Answer:
31.6 feet by 15.8 feet.
Step-by-step explanation:
Area of a Rectangle = Length X Breadth = LB
The area of the playground is to be 500 square feet
Therefore:
LB=500
Perimeter of the Rectangle = 2(L+B)
The Chain link fence that costs $2 per linear foot on three sides and a fancier wooden fence that costs $6 per linear foot on the fourth side.
Cost = ${2(L+2B)+6L}=2L+4B+6L=8L+4B
Cost= $(8L+4B)
From: LB=500, B=500/L
Substitute B into 8L+4B
C(L) = [tex]8L+4(\frac{500}{L} )=8L+\frac{2000}{L} =\frac{8L^2+2000}{L}[/tex]
C(L)=[tex]\frac{8L^2+2000}{L}[/tex]
The minimum cost of the fencing occurs when the dimensions are minimum.
If we take the derivative of C(L)
[tex]C^{'}(L)=\frac{8L^2-2000}{L^2}[/tex]
At [tex]C^{'}(L)=0[/tex]
[tex]\frac{8L^2-2000}{L^2}=0\\8L^2-2000=0\\8L^2=2000\\L^2=250\\L=15.8 ft[/tex]
Recall: B=500/L
[tex]B=\frac{500}{15.8}=31.6 ft[/tex]
The dimensions that minimizes the total cost of the fencing are 31.6 feet by 15.8 feet.
