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

A particle moves on the X-axis according to the equation x=A+Bsinomegat . Let motion is simple harmonic with amplitude

The displacement of a particle along the x-axis is given by x = asin^2 omegat . The motion of the particle corresponds to

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………………

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

The displacement ‘x’ (in meter)of a particle of mass ‘m’ (in kg) moving in one dimension under the action of a force, is related to time 't' (in sec) by t= sqrtx + 3 . The displacement of the particle when its velocity is zero will be:

A particle starts from the origin, goes along the X-axis to the point (20m, 0) and then returns along the same line to the point (-20m,0). Find the distance and displacement of the particle during the trip.

A particle moves along the X-axis as x=u(t-2 s)+a(t-2 s)^2 .