Lecture 8 Summary
Lecture 9: Gibbs Free Energy Reading: Zumdahl 10.7, 10.9 Outline –Defining the Gibbs Free Energy ( G) –Calculating G –Pictorial Representation of G
Defining G Recall, the second law of thermodynamics: S univ = S total = S system + S surr Also recall: S surr = - H sys /T Then S total = S system + S surr - H sys /T S total = -T S system + H sys
Defining G (cont.) We then define: G = -T S total Then: Or G = H - T S G = -T S sys + H sys G = The Gibbs Free Energy w/ P const
G and Spontaneous Processes Recall from the second law the conditions of spontaneity: Three possibilities: –If S univ > 0…..process is spontaneous –If S univ < 0…..process is spontaneous in opposite direction. –If S univ = 0….equilibrium In our derivation of G, we divided by -T; therefore, the direction of the inequality changes relative to entropy.
G and Spontaneous Processes (cont.) Three possibilities: –If S univ > 0…..process is spontaneous –If S univ < 0…..process is spontaneous in opposite direction. –If S univ = 0….equilibrium In terms of G: –If G < 0…..process is spontaneous –If G > 0…..process is spontaneous in opposite direction. –If G = 0….equilibrium
G and Spontaneous Processes (cont.) Note that G is composite of both H and S G = H - T S If H 0….spontaneous at all T A reaction is spontaneous if G < 0. Such that If H > 0 and S < 0….not spontaneous at all T If H < 0 and S < 0….spontaneous at low T If H > 0 and S > 0….spontaneous at high T
Example At what T is the following reaction spontaneous? Br 2 (l) Br 2 (g) where H° = kJ/mol, S° = 93.2 J/mol.K Ans: G° = H° - T S°
Example (cont.) Try 298 K just to see: G° = H° - T S° G° = kJ/mol - (298K) J/mol.K G° = kJ/mol = 3.13 kJ/mol > 0 Not spontaneous at 298 K
Example (cont.) At what T then? G° = H° - T S° S = ( kJ/mol) J/mol.K = 0 Just like our previous calculation = K
Calculating G° In our previous example, we needed to determine H° rxn and S° rxn to determine G° rxn Now, G is a state function; therefore, we can use known G° to determine G° rxn using:
Standard G of Formation: G f ° Like H f ° and S°, G f ° is defined as the “change in free energy that accompanies the formation of 1 mole of that substance for its constituent elements with all reactants and products in their standard state.” Like H f °, G f ° = 0 for an element in its standard state: Example: G f ° (O 2 (g)) = 0
Example Determine the G° rxn for the following: C 2 H 4 (g) + H 2 O(l) C 2 H 5 OH(l) Tabulated G° f from Appendix 4: G° f (C 2 H 5 OH(l)) = -175 kJ/mol G° f (C 2 H 4 (g)) = 68 kJ/mol G° f (H 2 O (l)) = -237 kJ/mol
Example (cont.) Using these values: C 2 H 4 (g) + H 2 O(l) C 2 H 5 OH(l) G° rxn G° f (C 2 H 5 OH(l)) - G° f (C 2 H 4 (g)) G° f (H 2 O (l)) G° rxn -175 kJ - 68 kJ -(-237 kJ) G° rxn -6 kJ < 0 ; therefore, spontaneous
More G° Calculations Similar to H°, one can use the G° for various reactions to determine G° for the reaction of interest (a “Hess’ Law” for G°) Example: C(s, diamond) + O 2 (g) CO 2 (g) G° = -397 kJ C(s, graphite) + O 2 (g) CO 2 (g) G° = -394 kJ
More G° Calculations (cont.) C(s, diamond) + O 2 (g) CO 2 (g) G° = -397 kJ C(s, graphite) + O 2 (g) CO 2 (g) G° = -394 kJ CO 2 (g) C(s, graphite) + O 2 (g) G° = +394 kJ C(s, diamond) C(s, graphite) G° = -3 kJ G° rxn < 0…..rxn is spontaneous
G° rxn ≠ Reaction Rate Although G° rxn can be used to predict if a reaction will be spontaneous as written, it does not tell us how fast a reaction will proceed. Example: C(s, diamond) + O 2 (g) CO 2 (g) G° rxn = -397 kJ But diamonds are forever…. <<0 G° rxn ≠ rate
Example Problem Is the following reaction spontaneous under standard conditions? H° f (kJ/mol) S° (J/mol.K) KClO 3 (s) KClO 4 (s) KCl (s)
Example Problem Solution Calulating H° rxn Calulating S° rxn
Example Problem Solution Calulating G° rxn G°rxn < 0 ;therefore, reaction is spontaneous.
Example Problem Continued For what temperatures will this reaction be spontaneous? Answer: For T in which G rxn < 0. Spontaneous as long as T < 3446 K.