An approximate partition function for a gas of hard spheres can be obtained from the partition function of a monatomic gas by 2m) ³/2 v) by V by V-b, where b is related to the volume of the W hard replacing Vin Q(N, V, 3) = [9(V, P)] (where q(V. B) = ( spheres. Derive expressions for the energy and the pressure of this system. (Use the following as necessary: b, kg, N, T, and V.) N! h²ß (E) (P) = B

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An approximate partition function for a gas of hard spheres can be obtained from the partition function of a monatomic gas by by V-b, where b is related to the volume of the W hard spheres. Derive expressions for the energy and the pressure of this system. (Use the following as necessary: b, kg, N, T, and V.) replacing V in Q(N, V, B) = [9(V, P)] (where q(V, B) = (22m) 3/2v) by V N! h²ß (E) (P) =