Given:
[tex]L=2 \pi r( \frac{x}{360}) [/tex]
Solution:
If we want to find the solution for r, we need to move the r to the left side first. So I reverse the side
[tex]2 \pi r( \frac{x}{360})=L[/tex]
Move 2π to the right side. Because on the left side 2π acts as numerator, after it's moved to the right side, it becomes denominator.
[tex]2 \pi r( \frac{x}{360})=L[/tex]
[tex]r( \frac{x}{360})= \frac{L}{2 \pi } [/tex]
Move 360 to the right side. Because on the left side 360 acts as denominator, after it's moved to the right side, it becomes numerator.
[tex]r( \frac{x}{360})= \frac{L}{2 \pi } [/tex]
[tex]r(x)= \frac{360L}{2 \pi }[/tex]
Move x to the right side. Because on the left side x acts as numerator, after it's moved to the right side, it becomes denominator.
[tex]r(x)= \frac{360L}{2 \pi }[/tex]
[tex]r= \frac{360L}{2 \pi x}[/tex]
Then simplify the fraction
[tex]r= \frac{360L}{2 \pi x}[/tex]
[tex]r= \frac{180L}{ \pi x}[/tex]
The answer is second option
