What is the pH of a 3.9*10^-83.9108 MM NaOHNaOH solution?

2 Answers
Ernest Z.
Jul 7, 2016

The pH is 7.08.

Explanation:

The base is so dilute that we must also consider the "OH"^"-"OH- that comes from the autoionization of water.

"H"_2"O" ⇌ "H"^+ + "OH"^"-"H2OH++OH-

K_w = ["H"^+] ["OH"^"-"] = 1.00 × 10^"-14"Kw=[H+][OH-]=1.00×10-14

We start by noting that charges must balance.

If the "OH"^"-"OH- comes from "NaOH"NaOH, then

["OH"^"-"] = ["H"^+] + ["Na"^+][OH-]=[H+]+[Na+]

The "H"^+H+ comes from the autoionization of water, so

["H"^+] = (1.00 × 10^"-14")/["OH"^"-"][H+]=1.00×10-14OH-

Also, ["Na"^+] = 3.9 × 10^-8"[Na+]=3.9×108

["OH"^"-"] = (1.00 × 10^"-14")/(["OH"^"-"]) + 3.9 × 10^-8"[OH-]=1.00×10-14[OH-]+3.9×108

["OH"^"-"]^2 = 1.00 × 10^"-14" + 3.9 × 10^"-8"["OH"^"-"][OH-]2=1.00×10-14+3.9×10-8[OH-]

["OH"^"-"]^2 - 3.9 × 10^"-8"["OH"^"-"] - 1.00 × 10^"-14" = 0[OH-]23.9×10-8[OH-]1.00×10-14=0

Solving the quadratic, we get

["OH"^"-"] = 1.21 × 10^"-7"[OH-]=1.21×10-7

"pOH" = "-log"(1.21 × 10^"-7") = 6.92pOH=-log(1.21×10-7)=6.92

"pH" = "14.00 - pH" = "14.00 - 6.92" = 7.08pH=14.00 - pH=14.00 - 6.92=7.08

Michael
Jul 10, 2016

sf(pH=7.08)

Explanation:

We would predict that as this is such a low concentration the sf(pH) will be close to 7.

This is an incredibly low concentration, so we must take into account the sf(OH^-) ions which arise from the auto - ionisation of water:

sf(H_2O_((l))rightleftharpoonsH_((aq))^(+)+OH_((aq))^-)

For which:

sf(K_w=1xx10^(-14)" ""mol"^(2)."l"^(-2) at sf(25^@"C".

This means that the concentration of sf(OH^- ions is sf(10^(-7)"M") arising from the water.

A tiny amount of sf(OH^-) ions is added such that the concentration is sf(3.9xx10^(-8)"M".

It might be reasoned, therefore, that the total sf(OH^-) ion concentration will be sf((3.9xx10^(-8))+10^(-7)"M".

However this will not be the sf(OH^-) ion concentration at equilibrium.

By adding those ions we have disturbed a system which is at equilibrium.

Le Chatelier's Principle tells us that the system will respond by opposing that change, thus restoring the equilibrium which represents the lowest energy state.

The reaction quotient sf(Q) is given by:

sf(Q=[H_((aq))^(+)][OH_((aq))^-]=10^(-7)xx[(3.9xx10^(-8)+10^(-7))])

=sf(1.39xx10^(-14)" ""mol"^2."l"^(-2))

This shows that sf(Q>K) which confirms that the equilibrium will shift to the left. More sf(H^+) will be consumed by the extra sf(OH^-) ions to produce more water.

To calculate the sf(pH) we need to get the concentration of sf(H^+) ions at equilibrium which we can do by setting up an ICE table:

" "sf(H_2O" "rightleftharpoons" "H^(+)" "+" "OH^(-))

sf(color(red)(I)" "--" "10^(-7)" "1.39xx10^(-7))

sf(color(red)(C)" "--" " -x" " -x)

sf(color(red)(E)" "--" "(10^(-7)-x)" "(1.39xx10^(-7)-x))

So:

sf(K_(w)=(10^(-7)-x)(1.39xx10^(-7))=10^(-14))

This simplifies to:

sf(x^2-(2.39xx10^(-7))x+0.39xx10^(-14)=0)

This is a quadratic equation which can be solved using the quadratic formula.

Discarding the absurd root we get:

sf(x=0.1765xx10^(-7)"mol/l")

So:

sf([H_(eqm)^(+)]=(1xx10^(-7)-0.1765xx10^(-7))=0.824xx10^(-7)"mol/l")

sf(pH=-log[H_(eqm)^+]=-log[0.824xx10^(-7)]

sf(color(red)(pH=7.08))

You may see this more generally described as "The Common Ion Effect" . sf(OH^-)being the common ion in question.

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