Einsteins Mass to Energy Equation and the V wave - Page 3

Einstein based his equation upon the EXTERNAL FORCES acting on a body. I resolve his equations to mine acting with INTERNAL FORCES for a particle!

continued from page 2
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Reinterpreting the Standard Mathematics

Although the intention was not to imply the integral I is complex the squaring of this integral invites that comment by comparing equations (3) and (4).

The natural transition to a polar form in equation (4) is ideal for use with a particle that is spherical.

The value for the square root of pi in equation (14) suggests it can translate onto the complex plane if the sign of pi is ignored. This point can be compared with my interpretation of i^2 = -1 being a transformation from a circular to a square geometry. This means the work done for the error function would map exactly from 3D to 4D. In fact equation (14) gives the work done for a real V wave as equal to a complex value (ignoring 3D and 4D geometries).

To derive the V or W waves we can now use erfc (x) with limits between x and infinity. This can be used to describe the energy levels, say, as the energy peaks and reaches the particles surface and then subsides. To complete the V wave we then need to reverse the limits so the total energy curve is U shaped.
Note that we can use the erf (x) function to describe the mass levels at the same time.

continued on page 4 > CLICK HERE