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Question

A particle oscillates about the equilibrium position x0 subject to a force that has an associated potential energy U(x). Which of the following statements about U(x) is/are true:


A

u(x) must be symmetric about x0

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B

u(x) must have a minimum at x0

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C

u(x) may have a minimum at x0

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D

u(x) must be positive in the vicinity of x0

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Solution

The correct option is B

u(x) must have a minimum at x0


Consider a general example of a system. Which has a stable equilibrium at x = x0 and a restoring force F(x) which maintains an oscillation about x = x0, as shown-

When a system oscillates about a point of equilibrium, it must be a stable equilibrium, which implies u(x) must have a minimum at that point, x0 in this case.

In the case drawn, a mass m drops down a curved wedge, reaches the bottom, and continues upwards due to inertia, till it loses all kinetic energy. It shows from a height y0on the right side as well as it is clear from the conservation of total mechanical energy. There will be oscillations about x0 with the tangential, component of the weight acting as the restoring force since the potential of m at a height of h is mgh, the u-x graph will look like-

We can practically set the level for zero potential energy at any height from the ground. The u(x) function is clearly not symmetric about x0, has negative values in the vicinity of x0.

Hence, correct


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