| Topic: |
Science > Physics |
| User: |
"Louis Nielsen" |
| Date: |
05 Jul 2005 05:54:04 PM |
| Object: |
The Electron, the Proton and the Universe |
CONNECTIONS BETWEEN THE ELECTRON, THE PROTON AND THE UNIVERSE
By Louis Nielsen, Denmark, http://www.rostra.dk/louis/
Are there connections between the electron, the proton and the
Universe? My answer is yes.
My postulate is that there exists a connection between the average
mass-density of an electron and the average mass-density of the
Universe. A similar connection exists between the average mass-density
of a proton and the average mass-density of the Universe. The
mathematical connections are given by the equations:
(1) (m(e)/r(e)^3) = N(e)*(M/R^3)
and
(2) (m(p)/r(p)^3) = N(p)*(M/R^3)
In equation (1) m(e) = 9.11*10^(-31) kg is the rest mass of the
electron and
r(e) is the average extension of the electron.
In equation (2) m(p) = 1.67*10^(-27) is the rest mass of the proton
and r(p) is the average extension of the proton.
M is the total mass of the Universe and R is the actual average
extension of the Universe.
N(e) is equal to the ratio between the electrostatic and gravitostatic
forces between two electrons. N(p) is equal to the ratio between the
electrostatic and gravitostatic forces between two protons.
N(e) and N(p) are defined by:
(3) N(e) = (k*e^2)/(G*m(e)^2) = 4.16*10^42
(4) N(p) = (k*e^2)/(G*m(p)^2) = 1.24*10^36
In equation (3) and (4) k is Coulomb's constant and e is the electric
charge of the electron. G is the actual value of Newton's
gravitational ‘constant'. We assume that k, e, m(e), m(p) and M are
constants. G is assumed to decrease with increasing R. (See my
treatise)
From other equations in my treatise about Quantum Cosmology the values
of R and M can be calculated.
The actual values are: R = 10^26 meter and M = 1.6*10^60 kg.
From equations (1) and (2) we can then calculate the values of r(e)
and r(p):
(5) r(e) = R*(m(e)/(N(e)*M))^(1/3) = 0.5*10^(-18) meter
and
(6) r(p) = R*(m(p)/(N(p)*M))^(1/3) = 0.9*10^(-15) meter
The calculated average extensions of the electron and the proton are
in very good agreement with measured values!
From equation (1) and (2) we get a simple connection between the
masses and extensions of the electron and the proton:
(7) m(e)/r(e) = m(p)/r(p)
or:
(8) m(p)/m(e) = r(p)/r(e) = 1836
An electron (or a proton) is not a rigid system. The electron is a
quantum-dynamical system composed of a huge number of (yet unknown)
very tiny quanta.
According to equation (7) an electron have possible a ‘disc-shape'.
A question: Are similar equations as the above valid also for other
‘elementary particles'?
Read more in my treatise:
http://www.rostra.dk/louis/
Serious comments to the above considerations are very welcome.
Best regards, Louis Nielsen, Denmark
.
|
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| User: "Uncle Al" |
|
| Title: Re: The Electron, the Proton and the Universe |
05 Jul 2005 07:29:23 PM |
|
|
Louis Nielsen wrote:
CONNECTIONS BETWEEN THE ELECTRON, THE PROTON AND THE UNIVERSE
[snip]
My postulate is that there exists a connection between the average
mass-density of an electron and the average mass-density of the
Universe. A similar connection exists between the average mass-density
of a proton and the average mass-density of the Universe.
[snip crap]
Then "the average mass-density of an electron" and "the average
mass-density of a proton" are locked together. Leptons are point
particles, hadrons are composite proticles, and you are an empirical
*****.
--
Uncle Al
http://www.mazepath.com/uncleal/
(Toxic URL! Unsafe for children and most mammals)
http://www.mazepath.com/uncleal/qz.pdf
.
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| User: "John Sefton" |
|
| Title: Re: The Electron, the Proton and the Universe |
05 Jul 2005 11:54:29 PM |
|
|
Uncle Al wrote:
Louis Nielsen wrote:
CONNECTIONS BETWEEN THE ELECTRON, THE PROTON AND THE UNIVERSE
[snip]
My postulate is that there exists a connection between the average
mass-density of an electron and the average mass-density of the
Universe. A similar connection exists between the average mass-density
of a proton and the average mass-density of the Universe.
[snip crap]
Then "the average mass-density of an electron" and "the average
mass-density of a proton" are locked together. Leptons are point
particles, hadrons are composite proticles, and you are an empirical
*****.
'Point' is a description that says, basically,
"We can't see that small." (Or that fast.)
You have no model.
John
.
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| User: "John Sefton" |
|
| Title: Re: The Electron, the Proton and the Universe |
06 Jul 2005 12:04:26 AM |
|
|
Louis Nielsen wrote:
CONNECTIONS BETWEEN THE ELECTRON, THE PROTON AND THE UNIVERSE
By Louis Nielsen, Denmark, http://www.rostra.dk/louis/
Are there connections between the electron, the proton and the
Universe? My answer is yes.
My postulate is that there exists a connection between the average
mass-density of an electron and the average mass-density of the
Universe. A similar connection exists between the average mass-density
of a proton and the average mass-density of the Universe. The
mathematical connections are given by the equations:
(1) (m(e)/r(e)^3) = N(e)*(M/R^3)
and
(2) (m(p)/r(p)^3) = N(p)*(M/R^3)
In equation (1) m(e) = 9.11*10^(-31) kg is the rest mass of the
electron and
r(e) is the average extension of the electron.
In equation (2) m(p) = 1.67*10^(-27) is the rest mass of the proton
and r(p) is the average extension of the proton.
M is the total mass of the Universe and R is the actual average
extension of the Universe.
N(e) is equal to the ratio between the electrostatic and gravitostatic
forces between two electrons. N(p) is equal to the ratio between the
electrostatic and gravitostatic forces between two protons.
N(e) and N(p) are defined by:
(3) N(e) = (k*e^2)/(G*m(e)^2) = 4.16*10^42
(4) N(p) = (k*e^2)/(G*m(p)^2) = 1.24*10^36
In equation (3) and (4) k is Coulomb's constant and e is the electric
charge of the electron. G is the actual value of Newton's
gravitational ‘constant'. We assume that k, e, m(e), m(p) and M are
constants. G is assumed to decrease with increasing R. (See my
treatise)
From other equations in my treatise about Quantum Cosmology the values
of R and M can be calculated.
The actual values are: R = 10^26 meter and M = 1.6*10^60 kg.
From equations (1) and (2) we can then calculate the values of r(e)
and r(p):
(5) r(e) = R*(m(e)/(N(e)*M))^(1/3) = 0.5*10^(-18) meter
and
(6) r(p) = R*(m(p)/(N(p)*M))^(1/3) = 0.9*10^(-15) meter
The calculated average extensions of the electron and the proton are
in very good agreement with measured values!
From equation (1) and (2) we get a simple connection between the
masses and extensions of the electron and the proton:
(7) m(e)/r(e) = m(p)/r(p)
or:
(8) m(p)/m(e) = r(p)/r(e) = 1836
An electron (or a proton) is not a rigid system. The electron is a
quantum-dynamical system composed of a huge number of (yet unknown)
very tiny quanta.
According to equation (7) an electron have possible a ‘disc-shape'.
A question: Are similar equations as the above valid also for other
‘elementary particles'?
Read more in my treatise:
http://www.rostra.dk/louis/
Serious comments to the above considerations are very welcome.
Best regards, Louis Nielsen, Denmark
Hello, Louis.
My Galaxy Model for the Atom says you are
right!
http://users.accesscomm.ca/john/
The electron is the galactic arm.
The galactic arm is composed of suns and
planets. These are composed of atoms, most
of whose space is electron. The galaxies as
far as our telescopes can see
are atoms composing some piece of a planet or
sun making up just another galactic arm/slash/
electron.
John
.
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