Specific heat ratio/Citable Version: Difference between revisions

Specific heat ratio of various gases[1][2][3]
Gas	°C	k		Gas	°C	k
H2	−181	1.597		Dry Air	20	1.40
	−76	1.453			100	1.401
	20	1.41			200	1.398
	100	1.404			400	1.393
	400	1.387		CO2	0	1.310
	1000	1.358			20	1.30
	2000	1.318			100	1.281
He	20	1.66			400	1.235
N2	−181	1.47		NH3	15	1.310
	15	1.404		CO	20	1.40
Cl2	20	1.34		O2	−181	1.45
Ar	−180	1.76			−76	1.415
	20	1.67			20	1.40
CH4	−115	1.41			100	1.399
	−74	1.35			200	1.397
	20	1.32			400	1.394

The specific heat ratio of a gas is the ratio of the specific heat at constant pressure, ${\displaystyle C_{p}}$, to the specific heat at constant volume, ${\displaystyle C_{v}}$. It is sometimes referred to as the adiabatic index or the heat capacity ratio or the isentropic expansion factor or the adiabatic exponent or the isentropic exponent.

Either ${\displaystyle \kappa }$ (kappa), ${\displaystyle k}$ (Roman letter k) or ${\displaystyle \gamma }$ (gamma) may be used to denote the specific heat ratio:

${\displaystyle \kappa =k=\gamma ={\frac {C_{p}}{C_{v}}}}$

where:

${\displaystyle C}$ = the specific heat of a gas

${\displaystyle p}$ = refers to constant pressure conditions

${\displaystyle v}$ = refers to constant volume conditions

Ideal gas relations

In thermodynamic terminology, ${\displaystyle C_{p}}$ and ${\displaystyle C_{V}}$ may be expressed as:

${\displaystyle C_{p}=\left({\frac {\partial H}{\partial T}}\right)_{p}}$     and     ${\displaystyle C_{V}=\left({\frac {\partial U}{\partial T}}\right)_{V}}$

where ${\displaystyle T}$ stands for temperature, ${\displaystyle H}$ for the enthalpy and ${\displaystyle U}$ for the internal energy. For an ideal gas, the heat capacity is constant with temperature. Accordingly, we can express the enthalpy as ${\displaystyle H=C_{p}\,T}$ and the internal energy as ${\displaystyle U=C_{v}\,T}$. Thus, it can also be said that the specific heat ratio of an ideal gas is the ratio of the enthalpy to the internal energy:^[3]

${\displaystyle \kappa ={\frac {H}{U}}}$

The specific heats at constant pressure, ${\displaystyle C_{p}}$, of various gases are relatively easy to find in the technical literature. However, it can be difficult to find values of the specific heats at constant volume, ${\displaystyle C_{v}}$. When needed, given ${\displaystyle C_{p}}$, the following equation can be used to determine ${\displaystyle C_{v}}$ :^[3]

${\displaystyle C_{v}=C_{p}-R}$

where ${\displaystyle R}$ is the molar gas constant (also known as the Universal gas constant). This equation can be re-arranged to obtain:

${\displaystyle C_{p}={\frac {\kappa R}{\kappa -1}}\qquad {\mbox{and}}\qquad C_{v}={\frac {R}{\kappa -1}}}$

Relation with degrees of freedom

The specific heat ratio ( ${\displaystyle k}$ ) for an ideal gas can be related to the degrees of freedom ( ${\displaystyle f}$ ) of a molecule by:

${\displaystyle \kappa ={\frac {f+2}{f}}}$

Thus for a monatomic gas, with three degrees of freedom:

${\displaystyle \kappa ={\frac {5}{3}}=1.67}$

and for a diatomic gas, with five degrees of freedom (three translational and two rotational degrees of freedom, the vibrational degree of freedom is not involved except at high temperatures):

${\displaystyle \kappa ={\frac {7}{5}}=1.4}$.

Earth's atmospheric air is primarily made up of diatomic gases with a composition of ~78% nitrogen (N₂) and ~21% oxygen (O₂). At 20 °C and an absolute pressure of 101.325 kPa, the atmospheric air can be considered to be an ideal gas. This results in a value of:

${\displaystyle \kappa ={\frac {5+2}{5}}={\frac {7}{5}}=1.4}$

The specific heats of real gases (as differentiated from ideal gases) are not constant with temperature. As temperature increases, higher energy rotational and vibrational states become accessible to molecular gases, thus increasing the number of degrees of freedom and lowering ${\displaystyle \kappa }$.

For a real gas, ${\displaystyle C_{p}}$ and ${\displaystyle C_{v}}$ usually increase with increasing temperature and ${\displaystyle \kappa }$ decreases. Some correlations exist to provide values of ${\displaystyle \kappa }$ as a function of the temperature.^[4]

Isentropic compression or expansion of ideal gases

The specific heat ratio plays an important part in the isentropic process of an ideal gas (i.e., a process that occurs at constant entropy):^[3]

(1)    ${\displaystyle p_{1}{V_{1}}^{\kappa }=p_{2}{V_{2}}^{\kappa }}$

where, ${\displaystyle p}$ is the absolute pressure and ${\displaystyle V}$ is the volume. The subscripts 1 and 2 refer to conditions before and after the process, or at any time during that process.

Using the ideal gas law, ${\displaystyle pV=nRT}$, equation (1) can be re-arranged to:

(2)    ${\displaystyle {\frac {p_{1}}{p_{2}}}=\left({\frac {V_{2}}{V_{1}}}\right)^{\kappa }=\left({\frac {T_{2}}{T_{1}}}\right)^{\kappa }\left({\frac {p_{1}}{p_{2}}}\right)^{\kappa }}$

where ${\displaystyle T}$ is the absolute temperature. Re-arranging further:

(3)    ${\displaystyle \left({\frac {T_{2}}{T_{1}}}\right)^{\kappa }=\left({\frac {p_{1}}{p_{2}}}\right)\left({\frac {p_{2}}{p_{1}}}\right)^{\kappa }=\left({\frac {p_{2}}{p_{1}}}\right)^{\kappa -1}}$

we obtain the equation for the temperature change that occurs when an ideal gas is isentropically compressed or expanded:^[3][5]

(4)     ${\displaystyle {\frac {T_{2}}{T_{1}}}=\left({\frac {p_{2}}{p_{1}}}\right)^{(\kappa -1)/\kappa }}$

Equation (4) is widely used to model ideal gas compression or expansion processes in internal combustion engines, gas compressors and gas turbines.

Determination of  ${\displaystyle C_{v}}$  values

Values for ${\displaystyle C_{p}}$ are readily available, but values for ${\displaystyle C_{v}}$ are not as available and often need to be determined. Values based on the ideal gas relation of  ${\displaystyle C_{p}-C_{v}=R}$ are in many cases not sufficiently accurate for practical engineering calculations. If at all possible, an experimental value should be used.

A rigorous value can be calculated by determining ${\displaystyle C_{v}}$ from the residual property functions (also referred to as departure functions)^[6][7][8] using this relation:^[9]

${\displaystyle C_{v}=C_{p}+T{\frac {{\;\left({\frac {\partial p}{\partial T}}\right)}_{V}^{2}}{\left({\frac {\partial p}{\partial V}}\right)_{T}}}}$

Equations of state (EOS) (such as the Peng-Robinson equation of state) can be used to solve this relation and to provide values of ${\displaystyle C_{v}}$ that match experimental values very closely.

References