C h a p t e rC h a p t e r C h a p t e rC h a p t e r 16 Applications of Aqueous Equilibria Chemistry 4th Edition McMurry/Fay Chemistry 4th Edition McMurry/Fay.

C h a p t e rC h a p t e r C h a p t e rC h a p t e r 16 Applications of Aqueous Equilibria Chemistry 4th Edition McMurry/Fay Chemistry 4th Edition McMurry/Fay

Buffer Solutions01 A Buffer Solution : is a solution of a weak acid and a weak base (usually conjugate pair); both components must be present. A buffer solution has the ability to resist changes in pH upon the addition of small amounts of either acid or base. Buffers are very important to biological systems!

Buffer Solutions02 Base is neutralized by the weak acid. Acid is neutralized by the weak base.

Buffer Solutions03 Buffer solutions must contain relatively high concentrations of weak acid and weak base components to provide a high “buffering capacity”. The acid and base components must not neutralize each other. The simplest buffer is prepared from equal concentrations of an acid and its conjugate base.

Buffer Solutions04 a) Calculate the pH of a buffer system containing 1.0 M CH 3 COOH and 1.0 M CH 3 COONa. b) What is the pH of the system after the addition of 0.10 mole of HCl to 1.0 L of buffer solution? a) pH of a buffer system containing 1.0 M CH 3 COOH and 1.0 M CH 3 COO – Na + is: 4.74 (see earlier slide)

Buffer Solutions04 b) What is the pH of the system after the addition of 0.10 mole of HCl to 1.0 L of buffer solution? CH 3 CO 2 H (aq) + H 2 O (aq) CH 3 CO 2 – (aq) + H 3 O + (aq) I 1.01.0 0 add 0.10 mol HCl + 0.10 – 0.10 C -x -x +x E 1.1 – x 0.9 + x x K a = 1.8 x 10 -5 = = (0.9+x)(x) (0.9)x (1.1 – x) (1.1) x = ( 1.1 / 0.9 ) 1.8 x 10 -5 x = 2.2 x 10 -5 pH = 4.66 reacts w/

Water – No Buffer What is the pH after the addition of 0.10 mole of HCl to 1.0 L of pure water? HCl – strong acid, completely ionized. H + concentration will be 0.10 molar. pH will be –log(0.10) = 1.0 Adding acid to water: Δ pH = 7.0 - 1.0 = 6.0 pH units Adding acid to buffer: Δ pH = 4.74 - 4.66 = 0.09 pH units!! The power of buffers!

Titration: a procedure for determining the concentration of a solution using another solution of known concentration. Titrations involving strong acids or strong bases are straightforward, and give clear endpoints. Titration of a weak acid and a weak base may be difficult and give endpoints that are less well defined. Acid–Base Titrations01

The equivalence point of a titration is the point at which equimolar amounts of acid and base have reacted. (The acid and base have neutralized each other.) For a strong acid/strong base titration, the equivalence point should be at pH 7. Acid–Base Titrations02 H + (aq) + OH – (aq) → H 2 O (l) neutral

The equivalence point of a titration is the point at which equimolar amounts of acid and base have reacted. (The acid and base have neutralized each other.) Titration of a weak acid with a strong base gives an equivalence point with pH > 7. Acid–Base Titrations02 HA (aq) + OH – (aq) → H 2 O (l) + A – (aq) basic

Acid–Base Titration Examples03 Titration curve for strong acid–strong base: Note the very sharp endpoint (vertical line) seen with strong acid – strong base titrations. The pH is changing very rapidly in this region. add one drop of base: get a BIG change in pH

Titration of 0.10 M HCl03 Volume of Added NaOH 1. Starting pH (no NaOH added) 1.00 2. 20.0 mL (total) of 0.10 M NaOH. 1.48 3. 30.0 mL (total) of 0.10 M NaOH. 1.85 4. 39.0 mL (total) of 0.10 M NaOH. 2.90 5. 39.9 mL (total) of 0.10 M NaOH. 3.90 6. 40.0 mL (total) of 0.10 M NaOH. 7.00 7. 40.1 mL (total) of 0.10 M NaOH.10.10 8. 41.0 mL (total) of 0.10 M NaOH.11.08 9. 50.0 mL (total) of 0.10 M NaOH12.05 pH

Acid–Base Titrations04 pH at the equivalence point will always be >7 w/ weak acid/strong base Titration curve for weak acid–strong base: The endpoint (vertical line) is less sharp with weak acid – strong base titrations. strong acid weak acid strong acid equivalence point weak acid equivalence point

Acid–Base Titration Curves weak acid very weak acid With a very weak acid, the endpoint may be difficult to detect.

Acid–Base Titrations09 Strong Acid–Weak Base: The (conjugate) acid hydrolyzes to form weak base and H 3 O +. At equivalence point only the (conjugate) acid is present. pH at equivalence point will always be <7.

Aqueous Solubility Rules for Ionic Compounds A compound is probably soluble if it contains the cations: a. Li +, Na +, K +, Rb + (Group 1A on periodic table) b. NH 4 + A compound is probably soluble if it contains the anions: a. NO 3– (nitrate), CH 3 CO 2 – (acetate, also written C 2 H 3 O 2 – ) b. Cl –, Br –, I – (halides) except Ag +, Hg 2 2+, Pb 2+ halides c. SO 4 2– (sulfate) except Ca 2+, Sr 2+, Ba 2+, and Pb 2+ sulfates Other ionic compounds are probably insoluble. Solubility Equilibria01 Old way to analyze solubility. Answer is either “yes” or “no”.

Solubility Equilibria02 measure New method to measure solubility: Consider solution formation an equilibrium process: MCl 2 (s)  M 2+ (aq) + 2 Cl – (aq) Give equilibrium expression K c for this equation: K C = [M 2+ ][Cl – ] 2 K sp This type of equilibrium constant K c that measures solubility is called: K sp

Solubility Equilibria03 Solubility Product: is the product of the molar concentrations of the ions and provides a measure of a compound’s solubility. MX 2 (s)  M 2+ (aq) + 2 X – (aq) K sp = [M 2+ ][X – ] 2 “Solubility Product Constant”

Al(OH) 3 1.8 x 10 –33 BaCO 3 8.1 x 10 –9 BaF 2 1.7 x 10 –6 BaSO 4 1.1 x 10 –10 Bi 2 S 3 1.6 x 10 –72 CdS8.0 x 10 –28 CaCO 3 8.7 x 10 –9 CaF 2 4.0 x 10 –11 Ca(OH) 2 8.0 x 10 –6 Ca 3 (PO 4 ) 2 1.2 x 10 –26 Cr(OH) 3 3.0 x 10 –29 CoS4.0 x 10 –21 CuBr4.2 x 10 –8 CuI5.1 x 10 –12 Cu(OH) 2 2.2 x 10 –20 CuS6.0 x 10 –37 Fe(OH) 2 1.6 x 10 –14 Fe(OH) 3 1.1 x 10 –36 FeS6.0 x 10 –19 PbCO 3 3.3 x 10 –14 PbCl 2 2.4 x 10 –4 PbCrO 4 2.0 x 10 –14 PbF 2 4.1 x 10 –8 PbI 2 1.4 x 10 –8 PbS3.4 x 10 –28 MgCO 3 4.0 x 10 –5 Mg(OH) 2 1.2 x 10 –11 MnS3.0 x 10 –14 Hg 2 Cl 2 3.5 x 10 –18 HgS 4.0 x 10 –54 NiS 1.4 x 10 –24 AgBr 7.7 x 10 –13 Ag 2 CO 3 8.1 x 10 –12 AgCl 1.6 x 10 –10 Ag 2 SO 4 1.4 x 10 –5 Ag 2 S 6.0 x 10 –51 SrCO 3 1.6 x 10 –9 SrSO 4 3.8 x 10 –7 SnS 1.0 x 10 –26 Zn(OH) 2 1.8 x 10 –14 ZnS 3.0 x 10 –23 Solubility Equilibria - K sp Values04

Solubility Equilibria05 The solubility of calcium sulfate (CaSO 4 ) is found experimentally to be 0.67 g/L. Calculate the value of K sp for calcium sulfate. The solubility of lead chromate (PbCrO 4 ) is 4.5 x 10 –5 g/L. Calculate the solubility product of this compound. Calculate the solubility of copper(II) hydroxide, Cu(OH) 2, in g/L.

Equilibrium Constants - Review The reaction quotient (Q c ) is obtained by substituting initial concentrations into the equilibrium constant. Predicts reaction direction. Q c K c System forms more reactants (left)

Equilibrium Constants - Q c Predicting the direction of a reaction. Q c < K c Qc > KcQc > KcQc > KcQc > Kc

Solubility Equilibria06 We use the reaction quotient ( Q c ) to determine if a chemical reaction is at equilibrium: compare Q c and K c K sp values are also a type of equilibrium constant, but are valid for saturated solutions only. We can use “ion product” (IP) to determine whether a precipitate will form: compare IP and K sp

Solubility Equilibria06 Ion Product (IP): solubility equivalent of reaction quotient ( Q c ). It is used to determine whether a precipitate will form. IP < K sp IP = K sp IP > K sp Unsaturated (more solute can dissolve) Saturated solution Supersaturated; precipitate forms.

Solubility Equilibria07 A BaCl 2 solution (200 mL of 0.0040 M) is added to 600 mL of 0.0080 M K 2 SO 4. Will precipitate form? (K sp for BaSO 4 is 1.1 x 10 -10 ) 0.200 L x 0.0040 mol/L =.00080 moles Ba 2+ [Ba 2+ ] = 0.00080 mol  0.800 L = 0.0010 M 0.600 L x 0.0080 mol/L =.00480 moles SO 4 2– [SO 4 2– ] = 0.00480 mol  0.800 L = 0.0060 M [ Ba 2+ ] [ SO 4 2– ]

Solubility Equilibria07 IP= [ Ba 2+ ] 1 x [ SO 4 2– ] 1 = (0.0010) x (0.0060) = 6.00 x 10 -6 A BaCl 2 solution (200 mL of 0.0040 M) is added to 600 mL of 0.0080 M K 2 SO 4. Will precipitate form? (K sp for BaSO 4 is 1.1 x 10 -10 ) IP> K sp, so ppt forms

Solubility Equilibria07 Exactly 200 mL of 0.0040 M BaCl 2 are added to exactly 600 mL of 0.0080 M K 2 SO 4. Will a precipitate form? If 2.00 mL of 0.200 M NaOH are added to 1.00 L of 0.100 M CaCl 2, will precipitation occur?

The solubility product (K sp ) is an equilibrium constant; precipitation will occur when the ion product (IP) exceeds the K sp for a compound. If AgNO 3 is added to saturated AgCl, the increase in [Ag + ] will cause AgCl to precipitate. IP = [Ag + ] 0 [Cl – ] 0 > K sp The Common-Ion Effect and Solubility

The Common-Ion Effect and Solubility MgF 2 becomes less soluble as F - conc. increses

The Common-Ion Effect and Solubility CaCO 3 is more soluble at low pH.

Calculate the solubility of silver chloride (in g/L) in a 6.5 x 10 –3 M silver chloride solution. Calculate the solubility of AgBr (in g/L) in: (a) pure water (b) 0.0010 M NaBr The Common-Ion Effect and Solubility

C h a p t e rC h a p t e r C h a p t e rC h a p t e r 16 Applications of Aqueous Equilibria Chemistry 4th Edition McMurry/Fay Chemistry 4th Edition McMurry/Fay.

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C h a p t e rC h a p t e r C h a p t e rC h a p t e r 16 Applications of Aqueous Equilibria Chemistry 4th Edition McMurry/Fay Chemistry 4th Edition McMurry/Fay.

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