A particle is oscillating according to the equation `x=5cos(0.5pit)` where t is in seconds. The particle moves from the position of equilibrium to the position of maximum displacement in time………………

The magnitude of acceleration of particle executing SHM at the position of maximum displacement is

If a particle has moved from one position to another position, then :

A particle moves on the X-axis according to the equation x=x_0 sin^2omegat . The motion simple harmonic

A particle moves a distance x in time t according to equation x=(t+5)^-1 the acceleration of the particle is proportional to:

A particle having mass 10 g oscillates according to the equation x=(2.0cm) sin[(100s^-1)t+pi/6] . Find the amplitude the time period and the spring constant

Consider a particle moving in simple harmonic motion according to the equation x=2.0cos(50pit+tan^-1 0.75) where x is in centimetre and t in second. The motion is started at t=0. a. When does the particle come to rest for the first time? B. When does the acceleration have its maximum magnitude for the first time? c. When does the particle comes to rest for the second time?

A particle of mass m oscillates along x -axis according to equation x = a sin omega t . The nature of the graph between momentum and displacement of the particle is:

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . At what times the particle changes direction?

A particle executes a simple harmonic motion of time period T. Find the time taken by the particle to go directly from its mean position to half the amplitude.

A body oscillates with SHM according to the equation, X=(5.0m)cos[2pit+pi//4] .At t=1.5s, calculate the displacement