Molar concentration

Molar concentration
Common symbols	c, [chemical symbol or formula]
SI unit	mol/m3
Other units	mol/L, M
Derivations from other quantities	c = n/V
Dimension	${\displaystyle {\mathsf {L}}^{-3}{\mathsf {N}}}$

Molar concentration (also called amount-of-substance concentration or molarity) is the number of moles of solute per liter of solution.^[1] Specifically, It is a measure of the concentration of a chemical species, in particular, of a solute in a solution, in terms of amount of substance per unit volume of solution. In chemistry, the most commonly used unit for molarity is the number of moles per liter, having the unit symbol mol/L or mol/dm³ (1000 mol/m³) in SI units. Molar concentration is often depicted with square brackets around the substance of interest; for example with the hydronium ion [H₃O⁺] = 4.57 x 10^-9 mol/L.^[2]

Molar concentration or molarity is most commonly expressed in units of moles of solute per litre of solution.^[3] For use in broader applications, it is defined as amount of substance of solute per unit volume of solution, or per unit volume available to the species, represented by lowercase ${\displaystyle c}$:^[4]

${\displaystyle c={\frac {n}{V}}={\frac {N}{N_{\text{A}}\,V}}={\frac {C}{N_{\text{A}}}}.}$

Here, ${\displaystyle n}$ is the amount of the solute in moles,^[5] ${\displaystyle N}$ is the number of constituent particles present in volume ${\displaystyle V}$ (in litres) of the solution, and ${\displaystyle N_{\text{A}}}$ is the Avogadro constant, since 2019 defined as exactly 6.02214076×10²³ mol⁻¹. The ratio ${\displaystyle {\frac {N}{V}}}$ is the number density ${\displaystyle C}$.

In thermodynamics, the use of molar concentration is often not convenient because the volume of most solutions slightly depends on temperature due to thermal expansion. This problem is usually resolved by introducing temperature correction factors, or by using a temperature-independent measure of concentration such as molality.^[5]

The reciprocal quantity represents the dilution (volume) which can appear in Ostwald's law of dilution.

If a molecule or salt dissociates in solution, the concentration refers to the original chemical formula in solution, the molar concentration is sometimes called formal concentration or formality (F_A) or analytical concentration (c_A). For example, if a sodium carbonate solution (Na₂CO₃) has a formal concentration of c(Na₂CO₃) = 1 mol/L, the molar concentrations are c(Na⁺) = 2 mol/L and c(CO2−3) = 1 mol/L because the salt dissociates into these ions.^[6]

While there is clear consensus on the equivalence of units:

1 mol/m³ = 10⁻³ mol/dm³ = 10⁻³ mol/L = 10⁻³ M = 1 mM = 1 mmol/L

guidance on unit names and abbreviations varies:

[A]mount concentration ...[a]lso called amount-of-substance concentration, substance concentration (in clinical chemistry) and in older literature molarity. ...The common unit is mole per cubic decimetre (mol dm⁻³) or mole per litre (mol L⁻¹) sometimes denoted by M.

— IUPAC, "Gold Book" 5ed

In the older literature this quantity was often called molarity, a usage that should be avoided due to the risk of confusion with the quantity molality. Units commonly used for amount concentration are mol L⁻¹ (or mol dm⁻³), mmol L⁻¹, mmol L⁻¹ etc., often denoted M, mM, uM etc. (pronounced molar, millimolar, micromolar).

— IUPAC, "Green Book" 3ed

The term molarity and the symbol M should no longer be used because they, too, are obsolete. One should use instead amount-of-substance concentration of B and such units as mol/dm³, kmol/m³, or mol/L. (A solution of, for example, 0.1 mol/dm³ was often called a 0.1 molar solution, denoted 0.1 M solution. The molarity of the solution was said to be 0.1 M.)

— NIST, Guide to the SI, Chapter 8

The SI prefix "mega" (symbol M) has the same symbol. However, the prefix is never used alone, so "M" unambiguously denotes molar. Sub-multiples, such as "millimolar" (mM) and "nanomolar" (nM), consist of the unit preceded by an SI prefix:

Name	Abbreviation	Concentration
		(mol/L)	(mol/m3)
millimolar	mM	10−3	100=1
micromolar	μM	10−6	10−3
nanomolar	nM	10−9	10−6
picomolar	pM	10−12	10−9
femtomolar	fM	10−15	10−12
attomolar	aM	10−18	10−15
zeptomolar	zM	10−21	10−18
yoctomolar	yM	10−24 (6 particles per 10 L)	10−21
rontomolar	rM	10−27	10−24
quectomolar	qM	10−30	10−27

The conversion to number concentration ${\displaystyle C_{i}}$ is given by

${\displaystyle C_{i}=c_{i}N_{\text{A}},}$

where ${\displaystyle N_{\text{A}}}$ is the Avogadro constant.

The conversion to mass concentration ${\displaystyle \rho _{i}}$ is given by

${\displaystyle \rho _{i}=c_{i}M_{i},}$

where ${\displaystyle M_{i}}$ is the molar mass of constituent ${\displaystyle i}$.

The conversion to mole fraction ${\displaystyle x_{i}}$ is given by

${\displaystyle x_{i}=c_{i}{\frac {\overline {M}}{\rho }},}$

where ${\displaystyle {\overline {M}}}$ is the average molar mass of the solution, ${\displaystyle \rho }$ is the density of the solution.

A simpler relation can be obtained by considering the total molar concentration, namely, the sum of molar concentrations of all the components of the mixture:

${\displaystyle x_{i}={\frac {c_{i}}{c}}={\frac {c_{i}}{\sum _{j}c_{j}}}.}$

The conversion to mass fraction ${\displaystyle w_{i}}$ is given by

${\displaystyle w_{i}=c_{i}{\frac {M_{i}}{\rho }}.}$

For binary mixtures, the conversion to molality ${\displaystyle b_{2}}$ is

${\displaystyle b_{2}={\frac {c_{2}}{\rho -c_{1}M_{1}}},}$

where the solvent is substance 1, and the solute is substance 2.

For solutions with more than one solute, the conversion is

${\displaystyle b_{i}={\frac {c_{i}}{\rho -\sum _{j\neq i}c_{j}M_{j}}}.}$

The sum of molar concentrations gives the total molar concentration, namely the density of the mixture divided by the molar mass of the mixture or by another name the reciprocal of the molar volume of the mixture. In an ionic solution, ionic strength is proportional to the sum of the molar concentration of salts.

The sum of products between these quantities equals one:

${\displaystyle \sum _{i}c_{i}{\overline {V_{i}}}=1.}$

The molar concentration depends on the variation of the volume of the solution due mainly to thermal expansion. On small intervals of temperature, the dependence is

${\displaystyle c_{i}={\frac {c_{i,T_{0}}}{1+\alpha \Delta T}},}$

where ${\displaystyle c_{i,T_{0}}}$ is the molar concentration at a reference temperature, ${\displaystyle \alpha }$ is the thermal expansion coefficient of the mixture.

• Molality
• Normality
• Orders of magnitude (molar concentration)

• Molar Solution Concentration Calculator
• Experiment to determine the molar concentration of vinegar by titration