Heat capacity

The state of a compressible body is described by a thermodynamic parameter such as its temperature, T, or entropy S, and by a mechanical parameter such as the pressure, p, or the volume, V. Therefore one must distinguish between heat capacity at constant volume, ${\displaystyle C_{V}}$ , and heat capacity at constant pressure, ${\displaystyle C_{p}}$ .

Mathematically,

${\displaystyle C_{V}=\left({\frac {\delta Q}{dT}}\right)_{V}}$ 

${\displaystyle C_{p}=\left({\frac {\delta Q}{dT}}\right)_{p}}$ 

where ${\displaystyle \delta Q}$  is the infinitesimal amount of heat added, and ${\displaystyle dT}$  is the subsequent rise in temperature.

From the definition of entropy, for a reversible transformation, we have

${\displaystyle \delta Q=T\,dS.}$ 

The increment of internal energy is the heat added and the work added:

${\displaystyle dU=T\,dS-p\,dV}$ 

So the heat capacity at constant volume is

${\displaystyle C_{V}=\left({\frac {\partial U}{\partial T}}\right)_{V}=T\left({\frac {\partial S}{\partial T}}\right)_{V}.}$ 

The enthalpy is defined by ${\displaystyle H=U+pV}$ . The increment of enthalpy is

${\displaystyle dH=T\,dS+V\,dp.}$ 

So the heat capacity at constant pressure is

${\displaystyle C_{p}=\left({\frac {\partial H}{\partial T}}\right)_{p}=T\left({\frac {\partial S}{\partial T}}\right)_{p}.}$ 

Using the definition of entropy

${\displaystyle TdS=\delta Q\,}$ 

we can calculate the absolute entropy by integrating:

${\displaystyle S(T_{f},x)=\int _{T=0}^{T_{f}}{\frac {\delta Q}{T}}=\int _{0}^{T_{f}}\left({\frac {\delta Q}{dT}}\right)_{x}{\frac {dT}{T}}=\int _{0}^{T_{f}}C_{x}(T,x)\,{\frac {dT}{T}}}$ 

Where ${\displaystyle C_{x}}$   is the heat capacity measured while holding some thermodynamic parameter x constant. Any such heat capacity must be zero at zero temperature in order for the above integral not to diverge and yield an infinite absolute entropy violating the third law of thermodynamics.

The specific heat capacity of a material (measured in J·K⁻¹·kg⁻¹ ) is

${\displaystyle {C \over m}={C \over {\rho V}}}$ 

where

C is the heat capacity of a body made of the material in question (measured in J·K⁻¹)

m is the mass of the body (measured in kg)

V is the volume of the body (measured in m³)

ρ = mV⁻¹ is the density of the material (measured in kg·m⁻³)

CV⁻¹ is known as volumetric heat capacity, and has units of J·m⁻³K⁻¹.

The dimensionless heat capacity of a material is

${\displaystyle {C \over nR}={C \over {Nk}}}$ 

where

C is the heat capacity of a body made of the material in question (measured in J·K⁻¹)

n is the amount of matter in the body (measured in mol)

R is the gas constant (measured in J·K⁻¹·mol⁻¹)

nR=Nk is the amount of matter in the body (measured in J·K⁻¹)

N is the number of molecules in the body.

k is Boltzmann's constant (measured in J·K⁻¹·molecule⁻¹)

According to the equipartition theorem from classical statistical mechanics, for a system made up of independent and quadratic degrees of freedom, any input of energy into a closed system composed of N molecules is evenly divided among the degrees of freedom available to each molecule. It can be shown that, in the classical limit of statistical mechanics, for each independent and quadratic degree of freedom, that

${\displaystyle E_{i}={\frac {k_{B}T}{2}}}$ 

where

${\displaystyle E_{i}}$  is the mean energy (measured in joules) associated with degree of freedom i.

T is the temperature (measured in kelvins)

${\displaystyle k_{B}}$  is Boltzman's constant, (1.380 6505(24) × 10⁻²³ J K⁻¹)

In the case of a monatomic gas such as helium under constant volume, if it assumed that no electronic or nuclear quantum excitations occur, each atom in the gas has only 6 degrees of freedom, all of a translational type. No energy is attached to the degrees of freedom attached to the position of atoms, while degrees of freedom corresponding to the momentums of atoms are quadratic degrees of freedom. N atoms thus correspond to 3N degrees of freedom, leading to the equation

${\displaystyle C_{v}={\frac {\partial E}{\partial T}}={\frac {3}{2}}N\,k_{B}={\frac {3}{2}}n\,R}$ 

${\displaystyle c_{v,m}={\frac {C_{v}}{n}}={\frac {3}{2}}R}$ 

where

${\displaystyle C_{v}}$  is the heat capacity at constant volume of the gas

${\displaystyle c_{v,m}}$  is the molar heat capacity at constant volume of the gas

N is the total number of atoms present in the container

n is the number of moles of atoms present in the container (n is the ratio of N and Avogadro's number)

R is the ideal gas constant, (8.314570[70] J K⁻¹mol⁻¹). R is equal to the product of Boltzman's constant ${\displaystyle k_{B}}$  and Avogadro's number

The following table shows experimental molar constant volume heat capacity measurements taken for each noble monatomic gas (at 1 atm and 25 °C):

It is apparent from the table that the experimental heat capacities of the monatomic noble gases agrees with this simple application of statistical mechanics to a very high degree. In the somewhat more complex case of an ideal gas of diatomic molecules, the presence of internal degrees of freedom are apparent. In addition to the three translational degrees of freedom, there are rotational and vibrational degrees of freedom. In general, there are three degrees of freedom f per atom in the molecule n_a

${\displaystyle f=3n_{a}\,}$ 

Mathematically, there are a total of three rotational degrees of freedom, one corresponding to rotation about each of the axes of three dimensional space. However, in practice we shall only consider the existence of two degrees of rotational freedom for linear molecules. This approximation is valid because the moment of inertia about the internuclear axis is essentially zero. Quantum mechanically, it can be shown that the interval between successive rotational energy eigenstates is inversely proportional to the moment of inertia about that axis. Because the moment of inertia about the internuclear axis is vanishingly small relative to the other two rotational axes, the energy spacing can be considered so high that no excitations of the rotational state can possibly occur unless the temperature is extremely high. We can easily calculate the expected number of vibrational degrees of freedom (or vibrational modes). There are three degrees of translational freedom, and two degrees of rotational freedom, therefore

${\displaystyle f_{\mathrm {vib} }=f-f_{\mathrm {trans} }-f_{\mathrm {rot} }=6-3-2=1\,}$ 

Each rotational and translational degree of freedom will contribute R/2 in the total molar heat capacity of the gas. Each vibrational mode will contribute ${\displaystyle R}$  in the total molar heat capacity, however. This is because for each vibrational mode, there is a potential and kinetic energy component. Both the potential and kinetic components will contribute R/2 to the total molar heat capacity of the gas. Therefore, we expect that a diatomic molecule would have a constant volume heat capacity of

${\displaystyle C_{v}={\frac {3R}{2}}+R+R={\frac {7R}{2}}}$ 

where the terms originate from the translational, rotational, and vibrational degrees of freedom, respectively. The following is a table of some constant volume heat capacities of various diatomics

From the above table, clearly there is a problem with the above theory. All of the diatomics examined have heat capacities that are lower than those predicted by the Equipartition theorem, except ${\displaystyle Br_{2}}$ . However, as the atoms composing the molecules become heavier, the heat capacities move closer to their expected values. One of the reasons for this phenomenon is the quantization of vibrational, and to a lesser extent, rotational states. In fact, if it is assumed that the molecules remain in their lowest energy vibrational state because the interlevel energy spacings are large, the predicted constant volume heat capacity for a diatomic molecule becomes

${\displaystyle C_{v}={\frac {3R}{2}}+R={\frac {5R}{2}}}$ 

which is a fairly close approximation of the heat capacities of the lighter molecules in the above table. If the quantum harmonic oscillator approximation is made, it turns out that the quantum vibrational energy level spacings are actually inversely proportional to the square root of the reduced mass of the atoms composing the diatomic molecule. Therefore, in the case of the heavier diatomic molecules, the quantum vibrational energy level spacings become finer, which allows more excitations into higher vibrational levels at a fixed temperature.

For matter in a crystalline solid phase, the Dulong-Petit law states that the dimensionless specific heat capacity assumes the value 3. For more modern and precise analysis it is useful to use the idea of phonons. See Debye model.

• Quantum statistical mechanics
• Specific heat capacity
• Statistical mechanics
• Volumetric heat capacity
• thermodynamics equations