Answer:
1) The maximum area possible = 2450 ft²
2) Length, L = 70 ft Width , W = 35 ft
Explanation:
The length of the fencing available = 140 ft.
Let L, represent the length of the fence, and W, represent the Width of the fencing
We have;
L + 2·W = 140
∴ L = 140 - 2·W
The area = L × W = (140 - 2·W) × W
The area = (140 - 2·W) × W = 140·W - 2·W²
The area A = 140·W - 2·W²
The dimension of the width for the maximum area is obtained by finding the derivative and equating to zero as follows;
dA/dW = d(140·W - 2·W²)/dW = 140 - 4·W = 0
4·W = 140
W = 140/4 = 35 ft.
W = 35 ft.
The maximum area possible is obtained when W = 35
∴ The maximum area possible A₃₅, Where W = 140·35 - 2·35²
Where W = 35, A = 140 × 35 - 2×35² = 2450 ft.²
The maximum area possible = 2450 ft.²
Therefore, L = 140 - 2·W = 140 - 2 × 35 = 70 ft.
L = 70 ft.
The dimensions are;
Length, L = 70 ft. Width , W = 35 ft.