Rate equation for first order reaction is as follows:
[tex]t=\frac{2.303}{k}log\frac{A_{0}}{A_{t}}[/tex]
Here, k is rate constant of the reaction, t is time of the reaction, [tex]A_{0}[/tex] is initial concentration and [tex]A_{t}[/tex] is concentration at time t.
The rate constant of the reaction is [tex]0.1 day^{-1}[/tex].
(a) Let the initial concentration be 100, If 90% of the chemical is destroyed, the chemical present at time t will be 100-90=10, on putting the values,
[tex]t=\frac{2.303}{k}log\frac{A_{0}}{A_{t}}=\frac{2.303}{0.1 day^{-1}}log\frac{100}{10}=23.03 days[/tex]
Thus, time required to destroy 90% of the chemical is 23.03 days.
(b) Let the initial concentration be 100, If 99% of the chemical is destroyed, the chemical present at time t will be 100-99=1, on putting the values,
[tex]t=\frac{2.303}{k}log\frac{A_{0}}{A_{t}}=\frac{2.303}{0.1 day^{-1}}log\frac{100}{1}=46.06 days[/tex]
Thus, time required to destroy 99% of the chemical is 46.06 days.
(c) Let the initial concentration be 100, If 99.9% of the chemical is destroyed, the chemical present at time t will be 100-99.9=0.1, on putting the values,
[tex]t=\frac{2.303}{k}log\frac{A_{0}}{A_{t}}=\frac{2.303}{0.1 day^{-1}}log\frac{100}{0.1}=69.09 days[/tex]
Thus, time required to destroy 99.9% of the chemical is 69.09 days.
