The potential energy of a particle of mass m is given by `U(x)=U_0(1-cos cx)` where `U_0` and c are constants. Find the time period of small oscillations of the particle.

A particle of mass m is located in a one dimensional potential field where potential energy of the particle has the form u(x) = a/x^(2)-b/x) , where a and b are positive constants. Find the period of small oscillations of the particle.

A body of mass m is situated in a potential field U(x) =(U_0(1 - cosax) when U_0 and a are constants. Find the time period of small oscillations.

A particle of mass m is located in a one dimensional potential field where potential energy is given by V(x) = A(1- cos Px) , where A and P are constant . The period of small oscillations of the particle is

A partical of mass m is located in a unidimensionnal potential field where potentical energy of the partical depends on the coordinates x as: U (x) = U_(0) (1 - cos Ax), U_(0) and A constants. Find the period of small oscillation that the partical performs about the equilibrium position.

A partical of mass m is located in a unidimensionnal potential field where potentical energy of the partical depends on the coordinates x as: U (x) = U_(0) (1 - cos Ax), U_(0) and A constants. Find the period of small oscillation that the partical performs about the equilibrium position.

A body of mass m is situated in a potential field U(x) = V_(0)(1-cos ax) when U_(0) and alpha are constants. Find the time period of small oscillations.

A body of mass m is situated in potential field U(x)=U_(o)(1-cospropx) where, U_(o) and prop are constants. Find the time period of small oscillations.