A lifeguard marks off a rectangular swimming area at a beach480 m of rope. What is the greatest possible area she can enclose?

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A lifeguard marks off a rectangular swimming area at a beach480 m of rope. What is the greatest possible area she can enclose?

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Answer 1 · 2018-03-04T23:50:28

Either $28, 800$ $28,800$ or $14, 400$ $14,400$ square meters depending upon the interpretation of the description.

Explanation:

Possibility 1: The beach forms one side of the rectangular area (no rope required)

If $L$ $L$ represents the length of the side paralleling the beach
and $W$ $W$ represents the with of the remaining two sides perpendicular to the beach
then
$XXX L = 480 - 2 W xxxxx$ $color(white)("XXX")L=480-2Wcolor(white)("xxxxx")$ (all measurements in meters)
and the area would be
$XXX A_{L, W} = L \times W$ $color(white)("XXX")A_(L,W)= LxxW$
or
$XXX A (W) = 480 W - 2 W^{2}$ $color(white)("XXX")A(W)=480W-2W^2$

The maximum value for $A (W)$ $A(W)$ would be achieved when the derivative $A'(W)=0$

$color(white)("XXX")A'(W)=480-4W=0$

$color(white)("XXX")rArr W=120$

and, since $L=480-2W$
$color(white)("XXX")rArr L=240$

Giving a total possible area of
$color(white)("XXX")LxxW= 240xx120=28,800$ (square meters)

Possibility 2: All 4 sides require rope
In this case the maximum area is formed by a square with sides of length $480/4=120$ (meters)
and
a (maximum) area of $120xx120=14400$ square meters

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A lifeguard marks off a rectangular swimming area at a beach480 m of rope. What is the greatest possible area she can enclose?

1 Answer

Explanation:

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