Ideal solution
In chemistry, an ideal solution or ideal mixture is a solution that exhibits thermodynamic properties analogous to those of a mixture of ideal gases.[1] The enthalpy of mixing is zero[2] as is the volume change on mixing by definition; the closer to zero the enthalpy of mixing is, the more "ideal" the behavior of the solution becomes. The vapor pressures of the solvent and solute obey Raoult's law and Henry's law, respectively,[3] and the activity coefficient (which measures deviation from ideality) is equal to one for each component.[4]
The concept of an ideal solution is fundamental to chemical thermodynamics and its applications, such as the explanation of colligative properties.
Physical origin
Ideality of solutions is analogous to ideality for gases, with the important difference that intermolecular interactions in liquids are strong and cannot simply be neglected as they can for ideal gases. Instead we assume that the mean strength of the interactions are the same between all the molecules of the solution.
More formally, for a mix of molecules of A and B, then the interactions between unlike neighbors (UAB) and like neighbors UAA and UBB must be of the same average strength, i.e., 2 UAB = UAA + UBB and the longer-range interactions must be nil (or at least indistinguishable). If the molecular forces are the same between AA, AB and BB, i.e., UAB = UAA = UBB, then the solution is automatically ideal.
If the molecules are almost identical chemically, e.g., 1-butanol and 2-butanol, then the solution will be almost ideal. Since the interaction energies between A and B are almost equal, it follows that there is only a very small overall energy (enthalpy) change when the substances are mixed. The more dissimilar the nature of A and B, the more strongly the solution is expected to deviate from ideality.
Formal definition
Different related definitions of an ideal solution have been proposed. The simplest definition is that an ideal solution is a solution for which each component obeys Raoult's law for all compositions. Here is the vapor pressure of component above the solution, is its mole fraction and is the vapor pressure of the pure substance at the same temperature.[5][6][7]
This definition depends on vapor pressure, which is a directly measurable property, at least for volatile components. The thermodynamic properties may then be obtained from the chemical potential μ (which is the partial molar Gibbs energy g) of each component. If the vapor is an ideal gas,
The reference pressure may be taken as = 1 bar, or as the pressure of the mix, whichever is simpler.
On substituting the value of from Raoult's law,
This equation for the chemical potential can be used as an alternate definition for an ideal solution.
However, the vapor above the solution may not actually behave as a mixture of ideal gases. Some authors therefore define an ideal solution as one for which each component obeys the fugacity analogue of Raoult's law . Here is the fugacity of component in solution and is the fugacity of as a pure substance.[8][9] Since the fugacity is defined by the equation
this definition leads to ideal values of the chemical potential and other thermodynamic properties even when the component vapors above the solution are not ideal gases. An equivalent statement uses thermodynamic activity instead of fugacity.[10]
Thermodynamic properties
Volume
If we differentiate this last equation with respect to at constant we get:
Since we know from the Gibbs potential equation that:
with the molar volume , these last two equations put together give:
Since all this, done as a pure substance, is valid in an ideal mix just adding the subscript to all the intensive variables and changing to , with optional overbar, standing for partial molar volume:
Applying the first equation of this section to this last equation we find:
which means that the partial molar volumes in an ideal mix are independent of composition. Consequently, the total volume is the sum of the volumes of the components in their pure forms:
Enthalpy and heat capacity
Proceeding in a similar way but taking the derivative with respect to we get a similar result for molar enthalpies:
Remembering that we get:
which in turn means that and that the enthalpy of the mix is equal to the sum of its component enthalpies.
Since and , similarly
It is also easily verifiable that
Entropy of mixing
Finally since
we find that
Since the Gibbs free energy per mole of the mixture is then
At last we can calculate the molar entropy of mixing since and
Consequences
Solvent–solute interactions are the same as solute–solute and solvent–solvent interactions, on average. Consequently, the enthalpy of mixing (solution) is zero and the change in Gibbs free energy on mixing is determined solely by the entropy of mixing. Hence the molar Gibbs free energy of mixing is
or for a two-component ideal solution
where m denotes molar, i.e., change in Gibbs free energy per mole of solution, and is the mole fraction of component . Note that this free energy of mixing is always negative (since each , each or its limit for must be negative (infinite)), i.e., ideal solutions are miscible at any composition and no phase separation will occur.
The equation above can be expressed in terms of chemical potentials of the individual components
where is the change in chemical potential of on mixing. If the chemical potential of pure liquid is denoted , then the chemical potential of in an ideal solution is
Any component of an ideal solution obeys Raoult's Law over the entire composition range:
where is the equilibrium vapor pressure of pure component and is the mole fraction of component in solution.
Non-ideality
Deviations from ideality can be described by the use of Margules functions or activity coefficients. A single Margules parameter may be sufficient to describe the properties of the solution if the deviations from ideality are modest; such solutions are termed regular.
In contrast to ideal solutions, where volumes are strictly additive and mixing is always complete, the volume of a non-ideal solution is not, in general, the simple sum of the volumes of the component pure liquids and solubility is not guaranteed over the whole composition range. By measurement of densities, thermodynamic activity of components can be determined.
See also
- Activity coefficient
- Entropy of mixing
- Margules function
- Regular solution
- Coil-globule transition
- Apparent molar property
- Dilution equation
- Virial coefficient
References
- ^ Felder, Richard M.; Rousseau, Ronald W.; Bullard, Lisa G. (2005). Elementary Principles of Chemical Processes. Wiley. p. 293. ISBN 978-0471687573.
- ^ A to Z of Thermodynamics Pierre Perrot ISBN 0-19-856556-9
- ^ Felder, Richard M.; Rousseau, Ronald W.; Bullard, Lisa G. Elementary Principles of Chemical Processes. Wiley. p. 293. ISBN 978-0471687573.
- ^ IUPAC, Compendium of Chemical Terminology, 2nd ed. (the "Gold Book") (1997). Online corrected version: (2006–) "ideal mixture". doi:10.1351/goldbook.I02938
- ^ P. Atkins and J. de Paula, Atkins’ Physical Chemistry (8th edn, W.H.Freeman 2006), p.144
- ^ T. Engel and P. Reid Physical Chemistry (Pearson 2006), p.194
- ^ K.J. Laidler and J.H. Meiser Physical Chemistry (Benjamin-Cummings 1982), p.180
- ^ R.S. Berry, S.A. Rice and J. Ross, Physical Chemistry (Wiley 1980) p.750
- ^ I.M. Klotz, Chemical Thermodynamics (Benjamin 1964) p.322
- ^ P.A. Rock, Chemical Thermodynamics: Principles and Applications (Macmillan 1969), p.261