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5.4: Quantitative Units of Concentration

  • Page ID
    200128
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    Learning Objective

    • Learn to determine specific concentrations with several common units.

    Rather than qualitative terms (Section 11.2 - Definitions), we need quantitative ways to express the amount of solute in a solution; that is, we need specific units of concentration. In this section, we will introduce several common and useful units of concentration.

    Molarity (M) is defined as the number of moles of solute divided by the number of liters of solution:

    \[molarity \: =\: \frac{moles\: of\: solute}{liters\: of\: solution}\nonumber \]

    which can be simplified as

    \[M\: =\: \frac{mol}{L},\; or\; mol/L\nonumber \]

    As with any mathematical equation, if you know any two quantities, you can calculate the third, unknown, quantity.

    For example, suppose you have 0.500 L of solution that has 0.24 mol of NaOH dissolved in it. The concentration of the solution can be calculated as follows:

    \[molarity \: =\: \frac{0.24\: mol\: NaOH}{0.500L}=0.48\, M\; NaOH\nonumber \]

    The concentration of the solution is 0.48 M, which is spoken as "zero point forty-eight molarity" or "zero point forty-eight molar." If the quantity of the solute is given in mass units, you must convert mass units to mole units before using the definition of molarity to calculate concentration. For example, what is the molar concentration of a solution of 22.4 g of HCl dissolved in 1.56 L? First, convert the mass of solute to moles using the molar mass of HCl (36.5 g/mol):

    \[22.4\cancel{gHCl}\times \frac{1\: mol\: Hcl}{36.5\cancel{gHCl}}=0.614\, M\; HCl\nonumber \]

    Now we can use the definition of molarity to determine a concentration:

    \[M \: =\: \frac{0.614\: mol\: HCl}{1.56L}=0.394\, M\nonumber \]

    Example \(\PageIndex{1}\)

    What is the molarity of a solution made when 32.7 g of NaOH are dissolved to make 445 mL of solution?

    Solution

    To use the definition of molarity, both quantities must be converted to the proper units. First, convert the volume units from milliliters to liters:

    \[445\cancel{mL}\times \frac{1\: L}{1000\cancel{mL}}=0.445\, L\nonumber \]

    Now we convert the amount of solute to moles, using the molar mass of NaOH, which is 40.0 g/mol:

    \[32.7\cancel{gNaOH}\times \frac{1\: mol\: NaOH}{40.0\cancel{gNaOH}}=0.818\, mol\: NaOH\nonumber \]

    Now we can use the definition of molarity to determine the molar concentration:

    \[M \: =\: \frac{0.818\: mol\: NaOH}{0.445L}=1.84\, M\: NaOH\nonumber \]

    Exercise \(\PageIndex{1}\)

    What is the molarity of a solution made when 66.2 g of C6H12O6 are dissolved to make 235 mL of solution?

    Answer

    1.57 M

    The definition of molarity can be used to determine the amount of solute or the volume of solution, if the other information is given. Example 4 illustrates this situation.

    Example \(\PageIndex{2}\)

    How many moles of solute are present in 0.108 L of a 0.887 M NaCl solution?

    Solution

    We know the volume and the molarity; we can use the definition of molarity to mathematically solve for the amount in moles. Substituting the quantities into the definition of molarity:

    \[0.887\, M \: =\: \frac{mol\: NaCl}{0.108L}\nonumber \]

    We multiply the 0.108 L over to the other side of the equation and multiply the units together; "molarity × liters" equals moles, according to the definition of molarity. So

    mol NaCl = (0.887 M)(0.108 L) = 0.0958 mol

    Exercise \(\PageIndex{2}\)

    How many moles of solute are present in 225 mL of a 1.44 M CaCl2 solution?

    Answer

    0.324 mol

    If you need to determine volume, remember the rule that the unknown quantity must be by itself and in the numerator to determine the correct answer. Thus, rearrangement of the definition of molarity is required.

    Example \(\PageIndex{3}\)

    What volume of a 2.33 M NaNO3 solution is needed to obtain 0.222 mol of solute?

    Solution

    Using the definition of molarity, we have

    \[2.33\, M \: =\: \frac{0.222mol}{L}\nonumber \]

    To solve for the number of liters, we bring the 2.33 M over to the right into the denominator, and the number of liters over to the left in the numerator. We now have

    \[L \: =\: \frac{0.222mol}{2.33\, M}\nonumber \]

    Dividing, the volume is 0.0953 L = 95.3 mL.

    Exercise \(\PageIndex{3}\)

    What volume of a 0.570 M K2SO4 solution is needed to obtain 0.872 mol of solute?

    Answer

    1.53 L

    A similar unit of concentration is molality (m), which is defined as the number of moles of solute per kilogram of solvent, not per liter of solution:

    \[molality\: =\: \frac{moles\: solute}{kilograms\: solvent}\nonumber \]

    Mathematical manipulation of molality is the same as with molarity.

    Another way to specify an amount is percentage composition by mass (or mass percentage, % m/m). It is defined as follows:

    \[\%m/m\: =\: \frac{mass\: of\: solute}{mass\: of\: entire\: sample}\times 100\%\nonumber \]

    It is not uncommon to see this unit used on commercial products (see Figure \(\PageIndex{1}\) - Concentration in Commercial Applications).

    A white and light blue bottle of 5% urea is shown against a dark blue background.
    Figure \(\PageIndex{1}\) Concentration in Commercial Applications © Thinkstock. The percentage of urea in this package is 5% m/m, meaning that there are 5 g of urea per 100 g of product.

    Example \(\PageIndex{4}\)

    What is the mass percentage of Fe in a piece of metal with 87.9 g of Fe in a 113 g sample?

    Solution

    Using the definition of mass percentage, we have

    \[\%m/m\: =\: \frac{87.9\, g\, Fe}{113\, g\, sample}\times 100\%=77.8\%\, Fe\nonumber \]

    Related concentration units are parts per thousand (ppth), parts per million (ppm) and parts per billion (ppb). Parts per thousand is defined as follows:

    \[ppth\: =\: \frac{mass\: of\: solute}{mass\: of\: sample}\times 1000\nonumber \]

    There are similar definitions for parts per million and parts per billion:

    \[ppm\: =\: \frac{mass\: of\: solute}{mass\: of\: sample}\times 1,000,000\nonumber \]

    and

    \[ppb\: =\: \frac{mass\: of\: solute}{mass\: of\: sample}\times 1,000,000,000\nonumber \]

    Each unit is used for progressively lower and lower concentrations. The two masses must be expressed in the same unit of mass, so conversions may be necessary.

    Example \(\PageIndex{5}\)

    If there are 0.6 g of Pb present in 277 g of solution, what is the Pb concentration in parts per thousand?

    Solution

    Use the definition of parts per thousand to determine the concentration. Substituting

    \[\frac{0.6g\, Pb}{277g\, solution}\times 1000=2.17\, ppth\nonumber \]

    Exercise \(\PageIndex{5}\)

    If there are 0.551 mg of As in 348 g of solution, what is the As concentration in ppm?

    Answer

    1.58 ppm

    As with molarity and molality, algebraic rearrangements may be necessary to answer certain questions.

    Example \(\PageIndex{6}\)

    The concentration of Cl ion in a sample of H2O is 15.0 ppm. What mass of Cl ion is present in 240.0 mL of H2O, which has a density of 1.00 g/mL?

    Solution

    First, use the density of H2O to determine the mass of the sample:

    \[240.0\cancel{mL}\times \frac{1.00\: g}{\cancel{mL}}=240.0\, g\nonumber \]

    Now we can use the definition of ppm:

    \[15.0\, ppm\: =\: \frac{mass\: of\: solute}{240.0\: g\: solution}\times 1,000,000\nonumber \]

    Rearranging to solve for the mass of solute,

    \[mass\: solute =\: \frac{(15.0\, ppm)(240.0\: g\: solution)}{1,000,000}=0.0036g=3.6\, mg\nonumber \]

    Exercise \(\PageIndex{6}\)

    The concentration of Fe3+ ion in a sample of H2O is 335.0 ppm. What mass of Fe3+ ion is present in 3,450 mL of H2O, which has a density of 1.00 g/mL?

    Answer

    1.16 g

    For ionic solutions, we need to differentiate between the concentration of the salt versus the concentration of each individual ion. Because the ions in ionic compounds go their own way when a compound is dissolved in a solution, the resulting concentration of the ion may be different from the concentration of the complete salt. For example, if 1 M NaCl were prepared, the solution could also be described as a solution of 1 M Na+(aq) and 1 M Cl(aq) because there is one Na+ ion and one Cl ion per formula unit of the salt. However, if the solution were 1 M CaCl2, there are two Cl(aq) ions for every formula unit dissolved, so the concentration of Cl(aq) would be 2 M, not 1 M.

    In addition, the total ion concentration is the sum of the individual ion concentrations. Thus for the 1 M NaCl, the total ion concentration is 2 M; for the 1 M CaCl2, the total ion concentration is 3 M.

    Key Takeaway

    • Quantitative units of concentration include molarity, molality, mass percentage, parts per thousand (ppth), parts per million (ppm), and parts per billion (ppb).

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