in these
equations. They are complex equations mainly,
in both meanings of the word, and hard to
get a handle on until you follow Cook's understanding
and explanations, but really this is the meat
of the theory, right here on this page.
How well you will see the beauty in what
follows though, depends more on your study
of what will be presented than how it is presented.
There is no really good way to explain the
following other than to put forth the equations
and label them. The understanding of the implications
of these are something that will take years
to fully comprehend, as they go deep in the
rabbit hole.
Seriously, you will now begin to see it...
Where -n is the Quantum Number
pertaining to the Proton's bands and +n
is that of the electron's, h is Planck's
constant, the two is negative by the rule,
pi is the Irrational number equal to
3.141592..., B_r is the Bohr Radius
from (5), m_e
is the mass of the electron, c
is the speed of light and ci
is its Imaginary counterpart, V_g is
the electron Orbit (Group) Velocity
from (6 & 7)
and V_fi is the Electron Spin (Phase)
Velocity from (27,
28 & 29).
For values of this function, simply refer
to the values of V_g and V_fi,
as V_g is the Real part and V_fi
is the Imaginary part.
But Mr. Cook doesn't want to stay on the
Complex plane at this point, in order to illustrate
something ahead that is best shown by restricting
the vector to an Imaginary number. This is
what he does.
Where -n is the Quantum Number
pertaining to the Proton's bands and ni
is that of the electron's from the POV of
the Phase Velocity, h is Planck's
constant, the two is negative by the rule,
pi is the Irrational number equal to
3.141592..., B_r is the Bohr Radius
from (5), m_e
is the mass of the electron, c
is the speed of light and ci
is its Imaginary counterpart, V_g is
the electron Orbit (Group) Velocity
from (6 & 7)
and V_fi is the Electron Spin (Phase)
Velocity from (27,
28 & 29), Alpha_Ri is the Imaginary
Alpha Factor from (20),
alpha is the Fine Structure Constant from
(9), which is Real
from the POV of the Phase Velocity, -Lambda_R
is the Lorentz Factor from the proton's
perspective and +Lambda_R is the factor
from the electron's perspective both from
(8).
At n = 1:
Vi (n) = -4.108017...i x 10^10 m
s^-1
At n = 2:
Vi (n) = -8.216362...i x 10^9 m s^-1
At n = 3:
Vi (n) = -1.232463...i x 10^9 m s^-1
Did you see that? Look again. By simply multiplying
i, the dimensionless value of the square
root of minus one, by n in the Real
part of the non-linear function in (78 &
79), the group velocity simply cancelled out
completely. Look again at equation (85) and
then notice again the Imaginary n in
(80). The only thing left behind in (85) is
the Phase Velocity (AKA, Electron Spin
Velocity) and a couple of Lorentz Factors
to boot.
So what does that mean?
Well, to Mr. Cook this means that when
something passes the speed of light, which
phase velocities regularly do, information
from everything traveling below the speed
of light blinks out. It does not compute.
It ceases to exist as far as measurements
go.
In other words, if I were able to travel
away from you at the speed of light, you would
simply see me disappear the moment I surpassed
c. In the same, looking back toward
you, I would see that you disappeared. This
is extraordinarily significant in Cook's opinion.
This is why...
Working with the non-linear Terminal Velocity
Function above, calculate the X-Wave.
Where the two is negative in accordance with
the rule, h is Planck's constant, epsilon_o
is the Permittivity of Free Space from
(4), c is
the speed of light and ci is
its Imaginary counterpart, Vc (n) is
the non-linear Terminal Velocity Function
from (78 & 79) above, -q is the
electron's charge and +q is the proton's
from (1).
Dividing an Imaginary number by a Complex
number isn't all that difficult, but it helps
to separate everything in the equation from
the Complex Number and represent it as a variable.
We'll call this variable b.
And then apply b to the
X-Wave function to solve first for
the Real part, which can be done like this...
Where b is our variable from (87)
above, V_g is the electron Orbit (Group)
Velocity from (6
& 7), V_f is the Real value
of the Electron Spin (Phase) Velocity
from (27, 28 &
29), the one is negative in accordance
with the rule and n is the Quantum
number pertaining to the electron.
At n = 1:
Re (Xc (n)) = -1 (dimensionless)
At n = 2:
Re (Xc (n)) = -1 / 2
(dimensionless)
At n = 3:
Re (Xc (n)) = -1 / 3
(dimensionless)
Did you just see that? The X-Wave governs
the electron orbitals (AKA energy shells),
or more precisely are the orbitals
themselves. What is an orbital? An X-Wave.
What is an X-Wave? An orbital. They are one
in the same.
But what about the Imaginary Part?
Indeed, perhaps even more interesting is
the Imaginary part, which we will spend a
little extra time with now.
Where b is our variable from (87)
above, V_g is the electron Orbit (Group)
Velocity from (6
& 7), V_f is the Real value
of the Electron Spin (Phase) Velocity
from (27, 28 &
29), the one is negative in accordance
with the rule, n is the Quantum
number pertaining to the electron, -Lambda_R
is the Lorentz Factor from the proton's
perspective and +Lambda_R is the factor
from the electron's perspective both from
(8) and Alpha_R
is the Imaginary Alpha Factor from
(20), but is represented
in the equation as Real so as to bring out
the i for a more complete picture.
Whoa. Okay. What does all that mean?
Well, the Lorentz Factor is something
from Relativity and the Quantum
number is something from Quantum Physics
and the Alpha ratio is that ratio that
allows constants to remain constant when the
electron crosses from one energy level to
the next in accordance with Cook's New
Electrogravity Theory. This is all tied
together with an X-Wave, particularly the
Imaginary Part of the wave.
In order to see what's really inside the
Imaginary part of the X-Wave, it helps to
twist it around a bit. We will divide the
minus i by the Imaginary part, thereby
cancelling i, give the square root
and then multiply that again by the Imaginary
part.
One gets
And what is interesting about that?
Well, the same result just so happens to
equal this.
Where alphai is the Imaginary Fine
Structure Constant from (9)
and -n is the Quantum Number
pertaining to the proton and +n for
the electron.
At n = 1:
Im (Xc (n)) = -7.297353...i
x 10^-3 (dimensionless)
At n = 2:
Im (Xc (n)) = -2.580004...i
x 10^-3 (dimensionless)
At n = 3:
Im (Xc (n)) = -1.404376...i
x 10^-3 (dimensionless)
Whereby Mr. Cook sets (94 & 95) equal
to each other in order to solve for the Imaginary
Fine Structure Constant, to see what it
is a product of.
Where -n is the Quantum Number
pertaining to the proton, +n for the
electron and Im (Xc (n))
is the Imaginary part of the X-Wave from (90-93)
above.
For all n:
alphai = 7.297353...i x 10^-3 (dimensionless)
Mr. Cook likes product equations, as they
show more clearly what it is that make up
a certain parameter. For instance, force equals
energy per meter, but that is not descriptive
enough in Cook's mind, as it only shows that
by removing distance from energy, one gets
force. He prefers to think of force as the
product of mass and acceleration, as it appears
to him as something more fundamental.
In the same, equation (96) above is a much
more profound statement for the Fine Structure
Constant than the ratio in (9),
'cause it definitively states what exactly
it is:
The Fine Structure Constant is the lock
and key center-point between the Real plane
of the Quantum world (Quantum numbers) and
the Imaginary plane of the Relativistic world
(Lorentz factors)! It is that which keeps
the two planes constantly connected.
Thus, if one divides the Imaginary Fine
Structure Constant times the Real part
of the X-Wave by the Imaginary part
raised by some percent from (94 & 95),
one gets the Square Root Function,
as i simply cancels out.
Where alphai is the Imaginary Fine
Structure Constant from (9),
Re (Xc (n)) is the Real part of the X-Wave
from (88 & 89) above and Im (Xc (n)) is
the Imaginary part from (90-93) above.
At n = 1:
Sqrt {n} = 1 (dimensionless)
At n = 2:
Sqrt {n} = 1.414213... (dimensionless)
At n = 3:
Sqrt {n} = 1.732050... (dimensionless)
And that's about as fundamental as one could
get.
There is more to this of course, but for
sake of completeness, in case one wants to
explore further the X-Wave without Complex
values, there is a way to do so for a Real
X-Wave and one will never run into problems
with it.
Where the two is negative in
accordance with the rule, h is Planck's
constant, epsilon_o is the Permittivity
of Free Space from (4),
c is the speed of light and
-ci is its Imaginary counterpart (made
negative in order to keep things on the Real
plane, Vi (n) is the Imaginary Terminal
Velocity Function from (80-85) above,
-q is the electron's charge, +q
is the proton's from (1),
-n is the Quantum number pertaining
to the proton, +n pertaining to the
electron, -Lambda_R is the Lorentz
Factor from the proton's perspective and
+Lambda_R is the factor from the electron's
perspective both from (8),
alphai is the Imaginary Fine Structure
Constant from (9
& 96) and Alpha_Ri is the Imaginary
Alpha factor from (20).
At n = 1:
X_R (n) = 1.000053... (dimensionless)
At n = 2:
X_R (n) = 2.000026... (dimensionless)
At n = 3:
X_R (n) = 3.000017... (dimensionless)
And now that the math behind the X-Wave
is presented, it is time to move into the
realm of the Mach-Cook Parallel where
we can begin to look at the X-Wave in action.
Let's do this then...
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