Trouton's rule: Difference between revisions
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A similar way of stating this ('''Trouton's ratio''') is that the [[latent heat]] is connected to [[boiling point]] roughly by: |
A similar way of stating this ('''Trouton's ratio''') is that the [[latent heat]] is connected to [[boiling point]] roughly by: |
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:<math>\frac{L_{vap}}{T_{boiling}} \approx |
:<math>\frac{L_{vap}}{T_{boiling}} \approx 85-88 \frac{J}{K mol}</math>. |
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Trouton’s rule can be explained by using [[Boltzmann's entropy formula|Boltzmann's definition of entropy]] to the relative change in free volume (that is, space available for movement) between the liquid and vapour phases.<ref name="ShutlerCheah1998">{{cite journal|last1=Shutler|first1=P M E|last2=Cheah|first2=H M|title=Applying Boltzmann's definition of entropy|journal=European Journal of Physics|volume=19|issue=4|year=1998|pages=371–377|issn=0143-0807|doi=10.1088/0143-0807/19/4/009|bibcode=1998EJPh...19..371S}}</ref> It is valid for many liquids; for instance, the [[entropy]] of vaporization of [[toluene]] is 87.30 J K<sup>−1</sup> mol<sup>−1</sup>, that of [[benzene]] is 89.45 J K<sup>−1</sup> mol<sup>−1</sup>, and that of [[chloroform]] is 87.92 J K<sup>−1</sup> mol<sup>−1</sup>. Because of its convenience, the rule is used to estimate the enthalpy of vaporization of liquids whose boiling points are known. |
Trouton’s rule can be explained by using [[Boltzmann's entropy formula|Boltzmann's definition of entropy]] to the relative change in free volume (that is, space available for movement) between the liquid and vapour phases.<ref name="ShutlerCheah1998">{{cite journal|last1=Shutler|first1=P M E|last2=Cheah|first2=H M|title=Applying Boltzmann's definition of entropy|journal=European Journal of Physics|volume=19|issue=4|year=1998|pages=371–377|issn=0143-0807|doi=10.1088/0143-0807/19/4/009|bibcode=1998EJPh...19..371S}}</ref> It is valid for many liquids; for instance, the [[entropy]] of vaporization of [[toluene]] is 87.30 J K<sup>−1</sup> mol<sup>−1</sup>, that of [[benzene]] is 89.45 J K<sup>−1</sup> mol<sup>−1</sup>, and that of [[chloroform]] is 87.92 J K<sup>−1</sup> mol<sup>−1</sup>. Because of its convenience, the rule is used to estimate the enthalpy of vaporization of liquids whose boiling points are known. |
Revision as of 23:16, 10 May 2020
Trouton’s rule states that the entropy of vaporization is almost the same value, about 85–88 J K−1 mol−1, for various kinds of liquids at their boiling points.[1] The entropy of vaporization is defined as the ratio between the enthalpy of vaporization and the boiling temperature. It is named after Frederick Thomas Trouton.
Mathematically, it can be expressed as:
where R is the gas constant
A similar way of stating this (Trouton's ratio) is that the latent heat is connected to boiling point roughly by:
- .
Trouton’s rule can be explained by using Boltzmann's definition of entropy to the relative change in free volume (that is, space available for movement) between the liquid and vapour phases.[2] It is valid for many liquids; for instance, the entropy of vaporization of toluene is 87.30 J K−1 mol−1, that of benzene is 89.45 J K−1 mol−1, and that of chloroform is 87.92 J K−1 mol−1. Because of its convenience, the rule is used to estimate the enthalpy of vaporization of liquids whose boiling points are known.
The rule, however, has some exceptions. For example, the entropies of vaporization of water, ethanol, formic acid and hydrogen fluoride are far from the predicted values. The entropy of vaporization of XeF6 at its boiling point has the extraordinarily high value of 136.9 J K−1 mol−1.[3] The characteristic of those liquids to which Trouton’s rule cannot be applied is their special interaction between molecules such as hydrogen bonding. The entropy of vaporization of water and ethanol shows positive deviance from the rule; this is because the hydrogen bonding in the liquid phase lessens the entropy of the phase. In contrast, the entropy of vaporization of formic acid has negative deviance. This fact indicates the existence of an orderly structure in the gas phase; it is known that formic acid forms a dimer structure even in the gas phase. Negative deviance can also occur as a result of a small gas phase entropy owing to a low population of excited rotational states in the gas phase, particularly in small molecules such as methane - a small moment of inertia I giving rise to a large rotational constant B, with correspondingly widely separated rotational energy levels and, via Maxwell–Boltzmann distribution, a small population of excited rotational states and hence a low rotational entropy. Trouton's rule validity can be increased by considering
Here, if T = 400 K, we find the original formulation for Trouton's rule.
Another equation which Tboiling < 2100 K is ΔHboiling = 87 Tboiling − 0.4 J/K.
See also
References
- ^ Compare David Warren Ball. Physical Chemistry. (85 J K−1 mol−1) and Daniel L. Reger; Scott R. Goode; David W. Ball. Chemistry: Principles and Practice. (88 J K−1 mol−1)
- ^ Shutler, P M E; Cheah, H M (1998). "Applying Boltzmann's definition of entropy". European Journal of Physics. 19 (4): 371–377. Bibcode:1998EJPh...19..371S. doi:10.1088/0143-0807/19/4/009. ISSN 0143-0807.
- ^ R Bruce King, ed. (2005). Encyclopedia of Inorganic Chemistry (2nd ed.). Wiley. ISBN 978-0-470-86078-6.
Further reading
- Trouton, Frederick (1884). "On Molecular Latent Heat". Philosophical Magazine. 18: 54–57. doi:10.1080/14786448408627563. - Publication of Trouton's rule
- Atkins, Peter (1978). Physical Chemistry Oxford University Press ISBN 0-7167-3539-3