A light spring is loaded with a mass under gravity . If the spring extends by 10cm ,calculate the period of small vertical osciallation.

In the arrangement shown in figure, pulleys are light and spring are ideal. K_(1) , k_(2) , k_(3) and k_(4) are force constant of the spring. Calculate period of small vertical oscillations of block of mass m .

Two identical springs are attached to a small block P. The other ends of the springs are fixed at A and B, When P is in equilibrium the extension of bottom spring is 10 cm. The period of small vertical oscillations of P about is equilibrium position is (use "g"=9.8 m//s^(2))

A steel sprial spring has on unstreched length of 8cm and when a mass is hung o it, its length becomes 10cm. Calculate the periodic time of the oscillation that would occur if the masss were displaced vertically.

A spring has a certain mass suspended from it and its period for vertical oscillation is T. The spring is now cut into two equal halves and the same mass is suspended from one of the halves. The period of vertical oscillation is now

Two identical spring are attached to a small block P The other ends of the springs are fixed at A and B. when P is equilibrium the extension of top spring is 20cm and extension of bottom spring is 10cm The period at small vertical oscillation of p about its equilibrium position is (use g = 9.8m//s^(2))

A body of weight 30N hangs from one end of a long, vertical spring whose other end is attached to a rigid support. The spring extends by 5cm when a force of 10N is applied to it. The time period of the vertical oscillations of the body is

In the arrangement shown if Fig. Pulleys are small and lught and spring are ideal and K_1=25(pi^2)(N)/(m) , K_2=2K_1 , K_3= and K_4=4K_1 are the force constant of the spring. Calculate the period of small vertical oscillation of block of mass m=3kg .

Periodic time of oscillation T_1 is obtained when a mass is suspended from a spring if another spring is used with same mass then periodic time of oscillation is T_2 . Now if this mass is suspended from series combination of above spring then calculate the time period.

In the arrangement shown in the diagram, pulleys are small and springs are ideal. k_(1)=k_(2)=k_(3)=k_(4)=10Nm^(-1) are force constants of the springs and mass m=10kg. If the time period of small vertical oscillations of the block of mass m is given by 2pix seconds, then find the value of x.

Two identical particles each of mass 0.5kg are interconnected by a light springs of stiffness 100N//m , time period of small oscillation is ….