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If a rectangle has sides of x and 18-x, what is the largest area this rectangle can have?

a) 96 square units
b) 81 square units
c) 76 square units
d) 90 square units

User Sydius
by
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1 Answer

4 votes

Final answer:

The largest area of the rectangle with sides x and 18-x is found at the vertex of the parabola represented by the area function A = -x^2 + 18x. The vertex occurs at x = 9, resulting in a maximum area of 81 square units.

Step-by-step explanation:

To find the largest area of a rectangle with sides of x and 18-x, we can model the area A as a function of x by the equation A = x(18 - x). This gives us a quadratic function A = -x^2 + 18x, where the maximum value can be found by completing the square or using the vertex formula for a parabola. The vertex of the parabola will provide the maximum area since the leading coefficient is negative, indicating a downward opening parabola.

The vertex (h, k) of a parabola given by the function f(x) = ax^2 + bx + c is found at h = -b/(2a). Plugging the coefficients from our equation we get

h = -18 / (2 * -1) = 9

. We substitute

x = 9

back into the area function to find the maximum area,

A = 9 * (18 - 9) = 81 square units

. Therefore, the answer is

b) 81 square units

.

User StephanM
by
7.7k points

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