Moment of Inertia: Essential Concepts for Competitive Exams

Moment of Inertia

Q. A composite body consists of a solid cylinder and a solid sphere, both of mass M and radius R. What is the total moment of inertia about the same axis?

A. (7/10) MR^2
B. (9/10) MR^2
C. (11/10) MR^2
D. (13/10) MR^2

Solution

The total moment of inertia is I_cylinder + I_sphere = (1/2 MR^2) + (2/5 MR^2) = (7/10) MR^2.

Correct Answer: A — (7/10) MR^2

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Q. A disk and a ring of the same mass and radius are rolling down an incline. Which will reach the bottom first?

A. Disk
B. Ring
C. Both will reach at the same time
D. Depends on the angle of incline

Solution

The disk has a smaller moment of inertia compared to the ring, hence it will reach the bottom first.

Correct Answer: A — Disk

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Q. A disk and a ring of the same mass and radius are rolling without slipping. Which one will reach the bottom of an incline first?

A. Disk
B. Ring
C. Both will reach at the same time
D. Depends on the angle of incline

Solution

The disk will reach the bottom first because it has a smaller moment of inertia compared to the ring.

Correct Answer: A — Disk

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Q. A particle of mass m is located at a distance r from the axis of rotation. What is the moment of inertia of this particle?

A. mr
B. mr^2
C. m/r
D. m/r^2

Solution

The moment of inertia of a point mass is given by I = mr^2.

Correct Answer: B — mr^2

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Q. A particle of mass m is located at a distance r from the axis of rotation. What is the moment of inertia of this particle about the axis?

A. mr
B. mr^2
C. m/r
D. m/r^2

Solution

The moment of inertia of a point mass about an axis is given by I = mr^2.

Correct Answer: B — mr^2

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Q. A rectangular plate of mass M and dimensions a x b is rotated about an axis along one of its edges. What is its moment of inertia?

A. 1/3 Ma^2
B. 1/12 Ma^2 + 1/3 Mb^2
C. 1/2 Ma^2
D. 1/4 Ma^2 + 1/3 Mb^2

Solution

The moment of inertia of a rectangular plate about an edge is I = 1/12 Ma^2 + 1/3 Mb^2.

Correct Answer: B — 1/12 Ma^2 + 1/3 Mb^2

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Q. A solid sphere and a hollow sphere of the same mass and radius are released from rest at the same height. Which one will have a greater linear speed when they reach the ground?

A. Solid sphere
B. Hollow sphere
C. Both have the same speed
D. Depends on the mass

Solution

The solid sphere will have a greater linear speed because it has a smaller moment of inertia, allowing it to convert more potential energy into translational kinetic energy.

Correct Answer: A — Solid sphere

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Q. A solid sphere and a hollow sphere of the same mass and radius are released from rest at the same height. Which one will hit the ground first?

A. Solid sphere
B. Hollow sphere
C. Both hit at the same time
D. Depends on the mass

Solution

The solid sphere will hit the ground first because it has a smaller moment of inertia, allowing it to roll down faster.

Correct Answer: A — Solid sphere

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Q. A solid sphere and a hollow sphere of the same mass and radius are released from rest at the same height. Which one will have a greater translational speed when they reach the ground?

A. Solid sphere
B. Hollow sphere
C. Both will have the same speed
D. Depends on the mass

Solution

The solid sphere will have a greater translational speed because it has a smaller moment of inertia.

Correct Answer: A — Solid sphere

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Q. A solid sphere of mass M and radius R is rolling without slipping. What is its moment of inertia about an axis through its center?

A. 2/5 MR^2
B. 3/5 MR^2
C. 1/2 MR^2
D. MR^2

Solution

The moment of inertia of a solid sphere about its center is I = 2/5 MR^2.

Correct Answer: A — 2/5 MR^2

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Q. A solid sphere of mass M and radius R is rotating about an axis through its center. What is its moment of inertia?

A. 2/5 MR^2
B. 3/5 MR^2
C. 1/2 MR^2
D. 1/3 MR^2

Solution

The moment of inertia of a solid sphere about an axis through its center is I = 2/5 MR^2.

Correct Answer: A — 2/5 MR^2

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Q. A solid sphere rolls without slipping down an incline. What is the ratio of its translational kinetic energy to its total kinetic energy at the bottom?

A. 1:2
B. 2:3
C. 1:1
D. 1:3

Solution

For a solid sphere, the ratio of translational kinetic energy to total kinetic energy is 2:3.

Correct Answer: B — 2:3

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Q. A thin rod of length L and mass M is rotated about an axis perpendicular to its length and passing through one end. What is its moment of inertia?

A. 1/3 ML^2
B. 1/12 ML^2
C. 1/2 ML^2
D. ML^2

Solution

The moment of inertia of a thin rod about an end is I = 1/3 ML^2.

Correct Answer: A — 1/3 ML^2

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Q. A thin rod of length L and mass M is rotated about an axis perpendicular to its length through one end. What is its moment of inertia?

A. 1/3 ML^2
B. 1/12 ML^2
C. 1/2 ML^2
D. ML^2

Solution

The moment of inertia of a thin rod about an end is I = 1/3 ML^2.

Correct Answer: A — 1/3 ML^2

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Q. A uniform rod of length L and mass M is rotated about its center. What is its moment of inertia?

A. 1/3 ML^2
B. 1/12 ML^2
C. 1/2 ML^2
D. ML^2

Solution

The moment of inertia of a uniform rod about its center is I = 1/12 ML^2.

Correct Answer: C — 1/2 ML^2

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Q. A uniform rod of length L is pivoted at one end. If it is allowed to fall freely, what is its angular acceleration just after it is released?

A. g/L
B. 2g/L
C. g/2L
D. 3g/2L

Solution

The angular acceleration α = τ/I = (MgL/2)/(1/3 ML^2) = 3g/2L.

Correct Answer: B — 2g/L

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Q. A uniform thin circular ring of mass M and radius R is rotated about an axis through its center. What is its moment of inertia?

A. MR^2
B. 1/2 MR^2
C. 1/3 MR^2
D. 2/5 MR^2

Solution

The moment of inertia of a thin circular ring about an axis through its center is I = MR^2.

Correct Answer: A — MR^2

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Q. Calculate the moment of inertia of a hollow sphere of mass M and radius R about an axis through its center.

A. 2/5 MR^2
B. 3/5 MR^2
C. 2/3 MR^2
D. MR^2

Solution

The moment of inertia of a hollow sphere about an axis through its center is I = 2/5 MR^2.

Correct Answer: B — 3/5 MR^2

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Q. Determine the moment of inertia of a solid sphere of mass M and radius R about an axis through its center.

A. 2/5 MR^2
B. 3/5 MR^2
C. 4/5 MR^2
D. MR^2

Solution

The moment of inertia of a solid sphere about an axis through its center is I = 2/5 MR^2.

Correct Answer: A — 2/5 MR^2

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Q. For a composite body made of a solid cylinder and a solid sphere, how do you calculate the total moment of inertia about the same axis?

A. Add the individual moments
B. Multiply the individual moments
C. Subtract the individual moments
D. Divide the individual moments

Solution

The total moment of inertia of a composite body about the same axis is the sum of the individual moments of inertia.

Correct Answer: A — Add the individual moments

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Q. For a composite body made of two solid cylinders of mass M1 and M2 and radius R, what is the total moment of inertia about the same axis?

A. I1 + I2
B. I1 - I2
C. I1 * I2
D. I1 / I2

Solution

The total moment of inertia of a composite body is the sum of the individual moments of inertia: I_total = I1 + I2.

Correct Answer: A — I1 + I2

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Q. For a given mass, which of the following configurations will have the smallest moment of inertia?

A. All mass at the center
B. Mass distributed evenly
C. Mass at the edge
D. Mass concentrated at one end

Solution

The moment of inertia is smallest when all mass is concentrated at the center, as it minimizes the distance from the axis of rotation.

Correct Answer: A — All mass at the center

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Q. For a hollow sphere of mass M and radius R, what is the moment of inertia about an axis through its center?

A. 2/5 MR^2
B. 3/5 MR^2
C. 2/3 MR^2
D. MR^2

Solution

The moment of inertia of a hollow sphere about an axis through its center is I = 2/5 MR^2.

Correct Answer: B — 3/5 MR^2

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Q. For a rectangular plate of mass M and dimensions a x b, what is the moment of inertia about an axis through its center and parallel to side a?

A. 1/12 Mb^2
B. 1/3 Mb^2
C. 1/4 Mb^2
D. 1/6 Mb^2

Solution

The moment of inertia of a rectangular plate about an axis through its center parallel to side a is I = 1/12 Mb^2.

Correct Answer: A — 1/12 Mb^2

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Q. For a solid disk of mass M and radius R, what is the moment of inertia about an axis perpendicular to the disk and passing through its center?

A. 1/2 MR^2
B. 1/4 MR^2
C. MR^2
D. 3/4 MR^2

Solution

The moment of inertia of a solid disk about an axis through its center is I = 1/2 MR^2.

Correct Answer: A — 1/2 MR^2

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Q. For a solid disk of mass M and radius R, what is the moment of inertia about an axis through its center and perpendicular to its plane?

A. 1/2 MR^2
B. 1/4 MR^2
C. MR^2
D. 3/4 MR^2

Solution

The moment of inertia of a solid disk about an axis through its center is I = 1/2 MR^2.

Correct Answer: A — 1/2 MR^2

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Q. For a system of particles, how is the moment of inertia calculated?

A. Sum of individual moments
B. Product of mass and distance squared
C. Sum of mass times distance squared
D. Average of all moments

Solution

The moment of inertia for a system of particles is calculated as I = Σ(m_i * r_i^2), where m_i is the mass and r_i is the distance from the axis.

Correct Answer: C — Sum of mass times distance squared

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Q. For a system of particles, the moment of inertia is calculated as the sum of the products of mass and the square of the distance from the axis of rotation. This is known as:

A. Parallel Axis Theorem
B. Perpendicular Axis Theorem
C. Rotational Dynamics
D. Angular Momentum

Solution

This is known as the Parallel Axis Theorem, which states that I = Σ(m_i * r_i^2).

Correct Answer: A — Parallel Axis Theorem

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Q. For a system of particles, the moment of inertia is calculated by summing which of the following?

A. Masses only
B. Distances only
C. Mass times distance squared
D. Mass times distance

Solution

The moment of inertia is calculated by summing the products of mass and the square of the distance from the axis of rotation.

Correct Answer: C — Mass times distance squared

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Q. For a system of particles, the total moment of inertia is calculated by which of the following?

A. Sum of individual moments
B. Product of mass and distance
C. Sum of mass times distance squared
D. Average of individual moments

Solution

The total moment of inertia for a system of particles is the sum of each particle's moment of inertia, I_total = Σ(m_i * r_i^2).

Correct Answer: C — Sum of mass times distance squared

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Moment of Inertia MCQ & Objective Questions

The concept of Moment of Inertia is crucial for students preparing for school and competitive exams in India. Understanding this topic not only enhances conceptual clarity but also boosts your confidence in tackling objective questions. Practicing Moment of Inertia MCQs and important questions can significantly improve your exam performance, allowing you to score better in your assessments.

What You Will Practise Here

Definition and significance of Moment of Inertia
Key formulas related to Moment of Inertia for various shapes
Calculation methods for Moment of Inertia using integration
Understanding the parallel axis theorem and perpendicular axis theorem
Applications of Moment of Inertia in real-world scenarios
Diagrams illustrating Moment of Inertia for different geometries
Sample objective questions and practice problems with solutions

Exam Relevance

Moment of Inertia is a fundamental topic that frequently appears in CBSE, State Boards, NEET, and JEE exams. Students can expect questions that require both theoretical understanding and practical application of the concept. Common question patterns include numerical problems, derivations, and conceptual MCQs that test your grasp of the subject. Being well-prepared in this area can give you an edge in your exam preparation.

Common Mistakes Students Make

Confusing Moment of Inertia with mass or weight
Incorrect application of the parallel axis theorem
Overlooking the units while calculating Moment of Inertia
Neglecting to consider the shape of the object in calculations
Misunderstanding the significance of the radius of gyration

FAQs

Question: What is Moment of Inertia?
Answer: Moment of Inertia is a measure of an object's resistance to rotational motion about an axis, depending on the mass distribution relative to that axis.

Question: How is Moment of Inertia calculated for different shapes?
Answer: Moment of Inertia is calculated using specific formulas for various shapes, such as rectangles, circles, and spheres, which take into account the shape's dimensions and mass distribution.

Now is the time to enhance your understanding of Moment of Inertia! Dive into our practice MCQs and test your knowledge to ensure you are well-prepared for your exams. Your success starts with practice!

Moment of Inertia

Moment of Inertia MCQ & Objective Questions

What You Will Practise Here

Exam Relevance

Common Mistakes Students Make

FAQs

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