The potential energy of a force filed `vec(F)` is given by `U(x,y)=sin(x+y)`. The force acting on the particle of mass m at `(0,(pi)/4)` is

The potential energy for a force filed vecF is given by U(x,y)=cos(x+y) . The force acting on a particle at position given by coordinates (0, pi//4) is

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

The potential energy of a body is given by U = A - Bx^(2) (where x is the displacement). The magnitude of force acting on the partical is

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 motion of a particle of mass m is described by y =ut + (1)/(2) g t^(2) . Find the force acting on the particale .

The motion of a particle of mass m is described by y =ut + (1)/(2) g t^(2) . Find the force acting on the particale .

The potential energy function of a particle due to some gravitational field is given by U=6x+4y . The mass of the particle is 1kg and no other force is acting on the particle. The particle was initially at rest at a point (6,8) . Then the time (in sec). after which this particle is going to cross the 'x' axis would be:

The potential energy of a particle of mass 2 kg moving in a plane is given by U = (-6x -8y)J . The position coordinates x and y are measured in meter. If the particle is initially at rest at position (6, 4)m, then

The potential energy of a particle is given by formula U=100-5x + 100x^(2), where U and 'x' are in SI unit .if mass of particle is 0.1 Kg then find the magnitude of its acceleration

A single conservative force F(x) acts on a on a (1.0kg ) particle that moves along the x-axis. The potential energy U(x) is given by: U(x) =20 + (x-2)^(2) where, x is meters. At x=5.0m the particle has a kinetic energy of 20J (a) What is the mechanical energy of the system? (b) Make a plot of U(x) as a function of x for -10mlexle10m , and on the same graph draw the line that represents the mechanical energy of the system. Use part (b) to determine. (c) The least value of x and (d) the greatest value of x between which the particle can move. (e) The maximum kinetic energy of the particle and (f) the value of x at which it occurs. (g) Datermine the equation for F(x) as a function of x. (h) For what (finite ) value of x does F(x) =0 ?.