So firstly, we have to find the radius of the circular garden before finding the circumference (the amount of fencing needed to surround the garden). To find the radius, use the area formula ([tex] A=\pi r^2 [/tex]), plug in the area of the garden (36 ft^2) and solve for r as such:
[tex] 36=\pi r^2\\ \frac{36}{\pi}=r^2\\ \frac{\sqrt{36}}{\sqrt{\pi}}=r\\ \frac{6}{\sqrt{\pi}}=r [/tex]
So that we know the radius, plug that into the circumference equation ([tex] C=2\pi r [/tex]) to solve:
[tex] C=2\pi*\frac{6}{\sqrt{\pi}}\\ C=\frac{12\pi}{\sqrt{\pi}}\\ C=12\sqrt{\pi} [/tex]
Your answer is A. 12√π.
