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The Van Laar equation is an activity model, which was developed by Johannes van Laar in 1910-1913, to describe phase equilibria of liquid mixtures. The equation was derived from the Van der Waals equation. The original van der Waals parameters didn't give good description of vapor-liquid phase equilibria, which forced the user to fit the parameters to experimental results. Because of this, the model lost the connection to molecular properties, and therefore it has to be regarded as an empirical model to correlate experimental results.

Equations

Van Laar derived the excess enthalpy from the van der Waals equation:^[1]

${\displaystyle H^{ex}=\frac{b_1{X}_1{b}_2{X}_2}{b_1{X}_1+b_2{X}_2}{(\frac{\sqrt{a_1}}{b_1}-\frac{\sqrt{a_2}}{b_2})}^2}$

In here a_i and b_i are the van der Waals parameters for attraction and excluded volume of component i. Since these parameters didn't lead to good phase equilibrium description the model was reduced to the form:

${\displaystyle \frac{G^{ex}}{RT}=\frac{A_{12}{X}_1{A}_{21}{X}_2}{A_{12}{X}_1+A_{21}{X}_2}}$

In here A₁₂ and A₂₁ are constants, which are obtained by regression of experimental vapor-liquid equilibrium data.

The activity coefficient of component i is derived by differentiation to x_i. This yields:

${\displaystyle \{\begin{array}{c}\ln {\gamma }_1=A_{12}{\left(\frac{A_{21}{X}_2}{A_{12}{X}_1+A_{21}{X}_2}\right)}^2\\ \ln {\gamma }_2=A_{21}{\left(\frac{A_{12}{X}_1}{A_{12}{X}_1+A_{21}{X}_2}\right)}^2\end{array}}$

This shows that the constants A₁₂ and A₂₁ are equal to logarithmic limiting activity coefficients ${\displaystyle ln({\gamma }_1^{\mathrm{\infty }})}$ and ${\displaystyle ln({\gamma }_2^{\mathrm{\infty }})}$ respectively. The model gives increasing (A₁₂ and A₂₁ >0) or only decreasing (A₁₂ and A₂₁ <0) activity coefficients with decreasing concentration. The model can not describe extrema in the activity coefficient along the concentration range.

In case ${\displaystyle A_{12}=A_{21}=A}$, which implies that the molecules are of equal size but different in polarity, then the equations become:

${\displaystyle \{\begin{array}{c}\ln {\gamma }_1=A{x}_2^2\\ \ln {\gamma }_2=A{x}_1^2\end{array}}$

In this case the activity coefficients mirror at x₁=0.5. When A=0 the model the activity coefficients are unity, thus describing an ideal mixture.

References

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