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Energy of a Composite Object and the Potential
Energy Lost Upon its Formation
The measured mass of a composite nucleus is generally less the combined masses of the nucleons that make it up. This mass deficit is an enigma. Seemingly no one knows why it occurs. It occurs when nucleons are brought into close proximity. This the same situation involved in the loss of potential energy. The mass deficit is reversed when the nucleons are taken out of close proximity and gain potential energy. There thus may be a connection between the mass deficit of a nucleus and the loss in potential energy.
Binding energy is just the mass deficit expressed in energy units using the Einstein formula E=mc².
When a charged particle is injected into a magnetic field it executes a helicial trajectory. The radius R of the helix depends up the mass m, velocity v, and charge of the partcle q as well as field intensity B of the magnetic field.
This is the standard formula for computing mass. Thus with the observed radius and the velocity of the particle its mass maybe determined. A smaller radius corresponds to a smaller mass.
Now suppose there is a composite charged particle that is rotating and generating a magnetic field of intensity b. That generated magnetic field may enhance the effect of the outside magnetic field. Let us say the effective magnetic field is enhanced by some ratio of b. That is to say the field inducing the helix trajectory is
The radius of the helix is then
The computed mass m' using the standard formula is then
Thus the mass deficit Δm=m−m' is given approximately by
The magnetic field intensity generated by a rotating charge anywhere in space is proportional to the product of its charge q, the radius of its orbit ρ and the rate of rotation ω; i.e., qρω. This is dimensionally a chargeq times a velocity v, in effect a current Therefore .
where μ is a constant.
Now consider the relations that prevail in a Bohr model of an atom. This consists of two particles each with charge q. One particle is very heavy compared to the other one. The lighter particle of mass mq revolves around the heavier particle. The potential energy PE of the two particle system is given by
where k is the Coulomb constant.
The tangential velocity of the revolving charge is given by a balance of centrifugal force with the Coulombic (electrostatic) attraction
Therefore b is given by
But q can be expressed as
Similar relationships concwening potential energy and velocity previal for positronium but positronium does not generate a magnetic field since it has effectively a net current of zero.
Now the Bohr model is abandoned and the analysis reverts to
where m is the mass of the composite nucleus and equal to 2mq.
This leads to
where γ is equal to [B/((4λc²(mρ½)]. particular
Thus there is a one-to-one relationship between binding energy and the potential energy lost in the formation of a composite nucleus. In this analysis the mass deficit of a composite nucleus is apparent rather than real.
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