The displacement of a particle performing simple harmonic motion is given by, `x=8 "sin" "omega`t + 6 cos `omega`t, where distance is in cm and time is in second. What is the amplitude of motion?

The displacement of a particle in simple harmonic motion in one time period is

The phase (at a time t) of a particle in simple harmonic motion tells

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 equation of a simple harmonic motion is given by x =6 sin 10 t + 8 cos 10 t , where x is in cm, and t is in seconds. Find the resultant amplitude.

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 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

(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 motion of a particle executing simple harmonic motion is given by X = 0.01 sin 100 pi (t + 0.05) , where X is in metres andt in second. The time period is second is

Position-time relationship of a particle executing simple harmonic motion is given by equation x=2sin(50pit+(2pi)/(3)) where x is in meters and time t is in seconds. What is the position of particle at t=0 ?

Position-time relationship of a particle executing simple harmonic motion is given by equation x=2sin(50pit+(2pi)/(3)) where x is in meters and time t is in seconds. What is the position of particle at t=1s ?