13.4 Equilibrium calculations (Page 3/11)

Chemistry Page 3 / 11

Calculation of an equilibrium constant

Iodine molecules react reversibly with iodide ions to produce triiodide ions.

I_{2} (a q) + I^{−} (a q) ⇌ I_{3}^{−} (a q)

If a solution with the concentrations of I ₂ and I ⁻ both equal to 1.000 $\times$ 10 ⁻³ M before reaction gives an equilibrium concentration of I ₂ of 6.61 $\times$ 10 ⁻⁴ M , what is the equilibrium constant for the reaction?

Solution

We will begin this problem by calculating the changes in concentration as the system goes to equilibrium. Then we determine the equilibrium concentrations and, finally, the equilibrium constant. First, we set up a table with the initial concentrations, the changes in concentrations, and the equilibrium concentrations using − x as the change in concentration of I ₂ .

This table has two main columns and four rows. The first row for the first column does not have a heading and then has the following in the first column: Initial concentration ( M ), Change ( M ), Equilibrium concentration ( M ). The second column has the header, “I subscript 2 plus sign I superscript negative sign equilibrium arrow I subscript 3 superscript negative sign.” Under the second column is a subgroup of three rows and three columns. The first column has the following: 1.000 times 10 to the negative third power, negative x, [ I subscript 2 ] subscript i minus x. The second column has the following: 1.000 times 10 to the negative third power, negative x, [ I superscript negative sign ] subscript i minus x. The third column has the following: 0, positive x, [ I superscript negative sign ] subscript i plus x.

Since the equilibrium concentration of I ₂ is given, we can solve for x . At equilibrium the concentration of I ₂ is 6.61 $\times$ 10 ⁻⁴ M so that

1.000 \times 10^{−3} - x = 6.61 \times 10^{−4}

x = 1.000 \times 10^{−3} - 6.61 \times 10^{−4}

= 3.39 \times 10^{−4} M

Now we can fill in the table with the concentrations at equilibrium.

We now calculate the value of the equilibrium constant.

K_{c} = Q_{c} = \frac{[I_{3}^{−}]}{[I_{2}] [I^{−}]}

= \frac{3.39 \times 10^{−4} M}{(6.61 \times 10^{−4} M) (6.61 \times 10^{−4} M)} = 776

Check your learning

Ethanol and acetic acid react and form water and ethyl acetate, the solvent responsible for the odor of some nail polish removers.

C_{2} H_{5} OH + {CH}_{3} {CO}_{2} H ⇌ {CH}_{3} {CO}_{2} C_{2} H_{5} + H_{2} O

When 1 mol each of C ₂ H ₅ OH and CH ₃ CO ₂ H are allowed to react in 1 L of the solvent dioxane, equilibrium is established when $\frac{1}{3}$ mol of each of the reactants remains. Calculate the equilibrium constant for the reaction. (Note: Water is not a solvent in this reaction.)

Answer:

K _c = 4

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Calculation of a missing equilibrium concentration

If we know the equilibrium constant for a reaction and know the concentrations at equilibrium of all reactants and products except one, we can calculate the missing concentration.

Calculation of a missing equilibrium concentration

Nitrogen oxides are air pollutants produced by the reaction of nitrogen and oxygen at high temperatures. At 2000 °C, the value of the equilibrium constant for the reaction,

N_{2} (g) + O_{2} (g) ⇌ 2 NO (g),

is 4.1

\times

10 ⁻⁴ . Find the concentration of NO( g ) in an equilibrium mixture with air at 1 atm pressure at this temperature. In air, [N ₂ ] = 0.036 mol/L and [O ₂ ] 0.0089 mol/L.

Solution

We are given all of the equilibrium concentrations except that of NO. Thus, we can solve for the missing equilibrium concentration by rearranging the equation for the equilibrium constant.

K_{c} = Q_{c} = \frac{{[NO]}^{2}}{[N_{2}] [O_{2}]}

{[NO]}^{2} = K_{c} [N_{2}] [O_{2}]

[NO] = \sqrt{K_{c} [N_{2}] [O_{2}]}

= \sqrt{(4.1 \times 10^{−4}) (0.036) (0.0089)}

= \sqrt{1.31 \times 10^{−7}}

= 3.6 \times 10^{−4}

Thus [NO] is 3.6 $\times$ 10 ⁻⁴ mol/L at equilibrium under these conditions.

We can check our answer by substituting all equilibrium concentrations into the expression for the reaction quotient to see whether it is equal to the equilibrium constant.

Q_{c} = \frac{{[NO]}^{2}}{[N_{2}] [O_{2}]}

= \frac{{(3.6 \times 10^{−4})}^{2}}{(0.036) (0.0089)}

Q_{c} = 4.0 \times 10^{−4} = K_{c}

The answer checks; our calculated value gives the equilibrium constant within the error associated with the significant figures in the problem.

Check your learning

The equilibrium constant for the reaction of nitrogen and hydrogen to produce ammonia at a certain temperature is 6.00

\times

10 ⁻² . Calculate the equilibrium concentration of ammonia if the equilibrium concentrations of nitrogen and hydrogen are 4.26 M and 2.09 M , respectively.

Answer:

1.53 mol/L

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Source: OpenStax, Chemistry. OpenStax CNX. May 20, 2015 Download for free at http://legacy.cnx.org/content/col11760/1.9

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