If the same weight is suspended from three springs having length in the ratio 1 : 3 : 5 , the period of oscillations shall be the ratio of

The ratio of Young's modulus of two springs of same area of cross section and same length is 5 : 4 Equal masses are suspended from these springs. On stretching and then releasing, the springs start oscillating. Calculate the ratio of time period of oscillation.

Periodic time of oscillation T_(1) is obtained when a mass is suspended from a spring and 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 springs then calculated the time period.

Periodic time of oscillation T_(1) is obtained when a mass is suspended from a spring and 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 springs then calculated the time period.

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 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

The young modulii of two springs of equal length and equal cross sectional areas are in the ratio 2:3 both the springs are suspended and loaded with the same mass . When springs are stretched and released , the time period of oscillation of the two springs is in the ratio of

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.

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.

The period of oscillation of a mass M suspended from a spring of spring constant K is T. the time period of oscillation of combined blocks is

When a body is suspended from two light springs separately, the periods of vertical oscillations are T_1 and T_2 . When the same body is suspended from the two spring connected in series, the period will be