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In [[physics]], [[chemistry]], and [[chemical engineering]], the '''van der Waals equation''' is an [[equation of state]] for a [[fluid]] composed of particles that have a non-zero size and a pairwise attractive inter-particle [[force]] (such as the [[van der Waals force]].) It was derived by [[Johannes Diderik van der Waals]] in his doctoral thesis (Leiden 1873), based on a modification of the [[ideal gas law]]. The importance of his work was the recognition that the gas and liquid phase of a  compound transform continuously into each other. Above the [[critical temperature]] there is even no difference between the gas and the liquid phase, which is why it is proper to speak of the equation of a ''fluid'', a generic term for liquid ''and'' gas.
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In [[physics]], [[chemistry]], and [[chemical engineering]], the '''van der Waals equation''' is an equation of state for a fluid composed of particles that have a non-zero size and a pairwise attractive interparticle [[force]] (such as the [[van der Waals force]]). It was derived by [[Johannes Diderik van der Waals]] in his doctoral thesis (Leiden 1873)<ref>van der Waals, JD (1873) ''Over de Continuiteit van den Gas- en Vloeistoftoestand (on the continuity of the gas and liquid state)''. Ph.D. thesis, Leiden, The Netherlands. [http://www.scs.uiuc.edu/~mainzv/exhibit/vanderwaals.htm]</ref> by modification of the [[ideal gas law]]. The importance of this work is the recognition that the gas and liquid phase of a  substance transform continuously into each other. Above the [[critical temperature]], there is no difference between the gas and liquid phase, which is why it is proper to speak of the equation of a ''fluid'', a generic term for liquid ''and'' gas.


==Equation==
==Equation==
Consider a vessel  of volume ''V'' filled with ''n'' [[mole (unit)|moles]] of atoms or molecules of a single compound. Let [[Avogadro's constant]] be ''N''<sub>A</sub>, so that the total number of particles in the vessel is ''nN''<sub>A</sub>, then the van der Waals equation reads
Consider a vessel  of volume ''V'' filled with ''n'' [[mole (unit)|moles]] of particles (atoms or molecules) of a single compound. Let the pressure be ''p'' and the absolute temperature be ''T'', then the van der Waals equation reads
   
   
:<math>\left(p + \frac{n^2 a}{V^2}\right)\left(V-nb\right) = nRT</math>,
:<math>\left(p + \frac{n^2 a}{V^2}\right)\left(V-nb\right) = nRT</math>,
where
where
   
   
:''V'' is the total volume of the container containing the fluid
:''a'' is a measure of the strength of attraction between the particles,
:''a'' is a measure of the strength of attraction between the particles  
:''b'' is the volume excluded from ''V''  by one mole of particles,  
:''b'' is the volume excluded by a mole of particles,  
:''R'' is the [[gas constant]], ''R'' =  ''N''<sub>A</sub> ''k'', where ''k'' is the [[Boltzmann constant]] and ''N''<sub>A</sub> is [[Avogadro's constant]].
:''n'' is the number of moles
:''R'' is the [[gas constant]], ''R'' =  ''N''<sub>A</sub> ''k'', where ''k'' is the [[Boltzmann constant]].


The van der Waals parameter ''b'' is proportional to ''N''<sub>A</sub> times the volume of a single particle&mdash;the volume bounded by the [[atomic radius]].  In van der Waals' original derivation, given below, ''b''/''N''<sub>A</sub> is four times the volume of the particle. Observe that the pressure ''p'' goes to infinity when the container is completely filled with particles so that there is no void space left for the particles to move. This occurs when ''V = n b''.
The van der Waals parameter ''b'' is proportional to ''N''<sub>A</sub> times the volume of a single particle&mdash;the volume bounded by the [[atomic radius]].  In van der Waals' original derivation, given below, ''b''/''N''<sub>A</sub> is 4 times the volume of a single particle. Particles are seen as  hard spheres. Observe that the pressure ''p'' goes to infinity when the container is completely filled, so that there is no void space left for the particles to move. This occurs when ''V = n b''.


The [[critical temperature]] ''T''<sub>C</sub> is 8''a''/(27 ''R'' ''b''). For constant temperature ''T'' = 0.85 ''T''<sub>C</sub>, and the fairly arbitrary values ''b'' = 3 and ''a'' = 1, the van der Waals curve has the shape given in the following graph, in which we  see pressure versus molar volume ''V''<sub>''m''</sub>.  
Although the parameters ''a'' and ''b'' are referred to as "the Van der Waals constants", they are not truly constants because they vary from one gas to another; they are, however, independent of ''P'', ''V'', and ''T''. In other words, they are constant for the specific gas being considered.  


[[Image:Vanderwaals_equation_of_state.png|400px|center|van der Waals equation of state]]
===Illustration===
From the empirical critical temperature  ''T''<sub>''C''</sub> and the empirical [[critical pressure]] ''p''<sub>''C''</sub> the constants ''a'' and ''b'' can be obtained by the equations
:<math>
a = \frac{27}{64}\frac{(RT_C)^2}{p_C}\quad \hbox{and}\quad b =  \frac{RT_C}{8p_C}
</math>
 
The [[carbon dioxide]] molecule (CO<sub>2</sub>) has<ref>J. V. Sengers and J. M. H. Levelt-Sengers,
Annual Review of Physical Chemistry, vol. '''37''', p. 189 (1986)</ref> ''p''<sub>''C''</sub> = 7.37 MPa and ''T''<sub>''C''</sub> = 304.1 K = 31 ˚C , which gives
''a'' = 0.366 m<sup>6</sup> Pa and ''b'' = 42.9 10<sup>-6</sup> m<sup>3</sup>. For four different temperatures the van der Waals curves are given in the following figure. The critical pressure is at 73.7 [[Bar (unit)|bar]] = 7370 kPa (is close to 73.7 [[Atmosphere (unit)|atm]]).


For large volume the pressure is low and the fluid (which is in the gas phase at low pressures and below the critical temperature) obeys approximately the [[ideal gas law]] ''p V'' = ''R T''. If we decrease the volume,  the pressure rises until we reach the point ''C'', where condensation (formation of liquid) starts. At this point the van der Waals curve is no longer physical (excluding the possibility of the occurrence of an oversaturated, metastable gas), because from ''C'' downward to smaller volume, the pressure stays constant&mdash;equal to the vapor pressure of the liquid. All molecules are in the liquid phase at point ''A'', no molecules in the gas phase are left. When we now squeeze the volume  at ''A'' containing liquid only, the pressure will rise steeply, because the [[compressibility]] of a liquid is considerable smaller than that of a gas. Although the maximum and minimum in the van der Waals curve are not physical, the corresponding equation was a great scientific achievement in 1873. Even today it is not possible to give a single equation that describes correctly the phase transition.
{{Image|Vanderwaals_equation_of_state.png|center|500px|Different isotherms (curves of constant temperature) obeying the van der Waals equation of state. The dashed line from A to B  is drawn in accordance with Maxwell's equal area rule.}}
 
For large volumes (on the right-hand side of the figure), the pressures are low and the fluid  obeys approximately the [[ideal gas law]] ''pV'' = ''nRT'' for all temperatures shown. If we decrease the volume (go to the left in the figure along an isotherm),  the pressure rises.  Consider the (blue) [[isotherm]] of 10 <sup>0</sup>C, which is below the critical temperature.  Decrease the volume until we reach the point ''B'', where condensation (formation of liquid CO<sub>2</sub>) starts. At this point the van der Waals curve is no longer physical (excluding the possibility of the occurrence of an oversaturated, metastable gas), because in reality from ''B'' to the left (to smaller volume), the pressure stays constant&mdash;equal to the [[vapor pressure]] of the liquid. The real physical  behavior is given by the dashed line of gas-liquid coexistence. The  areas, bounded by the 10 °C isotherm, below and above the coexistence line are equal. This is the content of <i>Maxwell's equal-area rule</i>. Decreasing the volume further, we end at point ''A'' where all molecules are now in the liquid phase, no molecules are remaining in the gas phase. When the volume is diminished of a vessel that contains only liquid, the pressure rises steeply, because the [[compressibility]] of a liquid is considerable smaller than that of a gas.  
 
If one follows the (green)  31 °C curve of critical temperature,  one meets a horizontal point of inflection (first and second derivatives of ''p'' with respect to ''V'' are zero). Note that the figure exhibits two isotherms of temperature higher than the critical temperature; if they are followed, no liquid–gas phase transition will be seen; the higher pressure fluid will resemble a liquid, while at lower pressures the fluid  will be more gaslike. At temperatures higher than the critical temperature, no gas–liquid interface occurs.
 
Although the maxima and minima in the van der Waals curves below the critical point are not physical, the equation for these curves, derived by van der Waals in 1873, was a great scientific achievement. Even today it is not possible to give a ''single'' equation that describes correctly the gas–liquid phase transition.


==Validity==
==Validity==
Above the [[critical temperature]] the van der Waals equation is an improvement of the ideal gas law, and for lower temperatures the equation is also qualitatively reasonable for the liquid state and the low-pressure gaseous state. However,  the van der Waals model cannot be taken seriously in a quantitative sense, it is only useful for qualitative purposes.<ref>T. L. Hill, ''Statistical Thermodynamics'', Addison-Wesley, Reading (1960), p. 280</ref>
Above the critical temperature the van der Waals equation is an improvement of the ideal gas law, and for lower temperatures the equation is also qualitatively reasonable for the liquid state and the low-pressure gaseous state. However,  the van der Waals model cannot be taken seriously in a quantitative sense; it is only useful for qualitative purposes.<ref>T. L. Hill, ''Statistical Thermodynamics'', Addison-Wesley, Reading (1960), p. 280</ref>


In the [[phase transition|first-order phase transition]] range of ''(p,V,T)''  (where the [[liquid]] [[phase (matter)|phase]] and the [[gas]] phase are in equilibrium) it does not exhibit the empirical fact that ''p'' is constant (equal to the vapor pressure of the liquid) as a function  of ''V'' for a given temperature.
In the [[phase transition|first-order phase transition]] range of ''(p,V,T)''  (where the [[liquid]] [[phase (matter)|phase]] and the [[gas]] phase are in equilibrium) it does not exhibit the empirical fact that ''p'' is constant (equal to the vapor pressure of the liquid) as a function  of ''V'' for a given temperature.


==Derivation==
==Derivation==
In the usual textbooks one finds two different derivations. One is the conventional derivation that goes back to van der Waals and the other is a statistical mechanics derivation. The latter has its major advantage that it makes explicit the intermolecular potential, which is  out of sight in the first derivation.
In the usual textbooks one finds two different derivations. One is the conventional derivation that goes back to van der Waals and the other is a statistical mechanics derivation. The latter has as its major advantage that it makes explicit the intermolecular potential, which is  out of sight in the first derivation.


===Conventional derivation===
===Conventional derivation===
Consider first one mole of gas  which is composed of non-interacting point particles
Consider first one mole of gas  which is composed of non-interacting point particles
that satisfy the [[ideal gas law]]
that satisfy the [[ideal gas law]]
Line 35: Line 49:
:<math> p = \frac{RT}{V_\mathrm{m}}.</math>
:<math> p = \frac{RT}{V_\mathrm{m}}.</math>


Next assume that all particles are hard spheres of the same finite radius ''r'' (the [[van der Waals radius]]).  The effect of the finite volume of the particles is to decrease the available void space in which the particles are free to move. We must replace ''V'' by  ''V-b'', where ''b'' is called the ''excluded volume''. The corrected equation becomes
{{Image|Van der Waals equation spheres.png|right|250px|The cyan colored spheres are two fluid particles, of diameter ''d'', in closest contact. The (black) enveloping sphere is excluded to other particles.}}
Next assume that all particles are hard spheres of the same finite radius ''r'' = ''d''/2 (the [[van der Waals radius]]).  The effect of the finite volume of the particles is to decrease the available void space in which the particles are free to move. We must replace ''V'' by  ''V-b'', where ''b'' is called the ''excluded volume''. The corrected equation becomes


:<math> p = \frac{RT}{V_\mathrm{m}-b}.</math>
:<math> p = \frac{RT}{V_\mathrm{m}-b}.</math>


The excluded volume is not just equal to the volume occupied by the solid, finite size, particles, but actually four times that volume. To see this we must realize that a  particle is surrounded by a sphere of radius ''d = 2r''  that is forbidden for the centers of the other particles. If the distance between two particle centers would be smaller than 2''r'', it would mean that the two particles penetrate each other, which, by definition, hard spheres are unable to do.
The excluded volume ''b'' is not just equal to ''N''<sub>A</sub> times the volume occupied by a single particle, but actually 4 ''N''<sub>A</sub> times that volume. To see this we must realize that two colliding particles are enveloped by a sphere of radius ''d''  that is forbidden for the centers of the other particles, see the figure. If the center of a third particle would come into the enveloping sphere, it would mean that the third particle penetrates any of the other two, which, by definition, hard spheres are unable to do. The excluded volume ''b''/''N''<sub>A</sub> per particle pair is 4&pi;/3 &times; ''d''<sup>3</sup> = 32&pi;/3 &times; ''r''<sup>3</sup>, so that the excluded volume is '''not''' 8&pi;/3 &times; ''r''<sup>3</sup> (the sum of volumes of the two particles), but ''four'' times as much.<ref>That the argument leading to this factor is not completely trivial appears from the fact that [[James Clerk Maxwell|Maxwell]] considered it to be erroneous; Maxwell  derived a factor 16. See, A. Ya. Kipnis, B. E. Yavelov, and J. S. Rowlinson, ''Van der Waals and Molecular Science'', Oxford University Press, (1996) p. 64</ref>
The excluded volume per particle is <math>4\pi d^3/3</math>, which we must divide by two to avoid overcounting, so that the excluded volume <math>b' = b/N_\mathrm{A}</math> is 4 &times; 4&pi; r<sup>3</sup>/3, which is four times the proper volume of the particle. It was a point of concern to van der Waals that the factor four yields actually an upper bound, empirical values for <math>b'</math> are usually lower. Of course molecules are not infinitely hard, as van der Waals thought, but are often fairly soft.


Next, we introduce a pairwise attractive force between the particles. Van der Waals assumed that, notwithstanding the existence of this force, the density of the fluid is homogeneous. Further he assumed that the range of the attractive force is so small that the great majority of the particles do not feel that the container is of finite size. That is, the bulk of the particles do not notice that they have more attracting particles to their right than to their left when they are relatively close to the left-hand wall of the container. The same statement holds with left and right interchanged. Given the homogeneity of the fluid, the bulk of the particles do not experience a net force pulling them to the right or to the left. This is different for the  particles in surface layers directly adjacent to the walls. They feel a net force from the bulk particles pulling them into the container, because this force is not compensated  by particles between them and the wall (another assumption here is that there is no interaction between walls and particles). This net force decreases the force exerted onto the wall by the particles in the surface layer. The net force on a surface particle, pulling it into the container, is proportional to the number density <math>C=N_\mathrm{A}/V_\mathrm{m}</math>. The number of particles in the surface layers is, again by assuming homogeneity, also proportional to the density. In total, the force on the walls is decreased by a factor proportional to the square of the density and the pressure (force per unit surface) is decreased by   
It was a point of concern to van der Waals that the factor 4 yields actually an upper bound; empirical values for ''b'' are usually lower. Of course molecules are not infinitely hard, as van der Waals assumed, but are often fairly soft.
 
Next, we introduce a pairwise attractive force between the particles. Van der Waals assumed that, notwithstanding the existence of this force, the density of the fluid is homogeneous. Furthermore, he assumed that the range of the attractive force is so small that the great majority of the particles do not feel that the container is of finite size. That is, the bulk of the particles do not notice that they have more attracting particles to their right than to their left when they are relatively close to the left-hand wall of the container. The same statement holds with left and right interchanged. Given the homogeneity of the fluid, the bulk of the particles do not experience a net force pulling them to the right or to the left. This is different for the  particles in surface layers directly adjacent to the walls. They feel a net force from the bulk particles pulling them into the container, because this force is not compensated  by particles between them and the wall (another assumption here is that there is no interaction between walls and particles). This net force decreases the force exerted onto the wall by the particles in the surface layer. The net force on a surface particle, pulling it into the container, is proportional to the number density ''C'' &equiv; ''N''<sub>A</sub>/''V''<sub>m</sub>. The number of particles in the surface layers is, again by assuming homogeneity, also proportional to the density. In total, the force on the walls is decreased by a factor proportional to the square of the density and the pressure (force per unit surface) is decreased by   
:<math>a'C^2= a' \left(\frac{N_\mathrm{A}}{V_\mathrm{m}}\right)^2 = \frac{a}{V_\mathrm{m}^2}  
:<math>a'C^2= a' \left(\frac{N_\mathrm{A}}{V_\mathrm{m}}\right)^2 = \frac{a}{V_\mathrm{m}^2}  
\quad\hbox{with}\quad  a \equiv a' N^2_\mathrm{A},
\quad\hbox{with}\quad  a \equiv a' N^2_\mathrm{A},
Line 58: Line 74:


===Statistical thermodynamics derivation===
===Statistical thermodynamics derivation===
The canonical [[partition function]] ''Q'' of an ideal gas consisting of ''N = nN''<sub>A</sub> identical particles, is
The canonical [[partition function (statistical physics)|partition function]] ''Q'' of an ideal gas consisting of ''N = nN''<sub>A</sub> identical particles, is
:<math>
:<math>
Q = \frac{q^N}{N!}\quad \hbox{with}\quad q = \frac{V}{\Lambda^3}
Q = \frac{q^N}{N!}\quad \hbox{with}\quad q = \frac{V}{\Lambda^3}
Line 66: Line 82:
\Lambda = \sqrt{\frac{h^2}{2\pi m k T}}
\Lambda = \sqrt{\frac{h^2}{2\pi m k T}}
</math>
</math>
with the usual definitions: ''h'' is [[Planck's constant]], ''m'' the mass of a particle, ''k'' [[Boltzmann's constant]] and ''T'' the absolute temperature. In an ideal gas <math>\;q\;</math> is the partition function of a single particle in a container of volume ''V''. In order to derive the van der Waals equation we assume now that each particle moves independently in an average potential field offered by the other particles. The averaging over the particles is easy because we will assume that the particle density of the van der Waals fluid is homogeneous.
with the usual definitions: ''h'' is [[Planck's constant]], ''m'' the mass of a particle, ''k'' [[Boltzmann's constant]] and ''T'' the absolute temperature. In an ideal gas ''q'' is the partition function of a single particle in a vessel of volume ''V''. In order to derive the van der Waals equation, we assume now that each particle moves independently in an average potential field offered by the other particles. The averaging over the particles is easy because we will assume that the particle density of the van der Waals fluid is homogeneous.
The interaction between a pair of particles, which are hard spheres, is taken to be
The interaction between a pair of particles, which are hard spheres, is taken to be
:<math>
:<math>
Line 77: Line 93:
''r'' is the distance between the centers of the spheres and ''d'' is the distance where the hard spheres touch each other (twice the van der Waals radius). The depth of the van der Waals well is <math>\epsilon</math>.
''r'' is the distance between the centers of the spheres and ''d'' is the distance where the hard spheres touch each other (twice the van der Waals radius). The depth of the van der Waals well is <math>\epsilon</math>.


Because the particles are independent the total partition function still factorizes, <math>Q = q^N/N!</math>, but the intermolecular potential necessitates two modifications to <math>\,q\,</math>. First, because of the finite size of the particles, not all of ''V'' is available, but only <math>V - N b'</math>, where (just as in the conventional derivation above) <math> b' = 2\pi d^3/3 </math>. Second, we insert a Boltzmann factor
Because the particles are independent the total partition function still factorizes, <math>Q = q^N/N!</math>, but the intermolecular potential necessitates two modifications to ''q''. First, because of the finite size of the particles, not all of ''V'' is available, but only <math>V - N b'</math>, where <math>{\scriptstyle b'\, \equiv\, b/N_\mathrm{A} = 2\pi d^3/3} </math> (excluded volume per particle). Second, we insert a Boltzmann factor
<math>\exp[-\phi/(2kT)]</math> to take care of the average intermolecular potential. We divide here the potential by two because this interaction energy is shared between two particles. Thus
<math>\exp[-\phi/(2kT)]</math> to take care of the average intermolecular potential. We divide here the potential by two because this interaction energy is shared between two particles. Thus
:<math>
:<math>
Line 101: Line 117:
:<math> p = kT \frac{\partial \ln Q}{\partial V}
:<math> p = kT \frac{\partial \ln Q}{\partial V}
</math>,
</math>,
so that
so that, writing
:<math>
a \equiv N_\mathrm{A}^2 a',
</math>
we get,
:<math>
:<math>
p = \frac{NkT}{V-Nb'} - \frac{N^2 a'}{V^2} \Longrightarrow  
p = \frac{NkT}{V-Nb'} - \frac{N^2 a'}{V^2} \Longrightarrow  
Line 109: Line 129:
== Other thermodynamic parameters ==
== Other thermodynamic parameters ==


The extensive volume ''V''&nbsp; is related to the volume per particle ''v=V/N''&nbsp; where ''N = nN''<sub>A</sub>&nbsp; is the number of particles in the system.
The extensive (i.e., linear in ''n'')  volume ''V''&nbsp; is related to the volume ''v'' per particle ''V''= ''Nv'', where ''N = nN''<sub>A</sub>&nbsp; is the number of particles in the system. As before, the system consists of structureless particles with three translational degrees of freedom only.  


The equation of state does not give us all the thermodynamic parameters of the system. We can take the equation for the [[Helmholtz energy]] ''A''
We  consider the statistical-thermodynamic equation for the [[Helmholtz free energy]] ''A'',
:<math>
:<math>
A = -kT \ln Q.\,
A = -kT \ln Q.\,
Line 120: Line 140:
-\frac{n^2 a}{V}</math>
-\frac{n^2 a}{V}</math>


This equation expresses ''A''&nbsp; in terms of its [[Thermodynamic potential|natural variables]] ''V''&nbsp; and ''T''&nbsp;, and therefore gives us all thermodynamic information about the system. The mechanical equation of state was already derived above
This equation expresses ''A''&nbsp; in terms of its natural variables ''V''&nbsp; and ''T'', and gives us all thermodynamic information about the system.  
 
For instance, the mechanical equation of state (the van der Waals equation) was already derived above


:<math>p = -\left(\frac{\partial A}{\partial V}\right)_T  
:<math>p = -\left(\frac{\partial A}{\partial V}\right)_T  
= \frac{NkT}{V-nb}-\frac{n^2 a}{V^2}</math>
= \frac{NkT}{V-nb}-\frac{n^2 a}{V^2}</math>


The entropy equation of state yields the [[entropy]] (''S''&nbsp;)
The [[entropy (thermodynamics)|entropy]] (''S''&nbsp;) of a van der Waals fluid follows easily from ''A'', it is:


:<math>S = -\left(\frac{\partial A}{\partial T}\right)_V
:<math>S = -\left(\frac{\partial A}{\partial T}\right)_V
Line 132: Line 154:
from which we can calculate the [[internal energy]]
from which we can calculate the [[internal energy]]


:<math>U = A+TS = \frac{3}{2}\,NkT-\frac{n^2 a}{V}</math>
:<math>U \equiv A+TS = \frac{3}{2}\,NkT-\frac{n^2 a}{V}.</math>
 
Writing ''U'' in terms of its natural variables ''S'' and ''V''  requires elimination of ''T'', that is, it needs an expression for ''T'' as a function of ''S'' and ''V''. This can be obtained without great difficulty from the above expression for ''S''. 


Similar equations can be written for the other [[thermodynamic potentials]] and the [[chemical potential]], but expressing any potential as a function of pressure ''p''&nbsp; will require the solution of a third-order polynomial, which yields a complicated expression. Therefore, expressing the [[enthalpy]] and the [[Gibbs energy]] as functions of their natural variables will be complicated.
Similar equations can be derived from ''A'' for other thermodynamic [[characteristic function (thermodynamics)|characteristic function]]s, but expressing, for instance, the enthalpy ''H'' &equiv; ''A'' + ''TS'' + ''pV'' as function of its natural variables ''p'' and ''S'',  will require writing  ''T'' and ''V'' as explicit functions of ''p'' and ''S'', which yields a complicated expression for ''H''. Also the [[Gibbs free energy]] ''G'' &equiv; ''A''+''pV''  will be a  complicated function of its natural variables ''T'' and ''p''.


==Reduced form==
==Reduced form==
Although the material constants ''a'' and ''b'' in the van der Waals equation depend on the fluid considered, the equation can be recast into a single form applicable to ''all'' fluids.


Although the material constants ''a'' and ''b'' in the usual form of the van der Waals equation differs for every single fluid considered, the equation can be recast into an invariant form applicable to ''all'' fluids.
The critical pressure and critical volume can be computed from the condition that the tangent in the critical point is horizontal and that it is a [[point of inflection]]:
 
:<math>
Defining the following reduced variables (<math>\,f_R</math>, <math>\,f_c</math> is the reduced and [[critical variables]] version of <math>\,f</math>, respectively),
\left( \frac{\partial p}{\partial V}\right)_T = 0 \quad\hbox{and}\quad\left( \frac{\partial^2 p}{\partial V^2}\right)_T = 0.
</math>
This gives
:<math>
p_C=\frac{a}{27b^2}, \qquad \displaystyle{V_C=3b},\quad\hbox{and}\quad RT_C=\frac{8a}{27b}.
</math>


Defining the following reduced variables:
:<math>p_R=\frac{p}{p_C},\qquad
:<math>p_R=\frac{p}{p_C},\qquad
V_R=\frac{V}{V_C},\quad\hbox{and}\quad
V_R=\frac{V}{V_C},\quad\hbox{and}\quad
T_R=\frac{T}{T_C}</math>,
T_R=\frac{T}{T_C}</math>,


where
the van der Waals equation of state given above (with ''n'' = 1) can be recast in the following reduced form:  
:<math>
p_C=\frac{a}{27b^2}, \qquad \displaystyle{V_C=3b},\quad\hbox{and}\quad RT_C=\frac{8a}{27b}.
</math>
 
The van der Waals equation of state given above can be recast in the following reduced form:  


:<math>\left(p_R + \frac{3}{V_R^2}\right)(V_R - \frac{1}{3}) = \frac{8}{3} T_R</math>
:<math>\left(p_R + \frac{3}{V_R^2}\right)(V_R - \frac{1}{3}) = \frac{8}{3} T_R</math>


This equation is ''invariant'' (i.e., the same equation of state, viz., above, applies) for all fluids.
This equation holds for all fluids. Thus, when measured in units of the critical values of various quantities, all fluids obey the same equation of state&mdash;the reduced van der Waals equation of state. Van der Waals termed this the [[principle of corresponding states]].  
==References==
<references />


Thus, when measured in intervals of the critical values of various quantities, all fluids obey the same equation of state&mdash;the reduced van der Waals equation of state. This is also known as the [[principle of corresponding states]]. In the sense that we have eliminated the appearance of the individual material constants ''a'' and ''b'' in the equation, this can be considered ''unity in diversity.''
[[Category:Suggestion Bot Tag]]
===Reference===
<references />

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In physics, chemistry, and chemical engineering, the van der Waals equation is an equation of state for a fluid composed of particles that have a non-zero size and a pairwise attractive interparticle force (such as the van der Waals force). It was derived by Johannes Diderik van der Waals in his doctoral thesis (Leiden 1873)[1] by modification of the ideal gas law. The importance of this work is the recognition that the gas and liquid phase of a substance transform continuously into each other. Above the critical temperature, there is no difference between the gas and liquid phase, which is why it is proper to speak of the equation of a fluid, a generic term for liquid and gas.

Equation

Consider a vessel of volume V filled with n moles of particles (atoms or molecules) of a single compound. Let the pressure be p and the absolute temperature be T, then the van der Waals equation reads

,

where

a is a measure of the strength of attraction between the particles,
b is the volume excluded from V by one mole of particles,
R is the gas constant, R = NA k, where k is the Boltzmann constant and NA is Avogadro's constant.

The van der Waals parameter b is proportional to NA times the volume of a single particle—the volume bounded by the atomic radius. In van der Waals' original derivation, given below, b/NA is 4 times the volume of a single particle. Particles are seen as hard spheres. Observe that the pressure p goes to infinity when the container is completely filled, so that there is no void space left for the particles to move. This occurs when V = n b.

Although the parameters a and b are referred to as "the Van der Waals constants", they are not truly constants because they vary from one gas to another; they are, however, independent of P, V, and T. In other words, they are constant for the specific gas being considered.

Illustration

From the empirical critical temperature TC and the empirical critical pressure pC the constants a and b can be obtained by the equations

The carbon dioxide molecule (CO2) has[2] pC = 7.37 MPa and TC = 304.1 K = 31 ˚C , which gives a = 0.366 m6 Pa and b = 42.9 10-6 m3. For four different temperatures the van der Waals curves are given in the following figure. The critical pressure is at 73.7 bar = 7370 kPa (is close to 73.7 atm).

Different isotherms (curves of constant temperature) obeying the van der Waals equation of state. The dashed line from A to B is drawn in accordance with Maxwell's equal area rule.

For large volumes (on the right-hand side of the figure), the pressures are low and the fluid obeys approximately the ideal gas law pV = nRT for all temperatures shown. If we decrease the volume (go to the left in the figure along an isotherm), the pressure rises. Consider the (blue) isotherm of 10 0C, which is below the critical temperature. Decrease the volume until we reach the point B, where condensation (formation of liquid CO2) starts. At this point the van der Waals curve is no longer physical (excluding the possibility of the occurrence of an oversaturated, metastable gas), because in reality from B to the left (to smaller volume), the pressure stays constant—equal to the vapor pressure of the liquid. The real physical behavior is given by the dashed line of gas-liquid coexistence. The areas, bounded by the 10 °C isotherm, below and above the coexistence line are equal. This is the content of Maxwell's equal-area rule. Decreasing the volume further, we end at point A where all molecules are now in the liquid phase, no molecules are remaining in the gas phase. When the volume is diminished of a vessel that contains only liquid, the pressure rises steeply, because the compressibility of a liquid is considerable smaller than that of a gas.

If one follows the (green) 31 °C curve of critical temperature, one meets a horizontal point of inflection (first and second derivatives of p with respect to V are zero). Note that the figure exhibits two isotherms of temperature higher than the critical temperature; if they are followed, no liquid–gas phase transition will be seen; the higher pressure fluid will resemble a liquid, while at lower pressures the fluid will be more gaslike. At temperatures higher than the critical temperature, no gas–liquid interface occurs.

Although the maxima and minima in the van der Waals curves below the critical point are not physical, the equation for these curves, derived by van der Waals in 1873, was a great scientific achievement. Even today it is not possible to give a single equation that describes correctly the gas–liquid phase transition.

Validity

Above the critical temperature the van der Waals equation is an improvement of the ideal gas law, and for lower temperatures the equation is also qualitatively reasonable for the liquid state and the low-pressure gaseous state. However, the van der Waals model cannot be taken seriously in a quantitative sense; it is only useful for qualitative purposes.[3]

In the first-order phase transition range of (p,V,T) (where the liquid phase and the gas phase are in equilibrium) it does not exhibit the empirical fact that p is constant (equal to the vapor pressure of the liquid) as a function of V for a given temperature.

Derivation

In the usual textbooks one finds two different derivations. One is the conventional derivation that goes back to van der Waals and the other is a statistical mechanics derivation. The latter has as its major advantage that it makes explicit the intermolecular potential, which is out of sight in the first derivation.

Conventional derivation

Consider first one mole of gas which is composed of non-interacting point particles that satisfy the ideal gas law

GNU Image
The cyan colored spheres are two fluid particles, of diameter d, in closest contact. The (black) enveloping sphere is excluded to other particles.

Next assume that all particles are hard spheres of the same finite radius r = d/2 (the van der Waals radius). The effect of the finite volume of the particles is to decrease the available void space in which the particles are free to move. We must replace V by V-b, where b is called the excluded volume. The corrected equation becomes

The excluded volume b is not just equal to NA times the volume occupied by a single particle, but actually 4 NA times that volume. To see this we must realize that two colliding particles are enveloped by a sphere of radius d that is forbidden for the centers of the other particles, see the figure. If the center of a third particle would come into the enveloping sphere, it would mean that the third particle penetrates any of the other two, which, by definition, hard spheres are unable to do. The excluded volume b/NA per particle pair is 4π/3 × d3 = 32π/3 × r3, so that the excluded volume is not 8π/3 × r3 (the sum of volumes of the two particles), but four times as much.[4]

It was a point of concern to van der Waals that the factor 4 yields actually an upper bound; empirical values for b are usually lower. Of course molecules are not infinitely hard, as van der Waals assumed, but are often fairly soft.

Next, we introduce a pairwise attractive force between the particles. Van der Waals assumed that, notwithstanding the existence of this force, the density of the fluid is homogeneous. Furthermore, he assumed that the range of the attractive force is so small that the great majority of the particles do not feel that the container is of finite size. That is, the bulk of the particles do not notice that they have more attracting particles to their right than to their left when they are relatively close to the left-hand wall of the container. The same statement holds with left and right interchanged. Given the homogeneity of the fluid, the bulk of the particles do not experience a net force pulling them to the right or to the left. This is different for the particles in surface layers directly adjacent to the walls. They feel a net force from the bulk particles pulling them into the container, because this force is not compensated by particles between them and the wall (another assumption here is that there is no interaction between walls and particles). This net force decreases the force exerted onto the wall by the particles in the surface layer. The net force on a surface particle, pulling it into the container, is proportional to the number density CNA/Vm. The number of particles in the surface layers is, again by assuming homogeneity, also proportional to the density. In total, the force on the walls is decreased by a factor proportional to the square of the density and the pressure (force per unit surface) is decreased by

,

so that

Upon writing n for the number of moles and nVm = V, the equation obtains the form given above,

It is of some historical interest to point out that van der Waals in his Nobel prize lecture gave credit to Laplace for the argument that pressure is reduced proportional to the square of the density.

Statistical thermodynamics derivation

The canonical partition function Q of an ideal gas consisting of N = nNA identical particles, is

where is the thermal de Broglie wavelength,

with the usual definitions: h is Planck's constant, m the mass of a particle, k Boltzmann's constant and T the absolute temperature. In an ideal gas q is the partition function of a single particle in a vessel of volume V. In order to derive the van der Waals equation, we assume now that each particle moves independently in an average potential field offered by the other particles. The averaging over the particles is easy because we will assume that the particle density of the van der Waals fluid is homogeneous. The interaction between a pair of particles, which are hard spheres, is taken to be

r is the distance between the centers of the spheres and d is the distance where the hard spheres touch each other (twice the van der Waals radius). The depth of the van der Waals well is .

Because the particles are independent the total partition function still factorizes, , but the intermolecular potential necessitates two modifications to q. First, because of the finite size of the particles, not all of V is available, but only , where (excluded volume per particle). Second, we insert a Boltzmann factor to take care of the average intermolecular potential. We divide here the potential by two because this interaction energy is shared between two particles. Thus

The total attraction felt by a single particle is,

where we assumed that in a shell of thickness dr there are N/V 4π r2dr particles. Performing the integral we get

Hence, we obtain by the use of Stirling's approximation,

It is convenient to take T out of Λ and to rewrite this expression as

where Φ is a constant. From statistical thermodynamics we know that

,

so that, writing

we get,

Other thermodynamic parameters

The extensive (i.e., linear in n) volume V  is related to the volume v per particle V= Nv, where N = nNA  is the number of particles in the system. As before, the system consists of structureless particles with three translational degrees of freedom only.

We consider the statistical-thermodynamic equation for the Helmholtz free energy A,

From the equation derived above for lnQ, we find

This equation expresses A  in terms of its natural variables V  and T, and gives us all thermodynamic information about the system.

For instance, the mechanical equation of state (the van der Waals equation) was already derived above

The entropy (S ) of a van der Waals fluid follows easily from A, it is:

from which we can calculate the internal energy

Writing U in terms of its natural variables S and V requires elimination of T, that is, it needs an expression for T as a function of S and V. This can be obtained without great difficulty from the above expression for S.

Similar equations can be derived from A for other thermodynamic characteristic functions, but expressing, for instance, the enthalpy HA + TS + pV as function of its natural variables p and S, will require writing T and V as explicit functions of p and S, which yields a complicated expression for H. Also the Gibbs free energy GA+pV will be a complicated function of its natural variables T and p.

Reduced form

Although the material constants a and b in the van der Waals equation depend on the fluid considered, the equation can be recast into a single form applicable to all fluids.

The critical pressure and critical volume can be computed from the condition that the tangent in the critical point is horizontal and that it is a point of inflection:

This gives

Defining the following reduced variables:

,

the van der Waals equation of state given above (with n = 1) can be recast in the following reduced form:

This equation holds for all fluids. Thus, when measured in units of the critical values of various quantities, all fluids obey the same equation of state—the reduced van der Waals equation of state. Van der Waals termed this the principle of corresponding states.

References

  1. van der Waals, JD (1873) Over de Continuiteit van den Gas- en Vloeistoftoestand (on the continuity of the gas and liquid state). Ph.D. thesis, Leiden, The Netherlands. [1]
  2. J. V. Sengers and J. M. H. Levelt-Sengers, Annual Review of Physical Chemistry, vol. 37, p. 189 (1986)
  3. T. L. Hill, Statistical Thermodynamics, Addison-Wesley, Reading (1960), p. 280
  4. That the argument leading to this factor is not completely trivial appears from the fact that Maxwell considered it to be erroneous; Maxwell derived a factor 16. See, A. Ya. Kipnis, B. E. Yavelov, and J. S. Rowlinson, Van der Waals and Molecular Science, Oxford University Press, (1996) p. 64