CHAP. 2: STATE BEHAVIOUR [CONTENTS] 57
Note:This equation is suitable for estimating the temperature dependence of the molar
volume of a saturated liquid. Saturated liquid is such that at a given temperature is in
equilibrium with its vapour (i.e. at boiling, for more information see7.1.4). The pressure
of a saturated liquid (see7.1.7) is the lowest pressure at which a substance may be in the
liquid (equilibrium) state at a given temperature. If we want to find the molar volume of
a liquid at a pressure higher than that of a saturated liquid, we may use the isothermal
compressibility coefficientβTfor the conversion (see (2.35)).Example
Using the Rackett equation estimate the molar volume and density of liquid methane when boiling
at a temperature of 150 K. Data:Tc= 190.55 K,pc= 4.604 MPa,Vc= 99 cm^3 mol−^1.Solution
Substituting into (2.36) yieldsVm(l)= 99× 10 −^6(
4. 604 × 106 × 99 × 10 −^6
8. 314 × 190. 55)(1− 150 / 190 .55) 2 / 7
= 44. 45 × 10 −^6 m^3 mol−^1.The density is calculated from (2.3) and (2.1)ρ=M
Vm=
16 × 10 −^3
44. 45 × 10 −^6
= 360kg m−^3.2.3.3 Solids
The volume of a solid substance is little dependent on temperature and pressure. This depen-
dence is usually ignored, or the volume is calculated using equations (2.34) and (2.35).