1 Answer

Mohit Srivastava · Answer 1 · 2023-01-15T17:51:52+0000

Answer:

Dimensions: 150 m x 150 m

Area: 22,500m²

Explanation:

Given information:

Let
= width of the field

Let
= length of the field

Create two equations from the given information:

Area of field:
A= xy

Perimeter of fence:
2(x + y) = 600

Rearrange the equation for the perimeter of the fence to make y the subject:

$\begin{aligned} \implies 2(x + y) & = 600\\ x+y & = 300\\y & = 300-x\end{aligned}$

Substitute this into the equation for Area:

$\begin{aligned}\implies A & = xy\\& = x(300-x)\\& = 300x-x^2 \end{aligned}$

To find the value of x that will make the area a maximum, differentiate A with respect to x:

$\begin{aligned}A & =300x-x^2\\\implies (dA)/(dx)& =300-2x\end{aligned}$

Set it to zero and solve for x:

$\begin{aligned}(dA)/(dx) & =0\\ \implies 300-2x & =0 \\ x & = 150 \end{aligned}$

Substitute the found value of x into the original equation for the perimeter and solve for y:

$\begin{aligned}2(x + y) & = 600\\\implies 2(150)+2y & = 600\\2y & = 300\\y & = 150\end{aligned}$

Therefore, the dimensions that will give Tanya the maximum area are:

150 m x 150 m

The maximum area is:

$\begin{aligned}\implies \sf Area_(max) & = xy\\& = 150 \cdot 150\\& = 22500\: \sf m^2 \end{aligned}$

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