Difference between revisions of "Accepted Relativistic Addition of Velocities and Energies are Only Two-Variable Versions of a New Infinite Variables Formula"
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The well-known simple formula for adding velocities relativistically is only a 2-variable version of a far more powerful formula which enables an infinite number of relative velocities, energies or any Planck-limited variables to be totalled. That formula is based on the product of those variables, treated as fields, rather than their addition. The interpretation of the formula is of the comparison of the stretching of the fields in opposite directions versus the total stretching involved. | The well-known simple formula for adding velocities relativistically is only a 2-variable version of a far more powerful formula which enables an infinite number of relative velocities, energies or any Planck-limited variables to be totalled. That formula is based on the product of those variables, treated as fields, rather than their addition. The interpretation of the formula is of the comparison of the stretching of the fields in opposite directions versus the total stretching involved. | ||
| − | [[Category:Scientific Paper]] | + | [[Category:Scientific Paper|]] |
[[Category:Relativity]] | [[Category:Relativity]] | ||
Latest revision as of 09:53, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Accepted Relativistic Addition of Velocities and Energies are Only Two-Variable Versions of a New Infinite Variables Formula |
| Read in full | Link to paper |
| Author(s) | Michael Jefferson Lawrence |
| Keywords | Relativity; Velocities; Energies; Addition; Product; |
| Published | 2013 |
| Journal | None |
| No. of pages | 4 |
Read the full paper here
Abstract
The well-known simple formula for adding velocities relativistically is only a 2-variable version of a far more powerful formula which enables an infinite number of relative velocities, energies or any Planck-limited variables to be totalled. That formula is based on the product of those variables, treated as fields, rather than their addition. The interpretation of the formula is of the comparison of the stretching of the fields in opposite directions versus the total stretching involved.
[[Category:Scientific Paper|]]
