Answer: Dimensions should be 510 feet to maximize the total area of the two fields.
Step-by-step explanation:
Since we have given that
Perimeter of field = 2040 feet
Let the width of rectangle be 'x'
Let the length of rectangle be '2x'
So, According to question, it becomes,
[tex]2(l+b)=2040\\\\l+b=\dfrac{2040}{2}=1020\\\\x+2x=1020\\\\3x=1020\\\\x=\dfrac{1020}{3}\\\\x=340[/tex]
So, the length would be [tex]2x=2\times 340=680\ feet[/tex]
If another field is square,
So, the dimensions would be
[tex]4\times side=2040\\\\side=\dfrac{2040}{4}=510\ feet[/tex]
Now, Area of rectangle would be
[tex]Length\times breadth=340\times 680=231200\ ft^2[/tex]
Area of square would be
[tex]Side^2=510^2=260100[/tex] sq. ft
So, Dimensions should be 510 feet to maximize the total area of the two fields.
