Respuesta :
Answer:
Length and width of 85 yards will give the same perimeter and larger area.
Step-by-step explanation:
Let x represent length and y represent width of rectangle.
The perimeter of the rectangle would be [tex]2x+2y\Rightarrow 2(x+y)[/tex].
We have been given that a rectangular lot is 110 yard long and 60 yards wide. The perimeter of the given rectangle would be 2 times the width and length.
[tex]\text{Perimeter}=2(110+60)[/tex]
[tex]\text{Perimeter}=2(170)[/tex]
[tex]\text{Perimeter}=340[/tex]
Upon equating both perimeters, we will get:
[tex]2(x+y)=340[/tex]
Divide both sides by 2:
[tex]x+y=170[/tex]
[tex]y=170-x[/tex]
We know that area of rectangle is length times width.
[tex]\text{Area}=x\cdot y[/tex]
[tex]A(x)=x\cdot (170-x)[/tex]
[tex]A(x)=170x-x^2[/tex]
Now, we will take the derivative of area function as:
[tex]A'(x)=170-2x[/tex]
Now we will equate derivative with 0 and solve for x.
[tex]0=170-2x[/tex]
[tex]2x=170[/tex]
[tex]\frac{2x}{2}=\frac{170}{2}[/tex]
[tex]x=85[/tex]
Therefore, the length of rectangle would be 85 yards.
Upon substituting [tex]x=85[/tex] in equation [tex]y=170-x[/tex], we will get:
[tex]y=170-85=85[/tex]
Therefore, the width of rectangle would be 85 yards.
This means that we will get a square. Since each square is a rectangle, therefore, length and width of 85 yards will give the same perimeter and larger area.
We can verify our answers.
[tex]\text{New area}=85\times 85=7225[/tex]
[tex]\text{Original area}=110\cdot 60=6600[/tex]
[tex]\text{New perimeter}=2(85+85)[/tex]
[tex]\text{New perimeter}=2(170)=340[/tex]
Answer:
85 yards
Step-by-step explanation:
Length = 110 yard
width = 60 yards
Perimeter of rectangle = 2 ( length + width)
P = 2 (110 + 60) = 340 yards
Now let the length is L and width is W.
P = 340 = 2 ( L + W)
L + W = 170 W = 170 - L ..... (1)
Area, A = L x W
A = L (170 - L)
A = 170 L - L²
Differentiate with respect to L
dA/dL = 170 - 2 L
Put it equal to zero for maxima and minima
2 L = 170
L = 85 yards
So, W = 170 - L = 170 - 85 = 85 yards
So, A = 85 x 85 = 7225 yard²
So, when the length and width is same and equal to 85 yards the perimeter is same and the area is largest.
