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7 August, 13:18

A rancher with 750 ft of fencing wants to enclose a rectangular area and then divide it into four pens with fencing parallel to one side of the rectangle.

(a) Find a function that models the total area of the four pens.

(b) Find the largest possible total area of the four pens.

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  1. 7 August, 13:38
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    a) A (r) = (1/2) * (750*x - 5*x²)

    b) Dimensions

    x = 75 ft

    y = 187,5 ft

    A (max) = 14062,5 ft²

    Step-by-step explanation:

    Fencing material available 750 ft

    Rectangula area A (r)

    Let x and y dimensions of rectangular area, and x the small side of the rectangle, then

    The perimeter of the rectangle is

    P (r) = 2*x + 2*y (1)

    To get the four pens we have to place three more fence in between the two x sides of the rectangle, in such way that the total fence is

    P (r) + 3*x = 750

    So 2*x + 2*y + 3*x = 750 ⇒ 5*x + 2*y = 750 ⇒ y = (750 - 5x) / 2

    Plugging that value in (1)

    A (r) = x * y

    A (r) = x * (750 - 5*x) / 2 ⇒ A (r) = (1/2) * (750*x - 5*x²)

    Taking derivatives in both sides of the equation we get:

    A' (r) = (1/2) * (750 - 5*x) ⇒ A' (r) = 0 ⇒ (1/2) * (750 - 10*x) = 0

    750 - 10*x = 0 ⇒ x = 750/10 ⇒ x = 75 ft

    And y would be

    y = (750 - 5x) / 2 ⇒ y = (750 - 5*75) / 2 ⇒ y = 375 / 2

    y = 187,5 ft

    A (max) = 187,5*75

    A (max) = 14062,5 ft²
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