For this case we must find the perimeter of the fence, in a circular way, knowing that the perimeter of a circle is given by:
[tex]P = 2 \pi*r[/tex]
Where "r" represents the radius of the circle, in this case [tex]r = \frac {5} {\sqrt {2} -1}[/tex]
Substituting in the perimeter equation we have:
[tex]P = 2 \pi * \frac {5} {\sqrt {2} -1}[/tex]
Rationalizing we have:
[tex]P = \frac {2 \pi * 5 (\sqrt {2} +1)} {(\sqrt {2} -1) * (\sqrt {2} +1)}\\P = \frac {2 \pi*5 \sqrt {2} +2 \pi*5} {2-1}\\P = 10 \pi \sqrt {2} +10 \pi[/tex]
Taking out common factor [tex]\pi[/tex]:
[tex]P = (10 \sqrt {2} +10) \pi[/tex]
Answer:
[tex]P = (10 \sqrt {2} +10) \pi\ feet[/tex]
Option C
