The displacement of a particle ( in meter ) from its mean position is given by the equation `y = 0.2 ( cos^(2) "" (pi t)/( 2) - sin^(2) "" ( pi t )/( 2))`, The motion of the above particle is

The displacement of a particle from its mean position (in metre) is given by y=0.2 "sin" (10 pi t+ 1.5 pi) "cos" (10 pi t+1.5 pi) The motion of the particle is

The displacement of a particle executing simple harmonic motion is given by y = 4 sin(2t + phi) . The period of oscillation is

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

The displacement x of a particle in a straight line motion is given by x=1-t-t^(2) . The correct representation of the motion is

The displacement of a particle is repersented by the equation y=3cos((pi)/(4)-2omegat) . The motion of the particle is (b) (c) (d)

(b) The displacement of a particle executing simple harmonic motion is given by the equation y=0.3sin20pi(t+0.05) , where time t is in seconds and displacement y is in meter. Calculate the values of amplitude, time period, initial phase and initial displacement of the particle.

The displacement y of a particle executing periodic motion is given by y = 4 cos^(2) ((1)/(2)t) sin(1000t) This expression may be considereed to be a result of the superposition of

The displacement y of a particle executing periodic motion is given by y = 4 cos^(2) ((1)/(2)t) sin(1000t) This expression may be considereed to be a result of the superposition of