Respuesta :
Answer:
It will take 7 years ( approx )
Step-by-step explanation:
Given equation that shows the amount of the substance after t years,
[tex]A=A_0 e^{kt}[/tex]
Where,
[tex]A_0[/tex] = Initial amount of the substance,
If the half life of the substance is 19 years,
Then if t = 19, amount of the substance = [tex]\frac{A_0}{2}[/tex],
i.e.
[tex]\frac{A_0}{2}=A_0 e^{19k}[/tex]
[tex]\frac{1}{2} = e^{19k}[/tex]
[tex]0.5 = e^{19k}[/tex]
Taking ln both sides,
[tex]\ln(0.5) = \ln(e^{19k})[/tex]
[tex]\ln(0.5) = 19k[/tex]
[tex]\implies k = \frac{\ln(0.5)}{19}\approx -0.03648[/tex]
Now, if the substance to decay to 78% of its original amount,
Then [tex]A=78\% \text{ of }A_0 =\frac{78A_0}{100}=0.78 A_0[/tex]
[tex]0.78 A_0=A_0 e^{-0.03648t}[/tex]
[tex]0.78 = e^{-0.03648t}[/tex]
Again taking ln both sides,
[tex]\ln(0.78) = -0.03648t[/tex]
[tex]-0.24846=-0.03648t[/tex]
[tex]\implies t = \frac{0.24846}{0.03648}=6.81085\approx 7[/tex]
Hence, approximately the substance would be 78% of its initial value after 7 years.
