Answer:
a) 4.392317 mt
b) 9 seconds
c) [tex]\large f^{-1}(d)=2^d\;sec.[/tex]
Step-by-step explanation:
We have
[tex]\large f(t)=log_2(t)[/tex]
where t is given in seconds and t in meters.
a)How far has the point traveled 21 seconds after it started moving?
By replacing t=21 in our equation we get
[tex]\large f(21)=log_2(21)=4.392317 \;mt[/tex]
b)If the point has traveled 3.16993 meters, how many seconds have elapsed since it started moving?
We need to find a t such that f(t) =3.16993.
This can be accomplished by using the definition of [tex]log_2[/tex]
[tex]\large f(t)=3.16993\rightarrow log_2(t)=3.16993\rightarrow t=2^{3.16993}=9\;sec.[/tex]
c)Write a function [tex] f^{-1} [/tex] that determines the number of seconds that have elapsed since the particle started moving in terms of the distance (in meters) the particle has traveled.
[tex]f^{-1}[/tex] is given by the definition of log
[tex]\large f^{-1}(d)=2^d\;sec.[/tex]
