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17 September, 20:13

A rectangular garden of area 832 square feet is to be surrounded on three sides by a brick wall costing $8 per foot and on one side by a fence costing $5 per foot. find the dimensions of the garden such that the cost of the materials is minimized.

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  1. 17 September, 20:30
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    Nice problem!

    Area of a rectangle = length * width, or length = Area / width

    Let the Width be W

    then the length is 832/W

    Assume the side W is a fence, and the rest brick.

    Total cost, C (W) = $5*W + $8W + 2*$8 * (832/W)

    Simplifying, C (W) = 13W+13312/W

    To find the minimum cost, we differentiate the cost with respect to W, and equate the derivative C' (W) to zero.

    then C' (W) = 13-13312/W^2=0

    Rewrite C' (W) as (13W^2-13312) / (W^2) = 0, we solve for W and get

    W=sqrt (13312/13) = 32

    Therefore length, L=832/32=26

    Check L*W=26*32=832 ok [ note L>W, because this costs less $]

    Check L=26 and W=32 is the minimum (as opposed to maximum),

    we calculate C" (W) = 26624/W^3 > 0 which means that W=26 is a minimum for C (W).

    So the dimensions of the garden are 26' x 32', with fence on the W=32' dimension.

    Just by curiosity, total cost = C (32) = $832, and average cost = $7.17/'

    all sound reasonable.
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