Marilee is creating a garden in her yard. She needs to put up a fence to keep the animals out of it. She has 40 yards of fencing she can erect. This situation is modeled using the equation A = -w²+ 20w, where A is the area of the fence and w is the width of the fence. Using the equation, what is domain when the maximum range is achieved?

Question

Marilee is creating a garden in her yard. She needs to put up a fence to keep the animals out of it. She has 40 yards of fencing she can erect. This situation is modeled using the equation A = -w²+ 20w, where A is the area of the fence and w is the width of the fence. Using the equation, what is domain when the maximum range is achieved? 
•	10 yards
•	5 yards
•	10 square yards
•	100 yards

GPT 3.5 · Answer

To find the domain when the maximum range is achieved, we need to find the value of w that maximizes the area A.

The equation for the area of the fence is A = -w² + 20w.

To find the maximum value of A, we can take the derivative of A with respect to w and set it equal to 0.

dA/dw = -2w + 20

Setting -2w + 20 = 0, we get:

-2w = -20
w = 10

So, when w = 10 yards, the maximum range for the area is achieved.

The domain of w is the set of possible values for w. Since the width of the fence cannot be negative, the domain is w ≥ 0.

Therefore, the correct answer is 10 yards.