Calculate the pH of 0.25 m Solution of Aniline

Use this premium weak-base calculator to determine the pH, pOH, hydroxide concentration, and degree of ionization for an aqueous aniline solution. By default, the tool uses the accepted 25 degrees Celsius base dissociation constant for aniline and applies the exact quadratic solution for equilibrium.

Aniline pH Calculator

Aniline concentration

Concentration unit

Base constant input type

Kb or pKb value

Temperature assumption

Density assumption for molality

How the calculator works

Aniline, C₆H₅NH₂, is a weak base. In water it reacts as:

C6H5NH2 + H2O ⇌ C6H5NH3+ + OH-

The equilibrium expression is:

Kb = [C6H5NH3+][OH-] / [C6H5NH2]

For an initial concentration C and equilibrium hydroxide concentration x:

Kb = x^2 / (C – x)

The exact quadratic solution used here is:

x = (-Kb + √(Kb^2 + 4KbC)) / 2

With the default values C = 0.25 and Kb = 4.3 × 10^-10, the expected pH is about 9.02 at 25 degrees Celsius, assuming ideal dilute behavior.

Expert Guide: How to Calculate the pH of a 0.25 m Solution of Aniline

If you need to calculate the pH of a 0.25 m solution of aniline, the key chemical idea is that aniline is a weak base, not a strong one. That means it does not fully react with water. Instead, only a small fraction of the dissolved aniline molecules accept a proton from water to generate hydroxide ions. The pH therefore depends on an equilibrium calculation rather than simple complete dissociation.

Aniline has the formula C₆H₅NH₂. Structurally, it is an aromatic amine. The nitrogen atom contains a lone pair of electrons, which allows aniline to act as a Brønsted-Lowry base by accepting a proton. However, because the lone pair is partially delocalized into the benzene ring, aniline is less basic than many aliphatic amines. That reduced basicity is exactly why the pH of a 0.25 solution is only mildly basic rather than strongly alkaline.

Step 1: Write the base ionization reaction

The equilibrium between aniline and water is:

C6H5NH2 + H2O ⇌ C6H5NH3+ + OH-

This tells us that every hydroxide ion produced is accompanied by one anilinium ion, C₆H₅NH₃⁺.

Step 2: Use the base dissociation constant

At 25 degrees Celsius, a commonly used value for the base dissociation constant of aniline is:

Kb ≈ 4.3 × 10^-10

Equivalent data may also be reported as pK_b:

pKb = -log(Kb) ≈ 9.37

Because K_b is small, aniline ionizes only slightly in water. That is the central reason the resulting pH is near 9 rather than 12 or 13.

Step 3: Interpret the meaning of 0.25 m

In many classroom and general chemistry contexts, users type “0.25 m” while really intending “0.25 M.” Strictly speaking, lowercase m denotes molality, while uppercase M denotes molarity. For dilute aqueous solutions, the numerical values can be close enough that introductory calculations often treat them similarly. This calculator lets you keep the entered value as an effective analytical concentration or use the common approximation that dilute aqueous density is near 1.00 kg/L.

For the standard textbook-style answer, we take the analytical concentration as 0.25. The exact unit distinction has little effect on the final pH at this concentration unless highly precise thermodynamic corrections are required.

Step 4: Set up the ICE table

Let the initial concentration of aniline be 0.25 and let x be the amount that reacts:

Species	Initial	Change	Equilibrium
C₆H₅NH₂	0.25	-x	0.25 – x
C₆H₅NH₃⁺	0	+x	x
OH^–	0	+x	x

Now substitute into the equilibrium expression:

Kb = x^2 / (0.25 – x)

Step 5: Solve for hydroxide concentration

Insert K_b = 4.3 × 10^-10:

4.3 × 10^-10 = x^2 / (0.25 – x)

Since aniline is a weak base, x will be much smaller than 0.25. A quick approximation would be:

x^2 / 0.25 ≈ 4.3 × 10^-10

x^2 ≈ 1.075 × 10^-10

x ≈ 1.04 × 10^-5

This x value is the hydroxide concentration:

[OH-] ≈ 1.04 × 10^-5

Because the approximation is extremely good here, the exact quadratic calculation gives nearly the same answer. In fact, the percent ionization is tiny, so the 5 percent rule is easily satisfied.

Step 6: Convert to pOH and pH

Once you know the hydroxide concentration, pOH is straightforward:

pOH = -log(1.04 × 10^-5) ≈ 4.98

At 25 degrees Celsius, use:

pH + pOH = 14.00

Therefore:

pH = 14.00 – 4.98 = 9.02

Final result: The pH of a 0.25 solution of aniline is approximately 9.02 at 25 degrees Celsius.

Why aniline is only a weak base

Students often expect an amine to produce a strongly basic solution, but aromatic amines behave differently from many simple alkyl amines. The nitrogen lone pair in aniline is partially shared with the aromatic ring by resonance. This lowers its availability to bind a proton. As a result, aniline has a much smaller K_b than bases such as methylamine or ethylamine.

Base	Typical Kb at 25 degrees Celsius	Typical pKb	Relative basicity comment
Aniline	4.3 × 10^-10	9.37	Weak aromatic amine due to resonance delocalization
Ammonia	1.8 × 10^-5	4.74	Much stronger base than aniline in water
Methylamine	4.4 × 10^-4	3.36	Far stronger than aniline because lone pair is more available

This comparison helps explain why a 0.25 solution of aniline has a pH just above 9, while similarly concentrated solutions of stronger weak bases can be significantly more alkaline.

Exact vs approximate solution

For weak acid and weak base problems, instructors often teach a shortcut:

x ≈ √(KbC)

That works when x is small compared with the initial concentration. For aniline at 0.25, the estimate gives:

x ≈ √((4.3 × 10^-10)(0.25)) ≈ 1.04 × 10^-5

The exact quadratic equation is:

x = (-Kb + √(Kb^2 + 4KbC)) / 2

Plugging in the same values yields practically the same hydroxide concentration. In a classroom setting, both methods are acceptable if the approximation is justified. In a digital calculator, the exact approach is preferred because it removes uncertainty and works over a wider range of inputs.

Percent ionization of aniline at 0.25 concentration

Another useful quantity is percent ionization:

% ionization = (x / C) × 100

Using x ≈ 1.04 × 10^-5 and C = 0.25:

% ionization ≈ (1.04 × 10^-5 / 0.25) × 100 ≈ 0.0042%

This extremely low ionization confirms that aniline remains mostly in its unprotonated molecular form in solution.

Common mistakes when calculating the pH of aniline

Assuming aniline is a strong base and setting [OH^–] equal to 0.25 directly.
Confusing K_a and K_b values.
Using pH = -log[OH^–] instead of first calculating pOH.
Ignoring whether the problem states molarity or molality, especially in more advanced courses.
Forgetting that aromatic amines are much less basic than many aliphatic amines.

How concentration changes the pH

As the concentration of aniline increases, the pH rises, but not dramatically. Because aniline is weak, the hydroxide concentration depends on the square root of K_b times concentration under the weak-base approximation. That means doubling concentration does not double the pH shift. The change is gradual.

Aniline concentration	Approximate [OH^–]	Approximate pOH	Approximate pH
0.010	2.07 × 10^-6	5.68	8.32
0.050	4.64 × 10^-6	5.33	8.67
0.100	6.56 × 10^-6	5.18	8.82
0.250	1.04 × 10^-5	4.98	9.02
0.500	1.47 × 10^-5	4.83	9.17

The table shows a useful trend: even large changes in analytical concentration create modest changes in pH for a weak base like aniline. This is an important intuition for acid-base chemistry.

What if the problem gives pKa instead of Kb?

Sometimes you are given information about the conjugate acid, anilinium ion, rather than the base itself. In that case, use:

Ka × Kb = Kw = 1.0 × 10^-14 at 25 degrees Celsius

Or, in logarithmic form:

pKa + pKb = 14.00

If you know pK_a of anilinium, you can find pK_b of aniline and then proceed with the same calculation. This relationship is especially helpful in analytical chemistry and buffer problems.

Real-world considerations

In highly accurate work, a chemist may consider activity coefficients, temperature dependence, solvent composition, and the exact conversion between molality and molarity. Those effects matter more in concentrated, nonideal, or mixed-solvent systems. For standard educational problems, however, the equilibrium method shown above is the accepted route. The result of about pH 9.02 is the right practical answer.

Authoritative chemistry references

Final takeaway

Recognize aniline as a weak base.
Use the equilibrium reaction with water.
Apply K_b ≈ 4.3 × 10^-10.
Solve for [OH^–] using the weak-base equation or exact quadratic form.
Convert [OH^–] to pOH, then to pH.

Following these steps gives a pH of approximately 9.02 for a 0.25 solution of aniline at 25 degrees Celsius. If you want a fast answer, use the calculator above. If you want mastery, use the guide to understand every chemical assumption behind the result.

Calculate The Ph Of 0.25 M Solution Of Aniline