A solid sphere of mass and radius is rotated about one of its diameter with angular speed of . If the moment of inertia of the sphere about its tangent is times its angular momentum about the diameter. Then the value of will be _____.
- A
- B
- C
- D
A solid sphere of mass and radius is rotated about one of its diameter with angular speed of . If the moment of inertia of the sphere about its tangent is times its angular momentum about the diameter. Then the value of will be _____.
Correct answer:B
Standard Method
Given: mass of the solid sphere is , radius is , and angular speed is .
Find: the value of .
For a solid sphere, the moment of inertia about a diameter is
Using the parallel axis theorem, the moment of inertia about a tangent is
The angular momentum about the diameter is
Now compare the moment of inertia about the tangent with the angular momentum about the diameter:
Substituting ,
Source Working and Answer Mapping
The source solution states:
and
Therefore,
So the numerical value is . The correct option is B.
The source HTML contains a dimensional inconsistency in the wording because it compares moment of inertia with angular momentum, but using the given source answer and working leads to .
Using the tangent-axis moment of inertia as is incorrect because the perpendicular distance from the center to a tangent axis is , not . Use the parallel axis theorem with distance .
Comparing angular momentum ratio instead of the stated relation can cause confusion. The source working effectively uses the factor from to obtain . Follow the given relation carefully and substitute at the correct stage.
Forgetting that the moment of inertia about a diameter of a solid sphere is is a conceptual error. Do not use formulas for a shell, disc, or ring.
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