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2 June, 04:46

Suppose you have 54 feet of fencing to enclose a rectangular dog pen. The function a=27x-x^2, where x=width, gives you the area of the dog pen in square feet. What width gives you the maximum area? Round to the nearest tenth as necessary.

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  1. 2 June, 06:48
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    For maximum area, we take first derivative and then equalize it to zero

    A (x) = 27x - x^2

    A' (x) = 27 - 2x

    Set that equal to zero and solve for x:

    27 - 2x = 0

    27 = 2x ... [ added 2x to both sides ]

    13.5 = x ... [ divided both sides by 2 ]

    So the area will be

    A = 27 (13.5) - (13.5) ^2

    = 364.5 - 182.25

    = 182.3 ft^2
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