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22 June, 08:22

A farmer has 2400 ft of fencing and wants to fence off a rectangular field that borders a straight river. He needs no fencing along the river. What are the dimensions of the field that has the largest area?

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  1. 22 June, 08:33
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    600ft x 1200ft

    Step-by-step explanation:

    Use derivative optimization to find the maximum area.

    I'll call the two same sides "a", and the one different side "b"

    The maximum perimeter (including 3 sides) is 2400 ft. so,

    2400 = 2a + b

    The area is length * width. so,

    A = ab

    Using substitution to combine the equations,

    A = a * (2400 - 2a)

    A = - 2a² + 2400a

    Find the maximum of A by finding the zeros of its derivative.

    dA = - 4a + 2400

    0 = - 4a + 2400

    The maximum occurs at a = 600

    Substitute in the perimeter equation to find b.

    2400 = 2 (600) + b

    b = 1200

    600 x 1200
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