Guidelines

How do you find the moment of inertia of a disk about diameter?

How do you find the moment of inertia of a disk about diameter?

  1. 6 I. B.
  2. 4 I. C.
  3. 2 I. D.
  4. 6 I. Moment of inertia of a disc about an axis passing through center and perpendicular to plane of the disc=21​MR2. Thus moment of inertia about a diameter of the disc=21​×21​MR2=41​MR2=I. ⟹MR2=4I. Using parallel axis theorem, Id​=ICM​+Md2=21​MR2+MR2=23​MR2=6I. Was this answer helpful? Similar questions.

What is the expression for the moment of inertia of a circular disc of mass M and radius R about its diameter?

The moment of inertia of a uniform circular disc of mass M and radius R about any of its diameters is 1/4 MR^(2).

READ ALSO:   What is the 2021 solar incentive program?

What formula is used to find the theoretical moment of inertia for the disk rotated about its diameter?

In integral form the moment of inertia is I=∫r2dm I = ∫ r 2 d m . Moment of inertia is larger when an object’s mass is farther from the axis of rotation. It is possible to find the moment of inertia of an object about a new axis of rotation once it is known for a parallel axis.

What is moment of inertia of a ring and disc about its diameter?

Thus the moment of inertia of the ring about any of its diameter is MR22.

What is the moment of inertia of a circular section Mcq answer?

Explanation: The moment of inertia of a circular section is πD4/64.

What is the moment of inertia of a circular ring?

The moment of inertia of a circular ring about an axis perpendicular to its plane passing through its centre is equal to $M{{R}^{2}}$, where M is the mass of the ring and R is the radius of the ring. Hence, $I=M{{R}^{2}}$.

READ ALSO:   What are the parameters of air pollution?

How do you find the moment of inertia of a hollow tube?

Explanation:

  1. Moment of inertia of cylinder is IC=12MR2.
  2. The moment of inertia of the removed part is Ih=12ma2.
  3. Volume of the cylinder is VC=πr2L.
  4. The volume of the “hole” vh=πa2L.
  5. Ih=12⋅a2MR2⋅a2=12a4R2M.