MCQEasyJEE 2024Kepler's Laws of Planetary Motion

JEE Physics 2024 Question with Solution

Given that the angular speed of the moon in its orbit about the earth is greater than that of the earth around the sun, identify the reason.

  • A

    Shorter period of orbit

  • B

    Larger radius

  • C

    Higher mass of the moon

  • D

    Higher gravitational pull

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The angular speed of the moon about the earth is greater than that of the earth around the sun.

Find: The reason for this comparison.

Angular speed is given by

ω=2πT\omega = \frac{2\pi}{T}

where TT is the time period of revolution.

For the moon revolving around the earth,

Tmoon27.3daysT_{\text{moon}} \approx 27.3\,\text{days}

For the earth revolving around the sun,

Tearth365.25daysT_{\text{earth}} \approx 365.25\,\text{days}

Since

Tmoon<TearthT_{\text{moon}} < T_{\text{earth}}

it follows that

ωmoon=2πTmoon>2πTearth=ωearth\omega_{\text{moon}} = \frac{2\pi}{T_{\text{moon}}} > \frac{2\pi}{T_{\text{earth}}} = \omega_{\text{earth}}

Therefore, the moon has greater angular speed because its period of orbit is shorter. The correct option is A.

Direct Relation Trick

Given: Angular speed comparison between the moon and the earth.

Find: Which listed reason explains the larger angular speed.

Use the inverse relation

ω1T\omega \propto \frac{1}{T}

A smaller time period immediately means a larger angular speed. Since the moon completes its orbit in much less time than the earth, its angular speed is greater.

Therefore, the correct option is A, Shorter period of orbit.

Common mistakes

  • Confusing angular speed with orbital radius. A larger radius does not by itself guarantee a larger angular speed; use ω=2πT\omega = \frac{2\pi}{T} and compare time periods instead.

  • Assuming mass determines angular speed directly in this comparison. Here the relevant quantity is the period of revolution, not the mass of the moon.

  • Choosing gravitational pull without linking it to the given comparison. The question directly asks why angular speed is greater, so the immediate reason must come from the angular speed formula in terms of TT.

Practice more Kepler's Laws of Planetary Motion questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions