Question #659e1

1 Answer
Apr 25, 2017

#["Mg"^(2+)] = 2.7 * 10^(-5)"M"#

Explanation:

Magnesium carbonate is considered insoluble in water, which implies that when you dissolve this salt in water, a dynamic equilibrium exists between the undissolved solid and the dissolved ions.

#"MgCO"_ (3(s)) rightleftharpoons "Mg"_ ((aq))^(2+) + "CO"_ (3(aq))^(2-)" "color(darkorange)((!))#

Some of the solid will dissolve to produce ions, but most of the salt will remain undissolved, i.e. this equilibrium lies to the left.

By definition, the solubility product constant, #K_(sp)#, is equal to

#K_(sp) = ["Mg"^(2+)] * ["CO"_3^(2-)]#

The expression for #K_(sp)# uses the equilibrium concentrations of the two ions.

In your solution, you know that

#["CO"_3^(2-)] = "0.25 M"#

You also know that

#K_(sp) = 6.82 * 10^(-6)#

Your goal here is to determine the concentration of magnesium cations that will satisfy equation #color(darkorange)((!))#.

Rearrange the equation to solve for #["Mg"^(2+)]#

#["Mg"^(2+)] = K_(ps)/(["CO"_3^(2-)])#

Plug in your values to find

#["Mg"^(2+)] = (6.82 * 10^(-6))/(0.25) = color(darkgreen)(ul(color(black)(2.7 * 10^(-5)color(white)(.)"M")))#