A mass is suspended from a vertica spring which is executing SHM of frequency 5 Hz.
The spring is unstretched at the highest point of oscillation. Maximum speed of the mass is (take, acceleration due to gravity, `g=10m//s^(2)` )

A mass M is suspended from a massless spring. An additional mass m stretches the spring further by a distance x . The combined mass will oscillate with a period

A body of mass 100 gm is suspended from a light spring which stretches it by 10 cm. Find the force constant of the spring.

A mass is suspended from a spring having spring constant k is displaced veritcally and relased. It oscillates with period T the weight of the mass suspended is (g= gravitatioanal acceleration)

A simple pendulum of length 'L' has mass 'M' and it oscillates freely with amplitude energy is (g = acceleration due to gravity)

The amplitude of a particle executing S.H.M. with frequency of 60 Hz is 0.01 m. The maximum value of the acceleration of the particle is

A particle is executing S.H.M. of amplitude 5 cm and period of 2 s. Find the speed of the particle at a point where its acceleration is half of its maximum value.

A spring of a negligible mass is stretched by a force of 20 g wt through a distance of 5 cms. A total mass of 50 g. is attached to the spring and set into oscillations. Find the periodic time of oscillation. Given g = 9.8 frac(m)(s^2)

A simple pendulum of length 1 m is freely suspended from the ceiling of an elevator. The time period of small oscillations as the elevator moves up with an acceleration of 2m//s^2 is (use g=10 m//s^2 )

A body is thrown from the surface of the earth with velocity u m/s. The maximum height in metre above the surface of the earth upto which it will reac is (where, R = radish of earth, g=acceleration due to gravity)

If the period of oscillation of mass m suspended from a spring is 2 s, then the period of mass 4 m will be