Answer:
[tex]Z(t)=\pi (\frac{10}{3}t)^2[/tex]
Step-by-step explanation:
We have been given that the area [tex]A(r)[/tex] (in square meters) of a circular algae colony with radius r meters is given by [tex]A(r)=\pi r^2[/tex]. The radius [tex]M(t)[/tex] (in meters) after t minutes is given by [tex]M(t)=\frac{10}{3}t[/tex]. We are asked to write the formula for the area [tex]Z(t)[/tex] (in square meters) of the algae colony after t minutes.
This problem is based on composite functions, in which function [tex]M(t)[/tex] represents radius of circle after t minutes.
To write the formula for the area [tex]Z(t)[/tex] (in square meters) of the algae colony after t minutes, we need to substitute [tex]r=\frac{10}{3}t[/tex] in area formula [tex]A(r)[/tex].
[tex]Z(t)=\pi (\frac{10}{3}t)^2[/tex]
Therefore, our required formula would be [tex]Z(t)=\pi (\frac{10}{3}t)^2[/tex].
