Three simple harmonic motions of equal amplitudes A and equal time periods in the same direction combine. The phase of the second motion is `60^@` ahead of the first and the phase of the third motion is `60^@` ahead of the second. Find the amplitude of the resultant motion.

The time period of simple harmonic motion depends upon

A particle is subjected to two simple harmonic motions of same time period in the same direction. The amplitude of the first motion is 3.0 cm and that of the second is 4.0 cm. Find the resultant amplitude if the phase difference between the motion is a. 0^@, b. 60^@, c. 90^@

A particle is executing simple harmonic motion with an amplitude A and time period T. The displacement of the particles after 2T period from its initial position is

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

Three simple harmonic motions in the same direction having the same amplitude and same period are superposed. If each differ in phase from the next by 45^(@) , then

A particle executing simple harmonic motion with an amplitude 5 cm and a time period 0.2 s. the velocity and acceleration of the particle when the displacement is 5 cm is

A particle executing simple harmonic motion with an amplitude A. The distance travelled by the particle in one time period is

The distance moved by a particle in simple harmonic motion in one time period is

Three simple harmonic motions in the same direction having same amplitude and the same period are superposed. If each differs in phase from the next by pi//4 then which of the following is wrong. ( i ) Resultant amplitude is (sqrt(2)+1) a ( ii ) Phase of resultant motion relative to first is 90^(@) ( iii ) The energy associated with the resulting motion is 3 times the energy associated with any single motion

Two linear simple harmonic motions of equal amplitude and frequency are impressed on a particle along x and y axis respectively. The initial phase difference between them is pi/2 . The resultant path followed by the particle is