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Ideal and Dilute Solutions

Ideal and Dilute Solutions. Master Thermodynamics Equations. Chemical Potential. Diffusion from high to low potential. Chemical potential is a Partial Molar Quantity. Sum of moles of components. Chemical Potential of a Binary (A & B) Mixture. Chem. Potential applied to other variables:.

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Ideal and Dilute Solutions

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  1. Ideal and Dilute Solutions

  2. Master Thermodynamics Equations

  3. Chemical Potential Diffusion from high to low potential. Chemical potential is a Partial Molar Quantity Sum of moles of components

  4. Chemical Potential of a Binary (A & B) Mixture Chem. Potential applied to other variables:

  5. Measures of Composition • s = solute ; A = solvent; V = Tot. Vol. of solution. • Weight %: • Mole Fraction: • Molarity: • Molality: Different Composition Equations for different Laws

  6. Other Partial Molar Quantities Partial Molar Volume: Partial Molar Enthalpy: Partial Molar Entropy:

  7. Calculation for Partial Molar Volumes V = f(nA , nB) @ constant P & T Integrate @ constant composition

  8. Calculation for Partial Molar Volumes: 100 mL EtOH and 100 mL H2O EtOH (A): d = 0.785 g/mL M = 46.1 g/mol Water (B): d = 0.997 g/mL M = 18.0 g/mol Calculate moles of each component: Calculate mole fraction of A and use previous Partial Molar Volume curves to get partial molar volumes for both ethanol and water. Calculate Total Volume:

  9. Raoult’s Law & Ideal Solutions Vapor Pressure (VP)  Pi (escaping tendency   g) Gas Ideality => No Intermolecular forces Solution Ideality => Uniformity in Intermolecular forces. (Binary: A-A , B-B , A-B all the same) Dalton’s Law

  10. Raoult’s Law & Ideal Solutions

  11. Thermodynamics of Mixing for an Ideal Solution

  12. TD’s of Mixing for an Ideal Binary (A-B) Solution See Mathcad plot

  13. Finding Minimum of ΔGmixcurve

  14. Henry’s Law (Solubility of gases in liquids) In dilution solutions, each solute is surrounded by solvent molecules (uniform environment, relatively ‘ideal.’) Positive and Negative deviations from Raoult’s Law Endothermic Mixing versus Exothermic Mixing

  15. Phase Diagrams

  16. Phase Diagrams The Phase Diagrams of H2O and CO2

  17. P T Phase Diagrams for Multi-components For 2 components: Need 3 variables ( T , P , composition ) Most common plots: VP vs.  @ constant T B. pt. vs.  @ constant P

  18. Phase Diagrams for Multi-components Liquidus Curve: Vapour Curve:

  19. Phase Diagrams for Multi-components Excel Vap-line

  20. Colligative Properties • Boiling-Point Elevation • Molal boiling-point-elevation constant, Kb, expresses how much Tb changes with molality, mS: • Decrease in freezing point (Tf) is directly proportional to molality (Kfis the molal freezing-point-depression constant):

  21. Figure 13.22

  22. Solubility ( Conc’n vs. T ) Derivation starting with equilibrium thermodynamics, At equilibrium (constant P & T):

  23. Freezing Point Depression ( T vs. conc’n ) Kf = molal freezing point constant, all properties of the solvent A [ units = K kg mol-1 ] Similar equation for Tb

  24. Colligative Properties Osmosis • movement of a solvent from low solute concentration to high solute concentration across a semipermeable membrane. Figure 13.23

  25. Colligative Properties Osmosis • Osmotic pressure, , is the pressure required to stop osmosis:

  26. Application to Polymeric Solutions

  27. Ideal and Dilute Solutions

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