3.4 Statistical Entropy 133
d.Calculate the entropy changes of the system and the
surroundings if the initial and final states are the same
as in parts a and b, but if the gas is expanded
irreversibly and isothermally against an external
pressure of 1.000 atm and then heated irreversibly with
the surroundings remaining essentially at equilibrium
at 400 K.3.22 Find∆H,∆S, andqfor the reversible heating of
0.500 mol of benzene from 25◦Cto100◦C at a constant
pressure of 1.000 atm. The normal boiling temperature of
benzene is 80.1◦C and the enthalpy change of vaporization
is 30.8 kJ mol−^1.
3.23 a.A sample of 2.000 mol of neon is expanded reversibly
and adiabatically from a volume of 10.00 L and a
temperature of 500.0 K to a volume of 25.00 L. Find
the final temperature,q,w,∆U,∆S, and∆Sunivfor the
process. State any assumptions or approximations.
b. The same sample is restored to its original state and is
first expanded adiabatically and irreversibly at a
constant external pressure of 1.000 atm to a volume of
25.00 L, then cooled reversibly to the same final
temperature as in part a at a constant volume of
25.00 L. Find the final temperature for the irreversible
step, and findq,w,∆U, and∆Sfor this entire
two-step process. What can you say about∆Sunivfor
each step of this two-step process?
3.24 1.000 mol of carbon tetrafluoride is vaporized at the normal
boiling point of− 128 ◦C and 1.000 atm (bothPandT
held constant). The molar volume of the liquid is
44.9 cm mol−^1. The enthalpy change of vaporization is
12.62 kJ mol−^1. Findq,w,∆S, and∆Hfor this process.
3.25A sample of 2.000 mol of a monatomic ideal gas is
expanded and heated. Its initial temperature is 300.0 K and
its final temperature is 400.0 K. Its initial volume is
20.00 L and its final volume is 40.00 L. Calculate∆S.
Does the choice of path between the initial and final states
affect the result?
3.26 The molar heat capacity of water vapor is represented byCP, m 30 .54JK−^1 mol−^1 +(0.01029 J K−^2 mol−^1 )TwhereTis the absolute temperature.
a.Find∆Hfor heating 2.000 mol of water vapor at a
constant pressure of 1.000 atm from 100◦Cto500◦C.
b.Findq,w, and∆Ufor the process.
c.Find∆Sfor the process.3.4 Statistical Entropy
Since molecules can occupy various states without changing the macroscopic state of
the system of which they are a part, it is apparent that many microstates of a macroscopic
system correspond to one macroscopic state. We denote the number of microstates
corresponding to a given macrostate byΩ. The quantityΩis sometimes called the
thermodynamic probabilityof the macrostate. The thermodynamic probability is a
measure of lack of information about the microstate of the system for a particular
macrostate. A large value corresponds to a small amount of information, and a value
of unity corresponds to knowledge that the system is in a specific microstate.
For a macrostate specified by values ofU,V, andn, Boltzmann defined astatistical
entropy:SstkBln(Ω)+S 0 (definition of statistical entropy) (3.4-1)wherekBis Boltzmann’s constant, equal toR/NAv. The constantS 0 is a constant that we
usually set equal to zero. The task of this section is to show that the statistical entropy
can be equivalent to the thermodynamic entropy for a model system that is called a
lattice gas. This system contains a numberNof noninteracting point-mass molecules
confined in a container with volumeV. We assume that the particles obey classical
mechanics. The lattice gas is in an equilibrium macrostate specified by values ofU,V
andN. The microstate of the lattice gas is specified by the positions and velocities of
all of the particles.