Answer:
1250 square feet
Step-by-step explanation:
Let the dimensions of the wall be x and y
Since only three of the sides will require fencing
Perimeter=2x+y (where y is the side opposite the wall)
The farmer has 100 feet of fencing
Therefore: Perimeter=100 feet
2x+y=100
y=100-2x
Area of the enclosure, A(x,y)=xy
Substituting y=100-2x into A(x,y)
Area, A(x)=x(100-2x)
[tex]A(x)=100x-2x^2[/tex]
To determine the largest area the farmer can enclose, we maximize A(x) by finding its derivative and solving for its critical point.
[tex]A'(x)=100-4x[/tex]
Set A'(x)=0
100-4x=0
4x=100
x=25 feet
Recall: y=100-2x
y=100-2(25)=50 feet
Therefore, the largest area the farmer can enclose is that of an enclosure which has dimensions 25ft X 50ft.
Maximum Area=1250 square feet
