Answer:
Step-by-step explanation:
From radioactive equation, it is know that,
N = No•exp(-λt)
Where λ is the decay constant
N is is the material remaining after time t
No is the original material at the beginning I.e. at t = 0
Half-life is given as
T½ = In(2) / λ
Now
Given that,
The initial number of nuclides of type X to that of type Y is
No(X) / No(Y) = 2.7
The final number of nuclides of type X to that of type Y is
N(X) / N(Y) = 4.7
The time elapsed between this period is
t = 2.5d
the half life of isotope Y is
T½(Y) = 1.5d
What is the half life of isotope X
From first equation at t = 2.5d
For type X
N = No•exp(-λ•t)
N(X) = No(X) • exp(-2.5•λx)
For Type Y
N = No•exp(-λ•t)
N(Y) = No(Y) • exp(-2.5•λy)
Divide N(X) by N(Y)
Then, we have
N(X) / N(Y) = [No(X) / No(Y)]•exp(-2.5λx) / exp(-2.5λy)
Let substitute the given ratio
4.7 = 2.7 exp(-2.5λx+2.5λy)
4.7 / 2.7 = exp(-2.5λx+2.5λy)
1.741 = exp(-2.5λx+2.5λy)
Take In of both sides
In(1.741) = -2.5λx+2.5λy
0.5543 = -2.5(λx-λy)
(λx-λy) = 0.5543/-2.5
(λx-λy) = -0.2217 equation 1
From the second equation
T½ = In2 / λ
For Type Y
T½(Y) = In2 / λy
λy = In2 / T½(Y)
λy = In2 / 1.5d
λy = 0.4621 /d
From equation 1
λx-λy = -0.2217
λx - 0.4621 = -0.2217
λx = -0.2217 + 0.4621
λx = 02204 /d
Finally,
T½(X) = In2 / λx
T½(X) = In2 / 0.2204 /d
T½(X) = 2.8833 d
So the half life of Element X is 2.8833d