Respuesta :
The given question is incomplete. The complete question is as follows.
Sodium sulfate is slowly added to a solution containing 0.0500 M [tex]Ca^{2+}(aq)[/tex] and 0.0390 M [tex]Ag^{+}(aq)[/tex]. What will be the concentration of [tex]Ca^{2+}[/tex](aq) when [tex]Ag_{2}SO_{4}(s)[/tex] begins to precipitate? What percentage of the [tex]Ca^{2+}(aq)[/tex] can be separated from the Ag(aq) by selective precipitation?
Explanation:
The given reaction is as follows.
[tex]Ag_{2}SO_{4} \rightleftharpoons 2Ag^{+} + SO^{2-}_{4}[/tex]
[tex][Ag^{+}][/tex] = 0.0390 M
When [tex]Ag_{2}SO_{4}[/tex] precipitates then expression for [tex]K_{sp}[/tex] will be as follows.
[tex]K_{sp} = [Ag^{+}]^{2}[SO^{2-}_{4}][/tex]
[tex]1.20 \times 10^{-5} = (0.0390)^{2} \times [SO^{2-}_{4}][/tex]
[tex][SO^{2-}_{4}][/tex] = 0.00788 M
Now, equation for dissociation of calcium sulfate is as follows.
[tex]CaSO_{4} \rightleftharpoons Ca^{2+} + SO^{2-}_{4}[/tex]
[tex]K_{sp} = [Ca^{2+}][SO^{2-}_{4}][/tex]
[tex]4.93 \times 10^{-5} = [Ca^{2+}] \times 0.00788[/tex]
[tex][Ca^{2+}][/tex] = 0.00625 M
Now, we will calculate the percentage of [tex]Ca^{2+}[/tex] remaining in the solution as follows.
[tex]\frac{0.00625}{0.05} \times 100[/tex]
= 12.5%
And, the percentage of [tex]Ca^{2+}[/tex] that can be separated is as follows.
100 - 12.5
= 87.5%
Thus, we can conclude that 87.5% will be the concentration of [tex]Ca^{2+}(aq)[/tex] when [tex]Ag_{2}SO_{4}(s)[/tex] begins to precipitate.
