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The radius of a circular pond is increasing at a constant rate, modeled by the function [tex]\( r(t) = 5t \)[/tex], where [tex]\( t \)[/tex] is time in months. The area of the pond is modeled by the function [tex]\( A(r) = \pi r^2 \)[/tex]. The area of the pond with respect to time can be modeled by the composition [tex]\( A(r(t)) \)[/tex].

Which function represents the area with respect to time?

A. [tex]\( A(r(t)) = 5 \pi r^2 \)[/tex]

B. [tex]\( A(r(t)) = 10 \pi r^2 \)[/tex]

C. [tex]\( A(r(t)) = 5 \pi t^2 \)[/tex]

D. [tex]\( A(r(t)) = 25 \pi t^2 \)[/tex]

Sagot :

GinnyAnswer
To solve this, we need to find the area of the pond with respect to time, given the models for the radius and the area.

1. Understand the given functions:
- The radius of the pond as a function of time is [tex]\( r(t) = 5t \)[/tex].
- The area of the pond as a function of its radius is [tex]\( A(r) = \pi r^2 \)[/tex].

2. Find the composition of these functions to get the area in terms of time:
- We need to substitute the radius function [tex]\( r(t) = 5t \)[/tex] into the area function [tex]\( A(r) = \pi r^2 \)[/tex].

3. Substitute [tex]\( r(t) \)[/tex] into [tex]\( A(r) \)[/tex]:
- First, replace [tex]\( r \)[/tex] with [tex]\( 5t \)[/tex] in the area function.
- [tex]\( A(r(t)) = \pi (r(t))^2 \)[/tex].

4. Calculate [tex]\( A(r(t)) \)[/tex]:
- Substitute [tex]\( r(t) = 5t \)[/tex]:
[tex]\[ A(r(t)) = \pi (5t)^2 \][/tex]
- Simplify the expression:
[tex]\[ A(r(t)) = \pi \cdot 25t^2 \][/tex]
- Thus,
[tex]\[ A(r(t)) = 25\pi t^2 \][/tex]

5. Identify the correct option:
- The function that correctly represents the area of the pond with respect to time is [tex]\( A(r(t)) = 25\pi t^2 \)[/tex].

Therefore, the correct answer is:
[tex]\[ \boxed{D. \ A(r(t)) = 25 \pi t^2} \][/tex]
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