Answer:
t = 21.5 min.
Explanation:
Hello!
In this case, since the kinetics of a first-order reaction is:
[tex]\frac{[A]}{[A]_0}=exp(-kt)[/tex]
Thus, since we are given the 11.7 min for a 58.6-% consumption, we can compute the rate constant, k:
[tex]ln(1-0.586)=-kt\\\\k=\frac{ln(0.414)}{-t}=\frac{-0.882}{11.7min}=0.0754min^{-1}[/tex]
Now, for the second problem, as the new consumption is 80.2%, we can compute the required time as shown below:
[tex]ln(1-0.802)=-kt\\\\t=\frac{ln(198)}{k} \\\\t=\frac{-1.62}{0.0754min^{-1}}\\\\t=21.5min[/tex]
Best regards!
