176 SOLUTIONSwhere (S.4.68.9) defines the equation of state. To find quantum
corrections to the classical equation of state (which corresponds to the case
expand the integral in (S.4.68.9), using as a small
parameter:
The first term, which we may call corresponds to a Boltzmann gas with
(see Problem 4.39), and the second term gives the first correctionUsing the fact that, for small corrections (see, for instance, Landau and
Lifshitz, Statistical Physics, Sect. 24),we can write the first quantum correction to the free energy F. Using the
classical expression for in terms of and V gives the result to the sameUsingwe obtain, from (S.4.68.13),andUsing and substituting (S.4.68.10) into (S.4.68.9), we haveaccuracy:and