The Failure Of Einstein's E=mc2

## 1 Open Letter To The World Physics Community

Force is proportional to the rate of change of momentum
On the other hand, the formula $E=m{c}^{2}$ is derived from Einstein's special theory of relativity together with a new relativistic definition of momentum p as: $p=\frac{mv}{\sqrt{1-{v}^{2}/{c}^{2}}}$, where $m$ = rest mass, $c$=constant speed of light. With a new definition of momentum, force in special relativity would be different from the classical mechanics definition of $F=ma$; it is now: $\begin{array}{cc}F=\frac{dp}{dt}=\frac{d}{dt}\left(\frac{mv}{\sqrt{1-{v}^{2}/{c}^{2}}}\right)& \left(1.1\right)\end{array}$As any physics students can see, equation (1.1) is different from the rather simple $F=ma$. $F=ma$ is the basis of the SI definition for the unit of force, the newton N. There is no way equation (1.1) may be used in any manner to define a unit of force. The truth is that special relativity has no real unit for force; the physics community assumes equation (1.1) too evaluates force also in the same units as with classical Newtonian mechanics - it does not. Only in classical Newtonian mechanics that the SI unit of force, the newton N, may be used. The relativistic force as defined in equation (1.1) evaluates to only a real number with no association with any real unit of force. As force does not have a real unit, so does work and energy in special relativity have no real units. Energy in special relativity is only fictitious. The formula $E=m{c}^{2}$ is derived directly from equation (1.1) and therefore energy in the formula, too, is fictitious (the only exception may be when a particle is at rest where $E=m{c}^{2}$ may apply).
All figures of energy in relativistic physics, including high energy particle physics, is based on the fundamental formula $E=m{c}^{2}$; when energy is fictitious, all of particle physics breaks down. The European Organization for Nuclear Research, CERN, that operates the Large Hadron Collider (LHC) has purportedly accelerated protons to levels of energy as high as 7 TeV (tera electron-volt, $1{0}^{12}$). As the energy was computed from the formula $E=m{c}^{2}$, the figure was just a fictitious value. The only kinetic energy formula that computes energy in real units is the simple classical formula: $KE=\frac{1}{2}m{v}^{2}$. With this formula, the proton's energy within the LHC would only be about 470 MeV ($1{0}^{6}$); the CERN's reported figure being overstated by a factor of 15,000.
All of high energy particle physics fails.