Given
An enclose an area of 300 square feet with fence. If the area is rectangular, what is the least amount of fence
Solution
Then perimeter
[tex]Perimeter=2(x+\frac{300}{x})[/tex][tex]\begin{gathered} \frac{dp}{dx}=2(1-\frac{300}{x^2})=0 \\ \\ 1-\frac{300}{x^2}=0 \\ \\ 1=\frac{300}{x^2} \\ \\ x^2=300 \\ x=\sqrt{300} \end{gathered}[/tex]Now substitute x into the perimeter
[tex]\begin{gathered} Perimeter=2(\sqrt{300}+\frac{300}{\sqrt{300}}) \\ perimeter\text{ =amount} \\ Amount=2(\sqrt{300}+\frac{300}{\sqrt{300}}) \\ Amount=40\sqrt{3} \\ Amount=69.28203 \end{gathered}[/tex]The least amount of fence 69.28203ft
