NVAMediumJEE 2024Rolling Motion & Rotational Kinematics

JEE Physics 2024 Question with Solution

A ring and a solid sphere roll down the same inclined plane without slipping. They start from rest. The radii of both bodies are identical and the ratio of their kinetic energies is:

Answer

Correct answer:7

Step-by-step solution

Standard Method

Given: A ring and a solid sphere roll down the same inclined plane without slipping. Both start from rest and have identical radii.

Find: The required numerical value in the ratio of their kinetic energies.

In pure rolling motion, static friction does no work, so the loss of gravitational potential energy is converted completely into total kinetic energy.

Since both bodies start from rest from the same height on the same inclined plane, each loses the same potential energy. Therefore, their total kinetic energies at any given vertical drop are equal.

KEring=KEsphereKE_{\text{ring}} = KE_{\text{sphere}}

So the ratio of kinetic energies is

KEringKEsphere=1\frac{KE_{\text{ring}}}{KE_{\text{sphere}}} = 1

the solution expresses this ratio as

7x=1\frac{7}{x} = 1

Hence,

x=7x = 7

Therefore, the required answer is 77.

Why the first approach is inconsistent

Given: The same ring and solid sphere roll without slipping from rest.

Find: Check the consistency of the alternate working shown in the source.

The first approach computes

KEring=mv2KE_{\text{ring}} = mv^2

and

KEsphere=710mv2KE_{\text{sphere}} = \frac{7}{10}mv^2

then forms the ratio

KEringKEsphere=107\frac{KE_{\text{ring}}}{KE_{\text{sphere}}} = \frac{10}{7}

This comparison uses the same symbol vv for both bodies, which is not valid because the ring and the solid sphere do not reach the same speed after rolling down the incline. Their moments of inertia are different, so their accelerations and final speeds differ.

Hence that method is inconsistent for comparing the actual total kinetic energies of the two bodies after descending the incline.

Using energy conservation for each body from the same initial height gives equal total kinetic energy instead. That agrees with the final answer provided on the solution's:

7x=1x=7\frac{7}{x} = 1 \Rightarrow x = 7

Therefore, the correct answer is 77.

Common mistakes

  • Assuming both bodies have the same final speed and then directly comparing formulas written in terms of the same vv is incorrect. Different moments of inertia lead to different accelerations and different final speeds. Compare total energies using conservation of energy instead.

  • Comparing only translational kinetic energy and ignoring rotational kinetic energy is wrong. In rolling without slipping, total kinetic energy is the sum of translational and rotational parts.

  • Thinking friction must reduce the final kinetic energy here is incorrect. For pure rolling, static friction does no work, so gravitational potential energy is fully converted into kinetic energy.

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