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?

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.