A mass `m` is suspended separately by two different spring of spring constant `K_(1)` and `k_(2)` given the time period `t_(1)` and`t_(2)` respectively if the same mass `m` is shown in the figure then time period `t` is given by the relation

A mass is suspended separately by two different springs in successive order then time period is t_1 and t_2 respectively. If it is connected by both spring as shown in figure then time period is t_0 , the correct relation is : -

A mass is suspended separately by two different springs in successive order, then time periods is t_(1) "and" t_(2) respectively. It is connected by both springs as shown in fig. then time period is t_(0) . The correct relation is

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 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

When a block of mass m is suspended separately by two different springs have time period t_(1)" and "t_(2) . If same mass is connected to parallel combination of both springs, then its time period is given by :-

When a block of mass m is suspended separately by two different springs have time period t_(1)" and "t_(2) . If same mass is connected to parallel combination of both springs, then its time period is given by :-

When a block of mass m is suspended separately by two different springs have time period t_(1)" and "t_(2) . If same mass is connected to parallel combination of both springs, then its time period is given by :-

Two spring of spring constants k_(1) and k_(2) ar joined and are connected to a mass m as shown in the figure. Calculate the frequency of oscillation of mass m.