The first step in calculating the pH of a 0.97 M solution of carbonic acid (H2CO3) is to use the provided acid dissociation constant (Ka). Carbonic acid dissociates in water as follows:
H2CO3 ⇌ H+ + HCO3–
The expression for the acid dissociation constant (Ka) is:
Ka = rac{[H^+][HCO_3^-]}{[H_2CO_3]}
Here, we know that:
- [H2CO3] initially = 0.97 M
- Let ‘x’ be the concentration of H+ ions produced at equilibrium.
At equilibrium, the concentrations will be:
- [H2CO3] = 0.97 – x
- [H+] = x
- [HCO3–] = x
Substituting these into the Ka expression:
4.5 x 10-7 = rac{x imes x}{0.97 – x}
Since Ka is quite small compared to the concentration of the acid, we can assume that x is much smaller than 0.97. Thus, 0.97 – x is approximately 0.97:
4.5 x 10-7 = rac{x^2}{0.97}
Now, solve for x:
x2 = 4.5 x 10-7 × 0.97
x2 = 4.365 x 10-7
x ≈ 6.6 x 10-4
Now, since x represents [H+], we can calculate the pH:
pH = -log[H+]
pH = -log(6.6 x 10-4)
pH ≈ 3.18
Therefore, the pH of a 0.97 M solution of carbonic acid is approximately 3.18.