burt reynolds said:
so i just graduated high school taking only one physics class in 4 years. it was an academic level class and i only took it to fulfill a requirment, but I am glad i took it because it got me thinking. i don't plan to do anything with phusics in the fuutre, but i do have some questions that will probably seem elementary to most of you. here's the question: i know light travels 299,792,458 meters per second, but what if it could somehow travel slower to say 299,742,450 m/s? what would happen? would it still be light? has this ever been done? physics is hard.
To answer your question, no it wouldn't be light. Light can only travel at one speed, so if it travels at another speed it's not light. If light did, somehow, slow down (I think -- and if I'm wrong someone will correct me) then it wouldn't be capable of existing.
I'm going to take a stab at working through some equations to try to prove this, because if I make a mistake, maybe I can learn something from this too.
But I haven't had any formal training, so don't take this on blind faith.
The equation for the energy of a relativistic particle is E^2=m^2c^4+p^2c^2. A photon doesn't have a rest mass (
m = 0), so this reduces to E^2=p^2c^2
(Eq. 1).
The equation for relativistic momentum (
p) is p=\frac{mv}{\sqrt{1-\frac{v^2}{c^2}}}. Since
m is 0, the numerator (
mv) will be 0, which at first may make it look like
p will be 0, but if
v =
c, then the denominator will also be 0, and 0/0 is indeterminate, so as long as
v=
c, momentum doesn't have to be 0. If, however,
v <
c, then the denominator will become greater than 0, thus
the momentum of a particle with zero rest mass moving at a speed less than the speed of light is zero. If a particle has both zero rest mass and zero momentum, then based on
Eq. 1 it also has no energy. Something with no energy, no mass, and no momentum doesn't really seem to exist to me...
