Yes, but do remember that ##E=mc^2## is the ##p=0## special case of the more general relationship ##E^2=(m_0c^2)^2+(pc)^2## where ##p## is the momentum and ##m_0## is the rest mass. It doesn’t apply when ##p## is non-zero.TrillAeon said:TL;DR Summary: E = mc^2
means
m = E/c^2
Why people always underline that the general equation is different from the classical E=mc2?Nugatory said:Yes, but do remember that ##E=mc^2## is the ##p=0## special case of the more general relationship ##E^2=(m_0c^2)^2+(pc)^2## where ##p## is the momentum and ##m_0## is the rest mass. It doesn’t apply when ##p## is non-zero.
sha1000 said:Its not like E=mc2 is a special (or simplified) case of the general equation
In the two equations, the ##m## term means two different things.sha1000 said:Why people always underline that the general equation is different from the classical E=mc2?
These are the exact some equations, we just simply put terms in different way.
It absolutely is exactly a special case of the general equation. ##E=mc^2## is the special case of ##m^2 c^2 = E^2/c^2-p^2## where ##p=0##.sha1000 said:Why people always underline that the general equation is different from the classical E=mc2?
These are the exact some equations, we just simply put terms in different way.
Its not like E=mc2 is a special (or simplified) case of the general equation.
Because the universe doesn't behave according to the "obvious conclusion". It behaves according to the general equation in general.sha1000 said:Shouldn't we take it as it is and conclude that if something has energy then the rest mass must be non-zero? Why we try to play with it just to move ourselves away from the obvious conclusion?
It is even more elegant if you spend a couple of seconds to write it with LaTeX.sha1000 said:E=mc2 is one of the most elegant equations.
Let's imagine that we are in the begging of the theory of relativity. After some derivations the first equation we have obtained is :jbriggs444 said:In the two equations, the ##m## term means two different things.
If you take ##E=mc^2## as a general statement that applies whether or not the object is at rest then the ##m## must be "relativistic mass". Relativistic mass is a quantity that varies with velocity relative to your chosen reference frame.
By contrast in the general equation, ##E^2 = (m_0c^2)^2 + (pc)^2##, ##m_0## is the invariant mass. Invariant mass is a quantity that does not change with velocity. More precisely, it is a quantity that is the same, no matter what reference frame you select.
No, because that isn't true. You could conclude that the relativistic mass is non-zero. This is trivially true since relativistic mass is just energy divided by ##c^2##. But rest mass may be zero in things with positive energy - notably, light.sha1000 said:Shouldn't we take it as it is and conclude that if something has energy then the rest mass must be non-zero?
Seriously, use LaTeX.sha1000 said:E^2= (m_0c^2)^2 + (pc)^2
...
E = mc^2
No, because ##E=pc## for something traveling at light speed, so your conclusion would obviously contradict your starting point.sha1000 said:Wouldn't it be more reasonable to play with this equation and get E = mc^2 (with m= relativistic mass), and conclude that the rest-mass of the photon must be non-zero to satisfy this equation?
Sorry for that.Ibix said:Indeed - @sha1000, you literally only need to put a pair of # characters before each equation and after each one. You're already using the syntax.
You can assume that. Relativity still says that ##E=mc^2## is a special case of ##E^2=m^2c^4+p^2c^2## and things traveling at ##c## are massless - it's just that light is no longer such a thing, by assumption.sha1000 said:If I'm not mistaken we can assume that there is some limit speed in the universe (not necessarily the speed of light).
The general equation is every bit as classical as its ##E=mc^2## special case, is it not? Both are relativistic, neither is quantum mechanical.sha1000 said:Why people always underline that the general equation is different from the classical E=mc2?
When I try that I don’t conclude that the photon has non-zero rest mass, I conclude that I’m dividing by zero and therefore have messed something up and cannot take any results after that seriously.sha1000 said:And now we are wondering if the rest mass of the photon is zero or non-zero. Wouldn't it be more reasonable to play with this equation and get E = mc^2 (with m= m0/sqrt(1 -v/c^2) relativistic mass), and conclude that the rest-mass of the photon must be non-zero to satisfy this equation?
You are right that relativity implies an invariant speed, not necessarily the speed of light. However you are mistaken when you suggest that we are “assuming” that photons travel at the invariant speed. It’s the Lorentz invariance of Maxwell’s equations that tells us that that light (not photons! We don’t know about them yet) travels at the invariant speed. Photons moving at the speed of light (to the extent that photon speed is even a meaningful concept) appear after we develop quantum mechanics and then a relativistic quantum mechanical treatment of electromagnetism.sha1000 said:But do we really need to assume that photons travel with "speed of light" to derive the our equations? If I'm not mistaken we can assume that there is some limit speed in the universe (not necessarily the speed of light).
Obviously not since photons have energy but have zero rest mass. More precisely, the upper bound on their rest mass from various observational tests is so tiny that, in the context of this thread, and indeed for all practical purposes, it can be taken as zero. It certainly is much, much smaller than the photon's energy divided by ##c^2##.sha1000 said:Shouldn't we take it as it is and conclude that if something has energy then the rest mass must be non-zero?
As I mentioned before we don't need to assume that photons travel at the speed of "light" to derive ##E=mc^2##. For that we only need to assume that there is some critical speed in the universe (c = critical speed).Nugatory said:The general equation is every bit as classical as its ##E=mc^2## special case, is it not? Both are relativistic, neither is quantum mechanical.
When I try that I don’t conclude that the photon has non-zero rest mass, I conclude that I’m dividing by zero and therefore have messed something up and cannot take any results after that seriously.
Yes, but then, as @Nugatory pointed out, we know from the Lorentz invariance of Maxwell's Equations that light travels at whatever the critical speed is. So while we don't assume that photons travel at that speed, we do deduce that they do, so we end up at the same place.sha1000 said:we don't need to assume that photons travel at the speed of "light" to derive ##E=mc^2##. For that we only need to assume that there is some critical speed in the universe (c = critical speed).
Yes, they do. See above.sha1000 said:the speed of the photons don't has to be equal to c.
I'm really not against the idea of using ##E^2=(m_0c^2)+(pc)^2## .Nugatory said:Long before then we are using ##E^2=(m_0c^2)+(pc)^2## instead of ##E=m_0/\sqrt{1-v^2/c^2}## because in most physically reasonable relativistic problems we can measure ##p## but not ##v##. That’s a much stronger motivation than the need to explain to confused laypeople that they’ve misapplied ##E=mc^2##.
No, it isn't, because the latter expression is only valid for objects with ##m_0 > 0##. Whereas the former expression is valid for all objects.sha1000 said:I'm really not against the idea of using ##E^2=(m_0c^2)+(pc)^2## .
I just can't understand why this expression is considered as general one? It is exactly the same as ##E=m_0/\sqrt{1-v^2/c^2}## .
No, we didn't. The expression with ##p## there comes first. Then, for the case ##m_0 > 0##, you derive the expression for ##E## with the square root in it. You can't do it the other way around.sha1000 said:We just played with the terms in order to get ##p## there, for practical purposes.
You've already gone off the rails here, because we can't derive this expression without first deriving the more general expression involving ##p##. See above.sha1000 said:My question is simple. Imagine that we just have derived ##E=m_0/\sqrt{1-v^2/c^2}##.
For deriving the general equation with ##p## in it, yes. Then, to get the equation with the square root in it, we added the assumption ##m_0 > 0##.sha1000 said:For that we made an assumption about the existence of critical speed ##c## in the universe (nothing about the speed of the photons).
No, the logical process is to first look at the equations that tell us the dynamics of light, namely, Maxwell's Equations. And, as has already been stated several times, we find that those equations tell us that light moves at whatever the invariant speed is.sha1000 said:And now we are wondering if the mass of the photons is zero or non-zero. The logical process would be to play with this expression and get the ##E=m_0/\sqrt{1-v^2/c^2}## form.
Wrong. You have it backwards: we have to assume ##m_0 > 0## in order to derive the equation with the square root in it. See above.sha1000 said:From here we can conclude that any particle with some energy must have non-zero rest-mass
PeterDonis said:Yes, but then, as @Nugatory pointed out, we know from the Lorentz invariance of Maxwell's Equations that light travels at whatever the critical speed is. So while we don't assume that photons travel at that speed, we do deduce that they do, so we end up at the same place.Yes, they do. See above.
Yes.sha1000 said:Does Lorentz invariance of Maxwell equations tell us that speed of photons must be exactly Equal to ##c## (critical speed)?
No.sha1000 said:Or it can be "very" close to it in order to get things to work?
No.sha1000 said:Once we have the assumption about the invariant critical speed. All other velocities become invariant right?
Assuming you always use the same gun with the same properties, yes. But the bolded qualifier that I have put in the quote above means the speed of the bullets is not invariant--it will be different in different frames. Whereas the critical speed is invariant--it's the same in all frames.sha1000 said:The speed of the bullets that I fire will always be the same in my reference frame etc.
Sorry. My mistake.PeterDonis said:No, it isn't, because the latter expression is only valid for objects with ##m_0 > 0##. Whereas the former expression is valid for all objects.No, we didn't. The expression with ##p## there comes first. Then, for the case ##m_0 > 0##, you derive the expression for ##E## with the square root in it. You can't do it the other way around.You've already gone off the rails here, because we can't derive this expression without first deriving the more general expression involving ##p##. See above.For deriving the general equation with ##p## in it, yes. Then, to get the equation with the square root in it, we added the assumption ##m_0 > 0##.No, the logical process is to first look at the equations that tell us the dynamics of light, namely, Maxwell's Equations. And, as has already been stated several times, we find that those equations tell us that light moves at whatever the invariant speed is.Wrong. You have it backwards: we have to assume ##m_0 > 0## in order to derive the equation with the square root in it. See above.
Ok.sha1000 said:I intended to say that first we derive ##E^2=(m_0c^2)+(pc)^2##
Wrong. We need to assume ##m_0 > 0##. Otherwise you get a mathematically invalid equation during your attempted derivation.sha1000 said:From this point we just play with some terms and we can get the ##E=m_0/\sqrt{1-v^2/c^2}##. We don't need to make any assumptions about ##m_0## to do that, right?
Ok I see. Thank you for your explanations.PeterDonis said:Yes.No.No.Assuming you always use the same gun with the same properties, yes. But the bolded qualifier that I have put in the quote above means the speed of the bullets is not invariant--it will be different in different frames. Whereas the critical speed is invariant--it's the same in all frames.
Yes. The experiments which have established that astoundingly small upper bound on the possible mass of the photon are looking for violations of Lorentz invariance, and finding none to within the limits of experimental accuracy.sha1000 said:Does Lorentz invariance of Maxwell equations tell us that speed of photons must be exactly Equal to c (critical speed)?
But the correct equation is ##E_o=mc^2##.sha1000 said:E=mc2 is one of the most elegant equations.
Shouldn't we take it as it is and conclude that if something has energy then the rest mass must be non-zero?
Well, clearly that equation assumes that ##v\ne c##. So that is an assumption even if it is not an assumption about ##m##. The consequence of the equation is that no massive particle can travel at ##v=c##. But since we did assume ##v\ne c## in the derivation we cannot use this equation to rule out massless particles at ##v =c##.sha1000 said:We don't need to make any assumptions about m0 to do that, right? So the non-zero m0 is not an assumption but the consequence of this equation.
One should also once more state that the use of "relativistic mass" is out of fashion since 1907. It was introduced by Einstein at a time (1905), before the correct relativistic version of point-particle mechanics has been understood (Planck 1906). Einstein also clearly stated that it's preferrable not to use the notion of any relativistic mass to avoid misunderstandings and misconceptions. For the history, seejbriggs444 said:In the two equations, the ##m## term means two different things.
If you take ##E=mc^2## as a general statement that applies whether or not the object is at rest then the ##m## must be "relativistic mass". Relativistic mass is a quantity that varies with velocity relative to your chosen reference frame.
By contrast in the general equation, ##E^2 = (m_0c^2)^2 + (pc)^2##, ##m_0## is the invariant mass. Invariant mass is a quantity that does not change with velocity. More precisely, it is a quantity that is the same, no matter what reference frame you select.
Indeed. Which is why I chose to link https://www.physicsforums.com/insights/what-is-relativistic-mass-and-why-it-is-not-used-much/ when I used the phrase.vanhees71 said:One should also once more state that the use of "relativistic mass" is out of fashion since 1907.
Oh, that is a very specific date. What happened in 1907?vanhees71 said:"relativistic mass" is out of fashion since 1907.
https://en.wikipedia.org/wiki/1907Dale said:Oh, that is a very specific date. What happened in 1907?
Einstein learnt about the consistent description of classical point-particle mechanics within SRT from Planck.Dale said:Oh, that is a very specific date. What happened in 1907?
It may be unralated, but at that time he was asked to write a review article about relativity. Then he decided that gravity needs to be treated relativistically and it is a problem that can be worked on. May be he also realized that relativistic mass is more confusing than usefull.Dale said:Oh, that is a very specific date. What happened in 1907?
vanhees71 said:One should also once more state that the use of "relativistic mass" is out of fashion since 1907.
vanhees71 said:Einstein learnt about the consistent description of classical point-particle mechanics within SRT from Planck.
Source:Wikipedia said:Planck (1906a) defined the relativistic momentum and gave the correct values for the longitudinal and transverse mass by correcting a slight mistake of the expression given by Einstein in 1905. Planck's expressions were in principle equivalent to those used by Lorentz in 1899.[80] Based on the work of Planck, the concept of relativistic mass was developed by Gilbert Newton Lewis and Richard C. Tolman (1908, 1909) by defining mass as the ratio of momentum to velocity. So the older definition of longitudinal and transverse mass, in which mass was defined as the ratio of force to acceleration, became superfluous. Finally, Tolman (1912) interpreted relativistic mass simply as the mass of the body.[81] However, many modern textbooks on relativity do not use the concept of relativistic mass anymore, and mass in special relativity is considered as an invariant quantity.