Physics:Mayer's relation

In the 19th century, German chemist and physicist Julius von Mayer derived a relation between specific heat at constant pressure and the specific heat at constant volume for an ideal gas. Mayer's relation states that [math]\displaystyle{ C_{P,\mathrm{m}} - C_{V,\mathrm{m}} = R, }[/math] where C_P,m is the molar specific heat at constant pressure, C_V,m is the molar specific heat at constant volume and R is the gas constant.

For more general homogeneous substances, not just ideal gases, the difference takes the form, [math]\displaystyle{ C_{P,\mathrm{m}} - C_{V,\mathrm{m}} = V_{\mathrm{m}} T \frac{\alpha_V^2}{\beta_{T}} }[/math] (see relations between heat capacities), where [math]\displaystyle{ V_{\mathrm{m}} }[/math] is the molar volume, [math]\displaystyle{ T }[/math] is the temperature, [math]\displaystyle{ \alpha_{V} }[/math] is the thermal expansion coefficient and [math]\displaystyle{ \beta }[/math] is the isothermal compressibility.

From this latter relation, several inferences can be made:^[1]

• Since the isothermal compressibility [math]\displaystyle{ \beta_{T} }[/math] is positive for nearly all phases, and the square of thermal expansion coefficient [math]\displaystyle{ \alpha }[/math] is always either a positive quantity or zero, the specific heat at constant pressure is nearly always greater than or equal to specific heat at constant volume: [math]\displaystyle{ C_{P,\mathrm{m}} \geq C_{V,\mathrm{m}}. }[/math] There are no known exceptions to this principle for gases or liquids, but certain solids are known to exhibit negative compressibilities ^[2] and presumably these would be (unusual) cases where [math]\displaystyle{ C_{P,\mathrm{m}} \lt C_{V,\mathrm{m}} }[/math].
• For incompressible substances, C_P,m and C_V,m are identical. Also for substances that are nearly incompressible, such as solids and liquids, the difference between the two specific heats is negligible.
• As the absolute temperature of the system approaches zero, since both heat capacities must generally approach zero in accordance with the Third Law of Thermodynamics, the difference between C_P,m and C_V,m also approaches zero. Exceptions to this rule might be found in systems exhibiting residual entropy due to disorder within the crystal.

References

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