A particle of mass 200 g executes a simple harmonic motion. The restoring force is provided by a spring of spring constant `80 N m^-1`. Find the time period.

A paricle of mass 200 g executes a simple harmonic motion. The restorting force is provided by a spring of spring constant 80 N//m . Find the time period.

A particle executes simple harmonic motion under the restoring force provided by a spring. The time period is T. If the spring is divided in two equal parts and one part isused to continue the simple harmonic motion, the time period will

A block of mass 5 kg executes simple harmonic motion under the restoring force of a spring. The amplitude and the time period of the motion are 0.1 m and 3.14 s respectively. Fnd the maximum force exerted by the spring on the block.

A particle at the end of a spring executes simple harmonic motion with a period t_1 , while the corresponding period of another spring is t_2 . If the period of oscillation with the two springs in series is T. Then

A block of mass 2kg executes simple harmonic motion under the reading from at a spring .The angular and the time period of motion are 0.2 cm and 2pi sec respectively Find the maximum force execute by the spring in the block.

A particle executes simple harmonic motion. The amplitude of vibration of particle is 2 cm. The displacement of particle in one time period is

A particle of mass 0.50 kg executes a simple harmonic motion under a force F = – (50 N/m)x. If it crosses the centre of oscillation with a speed of 10 m/s, find the amplitude of the motion.

A particle moving along the X-axis executes simple harmonic motion, then the force acting on it is given by where, A and K are positive constants.

A particle of mass 40 g executes a simple harmonic motion of amplitude 2.0 cm. If the time period is 0.20 s, find the total mechanical energy of the system.

A mass m oscillates with simple harmonic motion with frequency f= omega/(2pi) and amlitude A on a spring with constant K. therefore