A body of mass `m` is suspended from three springs as shown in figure. If mass `m` is displaced slightly then time period of oscillation is

A block of mass m is connected to three springs as shown in Fig. The block is displaced down slightly and left free, it starts oscillating. Find time period of oscillations.

A block of mass m hangs from three springs having same spring constant k. If the mass is slightly displaced downwards, the time period of oscillation will be

A pendulum of mass m and length L is connected to a spring as shown in figure. If the bob is displaced slightly from its mean position and released, it performs simple harmonic motion. The angular frequency of the oscillation of bob is

A block of mass m is suspended by different springs of force constant shown in figure. Let time period of oscillation in these four positions be T_(1),T_(2),T_(3) "and" T4 Then -

Find the period of the oscillations of the devices shown in figure if m is displaced slightly.

A mass is suspended separately by two springs of spring constants k_(1) and k_(2) in successive order. The time periods of oscillations in the two cases are T_(1) and T_(2) respectively. If the same mass be suspended by connecting the two springs in parallel, (as shown in figure) then the time period of oscillations is T. The correct relations is

A spring of stiffness constant k and natural length l is cut into two parts of length 3l//4 and l//4 , respectively, and an arrangement is made as shown in figure . If the mass is slightly displaced , find the time period of oscillation.

figure (a) and (b) represent spring- block system. If m is displacement slightly , find the time period of ascillation of the system.