Question:
The gravitational potential at a place varies inversely with \( x^2 \) (i.e., \( V = kx^2 \)), the gravitational field at that place is
The gravitational potential at a place varies inversely with \( x^2 \) (i.e., \( V = kx^2 \)), the gravitational field at that place is
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Gravitational field is the negative derivative of the gravitational potential with respect to distance.
Updated On: Jan 6, 2026
- \( \frac{2k}{x^3} \)
- \( \frac{-2k}{x^3} \)
- \( \frac{k}{x} \)
- \( \frac{-k}{x} \)
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The Correct Option is B
Solution and Explanation
Step 1: Relationship between potential and field.
Gravitational field is the negative gradient of the potential: \[ E = -\frac{dV}{dx} \] For \( V = kx^2 \), differentiating with respect to \( x \) gives the gravitational field as \( E = \frac{-2k}{x^3} \).
Step 2: Conclusion.
The gravitational field at that point is \( \frac{-2k}{x^3} \), which is the correct answer.
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