empirical model parameter
\ln {\mu}_{12} = \frac{x_1}{x_1 + \alpha \, x_2} \cdot \ln {\mu}_1 + \frac{\alpha \, x_2}{x_1 + \alpha \,x_2} \cdot \ln {\mu}_2 |
where
| viscosity of fluid mixture | viscosity of the 1st fluid component | viscosity of the 2st fluid component | |||
empirical model parameter | mole fraction of the 1st fluid component | mole fraction of the 2nd fluid component |
The empirical parameter can be fitted on experimental data.
For it reduces to Arrhenius equation.
Physics / Fluid Dynamics / Fluid Mixing Rules / Mixing Rules for Viscosity
1. E.L.Lederer,ZurTheorie derViskositätvonFlüssigkeiten,KolloidBeihefte34(1932)270-338.
2. M.Roegiers,(Sr.),L.Roegiers,Laviscositédes mélanges de fluidesnormaux,Sociétédes Huiles deCavel & Roegiers,S.A.,Gand,1946.
3. M.Roegiers,(Sr.),Discussionofthefundamental equationofviscosity,Industrial LubricationandTribology3(1951)27-29.Lube 121.indd 2713/05/2014 09:53