Potential energy of a particle moving along x-axis is by
`U=(x^(3)/3-4x + 6)`.
here, U is in joule and x in metre. Find position of stable and unstable equilibrium.

Potential energy of a particle along x-axis varies as U = - 30 + (X-2)^2 , where U is in joule and x is in meter. Hence the particle is in

potential enrgy of a particle along x-axis varies as, U=-20 + (x-2)^(2) , where U is in joule and x in meter. Find the equilibrium position and state whether it is stable or unstable equilibrium.

potential enrgy of a particle along x-axis varies as, U=-20 + (x-2)^(2) , where U is in joule and x in meter. Find the equilibrium position and state whether it is stable or unstable equilibrium.

The potential energy of a particle oscillating on x-axis is given as U = 20 + (x-2)^(2) where .U. is in joules and .x. is in metres. Its mean position is

The potential energy of a particle oscillating along x-axis is given as U=20+(x-2)^(2) Here, U is in joules and x in meters. Total mechanical energy of the particle is 36J . (a) State whether the motion of the particle is simple harmonic or not. (b) Find the mean position. (c) Find the maximum kinetic energy of the particle.

The potential energy of a particle oscillating along x-axis is given as U=20+(x-2)^(2) Here, U is in joules and x in meters. Total mechanical energy of the particle is 36J . (a) State whether the motion of the particle is simple harmonic or not. (b) Find the mean position. (c) Find the maximum kinetic energy of the particle.

The potential energy of a particle oscillating along x-axis is given as U=20+(x-2)^(2) Here, U is in joules and x in meters. Total mechanical energy of the particle is 36J . (a) State whether the motion of the particle is simple harmonic or not. (b) Find the mean position. (c) Find the maximum kinetic energy of the particle.

The potential energy of a particle moving along x-axis is given by U = 20 + 5 sin (4 pi x) , where U is in J and x is in metre under the action of conservative force :

Potential energy of a particle in SHM along x - axis is gives by U = 10 + (x - 2)^(2) Here, U is in joule and x in metre. Total mechanical energy of the particle is 26 J . Mass of the particle is 2kg . Find (a) angular frequency of SHM, (b) potential energy and kinetic energy at mean position and extreme position, (c ) amplitude of oscillation, (d) x - coordinates between which particle oscillates.

Potential energy of a particle in SHM along x - axis is gives by U = 10 + (x - 2)^(2) Here, U is in joule and x in metre. Total mechanical energy of the particle is 26 J . Mass of the particle is 2kg . Find (a) angular frequency of SHM, (b) potential energy and kinetic energy at mean position and extreme position, (c ) amplitude of oscillation, (d) x - coordinates between which particle oscillates.