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This question already has an answer here:

What exactly is entropy? Why is it measure of randomness?

I have been told Entropy is measure of randomness and it increases everytime randomness increases. What is Randomness? Randomness in what?

Also let us take a gas filled in an adiabatic chamber which is allowed to expand against vacuum thus Work = 0. Also since it is adiabatic, $Q = 0$. By first law of thermodynamics, change in internal energy is also zero.

Here, entropy would increase since volume has increased but the walls were adiabatic, so be $dQ/T$ should be zero at all points and so should be the integration of it which equals change in entropy.

Please explain.

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marked as duplicate by ACuriousMind, John Rennie, Norbert Schuch, Gert, Hritik Narayan Dec 27 '15 at 3:40

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For a system having a fixed energy, entropy is the logarithm of all possible states that the system can take times the Boltzman constant. That is the definition of entropy statistically.

Now entropy is said to be a measure of randomness. In an example like an adiabatic cubical box having 8 different gases each separated from others has lesser number of possible states than when it is mixed randomly. Now for adiabatic containers, we know that the equilibrium situation is when entropy is maximized, therefore the gases will go to a situation where they have maximum entropy rather than sitting unmixed, i.e they will go to a configuration having the largest number of possible states and this occurs when they are completely random-mixed. Thus entropy can be visualized as a measure of randomness.

Lets take a simpler example. There is a cube of length $2L$ of each side. In one of the corners of this cube, I have a gas which is enclosed by partitions within a smaller cube of length $L$. The entropy of the gas is now $S = k_B N ln(cL^3)$, where c is a proportionality constant and N is the number of particles in the gas. Now the partition is removed and the question is what happens to the gas. The answer is it will mix uniformly in the entire volume, as then it has maximum entropy, i.e, $S = k_B N ln(8cL^3)$. The gas is spread out more randomly than ever before.

Now the next question is how is the no of possible states for a system with constant energy calculated. To calculate this, we need to calculate the allowed phase space for the particles. That is a product of the contribution of the volume spanned by each particle times the surface area of 3N dimensional surface of radius $\sqrt{2mE}$, where $E$ is the total energy of the system and $m$ is the mass of the particle in question. This when divided by a minimum unit of phase space that a particle can possess gives the total number of possible states for the system (in statistical mechanics, this formulation yields the total number of microstates for the system in a microcanonical ensemble).

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  • $\begingroup$ Thanks. Now I feel what Entropy is. And what exactly we mean when we say measure of Randomness. $\endgroup$ – Smit Chaudhary Dec 27 '15 at 2:35
  • $\begingroup$ Could you please also tell me about the free expansion or expansion against vacuum. I have tgat question listed up there as well. Thanks in advance. $\endgroup$ – Smit Chaudhary Dec 27 '15 at 2:36
  • $\begingroup$ forgot to answer that one. here you have a misconception. the change in entropy is not equal to $dQ/T$ but $dQ_{rev}/T$. The change in entropy is always greater than or equal to $dQ/T$ with equality only in the reversible case. Here free expansion is an irreversible process.So here the entropy actually increases while free expansion. $\endgroup$ – Bruce Lee Dec 27 '15 at 2:51
  • $\begingroup$ i edited my previous answer too. it was really unreadable earlier. i wonder how u managed to understand it at first! $\endgroup$ – Bruce Lee Dec 27 '15 at 3:00
  • $\begingroup$ I was pretty fine with the answer. Thanks though, I appreciate the effort. $\endgroup$ – Smit Chaudhary Dec 27 '15 at 14:23

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