OK. I looked over this video and saw what the guy said. I was very unhappy with the way he presented the material, and it's no wonder you are confused. It seems that he has only a nodding acquaintance with the idea that the math must be precise in order to properly describe thermodynamics.
Please be advised that, in my judgment, differentials should be applied to state functions like internal energy U (e.g., dU) only for reversible processes, For irreversible processes, one should only focus on the changes in the state functions between the initial and final thermodynamic equilibrium states of the system, and in those cases, only use finite differences over the entire path (e.g., ##\Delta U=U_2-U_1##). State functions are equilibrium properties of the material (and not directly related to any specific processes the material subjected to), and should only be considered for the initial and final thermodynamic equilibrium states of the system, not for intermediate non-equilibrium states (as occur in irreversible processes). For a reversible process, it is valid to consider differential changes in state functions because reversible processes are comprised of a continuous sequence of thermodynamic equilibrium states.
On the other hand, for path dependent quantities like work and heat, it is valid to use differentials both for reversible and for irreversible paths.
Rahulx084 said:
I think I very poorly framed the question. Here is the better version.
For an adiabatic process and irreversible process, the reason of irreversiblity is that, the Pext=0 , so the piston going to slap up once the stopper is removed (very fast) , in a piston cylinder assembly. In this case we see heat transfer and work done both are 0 , so from first law the change in internal energy must be 0 .But there is this statement I read which says "You can have an adiabatic irreversible process where work is either 0 or something else, but its not equal to change in internal energy unless the process is reversible (like what we see in entropy).
So my query are:
1)Is this above statement correct?
No. If the work is zero for an adiabatic irreversible path, the change in internal energy is zero. The first law tells us this. But, if the gas is not an ideal gas, there will be a change in temperature, because U is a function both of T and V, and V has changed. For an ideal gas, where U is a function only of temperature, the change in temperature is zero.
2) If yes then, can we only use first law for rev. Processes only.I mean like if a process is irreversible , do we have to make a reversible path between the initial and final point of the irreversible process and calculate the work done and heat transfer to get internal energy, like what we do while calculating entropy.
Since the answer to question 1 is NO, we don't need to address this question.
3)For isochoric process carried out irreversibly change in internal energy will be equal to heat transfer in the process, so do we have to here get a reversible path again between the initial and final points of irreversible process and get the heat transfer?
No. If you know the temperature change and the heat capacity at constant volume (a property of the material), then you know the heat transfer.
It's too bad this guy did such a bad job of explaining this. All he did was confuse you. It's not your fault, it's his.
