Question #58f8b
1 Answer
Here's what I got.
Explanation:
Before doing any calculations, try to predict what the volume ratio between the weak acid and its conjugate base will be at that pH.
Notice that the
pK_a = -log(K_a) = -log(1.75 * 10^(-5)) = 4.76
Now, notice that the difference between the acid's
This means that if you have something like
log(x/y) = 1" " and" "log(x/y) = 2
then you can say that the increase of the value returned by the log is caused by the fact that
In the first case,
Now let's do the calculations to prove this prediction. As you know, the pH of a buffer that contains a weak acid and its conjugate base can be calculated using the Henderson - Hasselbalch equation, which looks like this
color(blue)("pH" = pK_a + log( (["conjugate base"])/(["weak acid"])))
In your case, you have
5.8 = 4.76 + log( (["CH"_3"COO"^(-)])/(["CH"_3"COOH"]))
Your goal here is to solve this equation to find
log( (["CH"_3"COO"^(-)])/(["CH"_3"COOH"])) = 5.8 - 4.76 = 1.04
This is equivalent to
(["CH"_3"COO"^(-)])/(["CH"_3"COOH"]) = 10^1.04 = 10.96
Therefore, you need to have about
["CH"_3"COO"^(-)] = 11 * ["CH"_3"COOH"]
This means that you need
Since the volume of the buffer is set at
1.00color(red)(cancel(color(black)("L buffer"))) * ("1 L CH"_3"COOH")/((1 + 11)color(red)(cancel(color(black)("L buffer")))) = "0.0833 L"
and
1.00color(red)(cancel(color(black)("L buffer"))) * ("11 L CH"_3"COO"^(-))/((1 + 11)color(red)(cancel(color(black)("L buffer")))) = "0.9167 L"
Expressed in mililiters, the answers will be
V_"weak acid" = color(green)("83 mL")
V_"conj. base" = color(green)("917 mL")
