Question

If the half life of a radioactive substance is 4 days. Calculate the time required to decrease the concentration of 1/8th of original??

Answer 1

Half life of a radioactive substance is defined as the time taken for it to degrade to 1/2 of its original quantity.

I like looking at the problem this way

`1->1/2->1/4->1/8`

So it reaches `1/8`th of the original after `3`(counting the number of arrows) half lives.

The time required, therefore, to decrease the concentration of 1/8th of original would be

`=3xx4 " days"`

`= 12 " days"`

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Now, this is the formula approach.

Let `N_0` be the original quantity and `N` be the new quantity then,

`N / (N_0)= 1/2^(t/T)`

`N / (N_0)= 1/8` `color(white)(ddddwwwwwwwwwdd` `["given that " N = N_0/8]`

`=>1/8 = 1/2^(t/T)`

`=> 2^(t/T)=8=2^3`

`=>t/T = 3`

`=> t= 3xx4 " days"= 12 " days"` `color(white)(ddd` `["given that " T=4 " days"`]