A radioactive element` X` converts into another stable elemnet `Y`. Half-life of `X` is `2h`. Initally, only `X` is present. After time `t`, the ratio of atoms of `X` and `Y` is found to be `1:4` Then `t` in hours is .A. `2`B. `4`C. between` 4` and `6`D. `6`

A radioactive element` X` converts into another stable elemnet `Y`. Ha

1.	A radioactive element` X` converts into another stable elemnet `Y`. Half-life of `X` is `2h`. Initally, only `X` is present. After time `t`, the ratio of atoms of `X` and `Y` is found to be `1:4` Then `t` in hours is .A. `2`B. `4`C. between` 4` and `6`D. `6`
Answer» Correct Answer - c Let `N_(2)` be the number of atoms of X at time `t =0`. Then, at `t=4h` (two half-lives), `N_x =N_0/4` and `N_y =3N_0/4` `because (N_(x))/(N_(y)) =(1)/(3) ~~0.33` At `t=6th` (three half-lives), `N_(x) =(N_(0))/(8)` and `N_(y) =(7N_(0))/(8)` or `(N_(x))/(N_(y)) =(1)/(7) ~~0.142` The given ratio `(1)/(4)` lies between `(1)/(3)` and `(1)/(7)`. Therefore , t lies between `4 h` and `6h`.

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A radioactive element` X` converts into another stable elemnet `Y`. Half-life of `X` is `2h`. Initally, only `X` is present. After time `t`, the ratio of atoms of `X` and `Y` is found to be `1:4` Then `t` in hours is .A. `2`B. `4`C. between` 4` and `6`D. `6`

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