pH, Ka, pKa & Kw Calculations | CIE A Level Chemistry Revision Notes 2025

Calculating pH, Ka, pKA & Kw

pH

The pH indicates the acidity or basicity of an acid or alkali
The pH scale goes from 0.0 to 14.0
- Acids have a pH below 7.0
- Pure water is neutral with a pH of 7.0
- Bases and alkalis have a pH above 7.0
pH can be calculated using:

pH = -log₁₀ [H⁺]

- where [H⁺] = concentration of H⁺ ions (mol dm^-3)
The pH can also be used to calculate the concentration of H⁺ ions in solution by rearranging the equation to:

[H⁺] = 10^-pH

Worked example

Calculating the pH of acids

Calculate the pH of ethanoic acid, at 298K, when the hydrogen ion concentration is 1.32 x 10^-3 mol dm^-3.

Answer

pH = -log [H⁺]
pH = -log 1.32 x 10^-3
pH = 2.9

K_a & pK_a

The K_a is the acidic dissociation constant
- It is the equilibrium constant for the dissociation of a weak acid at 298 K
For the partial ionisation of a weak acid HA, the equilibrium expression to find K_a is:

HA (aq) ⇌ H⁺ (aq) + A^- (aq)

K_a = $\frac{[H +] [A^{-}]}{[HA]}$

When writing the equilibrium expression for weak acids, the following assumptions are made:
- The concentration of hydrogen ions due to the ionisation of water is negligible
- The dissociation of the weak acid is so small that the concentration of HA is approximately the same as the concentration of A^-
The value of K_a indicates the extent of dissociation
- A high value of K_a means that:
  - The equilibrium position lies to the right
  - The acid is almost completely ionised
  - The acid is strongly acidic
- A low value of K_a means that:
  - The equilibrium position lies to the left
  - The acid is only slightly ionised (there are mainly HA and only a few H⁺ and A^- ions)
  - The acid is weakly acidic
Since K_a values of many weak acids are very low, pK_a values are used instead to compare the strengths of weak acids with each other

pK_a = -log₁₀ K_a

The less positive the pK_a value the more acidic the acid is

Worked example

Calculating the K_a & pK_a of weak acids

Calculate the K_a and pK_a values of 0.100 mol dm^-3 ethanoic acid at 298K which forms 1.32 x 10^-3 of H⁺ ions in solution.

Answer

Step 1: Write down the equation for the partial dissociation of ethanoic acid:
- CH₃COOH (aq) ⇌ H⁺ (aq) + CH₃COO^- (aq)

Step 2: Write down the equilibrium expression to find K_a:
- K_a = $\frac{[H^{+}] [{CH}_{3} {COO}^{-}]}{[{CH}_{3} COOH]}$

Step 3: Simplify the expression:
- The ratio of H⁺ to CH₃COO^- is 1:1
- The concentration of H⁺ and CH₃COO^- is, therefore, the same
- The equilibrium expression can be simplified to:
- K_a = $\frac{{[H^{+}]}^{2}}{[{CH}_{3} COOH]}$

Step 4: Substitute the values into the expression to find K_a:
- K_a = $\frac{{[1.32 \times 10^{- 3}]}^{2}}{[0.100]}$
- K_a = 1.74 x 10^-5
Step 5: Determine the units of K_a:
- K_a = $\frac{{[mol {dm}^{- 3}]}^{2}}{[mol {dm}^{- 3}]}$ = mol dm^-3
- Therefore, K_a is 1.74 x 10^-5 mol dm^-3
Step 6: Find pK_a:
- pK_a = - log₁₀K_a
- pK_a= - log₁₀ (1.74 x 10^-5)
- pK_a = 4.76

K_w

The K_w is the ionic product of water
- It is the equilibrium constant for the dissociation of water at 298 K
- Its value is 1.00 x 10^-14 mol² dm^-6
For the ionisation of water, the equilibrium expression to find K_w is:

H₂O (l) ⇌ H⁺ (aq) + OH^- (aq)

K_w = $\frac{[H^{+}] [{OH}^{-}]}{[H_{2} O]}$

As the extent of ionisation is very low, only small amounts of H⁺ and OH^-ions are formed
The concentration of H₂O can therefore be regarded as constant and removed from the K_w expression
The equilibrium expression therefore becomes:

K_w = [H⁺] [OH^-]

As the [H⁺] = [OH⁺] in pure water, the equilibrium expression can be further simplified to:

K_w = [H⁺]²

Worked example

Calculating the concentration of H⁺ of pure water

Calculate the concentration of H⁺ in pure water, using the ionic product of water

Answer

Step 1: Write down the equation for the partial dissociation of water:
- In pure water, the following equilibrium exists:

H₂O (l) ⇌ H⁺ (aq) + OH^- (aq)

Step 2: Write down the equilibrium expression to find K_w:
- K_w = $\frac{[H^{+}] [{OH}^{-}]}{[H_{2} O]}$

Step 3: Simplify the expression:
- Since the concentration of H₂O is constant, this expression can be simplified to:
- K_w = [H⁺] [OH^-]

Step 4: Further simplify the expression:
- The ratio of H⁺ to OH^- is 1:1
- The concentration of H⁺ and OH^- is, therefore, the same and the equilibrium expression can be further simplified to:
- K_w = [H⁺]²

Step 5: Rearrange the equation to find [H⁺]:
- [H⁺] = $\sqrt{K_{w}}$

Step 6: Substitute the values into the expression to find K_w:
- [H⁺] = $\sqrt{1.00 \times 10^{- 14}}$
- [H⁺] = 1.00 x 10^-7 mol dm^-3

Exam Tip

The greater the K_a value, the more strongly acidic the acid is
The greater the pK_a value, the less strongly acidic the acid is.
Also, you should be able to rearrange the following expressions:

pH = -log₁₀ [H⁺] ⇔ [H⁺] = 10^-pH

K_a = $\frac{[H^{+}] [A^{-}]}{[HA]}$ ⇔ [H⁺] = $\frac{K_{a} \times [HA]}{[A^{-}]}$

pK_a = - log₁₀K_a ⇔ K_a = 10^-pKa

pH, Ka, pKa & Kw Calculations (CIE A Level Chemistry)

Revision Note

Calculating pH, Ka, pKA & Kw

pH

Worked example

K_a & pK_a

Worked example

K_w

Worked example

Exam Tip

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pH, Ka, pKa & Kw Calculations (CIE A Level Chemistry)

Revision Note

pH

Ka & pKa

Kw

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Author: Philippa

K_a & pK_a

K_w