The moment of inertia of a square loop made of four uniform solid cylinders, each having radius and length () about an axis passing through the mid points of opposite sides, is (Take the mass of the entire loop as ) :
- A
- B
- C
- D
The moment of inertia of a square loop made of four uniform solid cylinders, each having radius and length () about an axis passing through the mid points of opposite sides, is (Take the mass of the entire loop as ) :
Correct answer:C
Standard Method
Given: A square loop is formed by four identical solid cylinders. The total mass of the loop is , so mass of each cylinder is .
Find: The moment of inertia about an axis passing through the midpoints of opposite sides.
The axis coincides with the longitudinal axis of two cylinders and is transverse to the other two.
Use the standard moments of inertia:
for a cylinder about its own axis, and
for a cylinder about a transverse axis through its center.
Also apply the parallel axis theorem:
Detailed Calculation
For the two cylinders parallel to the axis,
For the two cylinders perpendicular to the axis, the distance of their centers from the axis is
So,
Now simplify:
Therefore, total moment of inertia is
Substitute
Then,
Therefore, the moment of inertia is . The correct option is C.
Using directly as the mass of each cylinder is incorrect because the loop has four identical cylinders. First take mass of each cylinder as , then add their contributions.
For the side cylinders perpendicular to the axis, using moment of inertia about their own longitudinal axis is wrong. Their relevant central moment is the transverse one, .
Ignoring the parallel axis theorem for the two perpendicular cylinders gives an underestimated value. Since their centers are at distance from the axis, add for each cylinder.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.