Answer:
The maximum length is 170 feet and maximum width is 340 feet.
Step-by-step explanation:
Let the length of the parking = x feet and width = y feet.
Since, the fencing is to be applied on three sides of the lot.
So,we get, [tex]2x+y=680[/tex]
i.e. [tex]y=680-2x[/tex]
Since, the area of the rectangular lot = Length × Width
So, area of the lot = [tex]x \times y[/tex]
i.e. area of the lot = [tex]x \times (680-2x)[/tex]
i.e. area of the lot = [tex]680x-2x^2[/tex]
Now, we know the maximum value of 'x' in [tex]ax^2+bx+c[/tex] is [tex]\frac{-b}{2a}[/tex].
So, the maximum length of the lot is x= [tex]\frac{-680}{2\times -2}[/tex] = [tex]\frac{680}{4}[/tex] = 170 feet.
Then, [tex]y=680-2x[/tex] i,plies [tex]y=680-2\times 170[/tex] implies [tex]y=680-340[/tex] i.e. y= 340 feet.
So, the maximum length is 170 feet and maximum width is 340 feet.
