Find the ratio of the periods of two identical springs if they are first joined in series & then in parallel & a mass `m` is suspended from them:

Two identical capacitors are first connected in series and then in parallel. The ratio of equivalent capacitance is

Two identical springs of spring constant k each are connected in series and parallel as shown in figure. A mass M is suspended from them. The ratio of their frequencies of vertical oscillation will be

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

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.

Let T_(1) and T_(2) be the time periods of two springs A and B when a mass m is suspnded from them seperately. Now both the springs are connected in parallel and same mass m is suspended with them. Now let T be the time period in this position. Then -

The time period of a mass suspended from a spring is T if the spring is cut in to equal part and the same mass is suspended from one of the pert then the time period will be

The time period of a mass suspended from a spring is T. If the spring is cut into four equal parts and the same mass is suspended from one of the parts, then the new time period will be: