Answer:
1.386 or 1 hour
Step-by-step explanation:
Given that decay rate is 15% per hour.
i.e. y' =-0.15y
Separate the variables and integrate
ln y =-0.15 t +C where t = no of hours
Or [tex]y =Ae^{-0.5t}[/tex] where A = initial amount present
When it becomes 1/2 A we have
[tex]A/2 =Ae^{-0.5t}[/tex]
Or [tex]1/2 =e^{-0.5t}[/tex]
[tex]ln(1/2) ={-0.5t}[/tex]
=1.386
In other words in 1 hour (after rounding off) the exponential function reaches its half.
