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Host Element Fusion

Unpublished Work Copyright (c) 1990 Earl Laurence Lovings

1. Proton (1 Hydrogen 1) Energy: 938.3 Mev = 1.007825 amu 2. Neutron (1 Neutron 0) Energy: 939.6 Mev = 1.008665 amu 3. Deuterium (2 Hydrogen 1) = 2.014102 amu 4. [(1 Neutron 0) + (1 Hydrogen 1) - electron] = (939.6 Mev + 938.3 Mev - .511 Mev) = 1877.389 Mev = 2.015447128 amu 5. [(1 Neutron 0) - (1 Hydrogen 1) + electron] = (939.6 Mev - 938.3 Mev + .511 Mev) = 1.811 Mev = 1.9441763 x 10 - 03 amu 6. (105 Palladium 46) = 104.905064 amu 7. (103 Rhodium 45) = 102.905511 amu

The host element fusion experiment begins with a Palladium electrode submersed in Deuterium. A energy source is supplied, which enables the fusion process to begin. My theory on this subject is explained below:

The Deuterium atoms are allowed inside the Palladium electrode due to the electric field on the electrode. Once the Deuterium atoms are inside, the Deuterium causes the Palladium to become unstable. This is done by this process:

[ (105 Pd 46 - (1 Neutron 0 + 1 Hydrogen 1 - electron) + (1 Neutron 0 - 1 Hydrogen 1 + electron)] or, [ 104.905064 amu - 2.015447128 amu + 1.9441763 x 10-03 amu] = 102.8916 amu.

The closest element Palladium can try to become stable is (103 Rhodium 45).

Take Palladium's new mass and subtract it with Rhodium's mass. (103 Rhodium 45) - 102.8916 amu, or 102.905511 amu - 102.8916 amu = 1.394653 x 10-02 amu.

To find out how many electrons that is equivalent to: (1.394653 x 10-02 amu x 931.5 Mev/amu)/(.511 Mev/electrons) = 25.42309 electrons

This is the amount of electrons required to be ionized to enable host element fusion with Deuterium.

That is the first process of host element fusion.

The second process begins when the ionized electrons from the palladium atom shields the deuterium atoms to allow host element fusion.

The Equation:

Q = [(2 Hydrogen 1) + (2 Hydrogen 1) + (25.423 e) - (1877.389 Mev) + (1.811 Mev) - (2 Hydrogen 1)] x 931.5 Mev or,

Q = [(2.014102 amu + 2.014102 amu + .01394653 amu - 2.015447 amu + 1.944176 x 10-03 amu - 2.014102 amu)] x 931.5 Mev

Q = 13.55 Mev

You must realize for this process to work for host element fusion, you have to have a host element before Deuterium will fuse. My equation also theoretically works for known Deuterium fusion processes.

Known Equation:

1. [(2 Hydrogen 1) + (2 Hydrogen 1)] -> (3 Helium 2) + (1 Neutron 0)] = or,

[(2.014102 amu + 2.014102 amu - 3.016030 amu - 1.008665 amu) x (931.5 Mev/amu)] = Q = 3.27 Mev

My Equation:

Host Element = (3 Helium 2) + (1 Neutron 0) [(3 Helium 2) + (1 Neutron 0) - 1877.389 Mev + 1.811 Mev] = [3.016030 amu + 1.008665 amu - 2.015447 amu + 1.944176x10-03 amu] = 2.011192 amu

The element whose mass is closest to the new unstable "element" is (2 Hydrogen 1)

(2.014102 amu) - 2.011192 amu = 2.909899 x 10-03 amu excess mass convert to electrons

(2.909899 x 10-03 amu x 931.5 Mev/amu) /(.511 Mev/electrons) = 5.304445 electrons

Now the fusion of Deuterium atoms [(2 Hydrogen 1) + (2 Hydrogen 1) + 5.30444e - 1877.389 Mev + 1.811 Mev - (2 Hydrogen 1)] x 931.5 Mev = [(2.014102 amu + 2.014102 amu + 2.909899x10-03 amu - 2.015447 amu + 1.944176x10-03 amu - 2.014102 amu)] x (931.5 Mev/amu)

Q = 3.27 Mev

Known Equation:

2. [(2 Hydrogen 1) + (2 Hydrogen 1) -> (4 Helium 2)] = or, [(2.014102 amu + 2.014102 amu - 4.002603 amu)] x (931.5 Mev/amu) = Q = 23.85 Mev My Equation:

Host Element = (4 Helium 2) [(4 Helium 2) - 1877.389 Mev + 1.811 Mev] = [(4.002603 amu - 2.015447 amu + 1.944176x10-03 amu)] = 1.9891 amu

The element whose mass is closest to the new unstable "element" is (2 Hydrogen 1)

(2.014102 amu) - 1.9891 amu = 2.500188 x 10-02 amu excess mass convert to electrons

(2.500188 x 10-02 amu x 931.5 Mev/amu) /(.511 Mev/electrons) = 45.57585 electrons

Now the fusion of Deuterium atoms [(2 Hydrogen 1) + (2 Hydrogen 1) + 45.58 electrons - 1877.389 Mev + 1.811 Mev - (2 Hydrogen 1)] x 931.5 Mev = [(2.014102 amu + 2.014102 amu + 2.500188x10-02 amu - 2.015447 amu + 1.944176x10-03 amu - 2.014102 amu)] x (931.5 Mev/amu) =

Q = 23.85 Mev

Known Equation:

3. [(2 Hydrogen 1) + (2 Hydrogen 1) -> (3 Hydrogen 1) + (1 Hydrogen 1) = or,

[(2.014102 amu + 2.014102 amu - 3.016050 amu - 1.007825 amu)] x (931.5 Mev/amu) = Q = 4.03 Mev

My Equation:

Host Element = (3 Hydrogen 1) + (1 Hydrogen 1) [(3 Hydrogen 1) + ( 1 Hydrogen 1) - 1877.389 Mev + 1.811 Mev] = [3.016050 amu + 1.007825 amu - 2.015447 amu + 1.944176x10-03 amu] = 2.010372 amu

The element whose mass is closest to the new unstable "element" is (2 Hydrogen 1)

(2.014102 amu - 2.010372 amu) = 3.729582x10-03 amu excess mass convert to electrons

(3.729582x10-03 amu x 931.5 Mev/amu)/(.511 Mev/electrons) = 6.798641 electrons

Now the fusion of Deuterium atoms [(2 Hydrogen 1) + (2 Hydrogen 1) + 6.799 electrons - 1877.389 Mev + 1.811 Mev - (2 Hydrogen 1)] x 931.5 Mev = [(2.014102 amu + 2.014102 amu + 3.7296x10-03 amu - 2.015447 amu + 1.944176x10-03 amu - 2.014102 amu)] x (931.5 Mev/amu) = Q = 4.03 Mev

Known Equation:

4. [(1 Hydrogen 1) + (1 Hydrogen) -> (2 Hydrogen 1) +(electron)= [(1.007825 amu + 1.007825 amu - 2 electrons - 2.014102 amu)] x (931.5 Mev/amu) = Q = .42 Mev

My Equation:

Host Element = (2 Hydrogen 1) [(2 Hydrogen 1) - 1877.389 Mev + 1.811 Mev] = [(2.014102 amu - 2.015447128 amu + 1.9441763x10-03 amu)] = 5.990302x10-04 amu

The element whose mass is closest to the new unstable "element" is (1 Hydrogen 1)

(1.007825 amu - 5.990302x10-03 amu) = 1.007226 amu excess mass convert to neutrinos

(1.007226 amu x 931.5 Mev/amu) / (.42 Mev/neutrinos) = 2233.884 neutrinos

Now the fusion of 1 Hydrogen 1 atoms

[(1 Hydrogen 1) + (1 Hydrogen 1) + 2234 neutrinos - 2 electrons - 1877.389 Mev + 1.811 Mev - (1 Hydrogen)] x 931.5 Mev/amu = [(1.007825 amu + 1.007825 amu + 1.007226 amu - .001097 amu -2.015447128 amu + 1.9441763x10-03 amu - 1.007825 amu)] x 931.5 Mev/amu = Q = .42 Mev