A particle of mass `2kg` is moving on a straight line under the action of force `F = (8-2x) N`. The particle is released at rest from `x = 6 m`. For the subsequnent motion(All the value in the right column are in their S.I. units)

A particle of mass 2 kg is moving on a straight line under the action of force F = (8 - 2x)N . It released at rest from x = 6 m . (a) Is the particle moving simple harmonically. (b) Find the equilibrium position of the particle. (c) Write the equation of motionof the particle. (d) Find the time period of SHM .

A partical of mass 2 kg is moving of a straigh line under the actin force F = (8 - 2s)N . It is released at rest from x = 6m . a. Is the partical moving simple hormonically. b.Find the equilibrium position of the partical. c. Write the equiation of motion of the partical. d. Find the time period of SHM.

A particle of mass m moves from A to C under the action of force vecF = 2xyhati + y^2 hatj , along different paths as shown in figure.

A particle of mass 2 kg starts motion at time t = 0 under the action of variable force F = 4t (where F is in N and t is in s). The work done by this force in first two

A particle of mass 1kg moves from rest along a straight line due to acition of a force F which varies with the displacement x as shown in graph - ( Use (1)/(sqrt(2))=0.8 if needed )

A particle of mass m moves from rest under the action of a constant force F which acts for two seconds. The maximum power attained is

A particle of mass m moves on positive x-axis under the influence of force acting towards the origin given by -kx^2 hat i. If the particle starts from rest at x=a, the speed it will attain when it crosses the origin is

A particle, initially at rest, starts moving in a straight line with an acceleration a=6t+4 m//s^(2) . The distance covered by it in 3 s is