00:01
So here to determine the reactor system with the lowest possible total volume for the given reaction, we need to find the total volume of the reactor required to achieve the desired concentration.
00:19
To solve this we can use the concept of residence time and the equation.
00:26
So the equation is residence time is equals to v divided by q where v is the volume of reactor and q is the volumetric flow rate.
00:42
So the resistance time is the average time a reactor spends inside the reactor.
00:48
By rearranging the equation we can solve for the volume of reactor.
00:52
So here rearranging the equation v is equals to residence time into q.
01:02
Now given q0 is equals to 5 it divided by s and cao is equals to 15 mole t.
01:13
So it can be calculated resistance time for different desired concentration of a and exist.
01:20
So equation 1 that is, so here a for desired concentration of a, the exist of 10 mole by it.
01:41
So here for the graph the reciprocal of the reactant rate that is ca is equals to 10 mole divided by it is approximately 1 divided by 0 .6 second per mole.
02:02
Now resistance time is equals to 1 divided by 0 .6 second per mole...