Question #15adf

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Question #15adf

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Answer 1 · 2016-04-08T19:56:15

$pH = 7.10$ $"pH" = 7.10$

Explanation:

You're dealing with a buffer solution that contains dihydrogen phosphate, $H_{2} {PO}_{4}^{-}$ $"H"_2"PO"_4^(-)$ , which will act as a weak acid, and hydrogen phosphate, ${HPO}_{4}^{2 -}$ $"HPO"_4^(2-)$ , which is its conjugate base.

As you can see, the weak acid will be delivered to the solution by monopotassium phosphate, ${KH}_{2} {PO}_{4}$ $"KH"_2"PO"_4$ , and the conjugate base will be delivered to the solution by dipotassium phosphate, $K_{2} {HPO}_{4}$ $"K"_2"HPO"_4$ , both soluble salts that dissociate completely in aqueous solution.

The following equilibrium will be established in solution

$H_{2} {PO}_{4 (a q)}^{-} + H_{2} O_{(l)} ⇌ {HPO}_{4 (a q)}^{2 -} + H_{3} O_{(a q)}^{+}$ $"H"_ 2"PO"_ (4(aq))^(-) + "H"_ 2"O"_ ((l)) rightleftharpoons "HPO"_ (4(aq))^(2-) + "H"_ 3"O"_ ((aq))^(+)$

Before moving on, calculate the concentrations of the weak acid and conjugate base by using the fact that both monopotassium phosphate and dipotassium phosphate dissociate in a $1 : 1$ $1:1$ mole ratio to form $H_{2} {PO}_{4}^{-}$ $"H"_2"PO"_4^(-)$ and ${HPO}_{4}^{2 -}$ $"HPO"_4^(2-)$ , respectively.

Start by using the molar masses of the two salts to figure out how many moles of each you get in those $15.00-g$ $"15.00-g"$ samples

$15.00 color(red)(cancel(color(black)("g"))) * ("1 mole KH"_2"PO"_4)/(136.086color(red)(cancel(color(black)("g")))) = "0.11022 moles KH"_2"PO"_4$

$15.00 color(red)(cancel(color(black)("g"))) * ("1 mole K"_2"HPO"_4)/(174.2color(red)(cancel(color(black)("g")))) = "0.086108 moles K"_2"HPO"_4$

Now, because the total volume of the solution is said to be equal to $"1.00 dm"^3$ , which is equivalent to $"1.00 L"$ , you can treat number of moles and molarity interchangeably.

As you know the molarity of a solution tells you how many moles of solute you get per cubic decimeter of solution. In this case, you know that $"1.00 dm"^3$ of solution will contain

$n_(H_2PO_4^(-)) = n_(KH_2PO_4) = "0.11022 moles H"_2"PO"_4^(-)$

$n_(HPO_4^(2-)) = n_(K_2HPO_4) = "0.086108 moles HPO"_4^(2-)$

which implies that you have

$["H"_2"PO"_4^(-)] = "0.11022 mol dm"^(-3)$

$["HPO"_4^(2-)] = "0.086108 mol dm"^(-3)$

The pH of a buffer solution that contains a weak acid and its conjugate base can be calculated using the Henderson - Hasselbalch equation, which looks like this

$color(blue)(|bar(ul(color(white)(a/a)"pH" = pK_a + log( (["conjugate base"])/(["weak acid"]))color(white)(a/a)|)))$

Notice that when you have equal concentrations of weak acid and conjugate base, the pH of the buffer is equal to the $pK_a$ of the acid.

In your case, the buffer contains more weak acid than conjugate, so right from the start you can predict that its pH will be lower than the $PK_a$ of the acid.

In your case, the H - H equation will look like this

$"pH" = 7.21 + log( (["HPO"_4^(2-)])/(["H"_2"PO"_4^(-)]))$

Plug in your values to get

$"pH" = 7.21 + log( (0.086108 color(red)(cancel(color(black)("mol dm"^(-3)))))/(0.11022color(red)(cancel(color(black)("mol dm"^(-3)))))) = color(green)(|bar(ul(color(white)(a/a)7.10color(white)(a/a)|)))$

As predicted, the buffer has a pH that's lower than the $pK_a$ of the acid.

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Question #15adf

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