A solid sphere of mass and radius is kept in contact with another solid sphere of mass and radius . The moment of inertia of this pair of spheres about the tangent passing through the point of contact is _____
- A
- B
- C
- D
A solid sphere of mass and radius is kept in contact with another solid sphere of mass and radius . The moment of inertia of this pair of spheres about the tangent passing through the point of contact is _____
Correct answer:A
Standard Method
Given: Two solid spheres are in contact. For the first sphere, and . For the second sphere, and .
Find: The moment of inertia of the pair about the tangent passing through the point of contact.
For a solid sphere about its center,
Using the parallel axis theorem for a tangent axis,
where .
For the first sphere,
For the second sphere,
the solution then gives the total as
There is a discrepancy in the intermediate working because the stated value does not match the final addition shown. However, the solution concludes that the correct option is A and the final answer is .
Therefore, the correct option is A.
Apply Parallel Axis Theorem Sphere-Wise
Given: Each sphere rotates about an axis tangent to it at the common point of contact.
Find: Total moment of inertia about that tangent.
This is the method used in the solution, which identifies A as the correct option despite the inconsistency in the displayed arithmetic.
Hence, the answer is A.
Using directly for each sphere is incorrect because that formula is about the center. The required axis is a tangent through the contact point, so the parallel axis theorem must be applied. Use instead.
Keeping radii in centimeters causes unit inconsistency. Since moment of inertia is required in , convert to and to before substitution.
Assuming the distance in the parallel axis theorem is the sum of radii is incorrect for each individual sphere. For a tangent axis to a sphere, the shift from the center is only that sphere’s own radius. Take for the first sphere and for the second sphere.
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