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1 June, 22:43

A gaseous system undergoes a change in temperature and volume. What is the entropy change for a particle in this system if the final number of microstates is 0.651 times that of the initial number of microstates?

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  1. 2 June, 02:13
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    1.38*10^-23ln (0.65/1)

    =-5.7*10^-24

    Explanation:

    If all the microstates have equal probability of occurring, then Boltzmann's equation tells you that the entropy of the system is given by:

    S = k*ln (W)

    where W is the number of microstates available to the system.

    In this case, we have a change in the number of microstates, and the question is asking for teh change in entropy:

    S_final - S_initial = k*[ln (W_final) - ln (W_initial) ]

    ΔS = k*ln (W_final/W_initial)

    We are told that in this case, W_final = 0.651*W_initial, so:

    S = k*ln (0.651) = - 10.00*10^-23 J / (K*particle)

    To get this in terms of molar entropy, multiply by Avogadro's number:

    ΔS = - 10.00*10^-23 J / (K*particle) * (7.22*10^23 particles/mol) = - 5.7*10^-24
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