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A particle of mass $$m$$ is located in a unidimensional potential field where potential energy of the particle depends on the coordinates $$x$$ as $$U(x)=\dfrac{A}{x^{2}}-\dfrac{B}{x}$$ where $$A$$ and $$B$$ are positive contacts. Find the time period of small oscillations that the particle performs about an equilibrium position.

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