Answer
Maximum Area that will be enclosed = 162 square yards
Step-by-step explanation
Let the side of the rectangular garden along the the side of the river have a width of y yards.
Then let the other side of the rectangle be x yards.
Perimeter of this rectangular garden will be the total sum of fencing material available.
x + x + y = 36
2x + y = 36
Then, the area of a rectangle is given as
Area = Length × Width
Area = x × y
Area = xy
We can substitute for y using the equation of the perimeter.
2x + y = 36
y = 36 - 2x
A = xy
A = x (36 - 2x)
A = (36x - 2x²)
We are then asked to find the maximum area of this rectangular garden.
Since we have managed to express the Area of the garden as a function of one of the sides of the rectangle, we will find the maximum like we would for any function.
At maximum point, the first derivative of any function is 0, that is,
(dA/dx) = 0
A = 36x - 2x²
(dA/dx) = 36 - 4x = 0
4x = 36
Divide both sides by 4
(4x/4) = (36/4)
x = 9 yards
This value corresponds to the length of the rectangle that will give the maximum area of the rectangular garden.
y = 36 - 2x = 36 - 2 (9) = 36 - 18 = 18 yards
Maximum Area = Length × Width
Maximum Area = 9 × 18
Maximum Area = 162 square yards
Hope this Helps!!!