Respuesta :
94.93
Step-by-step explanation:
The standard equation used to model a exponential growth is given by [tex]f(t)=Ae^{Bt}[/tex]
Given two data points, which are both explicitly a function of time, it is easy to solve the two equations,
[tex]4636=Ae^{2008B} ,5508=Ae^{2018B}[/tex]
Dividing the second equation by the first,
[tex]\frac{5508}{4636}=\frac{Ae^{2018B} }{Ae^{2008B} }[/tex]
[tex]e^{10B}=\frac{5508}{4636}[/tex]
[tex]10B=ln(\frac{5508}{4636} )=0.17235[/tex]
[tex]B=0.017235[/tex]
Substituting in first equation, [tex]A=4.32645\textrm{x}10^{-12}[/tex]
Growth model : [tex]f(t)=(4.3265\textrm{x}10^{-12} )e^{0.017235t}[/tex]
Growth rate=[tex]ABe^{Bt}[/tex]=[tex]94.93[/tex]
∴Approximate growth rate as of 2018 = 95
