Answer: [tex][Al^{3+}][/tex] = 1.834 M
[tex][F^-][/tex] = 0.004 M
[tex][AlF_6^{3-}][/tex] = 0.166 M
Explanation:
[tex]Al^{3+}+6F^-\rightleftharpoons AlF_6^{3-}[/tex]
Initial concentration of [tex]Al^{3+}[/tex] = 0.15 M
Initial concentration of [tex]F^-[/tex] = 2.0 M
The given balanced equilibrium reaction is,
[tex]Al^{3+}+6F^-\rightleftharpoons AlF_6^{3-}[/tex]
Initial conc. 2 M 0.15 M 0
At eqm. conc. (2-x) M (1-6x) M (x) M
The expression for equilibrium constant for this reaction will be,
[tex]K_f=\frac{[AlF_6^{3-}]}{[Al^{3+}][F^-]^6}[/tex]
Now put all the given values in this expression, we get :
[tex]4.0\times 10^{19}=\frac{(x)}{(2-x)\times (1-6x)^6}[/tex]
By solving the term 'x', we get :
[tex]x=0.166[/tex]
[tex][Al^{3+}][/tex] = (2-x) = 2-0.166 = 1.834 M
[tex][F^-][/tex] = (1-6x) = 1-6(0.1660)= 0.004 M
[tex][AlF_6^{3-}][/tex] = x = 0.166 M
