c12 JWBS043-Rogers September 13, 2010 11:27 Printer Name: Yet to Come
PROBLEMS, EXAMPLES, AND EXERCISE 197
by definition and the molar mass of water is 18.02, so we have 997.3/18.02=55.345
mol of water. The mole fractions are
X 2 =
n 2
n 1 +n 2
=
0. 1000
55. 345 + 0. 1000
= 1. 804 × 10 −^3
and
X 1 =
n 1
n 1 +n 2
=
55. 345
55. 345 + 0. 1000
= 0. 9982
Comment:First, notice that the sum of the two mole fractions is exactly 1.000, as
it should be because there are only two components in this solution. Second, notice
that we have already made some pretty serious approximations and assumptions. We
don’t really have the right to assume that the volume taken up by NaCl in solution
is the same as the volume in the crystalline state. Also we are assuming that the
density of water is exactly 1.000 kg dm−^3 and the volume of the solution is exactly
1.000 dm^3 without specifying the temperature. We shall have to take these approxi-
mations more seriously later.
In precise solution chemistry, we often usemolalconcentrations, the amount of
solute expressed in molesper 1000 g of solventin contrast to the ordinary stockroom
unit of moles per liter or molarity. A 0.1000 molal solution contains 1000/18.02=
55.494 moles of water, but so does a 0.2000 molal solution because the volume of
the solute is not subtracted from that of the solvent. That is one advantage of the
molal convention. Another is that the number of grams in a molal solution does
not depend on the temperature, but the number of grams in a molar solution does
because the volume of the solution is temperature-dependent. The mole fraction of the
0.1000molalsolution is
X 2 =
n 2
n 1 +n 2
=
0. 1000
55. 494 + 0. 1000
= 1. 800 × 10 −^3
and
X 1 =
n 1
n 1 +n 2
=
55. 494
55. 494 + 0. 1000
= 0. 9982
with a sum of 1.000 as before.
Why specify a new concentration unit when it comes out the same as the old
one? As the following exercise shows, it does not come out exactly the same and
sometimes it is not even close. For very dilute solutions, the difference is negligible,
which is why the concentrations of solutions in working labs and elementary courses
are usually given in molarity rather than molality. In medicinal and clinical chemistry,
many other concentration units are used but they can all be reduced to the basic ones
with a little algebra.