Question

The following reaction was monitored as a function of time: `AB -> A + B`. A plot of `1/[AB]` versus time yields a straight line with slope `5.6xx10^(-2) (M.s)^-1`. What is the value of the rate constant (k) for this reaction temperature?

Answer 1

`sf(k=5.6xx10^(-2)color(white)(x)"mol"^(-1)."l"."s"^(-1))`

Explanation:

This looks like a 2nd order reaction:

`sf(ABrarrA+B)`

For which the rate of disappearance of `sf(AB)` can be written:

`sf((d[AB])/(dt)=-k[AB]^2)`

Integrating this gives:

`sf((1)/([AB])=(1)/([AB]_0)+kt)`

Where `sf([AB]_0]` is the initial concentration and `sf(k)` is the rate constant.

This means a plot of `sf((1)/([AB])` against `sf(t)` will give a gradient of `sf(k)` and an intercept of `sf((1)/([AB]_0))`:

The graph is a straight line of the form `sf(y=mx+c)` so the rate constant is equal to the gradient of the line:

`:.` `sf(k=5.6xx10^(-2)color(white)(x)"mol"^(-1)."l"."s"^(-1))`