Van der Waals equation of state: Difference between revisions

Revision as of 16:38, 23 February 2007

The van der Waals (VDW) equation is

$\left.p={\frac {nRT}{V-nb}}-a\left({\frac {n}{V}}\right)^{2}\right.$ .

where:

$p$ is the pressure

$V$ is the volume

$n$ is the number of moles

$T$ is the absolute temperature

$R$ is the Gas constant; $R=N_{A}k_{B}$ , with $N_{A}$ being Avogadro constant

The Van der Waals equation of state takes into account two features that are absent in the ideal Gas equation of state:

The parameter $b$ introduces somehow the repulsive behavior between pairs of molecules at short distances, it represents the minimum molar volume of the system.

whereas $a$ measures the attractive interactions between the molecules

The Van der Waals equation of state leads to a liquid-vapor equilibrium at low temperatures, with the corresponding critical point

@@ Line 14: / Line 14: @@
 * <math> R  </math> is the Gas constant; <math> R = N_A k_B </math>, with <math> N_A </math> being [[Avogadro constant]]
-The VDW equation of state (EoS) takes into account two features that are absent in the Ideal Gas (EoS):
+The Van der Waals equation of state takes into account two features that are absent in the [[Equation of State: Ideal Gas | ideal Gas]] equation of state:
 The parameter <math> b </math> introduces somehow the '''repulsive behavior between pairs of molecules at short distances''',
@@ Line 21: / Line 21: @@
 whereas <math> a </math> measures the '''attractive interactions''' between the molecules
-The VDW EoS leads to a liquid-vapor equilibrium at low temperatures, with the corresponding critical point
+The Van der Waals equation of state leads to a liquid-vapor equilibrium at low temperatures, with the corresponding critical point

Van der Waals equation of state: Difference between revisions

Revision as of 16:38, 23 February 2007

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