Chapter 15 Chemical Equilibrium

Chapter 15 Chemical Equilibrium
Lecture Presentation Chapter 15 Chemical Equilibrium © 2012 Pearson Education, Inc.

The Concept of Equilibrium
Chemical equilibrium occurs when a reaction and its reverse reaction proceed at the same rate. © 2012 Pearson Education, Inc.

The Concept of Equilibrium
As a system approaches equilibrium, both the forward and reverse reactions are occurring. At equilibrium, the forward and reverse reactions are proceeding at the same rate. Once equilibrium is achieved, the amount of each reactant and product remains constant © 2012 Pearson Education, Inc.

The Equilibrium Constant
Consider the generalized reaction aA + bB cC + dD The equilibrium expression for this reaction would be Kc = [C]c[D]d [A]a[B]b © 2012 Pearson Education, Inc.

The equilibrium constant Kp for the reaction
is 158 at 1000K. What is the equilibrium pressure of O2 if the PNO = atm and PNO = atm? 2NO2 (g) NO (g) + O2 (g) 2 Kp = 2 PNO PO PNO PO 2 = Kp PNO PO 2 = 158 x (0.400)2/(0.270)2 = 347 atm 14.2

Relationship Between Kc and Kp
Kp = Kc (RT)n where n = (moles of gaseous product)  (moles of gaseous reactant) © 2012 Pearson Education, Inc.

The equilibrium concentrations for the reaction between carbon monoxide and molecular chlorine to form COCl2 (g) at 740C are [CO] = M, [Cl2] = M, and [COCl2] = 0.14 M. Calculate the equilibrium constants Kc and Kp. CO (g) + Cl2 (g) COCl2 (g) [COCl2] [CO][Cl2] = 0.14 0.012 x 0.054 Kc = = 220 Kp = Kc(RT)Dn Dn = 1 – 2 = -1 R = T = = 347 K Kp = 220 x ( x 347)-1 = 7.7 14.2

Equilibrium Can Be Reached from Either Direction
It doesn’t matter whether we start with N2 and H2 or whether we start with NH3, we will have the same proportions of all three substances at equilibrium. © 2012 Pearson Education, Inc.

What Does the Value of K Mean?
If K>>1, the reaction is product-favored; product predominates at equilibrium. If K<<1, the reaction is reactant-favored; reactant predominates at equilibrium. © 2012 Pearson Education, Inc.

Manipulating Equilibrium Constants
The equilibrium constant of a reaction in the reverse reaction is the reciprocal of the equilibrium constant of the forward reaction: Kc = = at 100 C [NO2]2 [N2O4] N2O4(g) 2NO2(g) Kc = = 4.72 at 100 C [N2O4] [NO2]2 N2O4(g) 2NO2(g) © 2012 Pearson Education, Inc.

Manipulating Equilibrium Constants
The equilibrium constant of a reaction that has been multiplied by a number is the equilibrium constant raised to a power that is equal to that number: Kc = = at 100 C [NO2]2 [N2O4] N2O4(g) 2NO2(g) Kc = = (0.212)2 at 100 C [NO2]4 [N2O4]2 4NO2(g) 2N2O4(g) © 2012 Pearson Education, Inc.

‘ ‘ ‘ ‘ ‘ Kc = [C][D] [A][B] Kc = [E][F] [C][D] Kc A + B C + D Kc
C + D E + F [E][F] [A][B] Kc = A + B E + F Kc Kc = Kc ‘ x If a reaction can be expressed as the sum of two or more reactions, the equilibrium constant for the overall reaction is given by the product of the equilibrium constants of the individual reactions. 14.2

Sample Exercise 15.5 Combining Equilibrium Expressions
Given the reactions determine the value of Kc for the reaction Solution Analyze We are given two equilibrium equations and the corresponding equilibrium constants and are asked to determine the equilibrium constant for a third equation, which is related to the first two. Plan We cannot simply add the first two equations to get the third. Instead, we need to determine how to manipulate the equations to come up with the steps that will add to give us the desired equation. 15

Sample Exercise 15.5 Combining Equilibrium Expressions
Continued Solve If we multiply the first equation by 2 and make the corresponding change to its equilibrium constant (raising to the power 2), we get Reversing the second equation and again making the corresponding change to its equilibrium constant (taking the reciprocal) gives Now we have two equations that sum to give the net equation, and we can multiply the individual Kc values to get the desired equilibrium constant. 16

Heterogenous equilibrium applies to reactions in which reactants and products are in different phases. CaCO3 (s) CaO (s) + CO2 (g) Kc = ‘ [CaO][CO2] [CaCO3] [CaCO3] = constant [CaO] = constant Kc x ‘ [CaCO3] [CaO] Kc = [CO2] = Kp = PCO 2 The concentration of solids and pure liquids are not included in the expression for the equilibrium constant. 14.2

ICE At 12800C the equilibrium constant (Kc) for the reaction
Is 1.1 x If the initial concentrations are [Br2] = M and [Br] = M, calculate the concentrations of these species at equilibrium. Br2 (g) Br (g) Let x be the change in concentration of Br2 Br2 (g) Br (g) Initial (M) 0.063 0.012 ICE Change (M) -x +2x Equilibrium (M) x x [Br]2 [Br2] Kc = Kc = ( x)2 x = 1.1 x 10-3 Solve for x 14.4

Kc = ( x)2 x = 1.1 x 10-3 4x x = – x 4x x = 0 -b ± b2 – 4ac  2a x = ax2 + bx + c =0 x = x = Br2 (g) Br (g) Initial (M) Change (M) Equilibrium (M) 0.063 0.012 -x +2x x x At equilibrium, [Br] = x = M or M At equilibrium, [Br2] = – x = M 14.4

Sample Exercise 15.9 Calculating K from Initial and Equilibrium Concentrations
A closed system initially containing  103 M H2 and  103 M I2 at 448 C is allowed to reach equilibrium, and at equilibrium the HI concentration is 1.87  103 M. Calculate Kc at 448 C for the reaction taking place, which is Solution Analyze We are given the initial concentrations of H2 and l2 and the equilibrium concentration of HI. We are asked to calculate the equilibrium constant Kc for Solve First, we tabulate the initial and equilibrium concentrations of as many species as we can. We also provide space in our table for listing the changes in concentrations. As shown, it is convenient to use the chemical equation as the heading for the table. Second, we calculate the change in HI concentration, which is the difference Between the equilibrium and initial values: Plan We construct a table to find equilibrium concentrations of all species and then use the equilibrium concentrations to calculate the equilibrium constant. Change in [HI] = 1.87  103 M  0 = 1.87  103 M 21

Continued Third, we use the coefficients in the balanced equation to relate the change in [HI] to the changes in [H2] and [I2]: Fourth, we calculate the equilibrium concentrations of H2 and I2, using initial concentrations and changes in concentration. The equilibrium concentration equals the initial concentration minus that consumed: Our table now looks like this (with equilibrium concentrations in blue for emphasis): [H2] =  103 M   103 M =  103 M [I2] =  103 M   103 M =  103 M Notice that the entries for the changes are negative when a reactant is consumed and positive when a product is formed. 22

Continued Finally, we use the equilibrium-constant expression to calculate the equilibrium constant: 23

The Reaction Quotient (Q)
Q gives the same ratio the equilibrium expression gives, but for a system that is not at equilibrium. To calculate Q, one substitutes the initial concentrations on reactants and products into the equilibrium expression. aA + bB cC + dD Q = [Cinitial]c[Dinitial]d [Ainitial]a[Binitial]b © 2012 Pearson Education, Inc.

Qc > Kc system proceeds from right to left to reach equilibrium
Qc = Kc the system is at equilibrium Qc < Kc system proceeds from left to right to reach equilibrium 14.4

Sample Exercise 15.10 Predicting the Direction of Approach to Equilibrium
At 448 C the equilibrium constant Kc for the reaction is Predict in which direction the reaction proceeds to reach equilibrium if we start with 2.0  102 mol of HI, 1.0  102 mol of H2, and 3.0  102 of I2 in a 2.00-L container. Solution Analyze We are given a volume and initial molar amounts of the species in a reaction and asked to determine in which direction the reaction must proceed to achieve equilibrium. Plan We can determine the starting concentration of each species in the reaction mixture. We can then substitute the starting concentrations into the equilibrium-constant expression to calculate the reaction quotient, Qc. Comparing the magnitudes of the equilibrium constant, which is given, and the reaction quotient will tell us in which direction the reaction will proceed. Solve The initial concentrations are The reaction quotient is therefore Because Qc < Kc, the concentration of HI must increase and the concentrations of H2 and I2 must decrease to reach equilibrium; the reaction as written proceeds left to right to attain equilibrium. 26

Le Châtelier’s Principle
“If a system at equilibrium is disturbed by a change in temperature, pressure, or the concentration of one of the components, the system will shift its equilibrium position so as to counteract the effect of the disturbance.” © 2012 Pearson Education, Inc.

Changes in Concentration continued Remove Add Add Remove aA + bB cC + dD Change Shifts the Equilibrium Increase concentration of product(s) left Decrease concentration of product(s) right Increase concentration of reactant(s) right Decrease concentration of reactant(s) left 14.5

Changes in Volume and Pressure A (g) + B (g) C (g) Change Shifts the Equilibrium Increase pressure Side with fewest moles of gas Decrease pressure Side with most moles of gas Increase volume Side with most moles of gas Decrease volume Side with fewest moles of gas 14.5

Adding a Catalyst does not change K does not shift the position of an equilibrium system system will reach equilibrium sooner uncatalyzed catalyzed Catalyst does not change equilibrium constant or shift equilibrium. 14.5

Chapter 15 Chemical Equilibrium

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