Is Mass Dependent on Temperature According to Mass-Energy Equivalence?

In summary, the conversation revolves around the question of whether mass is temperature-dependent or not. While the original poster believes that kinetic energy can alter the apparent mass of a system, others argue that the rest mass remains constant and only the total rest mass of the system increases. This is due to the relationship between energy, momentum, and rest mass, which shows that the total rest mass of a system is always greater than or equal to the sum of the rest masses of its individual components. Ultimately, the conversation raises further questions about the definition of atomic mass units and their potential dependence on temperature.
  • #1
Caledon
7
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I'm a high school chem and physics teacher, participating in a recreational online chem course hosted by MIT.

One of the practice questions in this course asked how many atoms a certain mass would contain at 300K. This got me thinking about mass-energy equivalence, and whether the atomic mass units listed on the periodic table are defined according to a specific temperature, analogous to the way other values are defined at STP. This would mean that the number of atoms in a sample of mass X would vary inversely with the temperature of X.

My research led me to these conclusions: (and I know this is an incomplete understanding)...temperature is kinetic energy. Kinetic energy can alter the apparent mass of a system because gravity couples to momentum and energy, not just mass. Thus the mass may appear to change, but this is simply the aggregate effect of the (unchanged) mass and the kinetic energy. I found several sources that support this view, or at the very least, the statement that non-relativistic changes in temperature/kinetic energy will alter mass, although the values may be too small for us to measure with existing tools.

However, the response from the class's forum, including an MIT student administrating the forum, is that "mass is NOT temperature dependent" and will in no way affect it. I'm not sure if I'm completely misinterpreting mass-energy equivalence, but this doesn't make sense to me.
 
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  • #2
Energy certainly is temperature dependent but rest mass is not temperature dependent. Don't confuse rest mass with the energy of a particle as the two are only equal in the rest frame of the particle.
 
  • #3
Caledon said:
whether the atomic mass units listed on the periodic table are defined according to a specific temperature

To follow up what WannabeNewton said, atomic mass units are units of rest mass, so they are independent of temperature. However, there is another wrinkle that's worth mentioning. You say:

Caledon said:
Kinetic energy can alter the apparent mass of a system because gravity couples to momentum and energy, not just mass.

More precisely, the internal motions of the parts of a system can increase the *rest* mass of the system. For example, consider a solid object made up of lots of atoms in a crystal lattice. These atoms are not completely stationary; they are constantly undergoing small oscillations around their equilibrium positions in the lattice. If we increase the temperature of the object, the kinetic energy in these oscillations increases, and this shows up as a (very small) increase in the total rest mass of the object. This is probably what was being referred to by the sources you mentioned that seemed to support the view that changes in kinetic energy will change mass.

Note that this change in the rest mass of the solid object does *not* change the number of atoms in the object, nor does it change the rest masses of the individual atoms. It only changes the kinetic energy of the atom's oscillations about their equilibrium positions in the crystal lattice. But those oscillations do not produce any net motion of the object as a whole, so their kinetic energy contributes to the object's rest mass.
 
  • #4
PeterDonis said:
Note that this change in the rest mass of the solid object does *not* change the number of atoms in the object, nor does it change the rest masses of the individual atoms. It only changes the kinetic energy of the atom's oscillations about their equilibrium positions in the crystal lattice. But those oscillations do not produce any net motion of the object as a whole, so their kinetic energy contributes to the object's rest mass.

Thank you, it sounds like we share the same understanding; the atoms retain a fixed individual rest mass, while the rest mass of the solid object increases with energy. And, yes, this does not change the number of atoms in the object, but (and this was the crux of my original inquiry) it would change the number of atoms necessary to produce a solid object with mass X. Or at least, I'm hoping that's a sensible conclusion. It seems that others are arguing that the very small change in rest mass is, in fact, nonexistant.
 
  • #5
Caledon said:
I'm a high school chem and physics teacher, participating in a recreational online chem course hosted by MIT.

One of the practice questions in this course asked how many atoms a certain mass would contain at 300K. This got me thinking about mass-energy equivalence, and whether the atomic mass units listed on the periodic table are defined according to a specific temperature, analogous to the way other values are defined at STP. This would mean that the number of atoms in a sample of mass X would vary inversely with the temperature of X.

My research led me to these conclusions: (and I know this is an incomplete understanding)...temperature is kinetic energy. Kinetic energy can alter the apparent mass of a system because gravity couples to momentum and energy, not just mass. Thus the mass may appear to change, but this is simply the aggregate effect of the (unchanged) mass and the kinetic energy. I found several sources that support this view, or at the very least, the statement that non-relativistic changes in temperature/kinetic energy will alter mass, although the values may be too small for us to measure with existing tools.

However, the response from the class's forum, including an MIT student administrating the forum, is that "mass is NOT temperature dependent" and will in no way affect it. I'm not sure if I'm completely misinterpreting mass-energy equivalence, but this doesn't make sense to me.

The total energy of a system of particles is:

[tex]E=c^2\Sigma {\gamma_i m_i}[/tex]

The total momentum of a system of particles is:

[tex]\vec{p}=\Sigma{\gamma_i m_i \vec{v_i}}[/tex]

The total rest mass [itex]M[/itex] of a system of particles satisfies the relationship:

[tex]E^2-(\vec{p}c)^2=M^2c^4[/tex]

We can always find [itex]\vec{V}[/itex] such that:

[tex]E=\gamma(V) M c^2[/tex]
[tex]\vec{p}=\gamma(V) M \vec{V}[/tex]

Obviously, from the above:

[tex]\gamma(V)M=\Sigma {\gamma_i m_i}[/tex]

[tex]\vec{V}=\frac{\Sigma {\gamma_i m_i \vec{v_i}}}{\Sigma {\gamma_i m_i }}[/tex]

and

[tex]M=\frac{\Sigma{\gamma_i m_i}}{\gamma(V)}[/tex]

What Peter Donis has been telling you is that we can prove that:

[tex]M \ge \Sigma{m_i}[/tex]

You can try to prove the above for the case [itex]i=2[/itex], it is pretty easy.
 
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  • #6
Caledon said:
Thank you, it sounds like we share the same understanding; the atoms retain a fixed individual rest mass, while the rest mass of the solid object increases with energy. And, yes, this does not change the number of atoms in the object, but (and this was the crux of my original inquiry) it would change the number of atoms necessary to produce a solid object with mass X. Or at least, I'm hoping that's a sensible conclusion.
This interpretation is not quite sensible.
It seems that others are arguing that the very small change in rest mass is, in fact, nonexistant.
Or rather, negligible.

To put the matter into perspective, consider the energy equivalence of 300K with respect to electron binding energies and nuclear rest mass.

1 eV is equivalent to a temperature of ~11604.52 K. (from NIST)
http://physics.nist.gov/cuu/Constants/energy.html

300 K is equivalent to 300 K/(11604.52 K/eV) = 0.02585 eV.

Compare that to an electron binding energy, which is on the order to eVs. For example, the ionization energy of the electron in a hydrogen atom is ~13.6 eV.

The rest energy of an electron is ~ 511 keV.

The rest energy equivalence of an atomic mass unit is 931.494 MeV, so the contribution of 300 K to an atomic mass unit would be 1 part in 36 billion (3.6 E10), so it would be negligible.

But associating kinetic energy of a mass with a change in it's rest mass is not correct.
 
  • #7
Astronuc said:
The rest energy equivalence of an atomic mass unit is 931.494 MeV, so the contribution of 300 K to an atomic mass unit would be 1 part in 36 billion (3.6 E10), so it would be negligible.
But since a typical sample contains ~1023 atoms, a change of one part in 36 billion means that ~1013 fewer atoms will be necessary. Not so negligible!
 
  • #8
Bill_K said:
But since a typical sample contains ~1023 atoms, a change of one part in 36 billion means that ~1013 fewer atoms will be necessary. Not so negligible!

Yes, it seems like some of the answers I've been reading elsewhere do not distinguish between "there is a negligible effect" and "there is NO effect". The class's original question referred to 13g of gold, so the result, according to these values, would have been trivial on the macroscopic scale but nontrivial on the atomic.

But associating kinetic energy of a mass with a change in it's rest mass is not correct.
Ok, this is where I assumed my understanding was breaking down. From my understanding of the equations that xox posted (thank you, xox), and what PeterDonis wrote, momentum and velocity are included in the consideration of total rest mass M, which is an aggregate of mass and energy and does not alter the original rest mass mi of the constituent particles. This appears to be the divergent point: is there something that forbids kinetic energy from contributing to M?
 
  • #9
Caledon said:
Ok, this is where I assumed my understanding was breaking down. From my understanding of the equations that xox posted (thank you, xox), and what PeterDonis wrote, momentum and velocity are included in the consideration of total rest mass M, which is an aggregate of mass and energy and does not alter the original rest mass mi of the constituent particles. This appears to be the divergent point: is there something that forbids kinetic energy from contributing to M?

Your understanding is correct. The mass of a system of particles is NOT equal to the sum of the masses of the particles composing the system. It is always larger than that sum. By how much it is larger is a function of the energy of the particles. You can try to prove the above for the case [itex]i=2[/itex], it is pretty easy.
In general , I shy away from "literary" descriptions of physics and I ted to mathematical descriptions. "Literature" can be very imprecise, math, on the other hand, is very precise. (see my answer to your question).
 
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  • #10
xox said:
The mass of a system of particles is NOT equal to the sum of the masses of the particles composing the system. It is always larger than that sum.

If the particles are all at rest with respect to each other, that is, if there is an inertial reference frame in which all the particles are at rest; and the system does not have any binding energy; then the mass of the system does equal the sum of the masses of the particles.
 
  • #11
jtbell said:
If the particles are all at rest with respect to each other, that is, if there is an inertial reference frame in which all the particles are at rest, then the mass of the system does equal the sum of the masses of the particles.

Yes, this is the ONLY case when [itex]M=\Sigma{m_i}[/itex]. It is very improbable for such a frame to exist since it would require that all particles have the same velocity.
In ALL other cases [itex]M>\Sigma{m_i}[/itex].
 
  • #12
Astronuc said:
associating kinetic energy of a mass with a change in it's rest mass is not correct.

For a single object, no. But associating kinetic energy of *parts* of a system with the rest mass of the *system*, which is what I was describing, *is* correct; the rest mass of the system as a whole is *not* the sum of the rest masses of all the parts, if the parts are in relative motion (i.e., if the parts are moving in the center of mass frame of the system as a whole).
 
  • #13
xox said:
The total energy of a system of particles is:

[tex]E=c^2\Sigma {\gamma_i m_i}[/tex]

The total momentum of a system of particles is:

[tex]\vec{p}=\Sigma{\gamma_i m_i \vec{v_i}}[/tex]

The total rest mass [itex]M[/itex] of a system of particles satisfies the relationship:

[tex]E^2-(\vec{p}c)^2=M^2c^4[/tex]

We can always find [itex]\vec{V}[/itex] such that:

[tex]E=\gamma(V) M c^2[/tex]
[tex]\vec{p}=\gamma(V) M \vec{V}[/tex]

Obviously, from the above:

[tex]\vec{V}=\frac{\Sigma {\gamma_i m_i \vec{v_i}}}{\Sigma {\gamma_i m_i }}[/tex]

and

[tex]M=\frac{\Sigma{\gamma_i m_i}}{\gamma(V)}[/tex]

What Peter Donis has been telling you is that we can prove that:

[tex]M \ge \Sigma{m_i}[/tex]

You can try to prove the above for the case [itex]i=2[/itex], it is pretty easy.

In the improbable (but not totally impossible) case when all particle velocities are equal:


[tex]\vec{V}=\frac{\Sigma {\gamma_i m_i \vec{v_i}}}{\Sigma {\gamma_i m_i }}=\vec{v}[/tex]

resulting into:

[tex]M=\frac{\Sigma{\gamma_i m_i}}{\gamma(V)}=\Sigma{m_i}[/tex]
 
  • #14
After I wrote my last post I went out for a walk, during which I realized that I hadn't fully appreciated the impact of my comment about binding energy, because I was focusing on the ∑mi = M case.

Binding energy actually subtracts from the sum of the masses of the individual particles in a bound system! The most prominent example is an atomic nucleus, whose mass is less than the sum of the masses of the protons and neutrons that comprise it. In order to "rip" a nucleus apart completely into protons and neutrons, you have to supply at least enough energy to make up that difference in mass.
 
  • #15
jtbell said:
After I wrote my last post I went out for a walk, during which I realized that I hadn't fully appreciated the impact of my comment about binding energy, because I was focusing on the ∑mi = M case.

Binding energy actually subtracts from the sum of the masses of the individual particles in a bound system! The most prominent example is an atomic nucleus, whose mass is less than the sum of the masses of the protons and neutrons that comprise it. In order to "rip" a nucleus apart completely into protons and neutrons, you have to supply at least enough energy to make up that difference in mass.

While it is true that binding energy is the difference between the sum of the energies of the particles composing a nucleus and the total energy of the nucleus, the OP is about a system of atoms, binding energy operates only at the level of the nucleus. Besides, the part that you posted about all components having the same velocity indicated that you knew that the discussion was about a system of atoms, you added the part about the binding energy later.
 
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  • #16
xox said:
The OP is about a system of atoms, binding energy operates only at the level of the nucleus.

No, it doesn't. The electrons in the atom have a negative binding energy when bound to the nucleus, compared to free electrons. So the rest mass of the atom is smaller than the sum of the rest masses of the nucleus and the same number of free electrons. It's true that the difference is much smaller than the difference in the case of a nucleus (nuclear binding energies are in the millions of eV, whereas atomic binding energies are a few eV, or about a million times smaller); but it's still not zero.

Also, atoms in a bound object like a solid have negative binding energy relative to identical atoms that are free. So the rest mass of the solid object is smaller than the sum of the rest masses of its constituent atoms. These binding energies (i.e., chemical bond energies) are typically an eV or less, so somewhat smaller than atomic binding energies; but again, that's still not zero.
 
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  • #17
PeterDonis said:
No, it doesn't. The electrons in the atom have a negative binding energy when bound to the nucleus, compared to free electrons.

I stand corrected, nevertheless the point is that the OP is about the system of atoms, not about the energies inside the atoms.

So the rest mass of the atom is smaller than the sum of the rest masses of the nucleus and the same number of free electrons.

I would take exception from the above language, since a better way is to express the above in terms of energy, not "rest mass".
 
  • #18
xox said:
the point is that the OP is about the system of atoms

Binding energy applies there too; see the edit I just made to my post.
 
  • #19
xox said:
I would take exception from the above language, since a better way is to express the above in terms of energy, not "rest mass".

Rest mass *is* energy; which term is more appropriate is a matter of taste and convention, not physics. I would say that if we are making measurements of mass, such as weighing something on a balance, the term "mass" is more appropriate. Given that convention, the statement I made is correct as it stands; it can be confirmed directly by sufficiently accurate measurements of the respective rest masses, in the same way we normally measure mass (not the way we measure energy).
 
  • #20
PeterDonis said:
Rest mass *is* energy;

"rest mass" is rest energy ([itex]m_0c^2[/itex]). Energy is [itex]\gamma m_0 c^2[/itex]. The particles constituting an atom are never at rest.
 
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  • #21
xox said:
The particles constituting an atom are never at rest.

Yes, this is true, and it means that the rest mass of the atom includes the kinetic energy of the particles that constitute it, *in addition to* the binding energy between those particles. So, for example, in the simplest case of a hydrogen atom, we would have

$$
M_0 = m_p + m_e + k_p + k_e - U
$$

where ##M_0## is the rest mass of the atom, ##m_p## is the rest mass of a proton, ##m_e## is the rest mass of an electron, ##k_p## and ##k_e## are the kinetic energies of the proton and electron (in the center of mass frame of the atom), and ##U## is the binding energy. In general, ##k_p + k_e - U## will not be zero, so the rest mass of the atom won't be equal to the sum of the rest masses of its constituents.

(In fact, the usually quoted "binding energy" of the electron in the hydrogen atom, 13.6 eV, includes *both* of the above effects: the binding energy due to the Coulomb attraction between electron and proton, *and* the kinetic energy of the electron in its orbit about the proton--the proton is assumed to be a rest, which is not precisely true in the center of mass frame but is a good enough approximation for this case.)
 
  • #22
PeterDonis said:
Yes, this is true, and it means that the rest mass of the atom includes the kinetic energy of the particles that constitute it, *in addition to* the binding energy between those particles. So, for example, in the simplest case of a hydrogen atom, we would have

$$
M_0 = m_p + m_e + k_p + k_e - U
$$

where ##M_0## is the rest mass of the atom, ##m_p## is the rest mass of a proton, ##m_e## is the rest mass of an electron, ##k_p## and ##k_e## are the kinetic energies of the proton and electron (in the center of mass frame of the atom), and ##U## is the binding energy. In general, ##k_p + k_e - U## will not be zero, so the rest mass of the atom won't be equal to the sum of the rest masses of its constituents.

(In fact, the usually quoted "binding energy" of the electron in the hydrogen atom, 13.6 eV, includes *both* of the above effects: the binding energy due to the Coulomb attraction between electron and proton, *and* the kinetic energy of the electron in its orbit about the proton--the proton is assumed to be a rest, which is not precisely true in the center of mass frame but is a good enough approximation for this case.)

Thank you, this is interesting, how would you generalize the above formalism into answering the OP question? That is, what is the mathematical formalism that calculates the (rest) mass of a system of atoms? I would love to see something along the lines of the mathematical formalism that I posted. How would you work binding energy in the formulas?
 
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  • #23
xox said:
Thank you, this is interesting, how would you generalize the above formalism into answering the OP question?

It works the same for ##N## particles: just add up the ##N## rest masses and kinetic energies (in the center of mass frame of the system), and all of the applicable binding energies. In general there could be ##N \left( N - 1 \right) / 2## of the latter, since each pair of particles could have an interaction; but in many cases we can restrict attention to a much smaller number.
 
  • #24
Thank you both for your insights. Xox, I know exactly what you mean about linguistics being a relatively (haha) inferior means of describing these properties; it seems like conflicting definitions of mass and energy are the source of many of the contrary opinions I've been reading. Unfortunately I have to rely heavily on linguistics in my classroom because our district prefers to make math terrifying.

On this subject, let me extend another line of inquiry; this is what I meant in my original post by "mass defined at a particular temperature". If atoms are always in motion, i.e. they have some amount of kinetic energy, I assume that energy cannot be easily quantified, per Uncertainty, nor can it be removed, per thermodynamics. Thus there will always be some baseline rest mass M that is in fact the aggregate of particle mass m and baseline energies k and U, perhaps analogous to something like Planck's constant.

Is this the state at which an atom's atomic mass is calculated? Meaning, is it extrapolated as opposed to directly observed? Or are we just working with empirical measurements that include some ambient temperature, such as room temp, and the nuanced differences are too small for us to really care about in terms of anything except, say, the LHC? The SI definition of the mole says nothing about energy or temperature considerations.
 
  • #25
Caledon said:
Is this the state at which an atom's atomic mass is calculated? Meaning, is it extrapolated as opposed to directly observed? Or are we just working with empirical measurements that include some ambient temperature, such as room temp, and the nuanced differences are too small for us to really care about in terms of anything except, say, the LHC? The SI definition of the mole says nothing about energy or temperature considerations.
To determine a particle's rest mass, it is not necessary to bring it to rest. For example when they determined the rest mass of the Higgs boson, they did not bring it to rest. They measured its energy and its momentum, and calculated the rest mass from that. Generally the rest mass of an atom is determined using a mass spectrometer.
 
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  • #26
Bill_K said:
To determine a particle's rest mass, it is not necessary to bring it to rest.

Yes, precisely what I'm trying to work around. It would in fact be impossible to bring it to true rest i.e. a state of zero motion. However, with that established, there are a variety of rest masses that could be measured: say, one at 300K, or as a plasma in the mass spectrometer, or one extrapolated down to a conjectured baseline near 0K, where the variable component of kinetic energy is at a minimum. Mind that I know we're talking about very small mass differences, but if the atoms in the spectrometer are being ionized at different energies, this would produce a non-standardized definition of mass.

I'll read the link you provided and see if I can gain a better understanding, thank you.
 
  • #27
Caledon said:
If atoms are always in motion, i.e. they have some amount of kinetic energy

Don't confuse the kinetic energy of the *constituents* of the atom with the kinetic energy of the atom itself. The rest mass of the atom itself assumes that the atom has zero kinetic energy; note that I carefully specified that the kinetic energies of the constituents of the atom are in the center of mass frame of the atom, i.e., the frame in which the atom itself, as a whole system, is at rest.

The mass numbers of particular isotopes of elements (which is what I think you mean by "atomic mass"--the atomic weights for elements that appear in the periodic table are weighted averages of the mass numbers of the isotopes, according to how common each isotope is in nature) are given in the center of mass frame, as above. So they are "pure" rest mass, as it were; i.e., they don't include any kinetic energy of the atoms as a whole. (They do, as above, include the kinetic energies of the *constituents* of the atoms.)

Caledon said:
The SI definition of the mole says nothing about energy or temperature considerations.

That's because a mole is just an Avogadro's number of atoms (or molecules, or whatever you're working with); there's nothing else required to define it except that number. In order to assign a mass to a mole, you have to know what kind of atom (or molecule) you have a mole of--and then, if you want to be really precise, you also have to know what state the mole of atoms (or molecules) is in, i.e., is it a gas at a certain temperature and pressure, or a liquid, or a solid, etc. But those things don't enter into the definition of a mole.
 
  • #28
PeterDonis said:
Don't confuse the kinetic energy of the *constituents* of the atom with the kinetic energy of the atom itself.

I appreciate your help. I follow everything you're saying, and I'll try to be as precise in my language as I can. Yes, I was considering the kinetic energy of the constituents of the atom, but I do recognize that they are conflated into the atom's frame of reference, and at rest with zero kinetic energy in relation to this state. But what if we're talking about, say, a box of gas, where the atoms themselves are in motion as well? This is more of what I had in mind in terms of ascribing kinetic energy to the system. The temperature of the system will affect both the atoms and the atomic constituents.

Yes, by atomic mass I was actually referring to any particular isotope one happens to choose, not the averaged value on the table. So, as you said, they don't include any kinetic energy of the atoms as a whole. Ok. The way this energy-less value is obtained is one focus of my interest.

PeterDonis said:
That's because a mole is just an Avogadro's number of atoms (or molecules, or whatever you're working with); there's nothing else required to define it except that number.
Actually (and perhaps this is the source of another miscommunication) the SI defines it in relationship to carbon.
From http://www.bipm.org/utils/common/pdf/si_brochure_8_en.pdf
"The mole is the amount of substance of a system which contains as many elementary entities as there are atoms in 0.012 kilogram of carbon 12".
If an Avogadro's number of atoms is tied directly to a mass value, and (rest)masses can change, then the number of atoms necessary to achieve that mass value (which is an evaluation of rest mass) can also change. A mole will always be a mole (just a number) but the correlation between those numbers and mass will not be constant, correct?
 
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  • #29
Caledon said:
what if we're talking about, say, a box of gas, where the atoms themselves are in motion as well?

Then the rest mass of the gas will be the sum of the rest masses of all the atoms (which will include the kinetic energies and binding energies of the constituents of the atoms) plus the kinetic energies of all the atoms (in the center of mass frame of the gas as a whole) plus the binding energies due to inter-atomic forces like Van der Waals forces (which for a gas are much smaller than atomic or chemical binding energies, so they are often neglected in approximations like the derivation of the ideal gas law).

Caledon said:
The temperature of the system will affect both the atoms

Yes; the temperature of the gas *is* the average kinetic energy of its atoms in the center of mass frame of the gas.

Caledon said:
and the atomic constituents.

No; the atoms themselves are bound states of nuclei and electrons that are unaffected by the temperature of the gas (at least, as long as that temperature is less than the ionization energy of the atoms, so collisions between atoms don't ionize the atoms).

Caledon said:
The way this energy-less value is obtained is one focus of my interest.

As I understand it, mass numbers of isotopes are usually measured by a mass spectrometer, which puts the atoms through a magnetic field and measures how they respond to it. The response depends on the ratio of charge to rest mass of the atoms; since the charge can be measured independently, the rest mass (mass number) can be determined.

Caledon said:
"The mole is the amount of substance of a system which contains as many elementary entities as there are atoms in 0.012 kilogram of carbon 12".

Yes, this is the modern way of defining Avogadro's number. The "amount of substance" here just means "number of elementary entities". See below.

Caledon said:
If an Avogadro's number of atoms is tied directly to a mass value

It isn't. It's tied directly to a number of atoms (or more correctly "elementary entities", as above, which may be molecules, or in more exotic cases may be ions, or even electrons or protons or some other type of particle). The mass value associated with that number of atoms depends, as I said before, on what kind of atoms (or other elementary entities) they are. The only function the mass value "0.012 kilogram of carbon 12" has is to pin down a particular number of elementary entities.

Note that the definition as given by SI is not entirely precise; it should really read "0.012 kilogram of carbon 12 at rest", since the intent of the definition is that you take 0.012 kilogram and divide by the mass number of carbon 12 to get Avogadro's number. That calculation gives a constant, since 0.012 kilogram and the mass number of carbon 12 are both constants. That this is the intent of the definition can be seen by looking just above the passage you quoted: "Amount of substance is defined to be proportional to the number of specified elementary entities in a sample, the proportionality constant being a universal constant which is the same for all samples".

Caledon said:
the number of atoms necessary to achieve that mass value (which is an evaluation of rest mass) can also change.

No, this is not correct. A mole is always exactly the same number of elementary entities. See above.
 
  • #30
PeterDonis said:
Yes; the temperature of the gas *is* the average kinetic energy of its atoms in the center of mass frame of the gas.

The average kinetic energy is a measure of the temperature but not identical with temperature.

PeterDonis said:
No; the atoms themselves are bound states of nuclei and electrons that are unaffected by the temperature of the gas (at least, as long as that temperature is less than the ionization energy of the atoms, so collisions between atoms don't ionize the atoms).

There are a lot of energy levels below ionization and in thermal equilibrium the population of these levels depends on temperature according to the Boltzmann distribution. Therefore the atoms actually are affected by temperature.
 
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  • #31
DrStupid said:
The average kinetic energy is a measure of the temperature but not identical with temperature.

What's the difference, other than units? (Yes, the units are different, but that's not a matter of physics, it's a matter of convention. And the convention is not always the same: many physicists measure temperature in energy units.)

DrStupid said:
There are a lot of energy levels below ionization and in thermal equilibrium the population of these levels depends on temperature according to the Boltzmann distribution. Therefore the atoms actually are affected by temperature.

Hm, yes, good point; I was assuming that all the atoms would be in their ground states, but that's not in general going to be the case.
 
  • #32
PeterDonis said:
What's the difference, other than units?

In contrast to kinetic energy temperature is defined for thermodynamic systems in thermal equilibrium only and the extension of the thermodynamic temperature to non equilibrium states may lead to results that are completely different from the "kinetic temperature" (such as the negative temperature of a pumped laser).
 
  • #33
DrStupid said:
temperature is defined for thermodynamic systems in thermal equilibrium only

I think this is a bit narrow. My body is certainly not in thermodynamic equilibrium, but it has a temperature. (More precisely, it has a kinetic temperature; see below.)

DrStupid said:
the extension of the thermodynamic temperature to non equilibrium states may lead to results that are completely different from the "kinetic temperature" (such as the negative temperature of a pumped laser).

Yes, but this really means the word "temperature" can refer to at least two distinct concepts, "kinetic temperature" and "thermodynamic temperature" (which is defined as ##1 / \beta##, where ##\beta = dS / dE##, the rate of change of entropy with energy). To be precise, the one I was talking about was kinetic temperature, since that's the one that contributes to the rest mass of a system. The rest mass of a pumped laser *increases* because of the energy being pumped in, even though the photons inside it have a negative thermodynamic temperature.
 
  • #34
Alright. So a mole is just a number, and that number coincides with the atoms in 12g of C12 at rest, in the same way that the number 5 coincides with the fingers on my hand and doesn't change if I chop one off. The connection I'm having trouble making is, how can this be used to stoichiometrically calculate the atoms in a given sample that is not at rest, since we established that the rest mass M can change? I guess I'm attempting to make a connection between molar mass and rest mass, perhaps this is invalid.
 
  • #35
PeterDonis said:
It works the same for ##N## particles: just add up the ##N## rest masses and kinetic energies (in the center of mass frame of the system), and all of the applicable binding energies. In general there could be ##N \left( N - 1 \right) / 2## of the latter, since each pair of particles could have an interaction; but in many cases we can restrict attention to a much smaller number.

We know that rest mass isn't additive (nor is its equivalent, rest energy), so why would the above be correct?
 
<h2>1. Is there a relationship between mass and temperature according to mass-energy equivalence?</h2><p>Yes, according to mass-energy equivalence, there is a direct relationship between mass and temperature. This is because as an object's temperature increases, its molecules gain more kinetic energy, which contributes to the object's overall mass.</p><h2>2. Does this mean that an object's mass increases as its temperature increases?</h2><p>Yes, according to mass-energy equivalence, an object's mass will increase as its temperature increases. However, the change in mass is extremely small and only becomes significant at very high temperatures or for extremely massive objects.</p><h2>3. How does mass-energy equivalence relate to Einstein's famous equation, E=mc²?</h2><p>Mass-energy equivalence is the principle that energy and mass are interchangeable, and this is reflected in Einstein's equation, E=mc². This equation shows that a small amount of mass can be converted into a large amount of energy, and vice versa.</p><h2>4. Can mass-energy equivalence be observed in everyday life?</h2><p>Yes, mass-energy equivalence can be observed in everyday life. For example, in nuclear reactions, a small amount of mass is converted into a large amount of energy. This is also seen in the production of nuclear power and in nuclear weapons.</p><h2>5. Are there any other factors besides temperature that can affect an object's mass according to mass-energy equivalence?</h2><p>Yes, besides temperature, an object's mass can also be affected by its velocity. This is known as relativistic mass and is a result of the relationship between mass and energy described by mass-energy equivalence.</p>

1. Is there a relationship between mass and temperature according to mass-energy equivalence?

Yes, according to mass-energy equivalence, there is a direct relationship between mass and temperature. This is because as an object's temperature increases, its molecules gain more kinetic energy, which contributes to the object's overall mass.

2. Does this mean that an object's mass increases as its temperature increases?

Yes, according to mass-energy equivalence, an object's mass will increase as its temperature increases. However, the change in mass is extremely small and only becomes significant at very high temperatures or for extremely massive objects.

3. How does mass-energy equivalence relate to Einstein's famous equation, E=mc²?

Mass-energy equivalence is the principle that energy and mass are interchangeable, and this is reflected in Einstein's equation, E=mc². This equation shows that a small amount of mass can be converted into a large amount of energy, and vice versa.

4. Can mass-energy equivalence be observed in everyday life?

Yes, mass-energy equivalence can be observed in everyday life. For example, in nuclear reactions, a small amount of mass is converted into a large amount of energy. This is also seen in the production of nuclear power and in nuclear weapons.

5. Are there any other factors besides temperature that can affect an object's mass according to mass-energy equivalence?

Yes, besides temperature, an object's mass can also be affected by its velocity. This is known as relativistic mass and is a result of the relationship between mass and energy described by mass-energy equivalence.

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