Joule–Thomson effect

In physics, the Joule–Thomson effect or Joule–Kelvin effect describes the temperature change of a gas or liquid when it is forced through a valve or porous plug while kept insulated so that no heat is exchanged with the environment.cite book |author=R. H. Perry, D. W. Green |title=Perry's Chemical Engineers' Handbook |publisher=McGraw-Hill Book Co. |year=1984 |isbn=0-07-049479-7] cite book |author=B.N. Roy |title=Fundamentals of Classical and Statistical Thermodynamics |publisher=Wiley |year=2002 |id=ISBN 0-470-84313-6] cite book|author=W. C. Edmister, B. I. Lee |title=Applied Hydrocarbon Thermodynamics|edition= 2nd edition |Volume=Vol. 1 |publisher=Gulf Publishing |year=1984 |isbn=0-87201-855-5] This procedure is called a "throttling process" or "Joule-Thomson process". [cite book |author=F. Reif. |title=Fundamentals of Statistical and Thermal Physics | chapter=Chapter 5 – Simple applications of macroscopic thermodynamics |publisher=McGraw-Hill |year=1965 |isbn=07-051800-9] At room temperature, all gases except hydrogen, helium and neon cool upon expansion by the Joule-Thomson process. [cite book |author=A. W. Adamson|title=A textbook of Physical Chemistry |edition=1st Edition |chapter=Chapter 4 – Chemical thermodynamics. The First Law of Thermodynamics|publisher=Academic press|year=1973] [cite book |author=G.W. Castellan |title=Physical Chemistry |edition=2nd Edition |chapter=Chapter 7 – Energy and the First Law of Thermodynamics; Thermochemistry |publisher=Addison-Wesley |year=1971]

The effect is named for James Prescott Joule and William Thomson, 1st Baron Kelvin who discovered it in 1852 following earlier work by Joule on "Joule expansion," in which a gas undergoes free expansion in a vacuum.

Description

The "adiabatic" (no heat exchanged) expansion of a gas may be carried out in a number of ways. The change in temperature experienced by the gas during expansion depends on the initial and final pressure, but also on the manner in which the expansion is carried out.
*If the expansion process is reversible, meaning that the gas is in thermodynamic equilibrium at all times, it is called an "isentropic" expansion. In this scenario, the gas does positive work during the expansion, and its temperature decreases.
*In a free expansion, on the other hand, the gas does no work and absorbs no heat, so the internal energy is conserved. Expanded in this manner, the temperature of an ideal gas would remain constant, but the temperature of a real gas may either increase or decrease, depending on the initial temperature and pressure.
*The method of expansion discussed in this article, in which a gas or liquid at pressure P₁ flows into a region of lower pressure P₂ via a valve or porous plug under steady state conditions and without change in kinetic energy, is called the Joule–Thomson process. During this process, enthalpy remains unchanged (see Appendix).

Temperature change of either sign can occur during the Joule-Thomson process. Each real gas has a Joule–Thomson (Kelvin) inversion temperature above which expansion at constant enthalpy causes the temperature to rise, and below which such expansion causes cooling. This inversion temperature depends on pressure; for most gases at atmospheric pressure, the inversion temperature is above room temperature, so most gases can be cooled from room temperature by isenthalpic expansion.

Physical mechanism

As a gas expands, the average distance between molecules grows. Because of intermolecular attractive forces (see "Van der Waals force"), expansion causes an increase in the potential energy of the gas. If no external work is extracted in the process and no heat is transferred, the total energy of the gas remains the same because of the conservation of energy. The increase in potential energy thus implies a decrease in kinetic energy and therefore in temperature.

A second mechanism has the opposite effect. During gas molecule collisions, kinetic energy is temporarily converted into potential energy. As the average intermolecular distance increases, there is a drop in the number of collisions per time unit, which causes a decrease in average potential energy. Again, total energy is conserved, so this leads to an increase in kinetic energy (temperature). Below the Joule–Thomson inversion temperature, the former effect (work done internally against intermolecular attractive forces) dominates, and free expansion causes a decrease in temperature. Above the inversion temperature, gas molecules move faster and so collide more often, and the latter effect (reduced collisions causing a decrease in the average potential energy) dominates: Joule-Thomson expansion causes a temperature increase.

The Joule–Thomson (Kelvin) coefficient

The rate of change of temperature $T$ with respect to pressure $P$ in a Joule–Thomson process (that is, at constant enthalpy $H$) is the "Joule–Thomson (Kelvin) coefficient" $mu\_\{JT\}$. This coefficient can be expressed in terms of the gas's volume $V$, its heat capacity at constant pressure $C\_\{p\}$, and its coefficient of thermal expansion $alpha$ as: [ [http://www.chem.arizona.edu/~salzmanr/480a/480ants/jadjte/jadjte.html Joule Expansion] (by W.R. Salzman, Department of Chemistry, University of Arizona)]

:$mu\_\{JT\}\; equiv\; left(\; \{partial\; T\; over\; partial\; P\}\; ight)\_H\; =\; frac\{V\}\{C\_\{pleft(alpha\; T\; -\; 1\; ight),$

See the Appendix for the proof of this relation. The value of $mu\_\{JT\}$ is typically expressed in °C/bar (SI units: K/Pa) and depends on the type of gas and on the temperature and pressure of the gas before expansion.

All real gases have an "inversion point" at which the value of $mu\_\{JT\}$ changes sign. The temperature of this point, the "Joule–Thomson inversion temperature", depends on the pressure of the gas before expansion.

In a gas expansion the pressure decreases, so the sign of $partial\; P$ is always negative. With that in mind, the following table explains when the Joule–Thomson effect cools or warms a real gas:

Helium and hydrogen are two gases whose Joule–Thomson inversion temperatures at a pressure of one atmosphere are very low (e.g., about 51 K (−222 °C) for helium). Thus, helium and hydrogen warm up when expanded at constant enthalpy at typical room temperatures. On the other hand nitrogen and oxygen, the two most abundant gases in air, have inversion temperatures of 621 K (348 °C) and 764 K (491 °C) respectively: these gases can be cooled from room temperature by the Joule–Thomson effect.

For an ideal gas, $mu\_\{JT\}$ is always equal to zero: ideal gases neither warm nor cool upon being expanded at constant enthalpy.

Applications

In practice, the Joule–Thomson effect is achieved by allowing the gas to expand through a throttling device (usually a valve) which must be very well insulated to prevent any heat transfer to or from the gas. No external work is extracted from the gas during the expansion (the gas must not be expanded through a turbine, for example).

The effect is applied in the Linde technique as a standard process in the petrochemical industry, where the cooling effect is used to liquefy gases, and also in many cryogenic applications (e.g. for the production of liquid oxygen, nitrogen, and argon). Only when the Joule–Thomson coefficient for the given gas at the given temperature is greater than zero can the gas be liquefied at that temperature by the Linde cycle. In other words, a gas must be below its inversion temperature to be liquefied by the Linde cycle. For this reason, simple Linde cycle liquefiers cannot normally be used to liquefy helium, hydrogen, or neon.

Appendix

Proof that enthalpy remains constant in a Joule-Thomson process

In a Joule-Thomson process the enthalpy remains constant. To prove this, the first step is to compute the net work done by the gas that moves through the plug. Suppose that the gas has a volume of V₁ in the region at pressure P₁ (region 1) and a volume of V₂ when it appears in the region at pressure P₂ (region 2). Then the work done on the gas by the rest of the gas in region 1 isP₁ V₁. In region 2 the amount of work done by the gas is P₂ V₂. So, the total work done by the gas is

:$P\_2\; V\_2\; -\; P\_1\; V\_1,$

The change in internal energy plus the work done by the gas is, by the first law of thermodynamics, the total amount of heat absorbed by the gas (here it is assumed that there is no change in kinetic energy). In the Joule-Thompson process the gas is kept insulated, so no heat is absorbed. This means that

:$E\_2\; -\; E\_1\; +\; P\_2\; V\_2\; -\; P\_1\; V\_1\; =\; 0,$

where $E\_1$ and $E\_2$ denote the internal energy of the gas in regions 1 and 2, respectively.

The above equation then implies that:

$H\_1\; =\; H\_2,$

where $H\_1$ and $H\_2$ denote the enthalpy of the gas in regions 1 and 2, respectively.

Derivation of the Joule-Thomson (Kelvin) coefficent

A derivation of the formula :$mu\_\{JT\}\; equiv\; left(\; frac\{partial\; T\}\{partial\; P\}\; ight)\_H\; =\; frac\{V\}\{C\_\{pleft(alpha\; T\; -\; 1\; ight),$

for the Joule–Thomson (Kelvin) coefficient.

The partial derivative of T with respect to P at constant H can be computed by expressing the differential of the enthalpy dH in terms of dT and dP, and equating the resulting expression to zero and solving for the ratio of dT and dP.

It follows from the fundamental thermodynamic relation that the differential of the enthalpy is given by:

:$dH\; =\; T\; dS\; +\; V\; dP,$ (here, $S$ is the entropy of the gas).

Expressing dS in terms of dT and dP gives:

:$dH\; =\; Tleft(frac\{partial\; S\}\{partial\; T\}\; ight)\_\{P\}dT\; +\; left\; [V+Tleft(frac\{partial\; S\}\{partial\; P\}\; ight)\_\{T\}\; ight]\; dP,$

Using

:$C\_\{P\}=\; Tleft(frac\{partial\; S\}\{partial\; T\}\; ight)\_\{P\},$ (see "Specific heat capacity"), we can write:

:$dH\; =\; C\_\{P\}dT\; +\; left\; [V+Tleft(frac\{partial\; S\}\{partial\; P\}\; ight)\_\{T\}\; ight]\; dP,$

The remaining partial derivative of S can be expressed in terms of the coefficient of thermal expansion via a Maxwell relation as follows. From the fundamental thermodynamic relation, it follows that the differential of the Gibbs energy is given by:

:$dG\; =\; -S\; dT\; +\; V\; dP,$

The symmetry of partial derivatives of G with respect to T and P implies that:

:$left(frac\{partial\; S\}\{partial\; P\}\; ight)\_\{T\}=\; -left(frac\{partial\; V\}\{partial\; T\}\; ight)\_\{P\}=\; -Valpha,$

where $alpha$ is the coefficient of thermal expansion. Using this relation, the differential of H can be expressed as

:$dH\; =\; C\_\{P\}dT\; +\; Vleft(1-Talpha\; ight)\; dP,$

Equating dH to zero and solving for dT/dP then gives:

$left(\; frac\{partial\; T\}\{partial\; P\}\; ight)\_H\; =\; frac\{V\}\{C\_\{pleft(alpha\; T\; -\; 1\; ight),$

See also

* Critical temperature
* Ideal gas
* Enthalpy and Isenthalpic
* Refrigeration
* Reversible process (thermodynamics)

References

Bibliography

*cite book | author=Mark W. Zemansky | title=Heat and Thermodynamics; an intermediate textbook| publisher=McGraw-Hill | year=1968 | id= LCCN 67026891, "p."182, 335
*cite book | author=Daniel V. Schroeder|title=An Introduction to Thermal Physics|publisher=Addison Wesley Longman|year=2000| id=ISBN 0-201-38027-7 , "p."142
*cite book | author=Charles Kittel and Herbert Kroemer|title= Thermal Physics|publisher=W.H. Freeman and Co.|year=1980|id=ISBN 0-7167-1088-9

External links

* [http://scienceworld.wolfram.com/physics/Joule-ThomsonProcess.html Joule-Thomson process] from Eric Weisstein's World of Physics
* [http://scienceworld.wolfram.com/physics/Joule-ThomsonCoefficient.html Joule-Thomson coefficient] from Eric Weisstein's World of Physics
* [http://www.britannica.com/eb/article?tocId=9044025&query=Joule-Thomson%20effect&ct= Joule-Thomson effect] from the truncated free online version of the Encyclopedia Britannica.