The potential energy of a particle of mass 'm' situated in a unidimensional potential field varies as `U(x) = U_0 [1- cos((ax)/2)]`, where `U_0` and a are positive constant. The time period of small oscillations of the particle about the mean position-

A particle of mass m in a unidirectional potential field have potential energy U(x)=alpha+2betax^(2) , where alpha and beta are positive constants. Find its time period of oscillations.

A body of mass m is situated in a potential field U(x)=U_(0)(1-cosalphax) when U_(0) and alpha are constant. Find the time period of small oscialltions.

A particle of mass m moves in a one dimensional potential energy U(x)=-ax^2+bx^4 , where a and b are positive constant. The angular frequency of small oscillation about the minima of the potential energy is equal to

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.

A particle of mass m is moving in a potential well, for which the potential energy is given by U(x) = U_(0)(1-cosax) where U_(0) and a are positive constants. Then (for the small value of x)

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) = (A)/(x^(2)) - (B)/(x) where A and B are positive constant. Find the time period of small oscillation that the partical perform about equilibrium possition.

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 particle located in a one-dimensional potential field has its potential energy function as U(x)(a)/(x^4)-(b)/(x^2) , where a and b are positive constants. The position of equilibrium x corresponds to

A particle located in one dimensional potential field has potential energy function U(x)=(a)/(x^(2))-(b)/(x^(3)) , where a and b are positive constants. The position of equilibrium corresponds to x equal to

The potential energy of a body mass m is U=ax+by the magnitude of acceleration of the body will be-