320 7 Chemical Equilibrium
Since the solution is dilute we assume thatγ(H 2 O)x(H 2 O)≈1 and thatγ(NH 3 )≈1. We
introduce the mean ionic activity coefficient defined in Eq. (6.4-6):γ±[
γ(NH+ 4 )γ(OH−)] 1 / 2We assume that the contribution of OH−from the ionization of water is negligible and letxmeq(NH+ 4 )
m◦meq(OH−)
m◦so that
1. 80 × 10 −^5 γ±^2 x^2
0. 100 −x
We use successive approximations. For our first approximation we assume thatγ±≈1:x^2 (1. 80 × 10 −^5 )(0. 100 −x)
x^2 +(1. 80 × 10 −^5 )x− 1. 80 × 10 −^6 0From the quadratic formulax− 1. 80 × 10 −^5 ±√(
1. 80 × 10 −^5) 2
+ 4(
1. 80 × 10 −^6)2
0. 00133We disregard a negative root to the quadratic equation, which is physically impossible. It is
always the case in a chemistry problem that one of the solutions to a quadratic equation is
unusable. For our next approximation we estimate the mean ionic activity coefficient for this
molality using the Davies equation. Since NH+ 4 and OH−are the only ions present, the first
estimate of the ionic strength is 0.00133 mol kg−^1log 10 (γ±)− 0. 510( √
0. 00133
1 +√
0. 00133−(0.30)(0.00133))− 0. 01774γ± 10 −^0.^01774 0. 9601. 80 × 10 −^5 (0.960)^2 x^2
0. 100 −x
Use of the quadratic formula on this equation yields x 0 .00140, or meq(NH+ 4 )
meq(OH−) 0 .00140 mol kg−^1. A further approximation produces only a small change, so
we stop at this approximation. Even for the low ionic strength of 0.00140 mol kg−^1 , neglect
of the activity coefficient has produced an error of about 5%.The Ionization of Water
Water ionizes according to the chemical equationH 2 OH++OH−