Answer:
Rate law: [tex]r=k[A]^2[/tex]
Integrated rate law: [tex]\frac{1}{[A]}=kt+ \frac{1}{[A]_0}[/tex]
Rate constant: [tex]k=3.40x10^{-2}\frac{L}{mol*s}[/tex]
Explanation:
Hello,
In this case, since the slope is obtained by plotting 1/[A] and it has the units L/(mol*s) or 1/(M*s), we can infer the reaction is second-order, therefore, its rate law is:
[tex]r=k[A]^2[/tex]
The integrated rate law:
[tex]\frac{1}{[A]}=kt+ \frac{1}{[A]_0}[/tex]
That is obtained from the integration of:
[tex]\frac{d[A]}{dt}=-k[A]^2[/tex]
And of course, since the slope equals the rate constant, its value is:
[tex]k=3.40x10^{-2}\frac{L}{mol*s}[/tex]
Regards.
