Answer:
Width = 108 ft
Length = 162 ft
Explanation:
Define the variables:
- Let x = width of the rectangle.
- Let y = length of the rectangle.
If the total length of the fence is the four walls and one additional vertical segment, then the length of the fence is the sum of 3 widths and 2 lengths.
Given the length of the fence is 648 ft, create an expression for the length in terms of the width:
The area of the rectangle is the width multiplied by the length.
Create an equation for the area in terms of x:
To find the value of x when the area is at is maximum, differentiate the equation for A with respect to x.
Set the differentiated equation to zero and solve for x:
Therefore, the width of the region that encloses the maximal area is 108 ft.
To find the length, substitute the found value of x into the expression for y:
Therefore, the dimensions of the region which enclose the maximal area are:
- Width = 108 ft
- Length = 162 ft
Differentiation rule used: