Question:
An electron revolving in circular orbit of radius \( r \) with velocity \( v \) and frequency \( \nu \) has orbital magnetic moment \( M \). If the frequency of revolution is doubled, then the new magnetic moment will be
An electron revolving in circular orbit of radius \( r \) with velocity \( v \) and frequency \( \nu \) has orbital magnetic moment \( M \). If the frequency of revolution is doubled, then the new magnetic moment will be
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Orbital magnetic moment is directly proportional to frequency of revolution.
Updated On: Jan 26, 2026
- \( \dfrac{M}{4} \)
- \( 2M \)
- \( M \)
- \( \dfrac{M}{2} \)
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The Correct Option is B
Solution and Explanation
Step 1: Write formula for orbital magnetic moment.
\[ M = I \times A \]
Step 2: Express current in terms of frequency.
\[ I = e\nu \]
Step 3: Area of orbit.
\[ A = \pi r^2 \]
Step 4: Write magnetic moment.
\[ M = e\nu \pi r^2 \]
Step 5: Effect of doubling frequency.
If \( \nu \to 2\nu \), then \[ M' = e(2\nu)\pi r^2 = 2M \]
Step 6: Conclusion.
The new magnetic moment becomes \( 2M \).
\[ M = I \times A \]
Step 2: Express current in terms of frequency.
\[ I = e\nu \]
Step 3: Area of orbit.
\[ A = \pi r^2 \]
Step 4: Write magnetic moment.
\[ M = e\nu \pi r^2 \]
Step 5: Effect of doubling frequency.
If \( \nu \to 2\nu \), then \[ M' = e(2\nu)\pi r^2 = 2M \]
Step 6: Conclusion.
The new magnetic moment becomes \( 2M \).
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