Respuesta :
Explanation:
Concentration of [tex]KNO_{2}[/tex] is 0.278 M and it is completely ionized into [tex]K^{+}[/tex] and [tex]NO^{-}_{2}[/tex].
This means that [tex][KNO_{2}][/tex] = [tex][NO_{2}][/tex] = 0.278 M
It is given that concentration of [tex]HNO_{2}[/tex] is 0.222 M.
As [tex]HNO_{2}[/tex] is a weak acid. Therefore, its dissociation will be as follows.
[tex]HNO_{2}(aq) \rightarrow H^{+}(aq) + NO^{-}_{2}(aq)[/tex]
Initially : 0.222 M 0 0.278 M
Change : - x +x +x
Equilibrium : 0.222 M - x x 0.278 M + x
Therefore, dissociation constant for this reaction will be as follows.
[tex]K_{a} = \frac{[H^{+}][NO^{-}_{2}]}{[HNO_{2}]}[/tex]
Hence, putting the given values into the above formula as follows.
[tex]K_{a} = \frac{[H^{+}][NO^{-}_{2}]}{[HNO_{2}]}[/tex]
[tex]4.50 \times 10^{-4} = \frac{x \times (0.278 + x)}{(0.222 - x)}[/tex]
x = 0.00036
As, [tex][H^{+}][/tex] is 0.00036 M. Therefore, percentage ionization of [tex]HNO_{2}[/tex] will be calculated as follows.
% ionization of [tex]HNO_{2}[/tex] = [tex]\frac{[H^{+}]}{[HNO_{2}]} \times 100[/tex]
= [tex]\frac{0.00036 M}{0.222 M} \times 100[/tex]
= 0.16 %
Thus, we can conclude that % ionization of [tex]HNO_{2}[/tex] is 0.16%.
