Klincewicz method
In thermodynamic theory, the Klincewicz method[1] is a predictive method based both on group contributions and on a correlation with some basic molecular properties. The method estimates the critical temperature, the critical pressure, and the critical volume of pure components.
Model description
[edit]As a group contribution method the Klincewicz method correlates some structural information of a chemical molecule with the critical data. The used structural information are small functional groups which are assumed to have no interactions. This assumption makes it possible to calculate the thermodynamic properties directly from the sums of the group contributions. The correlation method does not even use these functional groups, only the molecular weight and the number of atoms are used as molecular descriptors.
The prediction of the critical temperature relies on the knowledge of the normal boiling point because the method only predicts the relation of the normal boiling point and the critical temperature and not directly the critical temperature. The critical volume and pressure however are directly predicted.
Model Quality
[edit]The quality of the Klincewicz method is not superior to older methods, especially the method of Ambrose[2] gives somewhat better results as stated by the original authors and by Reid et al.[3] The advantage of the Klincewicz method is that it is less complex.
The quality and complexity of the Klincewicz method is comparable to the Lydersen method[4] from 1955 which has been used widely in chemical engineering.
The aspect where the Klincewicz method is unique and useful[3] are the alternative equations where only very basic molecular data like the molecular weight and the atom count are used.
Deviation diagrams
[edit]The diagrams show estimated critical data of hydrocarbons together with experimental data.[5] An estimation would be perfect if all data points would lie directly on the diagonal line. Only the simple correlation of the Klincewicz method with the molecular weight and the atom count have been used in this example.
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Critical temperatures
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Critical pressures
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Critical volumes
Equations
[edit]Klincewicz published two sets of equations.[6] The first uses contributions of 35 different groups. These group contribution based equations are giving somewhat better results than the very simple equations based only on correlations with the molecular weight and the atom count.
Group-contribution-based equations
[edit]
Equations based on correlation with molecular weight and atom count only
[edit]
with
MW: | Molecular weight in g/mol |
Tb: | Normal boiling point in K |
A: | Number of atoms |
Group contributions
[edit]Δj Values for | |||
---|---|---|---|
Tc | Pc | Vc | |
-CH3 | -2.433 | 0.026 | 16.2 |
-CH2- | 0.353 | -0.015 | 16.1 |
-CH2- (Ring) | 4.253 | -0.046 | 8.2 |
>CH- | 6.266 | -0.083 | 12.1 |
>CH- (Ring) | -0.335 | -0.027 | 7.4 |
>C< | 16.416 | -0.136 | 8.95 |
>C< (Ring) | 12.435 | -0.111 | -6.6 |
=CH2 | -0.991 | -0.015 | 13.9 |
=CH- | 3.786 | -0.050 | 9.8 |
=CH- (Ring) | 3.373 | -0.066 | 5.1 |
>C=;=C= | 7.169 | -0.067 | 2.7 |
>C= (Ring) | 5.623 | -0.089 | 0.2 |
≡CH | -4.561 | -0.056 | 7.5 |
≡C- | 7.341 | -0.112 | 3.0 |
-OH | -28.930 | -0.190 | -24.0 |
-O- | 5.389 | -0.143 | -26.1 |
-O- (Ring) | 7.127 | -0.116 | -36.6 |
>CO;-CHO | 4.332 | -0.196 | -6.7 |
-COOH | -25.085 | -0.251 | -37.0 |
-CO-O- | 8.890 | -0.277 | -28.2 |
-NH2 | -4.153 | -0.127 | -0.1 |
>NH | 2.005 | -0.180 | 53.7 |
>NH (Ring) | 2.773 | -0.172 | -8.0 |
>N- | 12.253 | -0.163 | -0.7 |
=N- (Ring) | 8.239 | -0.104 | -18.4 |
-CN | -10.381 | -0.064 | 12.0 |
-SH | 28.529 | -0.303 | -27.7 |
-S- | 23.905 | -0.311 | -27.3 |
-S- (Ring) | 31.537 | -0.208 | -61.9 |
-F | 5.191 | -0.067 | -34.1 |
-Cl | 18.353 | -0.244 | -47.4 |
-Br | 53.456 | -0.692 | -148.1 |
-I | 94.186 | -1.051 | -270.6 |
-XCX (X = halogen) | -1.770 | 0.032 | 0.8 |
-NO2 | 11.709 | -0.325 | -39.2 |
The group XCX is used to take the pairwise interaction of halogens connected to a single carbon into account. Its contribution has to be added once for two halogens but three times for three halogens (interactions between the halogens 1 and 2, 1 and 3, and 2 and 3).
Example calculations
[edit]Example calculation for acetone with group contributions
[edit]-CH3 | >C=O (nonring) | ||||||
---|---|---|---|---|---|---|---|
Property | No. of groups | Group value | No. of groups | Group value | Estimated Value | Unit | |
Tc | 2 | -2.433 | 1 | 4.332 | -0.534 | 510.4819* | K |
Pc | 2 | 0.026 | 1 | -0.196 | -0.144 | 45.69 | bar |
Vc | 2 | 16.2 | 1 | -6.7 | 25.7 | 213.524 | cm3/mol |
*used normal boiling point Tb= 329.250 K
Example calculation for acetone with molecular weight and atom count only
[edit]Used molecular weight: 58.080 g/mol
Used atom count: 10
Property | Estimated Value | Unit |
Tc | 505.1497 | K |
Pc | 52.9098 | bar |
Vc | 205.2 | cm3/mol |
For comparison, experimental values for Tc, Pc and Vc are 508.1 K, 47.0 bar and 209 cm3/mol, respectively.[3]
References
[edit]- ^ Klincewicz, K. M.; Reid, R. C. (1984). "Estimation of critical properties with group contribution methods". AIChE Journal. 30 (1). Wiley: 137–142. doi:10.1002/aic.690300119. ISSN 0001-1541.
- ^ Ambrose D., "Correlation and Estimation of Vapour-Liquid Critical Properties. I. Critical Temperatures of Organic Compounds", Nat. Phys. Lab. Rep. Chem., Rep. No. NPL Rep. Chem. 92, 1-35, 1978
- ^ a b c Reid R.C., Prausnitz J.M., Poling B.E., "The Properties of Gases & Liquids", Monograph, McGraw-Hill, 4 Ed., 1-742, 1987
- ^ Lydersen A.L., "Estimation of Critical Properties of Organic Compounds", University of Wisconsin College Engineering, Eng. Exp. Stn. Rep. 3, Madison, Wisconsin, 1955
- ^ Dortmund Data Bank
- ^ Klincewicz, K. M., "Prediction of Critical Temperatures, Pressures, and Volumes of Organic Compounds from Molecular Structure," S.M.Thesis, Massachusetts Institute of Technology, Cambridge, Massachusetts, 1982