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Peter Atkins • Julio de Paula Atkins’ Physical Chemistry

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1 Peter Atkins • Julio de Paula Atkins’ Physical Chemistry
Eighth Edition Chapter 5 – Lecture 2 Simple Mixtures Copyright © 2006 by Peter Atkins and Julio de Paula

2 The Chemical Potential of Liquids
Need to know how Gibbs energy varies with composition Recall that at equilibrium: μA (liq) = μA (vapor) Ideal solutions Use * to designate pure substances

3 Fig 5.10 Eqilibrium between liquid and condensed phases
For pure substance A: When B is added: A and B both volatile Combining : Raoult’s law:

4 Fig 5.11 Ideal binary mixture
Definition of ideal solution

5 Fig 5.12 Near-ideal mixture of benzene and toluene
Note: and are straight lines, indicating a nearly ideal solution: which becomes:

6 Fig 5.13 Molecular basis of Raoult’s law for a volatile
solvent and volatile solute solvent molecules

7 Fig 5.14 Strong deviations from Raoult’s law
Notice that Raoult’s law is obeyed increasingly closely as the component in excess (solvent) approaches purity Nonpolar Polar

8 Ideal-dilute solutions
In ideal solutions, both solvent and solute obey Raoult’s law. In real solutions at low concentrations: Solute = PB ∝ Solute Called an ideal-dilute solution Raoult’s law: PA = XAPA* Henry’s Law: PB = XBKB where KB is an empirical constant in units of P

9 Fig 5.14 Very dilute solution behavior
Henry’s law PB = XBKB PA = XAPA*

10 Fig 5.16 Henry’s law description of solute molecules in
a very dilute solution Solvent molecules environment differs only slightly from that of pure solvent However, solute molecules are in an entirely different environment from that of the pure solute solvent

11 Fig 5.17 Experimental vapor pressures of a mixture
of acetone and chloroform

12 The Properties of Solutions
Liquid mixtures of ideal solutions ΔHmix = 0

13 The Properties of Solutions
Liquid mixtures of real solutions Recall that ΔG = ΔH - TΔS Therefore: ΔGmix < 0 or ΔGmix > 0 Depends on relative magnitudes of ΔHmix and ΔSmix and T

14 Three types of interactions in the mixing process:
solute-solute interaction solvent-solvent interaction solvent-solute interaction ΔH1 ΔH2 DHmix = DH1 + DH2 + DH3 ΔH3

15 Enthalpy changes accompanying solution processes:
The enthalpy change of the overall process depends on H for each of these steps Enthalpy changes accompanying solution processes:

16 Enthalpy is only part of the picture
Increasing the disorder or randomness of a system tends to lower the energy of the system Solutions favored by increase in entropy that accompanies mixing

17 Factors Affecting Gibbs Energy of Mixing
can hydrogen bond with water Acetone is miscible in water Figure UN Title: Polar liquids tend to dissolve readily in polar solvents. Caption: Water is both polar and able to form hydrogen bonds (Section 11.2). Thus, polar molecules, especially those that can form hydrogen bonds with water molecules, tend to be soluble in water. Acetone is a polar molecule with the structural formula shown in the figure and mixes in all proportions with water. Acetone has a strongly polar C=O bond and pairs of nonbonding electrons on the O atom that can form hydrogen bonds with water. Notes: Keywords: ΔGmix < 0 Hexane is immiscible in water C6H14 ΔGmix > 0 H2O


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