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ACIDS AND BASES. REVISE. Brønsted-Lowry acids and bases Amphoteric substances Conjugate acid base pairs Neutralisation. Neutral: pH = 7 ([H + ] = [OH - ]) Acidic: pH < 7 ([H + ] > [OH - ]) Basic: pH > 7 ([H + ] < [OH - ]). pH = -log [H + ] pOH = -log [OH - ]
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REVISE • Brønsted-Lowry acids and bases • Amphoteric substances • Conjugate acid base pairs • Neutralisation Neutral: pH = 7 ([H+] = [OH-]) Acidic: pH < 7 ([H+] > [OH-]) Basic: pH > 7 ([H+] < [OH-]) pH = -log [H+] pOH = -log [OH-] pH + pOH = 14 at 25oC Kw = [OH-][H+] Kw = 14.0 at 25oC Kw = KaKb
STRONG ACIDS AND BASES Strong acids and bases react nearly “completely” to produce H+ and OH- equilibrium constants are large e.g.: HCl H+ + Cl- Complete dissociation: large small Common strong acids: HCl, HBr, HI, H2SO4, HNO3, HClO4 (Why is HF not a strong acid?) Common strong bases: LiOH, NaOH, KOH, RbOH, CsOH, R4NOH
Example: Calculate the pH of 0.1M LiOH. Strong base Dissociates completely LiOH Li+ + OH- 0.1M 0 0 Start: 0 0.1M 0.1M Complete rxn: pOH = -log [OH-] = -log (0.1) = 1 pH = 14 - 1 = 13
Problem: What is the pH of 1x10-8 M KOH? As before: pOH = -log (1x10-8) = 8 pH = 14 – 8 = 6 BUT pH 6 acidic conditions and KOH is a strong base IMPOSSIBLE!!!!!!
Since the concentration of KOH is so low (1x10-8 M), we need to take the ionisation of water into account. In pure water [OH-] = 1x10-7 M, which is greater than the concentration of OH- from KOH. We do this by systematic treatment of equilibrium. Charge balance:[K+] + [H+] = [OH-] Mass balance: [K+] = 1x10-8 M Equilibria: [H+][OH-] = Kw = 1x10-14 M 3 equations + 3 unknowns solve simultaneously Find: pH = 7.02 Hint: You end up with a quadratic equation which you solve using the formula.
Also note that: • Only pure water produces 1x10-7 M H+ and OH-. • If there is say 1x10-4 M HBr in solution, • pH = 4 and [OH-] = 1x10-10 M • But the only source of OH- is from the dissociation of water. if water produces 1x10-10 M OH- it can only produce 1x10-10 M H+ due to the dissociation of water. pH in this case is due mainly to the dissociation ofHBr and not the dissociation of water. • It is thus important to look at the concentration • of acid and bases present.
Some guidelines regarding the concentrations of acids and bases: • When conc > 1x10-6 M • calculate pH as usual • When conc < 1x10-8 M • pH = 7 • (there is not enough acid or base to affect the pH of water) • When conc 1x10-8 - 1x10-6 M • Effect of water ionisation and added acid and bases are comparable, thus: • use the systematic treatment of equilibrium approach.
WEAK ACIDS AND BASES Weak acids and bases react only “partially” to produce H+ and OH- equilibrium constants are small HA H+ + A- Partial dissociation small large Acid dissociation constant • Common weak acids: • carboxylic acids • (e.g. acetic acid = CH3COOH) • ammonium ions • (e.g. RNH3+, R2NH2+, R3NH+) • Common weak bases: • carboxylate anions • (e.g. acetate = CH3COO-) • amines • (e.g. RNH2, R2NH, R3N)
Base hydrolysis: B + H2O BH+ + OH- • Weak base • partial dissociation • Kb small base hydrolysis constant/ base “dissociation” constant NOTE: pKa = -log Ka pKb = -log Kb As K increases, its p-function decreases and vice versa.
Problem: Find the pH of a solution of formic acid given that the formal concentration is 2 M and Ka = 1.80x10-4. HCOOH H+ + HCOO- H2O H+ + OH- Systematic treatment of equilibria: Charge balance: [H+] = [HCOO-] + [OH-] Mass balance: 2 M = [HCOOH] + [HCOO-] Equilibria: 4 equations 4 unknowns difficult to solve
Make an assumption: [H+] due to acid dissociation [H+] due to water dissociation Produces HCOO- Produces OH- [HCOO-] large [OH-] small [HCOO-] >> [OH-] Charge balance: [H+] [HCOO-]
Charge balance: [H+] [HCOO-] Mass balance: 2 M = [HCOOH] +[H+] Equilibria: Let [H+] = [HCOO-] = x Or x = -0.019 No negative conc’s [H+] = [HCOO-] = 0.019 M pH = 1.7
OR since [HCOOH] > 1x10-6, we can calculate pH as usual Weak acid equilibrium conditions HCOOH H+ + HCOO- 2M 0 0 Start: 2-x x x Equilibrium: Solve as before
[HCOO-] 0.019 M = = F 2 M FRACTION OF DISSOCIATION, Fraction of acid in the form A- For the above problem: = 0.0095 Acid is 0.95% dissociated at 2 M formal concentration Weak electrolytes dissociate more as they are diluted.
B + H2O BH+ + OH- WEAK BASE EQUILIBRIA Charge balance: [BH+] = [OH-] Mass balance: F = [B] + [BH+] Equilibria: Let [BH+] = [OH-] = x FRACTION OF ASSOCIATION
CONJUGATE ACIDS AND BASES Relationship between Ka and Kb for a conjugate acid- base pair: Ka.Kb = Kw = 1x10-14 at 25oC • If Ka is very large (strong acid) Then Kb must be very small (weak conjugate base) And vice versa Base so weak it is not a base at all in water If Ka is very small, say 1x10-6 (weak acid) Then Kb must be small, 1x10-8(weak conjugate base) Greater acid strength, weaker conjugate base strength, and vice versa.
Kw 1x10-14 Kb = = Ka 5 .70x10-10 Problem: Calculate the pH of 0.1 M NH3, given that pKa = 9.244 for ammonia. Kb NH3 + H2O NH4+ + OH- base acid pKa = -log Ka Ka = 5.70x10-10 = 1.75 x10-5
x2 x2 Kb = = F - x 0.1 - x Problem: Calculate the pH of 0.1 M NH3, given that pKa = 9.244 for ammonia. Where x = [OH-] = [NH+] = 1.75 x10-5 Solve for x using the quadratic equation Negative value discarded Find x = 1.31x10-3 M = [OH-] pOH = -log [OH-] = 2.88 pH = 14 – 2.88 = 11.12
BUFFERS Mixture of an acid and its conjugate base. Buffer solution resists change in pH when acids or bases are added or when dilution occurs. Mix: A moles of weak acid + B moles of conjugate base • Find: • moles of acid remains close to A, and • moles of base remains close to B Very little reaction HA H+ + A- Le Chatelier’s principle
HENDERSON-HASSELBALCH EQUATION For acids: When [A-] = [HA], pH = pKa For bases: pKa applies to this acid Kb B + H2O BH+ + OH- Ka base acid acid base
Why does a buffer resist change in pH when small amounts of strong acid or bases is added? ? The acid or base is consumed by A- or HA respectively A buffer has a maximum capacity to resist change to pH. Buffer capacity, : Measure of how well solution resists change in pH when strong acid/base is added. Larger more resistance to pH change
A buffer is most effective in resisting changes in pH when: pH = pKa i.e.: [HA] = [A-] Choose buffer whose pKa is as close as possible to the desired pH. pKa 1 pH unit
NH3 + H2O NH4+ + OH- Ka base acid (0.200) pH = 9.244 + log (0.300) Problem: Calculate the pH of a solution containing 0.200 M NH3 and 0.300 M NH4Cl given that the acid dissociation constant for NH4+ is 5.7x10-10. pKa = 9.244 pKa applies to this acid pH = 9.07
POLYPROTIC ACIDS AND BASES Can donate or accept more than one proton. In general: Diprotic acid: H2L HL- + H+Ka1 K1 HL-L2- + H+Ka2 K2 Diprotic base: L2- + H2O HL- + OH- Kb1 HL-+ H2OH2L + OH- Kb2 Relationships between Ka’s and Kb’s: Ka1. Kb2 = Kw Ka2. Kb1 = Kw
Using pKa values and mass balance equations, the fraction of each species can be determined at a given pH.
ACID-BASE TITRATIONS We will construct graphs to see how pH changes as titrant is added. • Start by: • writing chemical reaction between titrant and analyte • using the reaction to calculate the composition and pH after each addition of titrant
TITRATION OF STRONG BASE WITH STRONG ACID Example: Titrate 50.00 ml of 0.02000 M KOH with 0.1000 M HBr. HBr + KOH KBr + H2O What is of interest to us in an acid-base titration: H+ + OH-H2O Mix strong acid and strong base reaction goes to completion H+ + OH-H2O
C1V1 C2V2 = n1 n2 Example: Titrate 50.00 ml of 0.02000 M KOH with 0.1000 M HBr. * Calculate volume of HBr needed to reach the equivalence point, Veq: But n1 = n2 = 1 CHBrVeq = CKOHVKOH (0.1000 M)Veq = (0.02000 M)(50.00 ml) Veq = 10.00 ml
There are 3 parts to the titration curve: 1 • Before reaching the equivalence point • excess OH- present • At the equivalence point • [H+] = [OH-] 2 3 • After reaching the equivalence point • excess H+ present
nunreacted COH- = Vtotal • Before reaching the equivalence point • excess OH- present HBr + KOH KBr + H2O Starting nOH- = (0.02 M)(0.050 L) = 1x10-3 mol Say 2.00 ml HBr has been added. nH+ added = (0.1 M)(0.002 L) = 2x10-4 mol COH- = 0.01538 M Vtotal = 50 + 2 mL = 52 mL = 0.052 L • nOH- unreacted = 8x10-4 mol Kw = [H+][OH-] 1x10-14 = [H+](0.01538 M) [H+] = 6.500x10-13 M pH = 12.19
At the equivalence point • nH+ = nOH- pH is determined by dissociation of H2O: H2O H+ + OH- x x Kw = [H+][OH-] 1x10-14 = x2 x = 1x10-7 M [H+] = 1x10-7 M pH = 7 pH = 7 at the equivalence point ONLY for strong acid – strong base titrations!!
nexcess CH+ = Vtotal • After reaching the equivalence point • excess H+ present HBr + KOH KBr + H2O Say 10.10 ml HBr has been added. Starting nOH- = 1x10-3 mol nH+ added = (0.1 M)(0.0101 L) = 1.010x10-3 mol CH+ = 1.664x10-4 M pH = 3.78 • nH+ excess = 1x10-5 mol Vtotal = 50 + 10.1 mL = 60.1 mL = 0.0601 L
Note: A rapid change in pH near the equivalence point occurs. Equivalence point where: • slope is greatest • second derivative is • zero (point of inflection)
Calculate titration curve by calculating pH values after a number of additions of HBr.
TITRATION OF WEAK ACID WITH STRONG BASE Example: Titrate 50.00 ml of 0.02000 M formic acid with 0.1000 M NaOH. HCO2H + NaOH HCO2Na + H2O OR HCO2H + OH- HCO2- + H2O HA A- pKa = 3.745 Equilibrium constant so large reaction “goes to completion” after each addition of OH- Ka = 1.80x10-4 Kb = 5.56x10-11 Strong and weak react completely
C1V1 C2V2 = n1 n2 Example: Titrate 50.00 ml of 0.02000 M formic acid with 0.1000 M NaOH. HCO2H + OH- HCO2- + H2O * Calculate volume of NaOH needed to reach the equivalence point, Veq: But n1 = n2 = 1 CNaOHVeq = CFAVFA (0.1000 M)Veq = (0.02000 M)(50.00 ml) Veq = 10.00 ml
Before base is added HA and H2O present. HAweak acid, pH determined by equilibrium: • HA H+ + A- Ka There are 4 parts to the titration curve: • From first addition of NaOH to immediately before equivalence point mixture of unreacted HA and A- • HA + OH- A- + H2O • BUFFER!! use Henderson-Hasselbalch eqn for pH 2 1
At the equivalence point • all HA converted to A-. A- is a weak base whose pH is determined by reaction: • A- + H2O HA + OH- Kb 4 3 4) Beyond the equivalence point excess OH- added to A-. Good approx: pH determined by strong base (neglect small effect from A-)
HA H+ + A- Ka = 1.80x10-4 F- x x x x2 1.80x10-4 = 0.02 - x • Before base is added • HA and H2O present. HA = weak acid. x2 + 1.80x10-4x – 3.60x10-6 = 0 x = 1.81x10-3 [H+] = 1.81x10-3 pH = 2.47
- Start 1x10-3 2x10-4 End 8x10-4 - 2x10-4 2x10-4 pH = 3.745 + log 8x10-4 • From first addition of NaOH to immediately before equivalence point mixture of unreacted HA and A- . BUFFER!! HCO2H + OH- HCO2- + H2O Say 2.00 ml NaOH has been added. Starting nHA = (0.02 M)(0.05 L) = 1x10-3 mol nOH- added = (0.1 M)(0.002 L) = 2x10-4 mol HA + OH- A- + H2O pH = 3.14
Special condition: When volume of titrant = ½ Veq pH = pKa Since: nHA = nA-
- Start 1x10-3 1x10-3 End - - 1x10-3 • At the equivalence point • all HA converted to A-. A- = weak base. (nHA = nNaOH) Starting nHA = 1x10-3 mol HA + OH- A- + H2O nOH- = 1x10-3 mol • Solution contains just A- a solution of weak base
nA- 1x10-3 mol FA- = = V 0.060 L x2 5.56x10-11 = 0.0167 - x Kb = 5.56x10-11 A- + H2O HA + OH- F- x x x Vtotal = 50 + 10 mL = 60 mL = 0.060 L = 0.0167 M [OH-] = 9.63x10-7 M x2 + 5.56x10-11x – 9.27x10-13 = 0 pOH = 6.02 x = 9.63x10-7 pH = 7.98 pH is slightly basic at equivalence point for strong base-weak acid titrations
Titration curve depends on Ka of HA. As HA becomes a weaker acid the inflection near the equivalence point decreases until the equivalence point becomes too shallow to detect not practical to titrate an acid or base that is too weak.
Titration curve depends on extent of dilution of HA. As HA becomes a more dilute the inflection near the equivalence point decreases until the equivalence point becomes too shallow to detect not practical to titrate a very dilute acid or base.
TITRATION OF WEAK BASE WITH STRONG ACID This is the reverse of the titration of weak base with strong acid. The titration reaction is: B + H+ BH+ Recall: Strong and weak react completely
Before acid is added • B and H2O present. • B weak base pH determined by equilibrium: • B + H2O BH+ + OH- Kb F-x x x There are 4 parts to the titration curve:
