ii. From Eq. (6.7) the integrated rate law is
k = 2.303t log 10
[A] 0
[A]t
On rearrangement, the equation becomes
kt
2.303
= log 10 [A] 0 - log 10 [A]tHence, log 10 [A]t = - 2.303k t + log 10 [A] 0
y m x cThe equation is of the straight line. A graph of
log 10 [A]t versus t yields a straight line with
slope -k/2.303 and y-axis intercept as log 10 [A] 0
This is shown in Fig. 6.4
6.5.6 Examples of first order reactions
Some examples of reactions of first order are :
i. 2 H 2 O 2 (l) 2 H 2 O(l) + O 2 (g),
rate = k[H 2 O 2 ]
ii. 2 N 2 O 5 (g) 4 NO 2 (g) + O 2 (g),
rate = k [N 2 O 5 ]
6.5.7 Integrated rate law for gas phase f
reactions
For the gas phase reaction,
A(g) B(g) + C(g)
Let initial pressure of A be Pi that decreases by
x within time t.
Pressure of reactant A at time t
PA = Pi - x
(6.11)
The pressures of the products B and C at time
t are
PB = PC = x
The total pressure at time t is then
P = Pi - x + x + x = Pi + x
Hence, x = P - Pi (6.12)
Pressure of A, PA at time t is obtained by
substitution of Eq. (6.12) into Eq. (6.11). Thus
PA = Pi - (P - Pi) = Pi - P + Pi = 2Pi - P
The integrated rate law turns out to bek = 2.303t log 10[A] 0
[A]t
The concentration now expressed in terms of
pressures.
Thus, [A] 0 = Pi and [A]t = PA = 2 Pi - P
Substitution gives in abovek =2.303
t log^10Pi
2 Pi - P(6.13)P is the total pressure of the reaction mixture
at time t.Fig. 6.5 : A plot of log 10 [A] 0 /[A]t vs time ttlog 10[A] 0
[A]tiii. Eq. (6.7) gives
log 10 [A]^0
[A]t
= 2.303k ty m xThe equation has a straight line form y = mx.
Hence, the graph of log 10 [A]^0
[A]t
versus t isstraight line passing through origin as shown
in Fig. 6.5.
Fig. 6.4 : A plot showing log 10 [A]t vs time ttime tlog 10 [A]t