- #106
Aer
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- 0
Can we at least agree to disagree for now?
I'm not sure what you mean by "a part of it". The potential energy of the bound and unbound state (which the binding energy is based on) must be taken into account when calculating the total energy of each state, but then the kinetic energy of each particle must be taken into account as well. The inertial mass of a compound object is proportional to the sum of potential, kinetic and rest mass energies of all its parts.Aer said:Is the binding energy apart of the deutron or not?
No they don't! The rest mass of a proton in a deuteron nucleus is the same as the rest mass of a free proton, the rest mass of a given type of particle never changes, it's a constant of nature.Aer said:All this says is that the proton and neutron lose rest mass when they are bound together.
Not by any physicists, no.Aer said:This rest mass is referred to as the potential energy since all mass is essentially a form of energy.
So electromagnetic potential energy (responsible for chemical binding between atoms) and strong-force potential energy (responsible for nuclear binding between protons and neutrons) can contribute to inertial mass, but somehow gravitational potential energy can't? And again, there is no existing theory of physics that explains changing potential energy between particles in terms of the particle's rest mass changing when the distance between them changes, you're just making stuff up off the top of your head now.Aer said:But this doesn't imply that kinetic energy or gravitational potential energy will become the potential energy that is considered mass.
OK, goodnight...Aer said:I guess at least I'll have to agree to disagree - going to bed, goodnight!
JesseM said:No they don't! The rest mass of a proton in a deuteron nucleus is the same as the rest mass of a free proton, the rest mass of a given type of particle never changes, it's a constant of nature. Not by any physicists, no. So electromagnetic potential energy (responsible for chemical binding between atoms) and strong-force potential energy (responsible for nuclear binding between protons and neutrons) can contribute to inertial mass, but somehow gravitational potential energy can't? And again, there is no existing theory of physics that explains changing potential energy between particles in terms of the particle's rest mass changing when the distance between them changes, you're just making stuff up off the top of your head now.
The mass of an atom is not the sum of the
masses of its individual parts. The mass of an atom is in fact less than
the mass of its parts.
The mass of an atom is the sum of the masses of its parts, minus (binding
energy)/c^2. Each proton and each neutron still have their original masses.
The loss of energy to the outside world results in a decrease of atomic
mass. At the level of particles and atoms, mass is NOT conserved. After an
event, you may end up with more or less mass than you started with. Total
energy, including E=mc^2, is conserved. Mass behaves like just another location
of energy. A negative potential energy can make the total energy less than
the sum of the other energies. At the atomic level, a negative potential
energy can make the total mass less than the sum of the individual masses.
Dr. Ken Mellendorf
Physics Professor
Illinois Central College
You're making stuff up when you say changes in potential energy are "really" changes in the rest masses of the particles (except in the case of gravitational potential, for some reason). There is no theory of physics that says this.Aer said:I'm making things up? I don't think so, the least I've done is inquire.
What does "the energy form of mass" mean? Do you mean inertial mass?Aer said:You are the one making things up saying that kinetic and gravitational potential energy can be considered the same as the energy form of mass
That sentence is ambiguous--when he says that total energy including E=mc^2 is conserved that could mean that "total energy" includes other things beyond E=mc^2 for each part--for example, the potential energy. Or, the "m" there may refer to the rest mass of the whole system, and as I've been saying, the rest mass of a composite system is defined to be equal to the total energy (which includes potential energy) divided by c^2. He also says that "the mass of an atom is in fact less than the mass of its parts", because you have to include the potential energy to get the total mass, and as he says, the potential energy is negative in the bound state (when compared to the unbound state). This is exactly what I've been saying! And it contradicts your claim that the mass of the atom is still equal to the sum of the mass of its parts, but that the mass of the proton and neutron have somehow decreased.Aer said:consider this answer from Dr. Ken Mellendorf"He uses total energy as the rest energy equation, E=mc^2.The mass of an atom is not the sum of the
masses of its individual parts. The mass of an atom is in fact less than
the mass of its parts.
The mass of an atom is the sum of the masses of its parts, minus (binding
energy)/c^2. Each proton and each neutron still have their original masses.
The loss of energy to the outside world results in a decrease of atomic
mass. At the level of particles and atoms, mass is NOT conserved. After an
event, you may end up with more or less mass than you started with. Total
energy, including E=mc^2, is conserved. Mass behaves like just another location
of energy. A negative potential energy can make the total energy less than
the sum of the other energies. At the atomic level, a negative potential
energy can make the total mass less than the sum of the individual masses.
Dr. Ken Mellendorf
Physics Professor
Illinois Central College
That is not my claim when dealing with masses at the quantum level! If I said anything similar to that, it was because you were confusing the issue of whether we are talking about the quantum level or macroscopic level.JesseM said:He also says that "the mass of an atom is in fact less than the mass of its parts", because you have to include the potential energy to get the total mass, and as he says, the potential energy is negative in the bound state (when compared to the unbound state). This is exactly what I've been saying! And it contradicts your claim that the mass of the atom is still equal to the sum of the mass of its parts, but that the mass of the proton and neutron have somehow decreased.
Aer said:Just to be clear - this example is on the quantum level, in which energy and mass -do- lose distinction. Taking this to the next level - that is, putting macroscropic objects in a box with relative velocity to the box and claiming the kinetic energy -adds- to the mass at the macroscopic level, just like a negative energy -subtracts- from the mass at the microscoptic level is not sufficient.
learningphysics said:Note: "(6) The rest-energy changes, therefore, in an inelastic collision (additively) like the
mass. "
By mass, Einstein's referring to rest-mass.
His example uses a simple inelastic collision of two bodies. The lost kinetic energy goes into the rest energy of the two bodies and therefore their rest masses... he says nothing about the form of the energy... it could be heat or it could be nuclear binding energy... whatever. The case is general for any inelastic collision.
I would love to see you try to make two baseballs collide to become "one" - what you are referring to only happens on the quantum level, not the macroscopic level. All the kinetic energy will be given off as energy in another form in actuality.learningphysics said:That's what the theory predicts. If two identical macroscopic baseballs collided in a symmetric inelastic collision losing some of their kinetic energy to heat, then each baseball would increase its rest energy, and therefore change its "rest mass". The increased "rest mass" is due to heat (which is the kinetic energy of the constituent particles that form the baseball).
You might want to verify it as it is in direct contradiction to the quote by Albert I gave.learningphysics said:I cannot verify the accuracy of the quote as I don't have this book.
Ich said:I don´t want to interfere, but I want to comment Mellendorf´s sentence "At the level of particles and atoms, mass is NOT conserved."
Mass is always conserved, as is Energy. After an an event (like n+p -> np + hf) the mass of the system still is the same. The photon contributes to the mass of the system, even though it has no mass itself.
Yes, and it is true only at "the level of particles and atoms" (i.e. quantum physics).jtbell said:Mellendorf's statement would have been phrased better as follows: "At the level of particles and atoms, (invariant) mass is not additive." The (invariant) mass of a system does not equal the sum of the (invariant) masses of the particles that it is composed of."
I put (invariant) in parentheses because many physicists (the ones who don't use the concept of "relativistic mass") would omit it. In this context, since we're discussing both kinds of mass, we need to be explicit about which one we're talking about.