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

The phase of a particle executing simple harmonic motion is pi/2 when it has

What are the two basic characterstics of a simple harmonic motion ?

A coin is placed on a horizontal platform which undergoes vertical simple harmonic motion of angular frequency omega . The amplitude of oscillation is gradually increased. The coin will leave contact with the platform for the first time :

The mass M shown in the figure oscillates in simple harmonic motion with amplitude A. The amplitude of the point P is

A particle executes simple harmonic motion with a frequency v. The frequency with which the kinetic energy oscillates is

The equation of linear simple harmonic motion is x = 8 cos (12pit) where x is in cm and t is in second. The initial phase angle 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

A particle is executing simple harmonic motion with a period of T seconds and amplitude a metre . The shortest time it takes to reach a point a/sqrt2 from its mean position in seconds is

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