Answer:
[tex]arc\,\,length=10\,\pi\,ft\\arc\,\,length=31.41\,ft[/tex]
Step-by-step explanation:
Recall that the formula for the length of an arc of circumference is given by the formula:
[tex]arc\,\,length=\theta\,R[/tex]
where [tex]\theta[/tex] is the radian form of central angle subtended , and R is the radius of the circumference. What is important is to have the angle given in radians for this formula to be valid.
In our case, the angle ( [tex]\frac{2\pi}{3}[/tex] ) is already in radians, so we can apply the formula directly:
[tex]arc\,\,length=\theta\,R\\arc\,\,length=\frac{2\,\pi}{3} \,(15\,ft)\\arc\,\,length=10\,\pi\,ft\\arc\,\,length=31.41\,ft[/tex]
