Chemistry 101 : Chap. 19

Chemistry 101 : Chap. 19 Chemical Thermodynamics • Spontaneous Processes • (2) Entropy and The Second Law of Thermodynamics • (3) Molecular Interpretation of Entropy • (4) Entropy Change in Chemical Reactions • (5) Gibbs Free Energy • (6) Free Energy and Temperature

Spontaneous Processes Which process looks “normal” at 25oC? Ice [H2O(s)] Liquid Water [H2O(l)]

Spontaneous Processes A spontaneous process is one that proceeds on its own without any outside assistance. Spontaneous chemical process 4 Fe (s) + 3 O2 (g)  2 Fe2O3 (s) rust

Spontaneous Processes At a given temperature and pressure, processes are spontaneous only in one direction H2O (l)  H2O (s) spontaneous at -10 oC H2O (l)  H2O (s) spontaneous at 25oC Why some processes are spontaneous and while others are not? Are all spontaneous processes exothermic? No

Spontaneous Processes Any spontaneous process is irreversible. Left: Vacuum, Right: Full of gas Gas will be evenly distributed You will not see the reverse process in billion years!

Spontaneous Processes 4 Possible Configurations Initial State Each configuration is equally possible However, the top two configurations are identical Number of ways to arrange two spheres All in the left = 1, One in the left and one in the right = 2, All in the right = 1

Spontaneous Processes • If we have four identical spheres.. -- There are 16 configurations -- 5 distinguishable arrangements Number of ways to arrange 4 identical spheres (NL=4, NR= 0) = 1, (NL=3, NR=1) = 4, (NL=2, NR=2) = 6, (NL=1,NR=3) = 4, (NL=0,NR=4) = 1 What happens if we have 1000 identical spheres? The even distribution, (NL = 500, NR=500), has close to 10300 configurations, but completely uneven distribution (NL=1000, NR=0 or NL=0, NR =1000) has just 2 configuration. Virtually, zero probability to have all in one side

Spontaneous Processes Spontaneous processes proceed towards a more probable state Generally, the more probable state is associated with more disorder S = k log W S = Entropy, k= Boltzman Constant W = Number of configurations associated with a given arrangement ( In general, number of microstates) Ludwig Eduard Boltzman (1844-1906)

Entropy Entropy is a state function  The change in entropy for any process is DS = Sfinal - Sinitial What is the sign of DS for the following processes at 25oC ? H2O (s) → H2O (l) DS = + CO2 (g) → CO2 (s) DS = -

Second Law of Thermodynamics The total entropy of the universe increases in any spontaneous process DSouniverse = DSosystem + DSosurroundings> 0 “I propose to name the quantity S the entropy of the system, after the Greek word [trope], the transformation. I have deliberately chosen the word entropy to be as similar as possible to the word energy.” (1865) Rudolf Clausius (1822-1888)

Second Law of Thermodynamics  Example : The enthalpy of fusion for H2O is Hfusion = 6.01kJ/mol. What is the entropy change when a mole of ice melts in the palm of your hand at 310K?

Entropy  Entropy of a substance in different phase gas solid liquid In gas phase, molecules aremore randomly distributed Of all phases, gases have the highest entropy Ssolid < Sliquid < Sgas

Entropy Entropies of molecules with different sizes or complexity Larger molecules have more internal motion Larger Molecules generally have a larger entropy Ssmall < Smedium < Slarge

Entropy  Usually, dissolving a solid or liquid will increase the entropy dissolves lower entropy higher entropy more disordered arrangement

Entropy Dissolving gas in liquid decreases the entropy dissolves overall more disordered arrangement: higher entropy lower entropy

Entropy  Decreasing the number of molecules usually decrease the entropy 2 NO(g) + O2(g)  2NO2 (g) Higher Entropy Lower Entropy

Entropy • Example : Predict whether S is positive or negative for each of the following processes under constant temperature H2O (l)  H2O (g) Ag+ (aq) + Cl- (aq)  AgCl (s) 4Fe (s) + 3O2 (g)  2Fe2O3 (s) Ba(OH)2(s)  BaO(s) + H2O (g)

Standard Molar Entropy • Absolute entropy (S) : This is based on the reference point of zero entropy for perfect crystalline solids at 0K

Standard Molar Entropy • Standard Molar Entropy (So) : The molar entropy value of substance in their standard state (25oC, 1 atm) } size of molecules increases } Sgas > Sliquid } dissolving a gas in a liquid is accompanied by a lowering of the entropy } dissolving a liquid in another liquid is accompanied by an increase in entropy O2(g) 205 Standard molar entropies of elements are not zero

Standard Molar Entropy  Example : For each of the following pairs, which substance has a higher molar entropy at 25oC ? HCl (l) HCl (s) Li (s) Cs (s) C2H2 (g) C2H6 (g) Pb2+ (aq) Pb (s) O2 (g) O2 (aq) HCl (l) HBr (l) N2 (l) N2 (g) CH3OH (l) CH3OH (aq)

Standard Molar Entropy  Entropy change in chemical reactions : If you know the standard molar entropies of reactants and products, you can calculate So for a reaction: Sorxn = Σ n So(products) – Σ m So(reactants) stoichiometric coefficients for products stoichiometric coefficients for reactants NOTE : Compare this equation with the standard enthalpy change formula.

substanceSo (J/K-mol) H2 (g) 130.6 C2H4 (g) 219.4 C2H6 (g) 229.5 So for elements are NOT zero Standard Molar Entropy  Example : What is So for the following reaction? Do you expect So to be positive or negative? C2H4 (g) + H2 (g) → C2H6 (g)

Standard Molar Entropy  Example : What is So for the following reaction? Do you expect So to be positive or negative? CH4 (g) + 2O2 (g) → CO2(g) + 2H2O (g) substanceSo (J/K-mol) O2 (g) 205.0 CH4 (g) 186.3 CO2 (g) 213.6 H2O (g) 188.3

Gibbs Free Energy  Recall : We need to know both Ssys and Ssurr to predict the direction of changes (second law of thermodynamics) However, in general, Ssurr is not easy to evaluate. Can we predict the direction of change based on the system properties only? … YES! An important key to solve this problem is to realize that there is a close relation between H (heat) and S.

Gibbs Free Energy  Gibbs Free Energy (G = H - TS): (under constant Temperature and Pressure) G = H - TS Why “free” energy? G for a given spontaneous process is the maximum amount of “available” work that a system can do on its surrounding at constant temperature and pressure. Josiah W. Gibbs (1839-1903)

Gibbs Free Energy  G and the direction of spontaneity G = H - TS G = H - TS (at constant temperature, pressure) Ssurr = qsurr/T = -Hsys/T (at constant temperature, pressure) Suniv = Ssys + Ssurr = Ssys - Hsys/T Therefore, Hsys - TSsys = -TSuniv = G G < 0 : spontaneous in forward direction G > 0 : non-spontaneous in forward direction G = 0 : System is in equilibrium

Gibbs Free Energy  Why Gibbs free energy is useful in chemistry? Most chemical reactions take place under constant temperature and pressure conditions.  G relates to the system alone and allows us to avoid examination of Ssurr for the prediction of spontaneity.  Free energy of a chemical system decreases until it reaches a minimum value, where a state of equilibrium exists.

Gibbs Free Energy • Example : The reaction of sodium metal with water takes place according to the following equation. 2 Na (s) + 2 H2O (l) → 2 NaOH (aq) + H2(g) Is the reaction spontaneous? What is the sign of DG? What is the sign of DH? What is the sign of DS?

Standard Free Energy Change  Standard free energy of formation (Gfo) : Free energy change for the formation of 1 mol of compound from elements with all substances in their standard states.  standard state = pure compound at 25oC and 1 atm.  For solution, standard state is 1M solution  Gfo for pure elements are zero.  G is a state function !  Standard free energy change (Go) Go = Σ n Gfo (products) – Σ m Gfo (reactants)

Standard Free Energy Change • Example : What is the Go value of the following reaction? 2 Cdiamond (s) + O2 (g) → 2 CO (g) substanceDHfo (kJ/mol)DGfo(kJ/mol)So (J/K-mol) O2 0 0 205.0 C (diamond, s) 1.88 2.84 2.43 C (graphite, s) 0 0 5.69 CO2 (g) -393.5 -394.4 213.6

Standard Free Energy Change • Example : What is Go for the following reaction at 25oC using the values of Ho and So provided? CH4 (g) + 2O2 (g) → CO2(g) + 2H2O (g) substanceHfo(kJ/mol)So (J/K-mol) O2 (g) 0 205.0 CH4 (g) -74.80 186.3 CO2 (g) -393.5 213.6 H2O (g) -241.8 188.3

Standard Free Energy Change • Example : What is Go for the following reaction at 25oC using the values of Go provided? CH4 (g) + 2O2 (g) → CO2(g) + 2H2O (g) substanceGfo(kJ/mol) CH4 (g) -50.8 CO2 (g) -394.4 H2O (g) -228.57

Free Energy and Temperature DG = DH - TDS DG DH DS + - + - + - - - sign depends on T ! low T => DG is negative high T => DG is positve + + sign depends on T ! low T => DG is positive high T => DG is negative

Free Energy and Temperature DG = DH - TDS H2O (s) → H2O (l) spontaneous at 298 K (25oC) H > 0, S > 0 and G < 0 TS > H (at 298 K) Which is larger, H or TS ? If you decrease the temperature, the difference between TS and H becomes smaller and, eventually, TS < H. At that point, the process becomes no longer spontaneous (G > 0) What happens when G = 0? G = 0 at melting point (equilibrium)

Free Energy and Temperature At the normal melting point, the Gibbs free energies of the solid and liquid phase of any substance are equal: at 0oC H2O (s) → H2O (l) DGo = 0 at -117oC DGo = 0 C2H5OH (s) C2H5OH(l) At the normal boiling point, the Gibbs free energies of the liquid and gas phase of any substance are equal: at 100oC DGo = 0 H2O (l) → H2O (g) at 79oC DGo = 0 C2H5OH (l) C2H5OH(g)

Free Energy and Temperature • Example : Determine the temperature at which the following reaction will become spontaneous in the opposite direction. Assume that H and S do not change with temperature. CH4 (g) + 2O2 (g) → CO2(g) + 2H2O (g)

Free Energy and Temperature  Example : Use the enthalpy of fusion (Hofus) and enthalpy of vaporization (Hovap) to calculate the values of Sofus and Sovap for 1 mol of water. (Hofus = 6.02 kJ/mol, Hovap = 40.7 kJ.mol)

Chemistry 101 : Chap. 19