Potential energy `(U)` of a body of unit mass moving in a one-dimension conservative force field is given by, `U=(X^(2)-4X+3)`. All units are in `S.I.`

Potential energy (U) of a body of unit mass moving in a one-dimension conservative force fileld is given by, U = (x^(2) – 4x + 3). All units are in S.I. (i) Find the equilibrium position of the body. (ii) Show that oscillations of the body about this equilibrium position is simple harmonic motion & find its timeperiod. (iii) Find the amplitude of oscillations if speed of the body at equilibrium position is 2 sqrt(6) m/s.

The potential energy U of a body of unit mass moving in one dimensional conservative force field is given by U=x^2-4x+3 . All units are is SI. For this situation mark out the correct statement (s).

The potential energy (U) of a body of unit mass moving in a one-dimension foroce field is given by U=(x^(2)-4x+3) . All untis are in S.L

S_(1): If the internal forces within a system are conservative, then the work done by the external forces on the system is equal to the change in mechanical energy of the system. S_(2): The potential energy of a particle moving along x- axis in a conservative force field is U=2x^(2)-5x+1 is S.I. units. No other forces are acting on it. It has a stable equalibrium position at one point on x- axis. S_(3) : Internal forces can perform net work on a rigid body. S_(4) : Internal forces can perform net work on a non - rigid body.

The potential energy of an object of mass m moving in xy plane in a conservative field is given by U = ax + by , where x and y are position coordinates of the object. Find magnitude of its acceleration :-

The potential energy of a particle of mass 1 kg in a conservative field is given as U=(3x^(2)y^(2)+6x) J, where x and y are measured in meter. Initially particle is at (1,1) & at rest then:

Potential energy of a particle moving along x-axis under the action of only conservative force is given as U=10+4cos(4pi x) . Here, U is in Joule and x in metres. Total mechanial energy of the particle is 16 J. Choose the correct option.

The potential energy of a particle under a conservative force is given by U ( x) = ( x^(2) -3x) J. The equilibrium position of the particle is at

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

The relation between conservative force and potential energy U is given by :–