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The function f(x) = -(x - 3)2 + 9 can be used to represent the area of a rectangle with a perimeter of 12 units, as a function of the length of the rectangle, x. What is the maximum area of the rectangle?
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The function f(x) = -(x - 3)2 + 9 can be used to represent the area of a rectangle with a perimeter of 12 units, as a

function of the length of the rectangle, x. What is the maximum area of the rectangle?
3 square units
6 square units
9 square units
12 square units

User Kevin Dahl
by
5.7k points

2 Answers

1 vote

Answer:

9 c

Explanation:

User Davis King
by
6.2k points
3 votes

Answer:

9 square units

Explanation:

The function f(x) describes a parabola opening downward, with a vertex at (3, 9). The maximum value of f(x) is found at the vertex, where it is f(3) = 9.

The maximum area is 9 square units.

The function f(x) = -(x - 3)2 + 9 can be used to represent the area of a rectangle-example-1
User Daaksin
by
6.0k points
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