The displacement of a particle from its mean position (in m) is given , by `y=0.2 sin (10pit+1.5pi) cos (10pit " The " +1.5pi).`
motion of 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 ( 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 of mass 3g executing simple harmonic motion is given by x =3sin(0.2t) in SI units. The kinetic energy of the particle at a point which is at a displacement equal to 1/3 of its amplitude from its mean position is

The displacement of a particle executing SHM is given by y=0.5 sin100t cm . The maximum speed of the particle is

The displacement of a particle executing simple harmonic motion is given by y=A_(0)+A sin omegat+B cos omegat . Then the amplitude of its oscillation is given by

The displacement of a particle is given by x = 3 sin ( 5 pi t) + 4 cos ( 5 pi t) . The amplitude of particle is

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

The transverse displacement of a string clamped at its both ends is given by y(x, t) = 0.06 sin ((2pi)/3 x) cos(l20pit) where x and y are in m and t in s. The length of the string is 1.5 m and its mass is 3 xx 10^(-2) kg. The tension in the string is

The displacement of a particle executing simple harmonic motion is given by x=3sin(2pit+(pi)/(4)) where x is in metres and t is in seconds. The amplitude and maximum speed of the particle is

A particle simple harmonic motion completes 1200 oscillations per minute and passes through the mean position with a velocity 3.14 ms^(-1) . Determine displacement of the particle from its mean position. Also obtain the displacement equation of the particle if its displacement be zero at the instant t = 0 .