The solubility product of a salt having the
formula M2X3 is 1 x 10-20. If the solubility of
another salt having formula M2X is twice
the molar solubility of M2X3, the solubility
product of M X is
1 32 x 10-12
2 9.16 x 10-5
3 4.58 x 10-5
Answers
Answer:
So for M2X3 we have, s =[ ksp/108 ]^1/5
It gives us S which can be used for the 2nd rxn,
i.e.for M2X , we have ,
S= [ksp/4]^1/3
OR
ksp=4S^3
It will give u Ksp=3×10^-12
Hope this will help you!
Explanation:
Explanation:
M2X3(s) ===> 2M(aq) + 3X(aq)
Ksp = [M]^2[X]^3 = 2.2 x 10^-10
Let [M] = x. Then [X] = (3/2)x
(x)^2(3x/2)^3 = (27/8)x^3 = 2.2 x 10^-10
x^3 = 6.5 x 10^-11, so x = 4.0 x 10^-4 = [M]
According to the balanced equation, [M] in solution = (1/2)[M2X3] that dissolves molar solubility). So molar solubility of M2X3 = (1/2)(4.0x10^-4) = 2.0 x 10^-4
M2X(s) ===> 2M(aq) + X(aq)
Ksp = [M]^2[X]
This time, let [X] = y. Then [M] = 2y. According to the balanced equatiion, [X] in solution = [M2X] that dissolved (molar solubility). According to the problem, y = 2x, so y = 4.0 x 10^-4
Ksp = (2y)^2(y) = 4y^3 = (4)(4.0x10^-4)^3 = 2.6 x 10^-10 to two significant figures..
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