`T_(1),T_(2)` are time periods of oscillation of a block when individually suspended to springs of force constants `K_(1),K_(2)` respectively. If same block is suspended to parallel combination fo same two springs. Its time period is

T_(1),T_(2) are time periods of oscillation of a block when individually suspended to springs of force constants K_(1),K_(2) respectively. If same block is suspended to series combination of same two springs, then it time period of oscillation.

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 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 :-

Let T_(1)" and "T_(2) be the time periods of spring A and B when mass M is suspended from the end of the spring. If both springs are taken in series and the same mass M is suspended from the series combination, the time period is T, then

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

Let T_(1) and T_(2) be the periods of springs A and B when mass M is suspended from one end of each spring. If both springs are taken in series and the same mass A is, suspended from the séries combination, the time period is T, then

Let T_(1) and T_(2) be the periods of springs A and B when mass M is suspended from one end of each spring. If both springs are taken in series and the same mass M is, suspended from the séries combination, the time period is T, then