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3 February, 16:52

Of all rectangles with a perimeter of 1313 , which one has the maximum area? (give the dimensions.) let a be the area of the rectangle. what is the objective function in terms of the width of the rectangle, w

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  1. 3 February, 17:09
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    Let the length be l.

    Formula of perimeter is P = 2 (length + width)

    1313 = 2 (l+w)

    l = / frac{1313}{2}-w

    And the formula of area of rectangle = length times width.

    A = l*w

    A = (/frac{1313}{2}-w) * w

    A = / frac{1313w}{2} - w^2

    And that's the required objective function.

    The equation represents parabola and a parabola is maximum at its vertex.

    And the formula of vertex is

    w = - / frac{b}{2a} = -/frac{1313}{4}

    Substituting this value of w in the formula of area, we will get

    A = / frac{1313*1313}{8} - (/frac{1313}{4}) ^2

    Area = / frac{1723969}{16}=107748 / square / units.
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