FAD1018 W4 — Solubility Product

Week 4 lecture on solubility equilibria, covering dissolution/precipitation of ionic compounds, solubility product constant ($K_{sp}$), molar solubility, the ion product $Q$, selective precipitation, and the common-ion effect.

Learning Outcomes

At the end of this topic, students should be able to:

Identify soluble and insoluble compounds
Write solubility equilibrium equations
Define saturated solution, solubility, and molar solubility
Write solubility product expressions ($K_{sp}$)
Calculate $K_{sp}$ from solubility data and vice versa
Write and apply the solubility quotient $Q$ to predict precipitation
Understand separation of ions by fractional precipitation
Define and describe the common-ion effect using Le Chatelier's principle
Perform calculations involving common ions

1. Introduction to Solubility Equilibria

Dissolution and precipitation of ionic compounds are heterogeneous reactions — they involve equilibria between a solid phase and an aqueous phase.

Solubility Equilibrium Equation

Dissolving (ionization/dissociation):

[Ag+].[Cl-]

$$\text{AgCl}(s) \rightleftharpoons \text{Ag}^+(aq) + \text{Cl}^-(aq)$$

[Ca+2].[S-2]

$$\text{CaS}(s) \rightleftharpoons \text{Ca}^{2+}(aq) + \text{S}^{2-}(aq)$$

[Ca+2].[F-].[F-]

$$\text{CaF}_2(s) \rightleftharpoons \text{Ca}^{2+}(aq) + 2\text{F}^-(aq)$$

Precipitating (reverse): $$\text{Ag}^+(aq) + \text{Cl}^-(aq) \rightleftharpoons \text{AgCl}(s)$$

2. Saturated Solutions

Type	Definition
Unsaturated	Dissolves less solute than needed to form a saturated solution; contains less solute than it has the capacity to dissolve
Saturated	Solution that contains the maximum possible quantity of dissolved solute at a given temperature; in equilibrium with undissolved solute
Supersaturated	Contains more solute than is present in a saturated solution (metastable)

For the dissolution of an ionic solid, the saturated solution is one in which the solution is in contact with undissolved solute. The equilibrium constant for this dissolution is called the solubility-product constant ($K_{sp}$).

Example:

[Ba+2].[O-]S(=O)(=O)[O-]

$$\text{BaSO}_4(s) \rightleftharpoons \text{Ba}^{2+}(aq) + \text{SO}_4^{2-}(aq)$$

$$K_{sp} = [\text{Ba}^{2+}][\text{SO}_4^{2-}]$$

3. Soluble and Insoluble Compounds (Recap)

Soluble Compounds	Insoluble Exceptions
All nitrate salts	None
All sulfate salts	$\text{PbSO}_4$, $\text{BaSO}_4$, $\text{CaSO}_4$
All chloride, bromide, iodide salts	$\text{Hg}_2\text{Cl}_2$, $\text{PbCl}_2$, $\text{AgCl}$ (and corresponding bromides/iodides)
$\text{Na}_2\text{CO}_3$, $\text{K}_2\text{CO}_3$, $(\text{NH}_4)_2\text{CO}_3$	Other carbonate salts
All ammonium, sodium, potassium salts	None
All Group 1 salts + $\text{NH}_4^+$	None
Acetates, chlorates, perchlorates	Most sulfides ($\text{S}^{2-}$)
Group 1 hydroxides and carbonates	Most hydroxides and carbonates
$\text{Ca(OH)}_2$ slightly soluble; Group 2 Sr and Ba hydroxides soluble

4. Solubility Product Constant, $K_{sp}$

$K_{sp}$ is the product of the molar concentrations of the constituent ions, each raised to the power of its stoichiometric coefficient.

General form:

[A].[B]

$$\text{A}_a\text{B}_b(s) \rightleftharpoons a\text{A}^{m+}(aq) + b\text{B}^{n-}(aq)$$

	Molar Solubility
	$s$

$$K_{sp} = [\text{A}^{m+}]^a[\text{B}^{n-}]^b = (as)^a(bs)^b$$

$$\text{unit } K_{sp} = (\text{concentration})^{a+b}$$

Pure solid is omitted (activity = 1)
The smaller the $K_{sp}$ value, the less soluble the compound in water
$K_{sp}$ is temperature-dependent

Writing $K_{sp}$ Expressions — Lecture Examples

[Pb+2].[Cl-].[Cl-]

$$\text{PbCl}2(s) \rightleftharpoons \text{Pb}^{2+}(aq) + 2\text{Cl}^-(aq)$$ $$K{sp} = [\text{Pb}^{2+}][\text{Cl}^-]^2$$

[Fe+3].[OH-].[OH-].[OH-]

$$\text{Fe(OH)}3(s) \rightleftharpoons \text{Fe}^{3+}(aq) + 3\text{OH}^-(aq)$$ $$K{sp} = [\text{Fe}^{3+}][\text{OH}^-]^3$$

[Ag+].[Ag+].[O-][Cr](=O)(=O)[O-]

$$\text{Ag}_2\text{CrO}_4(s) \rightleftharpoons 2\text{Ag}^+(aq) + \text{CrO}4^{2-}(aq)$$ $$K{sp} = [\text{Ag}^+]^2[\text{CrO}_4^{2-}]$$

[As+3].[As+3].[S-2].[S-2].[S-2]

$$\text{As}_2\text{S}3(s) \rightleftharpoons 2\text{As}^{3+}(aq) + 3\text{S}^{2-}(aq)$$ $$K{sp} = [\text{As}^{3+}]^2[\text{S}^{2-}]^3$$

[Ca+2].[Ca+2].[Ca+2].[O-]P(=O)([O-])[O-].[O-]P(=O)([O-])[O-]

$$\text{Ca}_3(\text{PO}_4)_2(s) \rightleftharpoons 3\text{Ca}^{2+}(aq) + 2\text{PO}4^{3-}(aq)$$ $$K{sp} = [\text{Ca}^{2+}]^3[\text{PO}_4^{3-}]^2$$

5. Solubility vs Molar Solubility

	Solubility	Molar Solubility
Definition	Maximum amount of solute (g) that dissolves in a known volume of solvent (L) to form a saturated solution	Number of moles of solute in 1 L (or 1 dm³) of saturated solution
Unit	g L⁻¹ or g dm⁻³	mol L⁻¹ or mol dm⁻³
Conversion	$\div$ Molar mass	$\times$ Molar mass

Key distinction: $K_{sp}$ is not the same as solubility. $K_{sp}$ is an equilibrium constant; solubility is a concentration.

6. Calculating $K_{sp}$ from Solubility

Sample: The solubility of PbS is $8.36 \times 10^{-14}$ mol L⁻¹. Calculate $K_{sp}$.

[Pb+2].[S-2]

$$\text{PbS}(s) \rightleftharpoons \text{Pb}^{2+}(aq) + \text{S}^{2-}(aq)$$

$$K_{sp} = (s)(s) = (8.36 \times 10^{-14})^2 = 6.99 \times 10^{-27} \text{ mol}^2\text{ L}^{-2}$$

Sample: Molar solubility of $\text{Pb(IO}_3)2$ is $4.0 \times 10^{-5}$ mol L⁻¹. Calculate $K{sp}$.

[Pb+2].[O-]I(=O)=O.[O-]I(=O)=O

$$\text{Pb(IO}_3)_2(s) \rightleftharpoons \text{Pb}^{2+}(aq) + 2\text{IO}_3^-(aq)$$

$$K_{sp} = (s)(2s)^2 = 4s^3 = 4(4.0 \times 10^{-5})^3 = 2.56 \times 10^{-13} \text{ mol}^3\text{ L}^{-3}$$

7. Calculating Solubility from $K_{sp}$

Sample: What are $[\text{Ag}^+]$ and $[\text{CrO}_4^{2-}]$ in a saturated solution of $\text{Ag}_2\text{CrO}4$? Given $K{sp} = 1.9 \times 10^{-12}$.

[Ag+].[Ag+].[O-][Cr](=O)(=O)[O-]

$$\text{Ag}_2\text{CrO}_4(s) \rightleftharpoons 2\text{Ag}^+(aq) + \text{CrO}_4^{2-}(aq)$$

$$K_{sp} = (2s)^2(s) = 4s^3 = 1.9 \times 10^{-12}$$

$$s = 7.8 \times 10^{-5} \text{ mol L}^{-1}$$

$$[\text{Ag}^+] = 2s = 1.6 \times 10^{-4} \text{ M}; \quad [\text{CrO}_4^{2-}] = s = 7.8 \times 10^{-5} \text{ M}$$

Sample: Calculate molar solubility of AgCl given $K_{sp} = 1.56 \times 10^{-10}$.

$$s = \sqrt{K_{sp}} = \sqrt{1.56 \times 10^{-10}} = 1.25 \times 10^{-5} \text{ M}$$

Solubility in g L⁻¹: $1.25 \times 10^{-5} \times 143.5 = 1.79 \times 10^{-3}$ g L⁻¹

8. Solubility Quotient, $Q$

The ion product $Q$ uses initial concentrations (not equilibrium concentrations):

$$Q = [\text{A}^+]_0[\text{B}^-]_0$$

The expression for $Q$ is the same form as $K_{sp}$.

Condition	Meaning
$Q < K_{sp}$	Unsaturated solution — no precipitate forms
$Q = K_{sp}$	Solution at saturation point (point of precipitation)
$Q > K_{sp}$	Supersaturated solution — precipitate forms

Predicting Precipitation — Lecture Examples

Example 1: $[\text{Mg}^{2+}] = 1.5 \times 10^{-6}$ M, $[\text{OH}^-] = 1.0 \times 10^{-4}$ M. Will $\text{Mg(OH)}2$ precipitate? ($K{sp} = 5.6 \times 10^{-12}$)

[Mg+2].[OH-].[OH-]

$$\text{Mg(OH)}_2(s) \rightleftharpoons \text{Mg}^{2+}(aq) + 2\text{OH}^-(aq)$$

$$Q = (1.5 \times 10^{-6})(1.0 \times 10^{-4})^2 = 1.5 \times 10^{-14}$$

$Q < K_{sp}$ → No precipitate forms (unsaturated)

Example 2: 200 mL of 0.004 M $\text{BaCl}_2$ + 600 mL of 0.008 M $\text{K}_2\text{SO}_4$. Will $\text{BaSO}4$ precipitate? ($K{sp} = 1.1 \times 10^{-10}$)

After mixing (total volume = 0.8 L):

$[\text{Ba}^{2+}] = 0.001$ M
$[\text{SO}_4^{2-}] = 0.006$ M

$$Q = (0.001)(0.006) = 6 \times 10^{-6}$$

$Q > K_{sp}$ → Precipitate forms (supersaturated)

Example 3: What $[\text{SO}_4^{2-}]$ is required to just begin precipitating $\text{BaSO}_4$ when $[\text{Ba}^{2+}] = 0.01$ M?

$$K_{sp} = [\text{Ba}^{2+}][\text{SO}_4^{2-}]$$ $$1.1 \times 10^{-10} = (0.01)[\text{SO}_4^{2-}]$$ $$[\text{SO}_4^{2-}] = 1.1 \times 10^{-8} \text{ M}$$

Precipitation begins when $[\text{SO}_4^{2-}] > 1.1 \times 10^{-8}$ M.

9. Selective Precipitation of Ions

Ions can be separated based on the different solubilities of their salts. Separation by using a reagent that forms a precipitate with one or more (but not all) ions is called selective precipitation.

Lecture example: Solution contains $1.0 \times 10^{-2}$ M $\text{Ag}^+$ and $2.0 \times 10^{-2}$ M $\text{Pb}^{2+}$. When $\text{Cl}^-$ is added:

$\text{AgCl}$ ($K_{sp} = 1.8 \times 10^{-10}$)
$\text{PbCl}2$ ($K{sp} = 1.7 \times 10^{-5}$)

Which precipitates first? $\text{AgCl}$ (smaller $K_{sp}$)

$[\text{Cl}^-]$ to begin $\text{AgCl}$ precipitation: $$[\text{Cl}^-] = \frac{1.8 \times 10^{-10}}{1.0 \times 10^{-2}} = 1.8 \times 10^{-8} \text{ M}$$

$[\text{Cl}^-]$ to begin $\text{PbCl}_2$ precipitation: $$[\text{Cl}^-] = \sqrt{\frac{1.7 \times 10^{-5}}{2.0 \times 10^{-2}}} = 2.9 \times 10^{-2} \text{ M}$$

Separation window: $\text{Ag}^+$ can be separated from $\text{Pb}^{2+}$ by keeping $[\text{Cl}^-]$ between $1.8 \times 10^{-8}$ M and $2.9 \times 10^{-2}$ M.

10. Common-Ion Effect

If one of the ions in a solution equilibrium is already dissolved in the solution, the equilibrium shifts to the left (Le Chatelier's principle) and the solubility of the salt decreases.

General statement: The solubility of a slightly soluble salt decreases in the presence of a second solute that provides a common ion.

Key point: At a given temperature, only the solubility is altered by the common-ion effect. The solubility product ($K_{sp}$), being an equilibrium constant, remains the same.

Lecture Examples

Example 1: Molar solubility of $\text{Mg(OH)}2$ in 0.1 M NaOH? ($K{sp} = 1.2 \times 10^{-11}$)

[Mg+2].[OH-].[OH-]

$$\text{Mg(OH)}_2(s) \rightleftharpoons \text{Mg}^{2+}(aq) + 2\text{OH}^-(aq)$$

	$\text{Mg(OH)}_2(s)$	$\text{Mg}^{2+}(aq)$	$2\text{OH}^-(aq)$
Initial (M)	—	0.0	0.1 (from NaOH)
Change (M)	$-s$	$+s$	$+2s$
Equilibrium (M)	—	$s$	$0.1 + 2s \approx 0.1$

$$K_{sp} = (s)(0.1)^2 = 1.2 \times 10^{-11}$$ $$s = 1.2 \times 10^{-9} \text{ M}$$

Example 2: Molar solubility of AgI in 0.274 M NaI? ($K_{sp} = 8.52 \times 10^{-17}$)

[Ag+].[I-]

$$\text{AgI}(s) \rightleftharpoons \text{Ag}^+(aq) + \text{I}^-(aq)$$

$$s = \frac{8.52 \times 10^{-17}}{0.274} = 3.11 \times 10^{-16} \text{ M}$$

In pure water: $s = \sqrt{8.52 \times 10^{-17}} = 9.23 \times 10^{-9}$ M

Molar solubility of AgI is much smaller in NaI due to the common ion $\text{I}^-$.

Example 3: $\text{CaF}2$ ($K{sp} = 3.9 \times 10^{-11}$)

In pure water: $s = 2.1 \times 10^{-4}$ M
In 0.010 M $\text{Ca}^{2+}$: $s = 3.1 \times 10^{-5}$ M
In 0.010 M $\text{F}^-$: $s = 3.9 \times 10^{-7}$ M

The effect of $\text{F}^-$ is more pronounced than $\text{Ca}^{2+}$ because $[\text{F}^-]$ appears to the second power in the $K_{sp}$ expression, whereas $\text{Ca}^{2+}$ appears to the first power.

Key Lecture Data: $K_{sp}$ Values at 25°C

Compound	$K_{sp}$
$\text{Al(OH)}_3$	$1.8 \times 10^{-33}$
$\text{BaCO}_3$	$8.1 \times 10^{-9}$
$\text{BaSO}_4$	$1.1 \times 10^{-10}$
$\text{CaCO}_3$	$8.7 \times 10^{-9}$
$\text{CaF}_2$	$4.0 \times 10^{-11}$
$\text{Ca(OH)}_2$	$8.0 \times 10^{-6}$
$\text{Ca}_3(\text{PO}_4)_2$	$1.2 \times 10^{-26}$
$\text{Fe(OH)}_3$	$1.1 \times 10^{-36}$
$\text{Mg(OH)}_2$	$1.2 \times 10^{-11}$
$\text{PbCl}_2$	$2.4 \times 10^{-4}$
$\text{PbCrO}_4$	$2.0 \times 10^{-14}$
$\text{PbS}$	$3.4 \times 10^{-28}$
AgCl	$1.6 \times 10^{-10}$
AgBr	$7.7 \times 10^{-13}$
AgI	$8.3 \times 10^{-17}$
$\text{Ag}_2\text{CrO}_4$	$1.4 \times 10^{-5}$
$\text{Ag}_2\text{S}$	$6.0 \times 10^{-51}$
$\text{Zn(OH)}_2$	$1.8 \times 10^{-14}$

Related Course Page

FAD1018 - Basic Chemistry II

[!warning] Variable exam presence Solubility Product has ~5–11% mark weight but was absent in 2023/24 and 2024/25 papers. May return this year.