The equation that I ended with yesterday means that theoretically, if an object with mass that has a Kaluza-Klein light-cone-gauge topology were to travel at the speed of light, the mass that it would have would be infinite. Yet that would not happen. So, if an object with mass were to go from under the speed of light to over the speed of light, the given object would need to at least momentarily convert its light-cone-topology into a Yang-Mills topology right when the object of mass would be traveling at light speed. (You will learn more about this in future courses.) As the object were to go over the speed of light with the use of superstring theory that I will not discuss here, the object would increase in mass, yet in an imaginary scale. As the object goes way over the speed of light, it will have more and more imaginary mass, according to
m=(1/(1-(v^2/c^2)^.5)). The object, however, would never attain zero mass, since it would always be something with a Yau-Exact mass that is there. (You will learn more about this in future courses). So, objects that all move at different speeds, even though these all have the same mass at rest, have different masses, while these are moving at different velocities. So, every person who ever lived would more than likely have experienced different masses as a whole during their life, since we all undergo different motion.
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