[tex] pH = 13.5 [/tex]
Explanation:
Sodium hydroxide completely ionizes in water to produce sodium ions and hydroxide ions. Hydroxide ions are in excess and neutralize all acetic acid added by the following ionic equation:
[tex] \text{HAc} + \text{OH}^{-} \to \text{Ac}^{-} + \text{H}_2\text{O} [/tex]
The mixture would contain
if [tex] \text{Ac}^{-} [/tex] undergoes no hydrolysis; the solution is of volume [tex] 0.1 + 0.4 = 0.5 \; \text{L} [/tex] after the mixing. The two species would thus be of concentration [tex] 0.30 \; \text{mol} \cdot \text{L}^{-1} [/tex] and [tex] 0.10 \; \text{mol} \cdot \text{L}^{-1} [/tex], respectively.
Construct a RICE table for the hydrolysis of [tex] \text{Ac}^{-} [/tex] under a basic aqueous environment (with a negligible hydronium concentration.)
[tex] \begin{array}{cccccccc} \text{R} & \text{Ac}^{-}(aq) &+ & \text{H}_2\text{O}(aq) & \leftrightharpoons & \text{HAc}(aq) & + & \text{OH}^{-} (aq)\\ \text{I} & 0.10 \; \text{M} & & & & & &0.30 \; \text{M}\\ \text{C} & -x \; \text{M}& & & & +x \; \text{M}& & +x \; \text{M} \\ \text{E} & (0.10 - x) \; \text{M} & & & & x \; \text{M} & & (0.30 +x) \; \text{M} \end{array} [/tex]
The question supplied the acid dissociation constant [tex] pK_a [/tex]for acetic acid [tex] \text{HAc} [/tex]; however, calculating the hydrolysis equilibrium taking place in this basic mixture requires the base dissociation constant [tex] pK_b [/tex] for its conjugate base, [tex] \text{Ac}^{-} [/tex]. The following relationship relates the two quantities:
[tex] pK_{b} (\text{Ac}^{-}) = pK_{w} - pK_{a}( \text{HAc}) [/tex]
... where the water self-ionization constant [tex] pK_w \approx 14 [/tex] under standard conditions. Thus [tex] pK_{b} (\text{Ac}^{-}) = 14 - 4.7 = 9.3 [/tex]. By the definition of [tex] pK_b [/tex]:
[tex] [\text{HAc} (aq)] \cdot [\text{OH}^{-} (aq)] / [\text{Ac}^{-} (aq) ] = K_b = 10^{-pK_{b}} [/tex]
[tex] x \cdot (0.3 + x) / (0.1 - x) = 10^{-9.3} [/tex]
[tex] x = 1.67 \times 10^{-10} \; \text{M} \approx 0 \; \text{M} [/tex]
[tex] [\text{OH}^{-}] = 0.30 +x \approx 0.30 \; \text{M} [/tex]
[tex] pH = pK_{w} - pOH = 14 + \text{log}_{10}[\text{OH}^{-}] = 14 + \text{log}_{10}{0.30} = 13.5 [/tex]
