Respuesta :
The largest area that can be enclosed to the nearest square meter will be 348613 m²
Explanation
Suppose, the length and width of the rectangular plot are [tex]l[/tex] and [tex]w[/tex] respectively.
The farmer does not fence the side along the highway. Lets assume, the farmer does not fence across one length side. So, the total fence needed [tex]= l+2w[/tex]
Given that, the length of the fence is 1670 meters. So, the equation will be.....
[tex]l+2w=1670\\ \\ l= 1670-2w[/tex]
Now, the area of the plot.....
[tex]A= l*w\\ \\ A= (1670-2w)w \\ \\ A=1670w-2w^2[/tex]
Taking derivative on both sides of the above equation in respect of [tex]w[/tex] , we will get.....
[tex]\frac{dA}{dw}=1670-2(2w)\\ \\ \frac{dA}{dw}=1670-4w[/tex]
Now [tex]A[/tex] will be maximum when [tex]\frac{dA}{dw}=0[/tex] . So....
[tex]1670-4w=0\\ \\ 4w=1670\\ \\ w=\frac{1670}{4}=417.5[/tex]
Thus, the area will be: [tex]A= 1670w-2w^2=1670(417.5)-2(417.5)^2= 348612.5 \approx 348613[/tex]
So, the largest area that can be enclosed to the nearest square meter will be 348613 m²
