Answer:
The exact area of the annulus (ring) made by the two circle is [tex]27\pi \ in^{2}[/tex]
Step-by-step explanation:
Given:
Let the radius of outer circle i.e CA be [tex]r_{o}= 6\ in[/tex]
Let the radius of inner circle i.e CB be [tex]r_{i}= 3\ in[/tex]
The diagram is given below as attachment.
[tex]\textrm{area of circle}= \pi r^{2} \\\textrm{area of the shaded region} =\textrm{area of outer circle}-\textrm{area of inner circle}\\\textrm{area of the annulus ring}=\pi r_{o}^{}2 - \pi r_{i}^{}2[/tex]
Substituting the values we get
[tex]\textrm{area of the annulus ring}=\pi\times 6^{2} - \pi\times 3^{2}\\=\pi (36-9)\\=27\pi\ in^{2}[/tex]
