The formula for length of an arc on a circle is given by the formula:
[tex]L = \frac{2 \pi rx}{360}[/tex],
where 'r' is the radius of the circle and 'x' is the measure of the central angle of the arc.
We have to determine the value of radius 'r'.
Since, [tex]L = \frac{2 \pi rx}{360}[/tex]
By Cross multiplication, we get
[tex]360 \times L = 2 \pi rx[/tex]
[tex]\frac{360 \times L}{ 2 \pi x} =r[/tex]
[tex]\frac{180 \times L}{ \pi x} =r[/tex]
[tex]r = \frac{180L}{ \pi x}[/tex]
Therefore, the radius 'r' is given by [tex]r = \frac{180L}{ \pi x}[/tex].
Option 4 is the correct answer.
I got the opposite of this answer, it was instead "solve for x."
With anyone with this for their question, the answer is the opposite:
x = 180L/[tex]\pi[/tex]r
Thus x = 180L/pi r, looks just like D, but the "r" and "x" placements are switched.
