![Moment of inertia of a ring of mass M and radius R about an axis passing through the centre and perpendicular to the plane is $I$. What is the moment of inertia Moment of inertia of a ring of mass M and radius R about an axis passing through the centre and perpendicular to the plane is $I$. What is the moment of inertia](https://www.vedantu.com/question-sets/45b40079-397d-4e5b-aaf1-74e9f298c2247221835739433727883.png)
Moment of inertia of a ring of mass M and radius R about an axis passing through the centre and perpendicular to the plane is $I$. What is the moment of inertia
![The moment of inertia of a ring of mass M and radius R about an axis, passing through the center and perpendicular to the plane of the ring is: The moment of inertia of a ring of mass M and radius R about an axis, passing through the center and perpendicular to the plane of the ring is:](https://toppr-doubts-media.s3.amazonaws.com/images/12925477/70ad569b-c38c-4cb7-aab0-e702fffbce16.jpg)
The moment of inertia of a ring of mass M and radius R about an axis, passing through the center and perpendicular to the plane of the ring is:
![The moment of inertia of a circular ring with mass M and radius R about an axis passing through its centre and perpendicular to its plane is:A. $\\dfrac{MR^2}{4}$B. $MR^2$C. $\\dfrac{MR^2}{2}$D. $\\dfrac{3}{4}MR^2$ The moment of inertia of a circular ring with mass M and radius R about an axis passing through its centre and perpendicular to its plane is:A. $\\dfrac{MR^2}{4}$B. $MR^2$C. $\\dfrac{MR^2}{2}$D. $\\dfrac{3}{4}MR^2$](https://www.vedantu.com/question-sets/381a340b-4770-40f8-8c64-1706d7a8c32d1312789461373609054.png)
The moment of inertia of a circular ring with mass M and radius R about an axis passing through its centre and perpendicular to its plane is:A. $\\dfrac{MR^2}{4}$B. $MR^2$C. $\\dfrac{MR^2}{2}$D. $\\dfrac{3}{4}MR^2$
How to calculate the moment of inertia of a thick circular ring about an axis passing through its centre perpendicular to its plane - Quora
Moment of inertia of a ring of radius R whose mass per unit length varies with parametric angle θ according to the relation λ=λ°cos²θ, about its axis will be
![Determine the moment of inertia of a ring perpendicular to tangent and its plane. | Homework.Study.com Determine the moment of inertia of a ring perpendicular to tangent and its plane. | Homework.Study.com](https://homework.study.com/cimages/multimages/16/untitled1600246088363239895.png)