Two mutually perpendicular simple harmonic vibrations have same amplitude, frequency and phase. When they superimpose, the resultant form of vibration will be

A particle is acted simultaneously by mutually perpendicular simple harmonic motions x = a cos omega t and y = a sin omega t . The trajectory of motion of the particle will be

Two particles are executing simple harmonic of the same amplitude (A) and frequency omega along the x-axis . Their mean position is separated by distance X_(0)(X_(0)gtA). If the maximum separation between them is (X_(0)+A), the phase difference between their motion is:

Two simple harmonic motion of angular frequency 100and 1000 rads^(-1) have the same displacement amplitude The ratio of their maximum acceleration is

A particle is executing a simple harmonic motion. Its maximum acceleration is alpha and maximum velocity is beta . Then, its time period of vibration will be

A particle executes linear simple harmonic motion with an amplitude of 2 cm . When the particle is at 1 cm from the mean position the magnitude of its velocity is equal to that of its acceleration. Then its time period in seconds is

A particle executes linear simple harmonic motion with an amplitude of 3 cm . When the particle is at 2 cm from the mean position, the magnitude of its velocity is equal to that of its acceleration. Then, its time period in seconds is

The resultant of two rectangular simple harmonic motion of the same frequency and unequal amplitude but differing in phase by pi//2 is

A body is executing simple harmonic motion with an angular frequency 2 rad/ s . The velocity of the body at 20 mm displacement, when the amplitude of motion is 60 mm , is

Two particles P and Q start from origin and execute simple harmonic motion along X-axis with same amplitude but with periods 3s and 6s respectively. The ratio of the velocities of P and Q when they meet is

If two waves having amplitudes 2A and A and same frequency and velocity, propagate in the same direction in the same phase, the resulting amplitude will be