MASS-ENERGY EQUATION FOR TOTAL ENERGY AT SLOW SPEEDS MUST INCLUDE ALL KINETIC AND POTENTIAL ENERGIES (original) (raw)

AND POTENTIAL ENERGIES. Stewart E Brekke, Northeastern Illinois University former graduate student Einstein originally proposed in his Special Theory of Relativity that the total energy of a mass at slow speeds is E=m0c 2 + 1/2mv 2. However, a mass may also be rotating and vibrating. Therefore, all the other kinetic energy factors and also the potential energy factors must be added to the mass energy Equation to account for total energy of the mass. Therefore, the proper mass-energy equation for the Total energy of the mass at slow speeds must be E= M0c 2 + 1/2M0v 2 + 1/2Iω 2 + 1/2kx 2 +GM0M2/r + kQ1Q2/r+ Um1 m2 /r, where 1/2Iω 2 is the rotational kinetic energy, 1/2kx 2 is the vibrational kinetic energy, Gm1m2/r is the gravitational potential energy , kQ1Q2/r is the electrostatic potential energy and Um1m2/r is the magnetic potential energy. There may be other potential energies. Therefore, The slow speed relativistic kinetic energy Einstein stated as T= (E-E0) = 1/2mv 2 must instead be T = 1/2mv 2 + 1/2Iω 2 + 1/2kx 2 + GM0M2/r + kQ1Q2/r + Um1 m2/r.

Sign up for access to the world's latest research.

checkGet notified about relevant papers

checkSave papers to use in your research

checkJoin the discussion with peers

checkTrack your impact