c10 JWBS043-Rogers September 13, 2010 11:26 Printer Name: Yet to Come
150 CHEMICAL KINETICS
10.3.2 Back to Kinetics: Sequential Reactions
In this section we shall obtain the concentrationBin the a sequence of two first-order
reactions:
A
k 1
→B
k 2
→C
The differential equations are
dA
dt
=−k 1 A
dB
dt
=k 1 A−k 2 B
dC
dt
=k 2 B
From the first equation, we have
A=A 0 e−k^1 t, B 0 =C 0 = 0
where the subscripted 0 indicates the initial concentration. Substituting this result
into the equation forB(t), we obtain
dB(t)
dt
=k 1 A 0 e−k^1 t−k 2 B(t)
Now take the Laplace transform of both sides and solve forb(s), the transform of
B(t):
sb(s)−B(t=0)=
k 1 A 0
s+k 1
−k 2 b(s)
whereB(t=0)=B 0 =0, so the remaining terms are
sb(s)+k 2 b(s)=
k 1 A 0
s+k 1
b(s)(s+k 2 )=
k 1 A 0
s+k 1
b(s)=
k 1 A 0
s+k 1
1
(s+k 2 )
=k 1 A 0
1
(s+k 1 )
1
(s+k 2 )