Here you will learn what is the formula for the area of circular ring and examples based on it.
Letโs begin โ
Area of a Ring
Let R and r be the outer and inner radii of a ring. 
Then, area of a ring = \(\pi(R^2 โ r^2)\)
Also Read : Area of a Circle and Semicircle โ Formula & Examples
Derivation :
We know that area of circle = \(\pi r^2\)
To calculate the area of ring (concentric circle), we subtract area of smaller circle from the area of bigger circle.
So, Area of rings = Area of bigger circleย โ Area of inner circle
= \(\pi R^2\) โ \(\pi r^2\)
= \(\pi(R^2 โ r^2)\)
Hence, the area is \(\pi(R^2 โ r^2)\).
Example : Find the area of the circular ring whose outer radius is 5 cm and inner radius is 4 cm.
Solution : Here, R = 5 cm and r = 3 cm
So, Area = \(\pi(R^2 โ r^2)\) = \(3.14 \times (25 -16)\) = \(3.14 \times 9\) = 28.26
Example : The area enclosed between two concentric is 770 \(cm^2\). If radius of the outer circle is 21 cm, find the radius of the inner circle.
Solution : Radius of outer circle = 21 cm
Area enclosed between two concentric circles = 770 \(cm^2\)
Let the radius of inner circle be r.
Then, according to question
\(\pi (21)^2\) โ \(\pi r^2\) = 770
\(\implies\)ย ย ย \(21^2\) โ \(r^2\) = \(770 \times 7\over 22\)
\(\implies\)ย \(r^2\) = 441 โ \(70 \times 7\over 2\) = 441 โ 245 = 196
\(\implies\)ย ย r = \(\sqrt{196}\) = 14 cm
Hence, the radius of inner circle is 14 cm.
