A particle is placed at the origin and a force `F=kx` is acting on it (where k is a positive constant). If `U(0)=0`, the graph of `U(x)` versus x will be (where, (U) is the potintial enetgy function). (a) , (b) , (d) .

A particle is placed at the origin and a force F=Kx is acting on it (where k is a positive constant). If U_((0))=0 , the graph of U (x) verses x will be (where U is the potential energy function.)

A particle is placed at the origin and a force F=Kx is acting on it (where k is a positive constant). If U_((0))=0 , the graph of U (x) verses x will be (where U is the potential energy function.)

On a particle placed at origin a variable force F=-ax (where a is a positive constant) is applied. If U(0)=0, the graph between potential energy of particle U(x) and x is best represented by:-

A particle, which is constrained to move along x-axis, is subjected to a force in the some direction which varies with the distance x of the particle from the origin an F (x) =-kx + ax^(3) . Here, k and a are positive constants. For x(ge0, the functional form of the potential energy (u) U of the U (x) the particle is. (a) , (b) , (c) , (d) .

A particle is moving along the x-axis and force acting on it is given by F=F_0sinomegaxN , where omega is a constant. The work done by the force from x=0 to x=2 will be

The potential energy U for a force field vec (F) is such that U=- kxy where K is a constant . Then

A particle moving along the X-axis executes simple harmonic motion, then the force acting on it is given by where, A and K are positive constants.

The potential energy of configuration changes in x and y directions as U=kxy , where k is a positive constant. Find the force acting on the particle of the system as the function of x and y.

A particle free to move along x-axis is acted upon by a force F=-ax+bx^(2) whrte a and b are positive constants. , the correct variation of potential energy function U(x) is best represented by.

A particle is projected from origin x-axis with velocity V_0 such that it suffers retardation of magnitude given by Kx^3 (where k is a positive constant).The stopping distance of particle is