Asked by Maggie
Calculate the concentrations of all species in a 0.320-M solution of H2X if K1 = 6.31E-06 and K2 = 3.71E-09
[H2X] =
[H3O1+] =
[HX1-] =
[X2-] =
Work:
H2X + H2O --> HX- + H3O+
.320 M
This is literally the only thing I know. How can there be two different Ks??
[H2X] =
[H3O1+] =
[HX1-] =
[X2-] =
Work:
H2X + H2O --> HX- + H3O+
.320 M
This is literally the only thing I know. How can there be two different Ks??
Answers
Answered by
DrBob222
You started very well. Just go from there. There can be two Ka values because there are two H ions to dissociate.
.......H2X + H2O ==> H3O^+ + HX^-
I....0.320............0.......0
C.....-x..............x.......x
E...0.320-x...........x.......x
Now Ka1 = (H3O^+)(HX^-)/(H2X)
Substitute the E line into the Ka1 expression and solve for x = (H3O^+) = (HX^-). You get (H2X) from 0.320-x = ?
Then for ka2, it is
.....HX^- + H2O ==> H3O^+ + X^2-
You don't need to fill this in.
Ka2 = (H3O^+)(X^2-)/(HX^-)
You just solved from Ka1 that (H3O^+) = (HX^-). One of those is in the numerator of Ka2 and the other one in the denominator of Ka2 so they cancel which leaves Ka2 = (X^2-).
Case closed.
.......H2X + H2O ==> H3O^+ + HX^-
I....0.320............0.......0
C.....-x..............x.......x
E...0.320-x...........x.......x
Now Ka1 = (H3O^+)(HX^-)/(H2X)
Substitute the E line into the Ka1 expression and solve for x = (H3O^+) = (HX^-). You get (H2X) from 0.320-x = ?
Then for ka2, it is
.....HX^- + H2O ==> H3O^+ + X^2-
You don't need to fill this in.
Ka2 = (H3O^+)(X^2-)/(HX^-)
You just solved from Ka1 that (H3O^+) = (HX^-). One of those is in the numerator of Ka2 and the other one in the denominator of Ka2 so they cancel which leaves Ka2 = (X^2-).
Case closed.
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