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A farmer has 260 feet of fencing to make a rectangular corral. What dimensions will make a corral with the maximum area? What is the maximum area possible?

A farmer has 260 feet of fencing to make a rectangular corral. What dimensions will make a corral with the maximum area? What is the maximum area possible?
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A farmer has 260 feet of fencing to make a rectangular corral. What dimensions will make a corral with the maximum area? What is the maximum area possible?

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User Pixparker
by
8.5k points

1 Answer

1 vote
Suppose we have a rectangle with a side of length L and another side of length (L-x). The area of the rectangle is

A=L(x-L)=Lx-L^2
We impose the condition of maximum

dA/dL =0
Thus
x-2L=0

x=2L
Hence the maximum area is when we have a square

A =L(2L-L) =L^2
With a perimeter
P=4L we obtain
L=P/4 =260/4=65 feet
which gives A =L^2=65*65 =6225 ft^2


answered
User Boris Bera
by
8.3k points
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