STATEMENT-1 : Any oscillatory motion cannot be treated as simple harmonic.
STATEMENT-2 : Even under larger amplitude restoring force should be proportional to displacement for being classified as `SHM`.

STATEMENT-1 : An oscillatory motion is always simple harmonic motion. STATEMENT-2 : A simple harmonic motion is always oscillatory motion.

STATEMENT-1 : An oscillatory motion is necessarily periodic. and STATEMENT -2 : A simple harmonic motion is necessarily osciallatory.

In a simple harmonic motion, the restoring force or restoring acceleration is directly proportional to

Show that in simple harmonic motion (S.H.M.), the acceleration is directly proportional to its displacement at the given instant.

STATEMENT-1 : In oscillatory motion, displacement of a body from equilibrium can be represented by sin or cos function. STATEMENT-2 : The body oscillates to and froabout its mean position.

(A) : Projection of a uniform circular motion on the diameter of the circle is simple harmonic. (B) : The energy of a body executing SHM is directly proportional to square of its amplitude.

Assertion : Consider motion for a mass spring system under gravity, motion of M is not a simple harmonic motion unless Mg is negligibly small. Reason : For simple harmonic motion acceleration must be proportional to displacement and is directed towards the mean position

STATEMENT-1 : The phase difference between acceleration and velocity in simple harmonic motion is 90^(@) . STATEMENT-2 : The tim e period in case of simple harmonic motion is independent of amplitude of vibration.

STATEMENT-1 : In simple harmonic motion, at extreme position the velocity and acceleration of object is zero. STATEMENT-2 : In simple harmonic motion at mean position?