Answer:
100m by 50m.
Step-by-step explanation:
Let the dimension of the rectangular pen be x and y
Area, A(x,y)=xy
Let the side opposite her barn = x
Since she wants to fence only three side
Perimeter = x+2y
Length of Fencing Available = 200m
Therefore: [tex]x+2y=200 \implies x=200-2y[/tex]
We want to maximize the area of the pen, A(x,y).
Substituting x=200-2y into A(x,y)=xy
[tex]A(y)=y(200-2y)\\A(y)=200y-2y^2[/tex]
To maximize A(y), we find its derivative and solve for the critical points.
[tex]A'(y)=200-4y\\$Setting $A'(y)=0\\200-4y=0\\200=4y\\y=50[/tex]
To ensure that this is a maximum, we use the second derivative test.
[tex]A''(y)=-4[/tex]
This is negative and thus, y=50 is a maximum point.
Recall:
x=200-2y
x=200-2(50)
x=200-100
x=100m
Therefore, the dimensions of the pen that has the largest area are 100m by 50m.
