Calculate the pH of a 0.37 m Methylamine Solution

Use this premium weak-base calculator to determine the pH, pOH, hydroxide concentration, protonated methylamine concentration, and percent ionization for a 0.37 concentration methylamine solution. The tool uses the weak-base equilibrium expression for methylamine and can compare the exact quadratic solution with the common square-root approximation.

Methylamine pH Calculator

Methylamine concentration

Concentration unit

Kb for methylamine at 25 C

Solution method

Reference temperature

Enter values and click Calculate pH to see the full equilibrium breakdown.

Quick chemistry summary

Base: methylamine, CH₃NH₂
Reaction: CH₃NH₂ + H₂O ⇄ CH₃NH₃⁺ + OH^–
Equilibrium expression: K_b = [CH₃NH₃⁺][OH^–] / [CH₃NH₂]
Typical K_b used: 4.4 x 10^-4 at 25 C
Main result for 0.37 concentration: pH is about 12.11 using the exact method
Why pH is high: methylamine is a weak base that generates hydroxide ions in water

How to calculate the pH of a 0.37 m methylamine solution

Methylamine is a classic weak base used in general chemistry and analytical chemistry to demonstrate base hydrolysis in water. When you are asked to calculate the pH of a 0.37 m methylamine solution, the key idea is that methylamine does not fully ionize the way a strong base such as sodium hydroxide does. Instead, it establishes an equilibrium with water. That means the hydroxide concentration must be found from an equilibrium calculation rather than by assuming complete dissociation.

The species involved are methylamine, water, methylammonium, and hydroxide. In equation form, the process is:

CH₃NH₂ + H₂O ⇄ CH₃NH₃⁺ + OH^–

For weak bases, the relevant equilibrium constant is K_b. A commonly used literature value for methylamine at 25 C is approximately 4.4 x 10^-4. Because the concentration given in this problem is 0.37 m, many classroom problems treat it effectively as a concentration of 0.37 for the equilibrium setup, especially in dilute aqueous solutions where the difference between molality and molarity is small enough to ignore for a routine pH estimate. In a strict physical chemistry context, molality and molarity are not identical, but in introductory pH calculations they are often used interchangeably if density information is not supplied.

Step 1: Write the base equilibrium expression

The weak-base expression for methylamine is:

K_b = [CH₃NH₃⁺][OH^–] / [CH₃NH₂]

If the initial methylamine concentration is 0.37 and the amount that reacts is x, then the ICE setup becomes:

Initial [CH₃NH₂] = 0.37
Change = -x for CH₃NH₂, +x for CH₃NH₃⁺, +x for OH^–
Equilibrium [CH₃NH₂] = 0.37 – x
Equilibrium [CH₃NH₃⁺] = x
Equilibrium [OH^–] = x

Substituting those values into the equilibrium expression gives:

4.4 x 10^-4 = x² / (0.37 – x)

Step 2: Solve for hydroxide concentration

There are two common ways to solve this. The first is the exact quadratic method. The second is the weak-base approximation, where x is assumed small compared with the initial concentration. For methylamine at 0.37, the approximation is actually very good, but it is still useful to compare both methods.

Exact method: Rearranging gives:

x² + K_bx – K_bC = 0

With K_b = 4.4 x 10^-4 and C = 0.37:

x = [-K_b + sqrt(K_b² + 4K_bC)] / 2

Plugging in the numbers gives x about 0.01255. Therefore:

[OH^–] about 0.01255
[CH₃NH₃⁺] about 0.01255
[CH₃NH₂] remaining about 0.35745

Approximation method: If x is small relative to 0.37, then 0.37 – x is approximated as 0.37. The equation becomes:

x = sqrt(K_b x C) = sqrt((4.4 x 10^-4)(0.37))

This yields x about 0.01276. The difference between the exact and approximate solutions is small, which confirms the shortcut is reasonable here.

Step 3: Convert hydroxide concentration to pOH and pH

Once hydroxide concentration is known, pOH is calculated from:

pOH = -log[OH^–]

Using the exact value [OH^–] = 0.01255:

pOH about 1.90
pH = 14.00 – 1.90 = 12.10 to 12.11

So the pH of a 0.37 m methylamine solution is approximately 12.11 at 25 C when using K_b = 4.4 x 10^-4.

Why the answer is not as high as a strong base

A strong base with a concentration near 0.37 would produce a much larger hydroxide concentration because it dissociates essentially completely. Methylamine is basic, but it is still a weak base, meaning only a fraction of the dissolved molecules accept protons from water. That fraction is reflected by the percent ionization. For this problem, the degree of ionization is only around 3.4 percent. In other words, more than 96 percent of the methylamine remains in its unprotonated form at equilibrium.

Quantity	Exact value for 0.37 methylamine	Interpretation
Initial methylamine concentration	0.3700	Starting amount before hydrolysis
Equilibrium [OH^–]	0.01255	Hydroxide generated by weak-base reaction
Equilibrium [CH₃NH₃⁺]	0.01255	Conjugate acid formed
Remaining [CH₃NH₂]	0.35745	Unreacted weak base
pOH	1.901	Negative log of hydroxide concentration
pH	12.099 to 12.11	Basic solution
Percent ionization	3.39%	Fraction of methylamine protonated

Exact versus approximate calculation

In chemistry classes, you are often encouraged to test whether the approximation is valid. The common 5 percent rule states that if x is less than 5 percent of the starting concentration, then replacing 0.37 – x with 0.37 is usually acceptable. Here the exact x is about 0.01255, and 5 percent of 0.37 is 0.0185, so the condition is satisfied.

That means both methods should give nearly the same pH. The table below shows the difference quantitatively.

Method	[OH^–]	pOH	pH	Percent error in [OH^–]
Exact quadratic	0.01255	1.901	12.099	0.00%
Square-root approximation	0.01276	1.894	12.106	About 1.7%

The numerical difference is tiny, so most homework solutions would report the pH as about 12.10 or 12.11. If your instructor requires exact equilibrium treatment, use the quadratic method. If your instructor allows approximations and asks you to justify them, note that the percent ionization is below 5 percent, so the simplification is acceptable.

Common mistakes students make

Using K_a instead of K_b. Methylamine is a base, so use K_b, not K_a.
Forgetting that pH comes from pOH. A weak base calculation typically gives [OH^–] first. Compute pOH, then convert to pH.
Assuming complete ionization. If you set [OH^–] equal to 0.37 directly, you would get a pH far too high.
Ignoring units without context. Lowercase m means molality, whereas uppercase M means molarity. In many teaching examples, the distinction is neglected unless density is provided, but in rigorous work it matters.
Dropping x without checking. The approximation is not universal. It is valid only when x is small enough compared with the starting concentration.

How methylamine compares with stronger and weaker bases

The value K_b = 4.4 x 10^-4 places methylamine among moderately weak molecular bases. It is substantially weaker than hydroxide from a strong base, but stronger than very weak nitrogen bases that have much lower K_b values. The practical consequence is that methylamine solutions are clearly basic, yet their pH depends strongly on both concentration and equilibrium.

For perspective, if you reduce the methylamine concentration by a factor of 10, the pH does not decrease by a full unit the way it would for a strong base. That is because the ionization fraction changes with concentration. Weak-base systems respond in a nonlinear way, which is one reason equilibrium calculations are so important.

Methylamine concentration	Exact [OH^–]	Exact pH	Percent ionization
0.010	0.00188	11.27	18.8%
0.050	0.00447	11.65	8.94%
0.100	0.00642	11.81	6.42%
0.370	0.01255	12.10	3.39%
1.000	0.02076	12.32	2.08%

This concentration trend highlights a useful equilibrium principle: as concentration increases, the pH rises, but the percent ionization falls. That behavior is typical of weak acids and weak bases.

Should 0.37 m be treated differently from 0.37 M?

Strictly speaking, yes. Molality is moles of solute per kilogram of solvent, while molarity is moles of solute per liter of solution. To convert exactly, you need density and sometimes partial molar volume data. However, in educational chemistry problems, if only a single concentration and a K_b value are supplied, the problem is almost always intended to be solved as a standard weak-base equilibrium calculation using 0.37 as the effective concentration term. That is exactly what the calculator above does. If your class is emphasizing thermodynamics or concentrated solutions, ask whether activity corrections or molality-to-molarity conversion are expected.

Final answer

Using K_b = 4.4 x 10^-4 for methylamine at 25 C and treating the 0.37 m solution as a standard dilute aqueous weak-base system, the equilibrium hydroxide concentration is about 0.01255. This gives a pOH of about 1.90 and a final pH of about 12.10 to 12.11.

Authoritative references for equilibrium constants and acid-base chemistry

LibreTexts Chemistry for detailed weak acid and weak base equilibrium derivations.
National Institute of Standards and Technology (NIST.gov) for authoritative chemistry data resources and standards.
United States Environmental Protection Agency (EPA.gov) for water chemistry and pH background information.

Calculate The Ph Of A 0.37 M Methylamine Solution