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Chapter 16.1 and 2
Aqueous Solutions and the concept of pH
andDetermining pH and
Titration
Acid-Base Titration and pH
1. Describe the self-ionization of water.2. Define pH, and give the pH of a
neutral solution at 25⁰C.3. Explain and use the pH scale.4. Given [H3O+] or [OH-], find pH.
5. Given pH, find [H3O+] or [OH-].
Objectives
Two water molecules produce a hydronium ion and a hydroxide ion by transfer of a protonH2O(l) + H2O(l) H3O+ (aq) + OH- (aq)In pure water, at 25⁰C
[H3O+] = 1.0 x 10-7 M[OH-] = 1.0 x 10-7 M
Kw = [H3O+] [OH-] = [1.0 x 10-7 M] [1.0 x 10-7 M] = 1.0 x 10-14 M2
Neutral, Acidic, or Basic [H3O+] = [OH-] neutral
1.0 x 10-7 M 1.0 x 10-7 M [H3O+] > [OH-] acidic
1.0 x 10-4 M 1.0 x 10-10 M [H3O+] < [OH-] basic
1.0 x 10-10 M 1.0 x 10-4 M
Self-ionization of water
At 25°C,Kw = [H3O+][OH−] = (1.0 × 10−7)(1.0 × 10−7) = 1.0
× 10−14
Kw increases as temperature increases
NaOH(s) Na+ (aq) + OH- (aq)
1 mol 1 mol 1 mol
1.0 x 10-2 mol NaOH 1 mol OH- 1.o x 10-2 mol OH-
L solution 1 mol NaOH L solution
= 1.0 x 10-2 M OH-
Monoprotic / Diprotic
H2SO4(l) + 2H2O(l) 2H3O+ (aq) + SO4-2 (aq)
1 mol 2 mol 2 mol 1 mol
1.0 x 10-2 mol H2SO4 2 mol H3O+ 2.o x 10-2 mol H3O+
L solution 1 mol H2SO4 L solution
= 2.0 x 10-2 M H3O+
x =
x =
Strong acids and bases are considered completely ionized or dissociated in weak aqueous solutions.
Calculating [H3O+] and [OH–]
s aq + aq2H O –NaOH( ) Na ( ) OH ( )
-14 -14
-123 – -2
1.0 10 1.0 10[H O ] 1.0 10 M
[OH ] 1.0 10
1 mol 1 mol 1 mol1.0 × 10−2 M NaOH solution has an [OH−] of 1.0 ×
10−2 M
The [H3O+] of this solution is calculated using Kw.Kw = [H3O+][OH−] = 1.0 × 10−14
If the [H3O+] of a solution is known, the [OH−] can be calculated using Kw.
[HCl] = 2.0 × 10−4 M[H3O+] = 2.0 × 10−4 M
Kw = [H3O+][OH−] = 1.0 × 10−14
-14 -14
– -10-4
3
1.0 10 1.0 10[OH ] 5.0 10 M
[H O ] 2.0 10
Some Strong Acids and Some Weak Acids
1) Sample Problem AA 1.0 10–4 M solution of HNO3 has been prepared for a laboratory experiment.a. Calculate the [H3O+] of this solution.
b. Calculate the [OH–].Sample Problem A SolutionGiven: Concentration of the solution = 1.0 × 10−4 M HNO3
Unknown: a. [H3O+] b. [OH−]
Solution:
HNO3 is a strong acidl + l aq + aq–
3 2 3 3HNO ( ) H O( ) H O ( ) NO ( )
3
3
mol HNOmolarity of HNO
1L solution
1 mol 1 mol 1 mol 1 mol
3 3 3
33
mol HNO 1mol H O mol H Omolarity of H O
L solution 1mol HNO L solution
–14–
3
1.0 10[OH ]
[H O ]
a.
b. [H3O+][OH−] = 1.0 × 10−14
–43 3
3
–4–3 4
3
1.0 10 mol HNO 1mol H O
1 L solution 1mol HNO
1.0 10 mol H O
1 L solution1.0 10 M H O
-10
–14 –14–
-43
1.0 10 1.0 10[OH ]
[H O ] 1.0 101.0 10 M
a.
b.
The pH Scale
• The pH of a solution is defined as the negative of the common logarithm of the hydronium ion concentration, [H3O+].
pH = −log [H3O+]
example: a neutral solution has a [H3O+] = 1×10−7
The logarithm of 1×10−7 is −7.0.
pH = −log [H3O+] = −log(1 × 10−7) = −(−7.0) = 7.0
pH Values as Specified [H3O+]
• The pOH of a solution is defined as the negative of the common logarithm of the hydroxide ion concentration, [OH−].
pOH = −log [OH–]
example: a neutral solution has a [OH–] = 1×10−7
The pH = 7.0.
The negative logarithm of Kw at 25°C is 14.0.pH + pOH = 14.0
The pH Scale
Calculations Involving pH
There must be as many significant figures to the right of the decimal as there are in the number whose logarithm was found.
example: [H3O+] = 1 × 10−7
one significant figure
pH = 7.0
Using Logarithms in pH Calculations
Calculating pH from [H3O+]Sample Problem BWhat is the pH of a 1.0 10–3 M NaOH solution?
–14 –14-11
3 – -3
1.0 10 1.0 10[H O ] 1.0 10 M
[OH ] 1.0 10
Sample Problem B SolutionGiven: Identity and concentration of solution = 1.0 × 10−3
M NaOHUnknown: pH of solutionSolution: concentration of base → concentration of
OH− → concentration of H3O+ → pH
[H3O+][OH−] = 1.0 × 10−14
pH = −log [H3O+] = −log(1.0 × 10−11) = 11.00
pH = −log [H3O+]
log [H3O+] = −pH
[H3O+] = antilog (−pH)
[H3O+] = 10−pH
The simplest cases are those in which pH values are integers.
Calculating [H3O+] and [OH–] from pH
Sample Problem DDetermine the hydronium ion concentration of an
aqueous solution that has a pH of 4.0.
Sample Problem D SolutionGiven: pH = 4.0Unknown: [H3O+] Solution:
[H3O+] = 10−pH
[H3O+] = 1 × 10−4 M
pH Calculations and the Strength of Acids and Bases
The pH of solutions of weak acids and weak bases must be measured experimentally.
The [H3O+] and [OH−] can then be calculated from the measured pH values.
pH Values of Some Common Materials
1. Describe how an acid-base indicator functions.
2. Explain how to carry out an acid-base titration.
3. Calculate the molarity of a solution from titration data.
Determining pH and TitrationsSection 16.2 Objectives
Acid-base indicators are compounds whose colors are sensitive to pH.
Indicators and pH Meters
• Indicators change colors because they are either weak acids or weak bases.
– In + InH H
• HIn and In− are different colors.
• In acidic solutions, most of the indicator is HIn
• In basic solutions, most of the indicator is In–
• The pH range over which an indicator changes color is called its transition interval.
• Indicators that change color at pH lower than 7 are stronger acids than the other types of indicators. • They tend to ionize more than the others.
• Indicators that undergo transition in the higher pH range are weaker acids.• A pH meter determines the pH of a solution by
measuring the voltage between the two electrodes that are placed in the solution.
• The voltage changes as the hydronium ion concentration in the solution changes.
• Measures pH more precisely than indicators
Color Ranges of Indicators
Color Ranges of Indicators
Color Ranges of Indicators
Titration• Neutralization occurs when hydronium ions
and hydroxide ions are supplied in equal numbers by reactants.
H3O+(aq) + OH−(aq) 2H2O(l)
• Titration is the controlled addition and measurement of the amount of a solution of known concentration required to react completely with a measured amount of a solution of unknown concentration.
Equivalence Point• The point at which the two solutions used in a
titration are present in chemically equivalent amounts is the equivalence point.
• The point in a titration at which an indicator changes color is called the end point of the indicator.• Indicators that undergo transition at about pH 7 are used to determine the equivalence point of strong-acid/strong base titrations.
• The neutralization of strong acids with strong bases produces a salt solution with a pH of 7.
• Indicators that change color at pH lower than 7 are used to determine the equivalence point of strong-acid/weak-base titrations.
• The equivalence point of a strong-acid/weak-base titration is acidic.
• Indicators that change color at pH higher than 7 are used to determine the equivalence point of weak-acid/strong-base titrations.
• The equivalence point of a weak-acid/strong-base titration is basic.
Titration Curve for a Strong Acid and a Strong Base
Titration Curve for a Weak Acid and a Strong Base
Molarity and Titration
• The solution that contains the precisely known concentration of a solute is known as a standard solution.
• A primary standard is a highly purified solid compound used to check the concentration of the known solution in a titration.
• The standard solution can be used to determine the molarity of another solution by titration.
Performing a Titration, Part 1
Performing a Titration, Part 2
Molarity and Titration, continued
• To determine the molarity of an acidic solution, 10 mL HCl, by titration
1. Titrate acid with a standard base solution 20.00 mL of 5.0 × 10−3 M NaOH was titrated
2. Write the balanced neutralization reaction equation.
HCl(aq) + NaOH(aq) NaCl(aq) + H2O(l)
1 mol 1 mol 1 mol 1 mol
3. Determine the chemically equivalent amounts of HCl and NaOH.
4. Calculate the number of moles of NaOH used in the titration.• 20.0 mL of 5.0 × 10−3 M NaOH is
needed to reach the end point
-3-45.0 10 mol NaOH 1 L
20 mL 1.0 10 mol NaOH used1 L 1000 mL
-4-21.0 10 mol HCl 1000 mL
1.0 10 M HCl10.0 mL 1 L
5. amount of HCl = mol NaOH = 1.0 × 10−4 mol
6. Calculate the molarity of the HCl solution
Four Steps:
1. Start with the balanced equation for the neutralization reaction, and determine the chemically equivalent amounts of the acid and base.
2. Determine the moles of acid (or base) from the known solution used during the titration.
3. Determine the moles of solute of the unknown solution used during the titration.
4. Determine the molarity of the unknown solution.
Sample Problem FIn a titration, 27.4 mL of 0.0154 M Ba(OH)2 is added to a 20.0 mL sample of HCl solution of unknown concentration until the equivalence point is reached. What is the molarity of the acid solution?
Ba(OH)2 + 2HCl BaCl2 + 2H2O1 mol 2 mol 1 mol 2
mol
Given: volume and concentration of known solution
= 27.4 mL of 0.0154 M Ba(OH)2
Unknown: molarity of acid solutionSolution:1. balanced neutralization equation
chemically equivalent amounts
Sample Problem F Solution, continued
2. volume of known basic solution used (mL) amount of base used (mol)
22 2
mol Ba(OH) 1 LmL of Ba(OH) solution mol Ba(OH)
1 L 1000 mL
22
2 mol HClmol of Ba(OH) in known solution mol HCl
mol Ba(OH)
3. mole ratio, moles of base used moles of acid used from unknown solution
Sample Problem F Solution, continued
4. volume of unknown, moles of solute in unknown molarity of unknown
amount of solute in unknown solution (mol) 1000 mL
volume of unknown solution (mL) 1 L
molarity of unknown solution
Sample Problem F Solution, continued
1. 1 mol Ba(OH)2 for every 2 mol HCl.
22
-42
0.0154 mol Ba(OH)24.7 mL of Ba(OH) solution
1 L1 L
4.22 10 mol Ba(OH)1000 mL
–42
2
–4
2 mol HCl4.22 10 mol of Ba(OH)
1mol Ba(OH)
8.44 10 mol HCl
-2
-48.44 10 mol HCl 1000 mL
20.0 m4.22 10
L 1M l
LHC