.Modelica.Media.IdealGases.Common.MixtureGasNasa.mixtureViscosityChung .Modelica.Media.IdealGases.Common.MixtureGasNasa.mixtureViscosityChungEquation to estimate the viscosity of gas mixtures at low
pressures.
It is a simplification of an extension of the rigorous kinetic
theory of Chapman and Enskog to determine the viscosity of
multicomponent mixtures, at low pressures and with a factor to
correct for molecule shape and polarity.
The input argument Kappa is a special correction for highly
polar substances such as alcohols and acids.
Values of kappa for a few such materials:
| Compound |
Kappa |
Compound |
Kappa |
| Methanol |
0.215 |
n-Pentanol |
0.122 |
| Ethanol |
0.175 |
n-Hexanol |
0.114 |
| n-Propanol |
0.143 |
n-Heptanol |
0.109 |
| i-Propanol |
0.143 |
Acetic Acid |
0.0916 |
| n-Butanol |
0.132 |
Water |
0.076 |
| i-Butanol |
0.132 |
Chung, et al. (1984) suggest that for other alcohols not shown
in the table:
kappa = 0.0682 + 4.704*[(number of -OH
groups)]/[molecular weight]
S.I. units relation for the
debyes:
1 debye =
3.162e-25 (J.m^3)^(1/2)
[1] THE PROPERTIES OF GASES AND LIQUIDS, Fifth Edition,
Bruce E. Poling, John
M. Prausnitz, John P. O'Connell.
[2] Chung, T.-H., M. Ajlan, L. L. Lee, and K. E. Starling: Ind.
Eng. Chem. Res., 27: 671 (1988).
[3] Chung, T.-H., L. L. Lee, and K. E. Starling; Ing. Eng. Chem.
Fundam., 23: 3 ()1984).
function mixtureViscosityChung extends Modelica.Icons.Function; input Temperature T "Temperature"; input Temperature[nX] Tc "Critical temperatures"; input MolarVolume[nX] Vcrit "Critical volumes (m3/mol)"; input Real[nX] w "Acentric factors"; input Real[nX] mu "Dipole moments (debyes)"; input MolarMass[nX] MolecularWeights "Molecular weights (kg/mol)"; input MoleFraction[nX] y "Molar Fractions"; input Real[nX] kappa = zeros(nX) "Association Factors"; output DynamicViscosity etaMixture "Mixture viscosity (Pa.s)"; end mixtureViscosityChung;