Respuesta :
700 ÷ 3 = 233 1/3
Therefore, one side should be 234 and the other 2 sides should be 233
Max area = 233 x 234 = 54522 m²
Answer: 54522 m²
Answer:
Length = 350 meters
Width = 125 metres
Maximum area = 43750 meter²
Step-by-step explanation:
Farmer Ed has total fencing = 700 meters
Let the length of rectangular plot is = x meters
Let the width of the plot is = y meters
Since fencing is to be done on three sides so x + 2y = 600 -------(1)
Now the area of plot A = xy --------(2)
Now we substitute the value of x in the equation 2 from equation 1.
A = y(600 - 2y)
A = 600y - 2y²
For the maximum area we find the derivative of the plot which will be equal to the zero.
[tex]\frac{dA}{dy}=\frac{d}{dy} (600y-2y^{2})[/tex]
= 600 - 4y
[tex]\frac{dA}{dy}=0[/tex]
600 - 4y = 0
4y = 600
y = 125 meters
By putting y = 125 in equation 1
x + 2(125) = 600
x + 250 = 600
x = 600 - 250
x = 350 meters
So the length will be 350 meters and width will be 125 meters
And the largest area enclosed will be = 350×125 = 43750 meter²
