Acceleration of a particle in SHM at displacement `x=10 cm` (from the mean position is `a =-2.5 cm//s^(2)`). Find time period of oscillations.

A particle executes SHM on a straight line path. The amplitude of oscillation is 3 cm. Magnitude of its acceleration is eqal to that of its velocity when its displacement from the mean position is 1 cm. Find the time period of S.H.M.

The equation of motion of a particle executing S.H.M. is a = - bx , where a is the acceleration of the particle, x is the displacement from the mean position and b is a constant. What is the time period of the particle ?

Maximum acceleration of a particle in SHM is 16 cm//s^(2) and maximum uelocity is 8 cm//s .Find time period and amplitude of oscillations.

The acceleration of a particle performing SHM is 12 cm //s^(2) at a distance of 3 cm from the mean position . Calculate its time - period . Hint : a = omega^(2) x a = 12 cm//s^(2) , x=3cm Find omega T= (pi)/(omega)

Amplitude of oscillation of a particle that executes SHM is 2cm . Its displacement from its mean position in a time equal to 1//6^(th) of its time period is

The acceleration of a particle executing SHM at a distance of 3 cm from equilibrium position is 5 cm//s^(2) . Its acceleration at a distance of 2 cm from equilibrium position is

A particle executes SHM on a straight line path. The amplitude of oscialltion is 3 cm. Magnitude of its acceleration is eqal to that of its velocity when its displacement from the mean position is 1 cm. Find the time period of S.H.M. Hint : A= 3cm When x=1 cm , magnitude of velocity = magnitude of acceleration i.e., omega(A^(2) - x^(2))((1)/(2)) = omega^(2) x Find omega T = ( 2pi)(omega)

a - x equation of a body in SHM is a + 16 x = 0 . Here, x is in cm and a in cm//s^(2) . Find time period of oscillations.

A body is vibrating in simple harmonic motion . If its acceleration in 12 cms^(-2) at a displacement 3 cm from the mean position, then time period is

A particle in linear SHM has speeds 4 cm/s and 3 cm/s when its displacements from the mean position are 3 cm and 4 cm , respectively. Find its period of oscillation.