Answer:
The Time period required for decay of Iodine-125 to half of its value is 60 days .
Step-by-step explanation:
Given as :
The initial quantity of iodine-125 = 0.4 gram
The rate of decay = 1.15 %
Let The time period for decay = x day
The finial quantity after decay = half of initial quantity
I.e The finial quantity after decay = 0.2 gram
Now ,
The final quantity after decay = initial quantity × [tex](1-\dfrac{\textrm rate}{100})^{\textrm Time}[/tex]
Or, 0.2 gm = 0.4 gm × [tex](1-\dfrac{\textrm 1.15}{100})^{\textrm x}[/tex]
or, [tex]\frac{0.2}{0.4}[/tex] = [tex](0.9885)^{x}[/tex]
Or, 0.5 = [tex](0.9885)^{x}[/tex]
Or, [tex](0.5)^{\dfrac{1}{x}}[/tex] = 0.9885
Taking log both side
log ( [tex](0.5)^{\dfrac{1}{x}}[/tex] ) = Log 0.9885
or, [tex]\dfrac{1}{x}[/tex] × log 0.5 = - 0.0050233
or, [tex]\dfrac{1}{x}[/tex] × ( - 0.301029 ) = - 0.0050233
or, x = [tex]\dfrac{0.301029}{0.0050233}[/tex]
∴ x = 59.92 ≈ 60 days
Hence The Time period required for decay of Iodine-125 to half of its value is 60 days . Answer
