For the damped oscillator shown in Fig. 14.19, the mass m of the block is `200 g, k = 90 N m^(-1)` and the damping constant b is `40 g s^(-1)`. Calculate (a) the period of oscillation, (b) time taken for its amplitude of vibrations to drop to half of its initial value, and (c) the time taken for its mechanical energy to drop to half its initial value.

For the damped oscillator shown in Figure, the mass m of the block is 400 g, k=45 Nm^(-1) and the damping constant b is 80 g s^(-1) . Calculate . (a) The period of osciallation , (b) Time taken for its amplitude of vibrations to drop to half of its initial value and (c ) The time taken for its mechanical energy to drop to half its initial value.

For the damped oscillator shown in previous Figure, the mass m of the block is 400 g, k=45 Nm^(-1) and the damping constant b is 80 g s^(-1) . Calculate . (a) The period of osciallation , (b) Time taken for its amplitude of vibrations to drop to half of its initial value and (c ) The time taken for its mechanical energy to drop to half its initial value.

For the damped oscillator shown in Fig, the mass of the block is 200 g, k = 80 N m^(-1) and the damping constant b is 40 gs^(-1) Calculate (a) The period of oscillation (b) Time taken for its amplitude of vibrations to drop to half of its initial values (c) The time for the mechanical energy to drop to half initial values

For the damped oscillator shown in Fig, the mass of the block is 200 g, k = 80 N m^(-1) and the damping constant b is 40 gs^(-1) Calculate The period of oscillation

For a damped oscillator the mass 'm' of the block is 200 g, k = 90 N m^(-1) and the damping constant b is 40 g s^(-1) . Calculate the period of oscillation.

For the damped oscillator, the mass m of the block is 200g, k = 90 Nm^(-1) and the damping constant b is 40 gs^(-1) . Calculate the period of oscillation.

For the damped oscillator, the mass m of the block is 400g, k = 120 Nm^(-1) and the damping constant b is 50 gs^(-1) . Calculate the period of oscillation.

For a damped oscillator. The mass of the block is 200 g. k=90 N.m^-1 and the damping constant b is 40 g. s^-1 . Calculate the period of oscillation.

For the damped oscillator, the mass m of the block is 200g, k = 90 Nm^(-1) and the damping constant b is 40 gs^(-1) . Calculate time taken for its amplitude of vibrations to drop to half of its initial value.