[" A cubical body (side "0.1m" and mass "0.002kg" ) float in water.It is pressed and then "],[" released,so that it oscillates vertically.Find the time period in (milli-sec) "]

A cubical body (side 0.1m and mass 0.002kg) floats in water. It is pressed and then released so that it executes SHM. Find the time period. (g=10m//s^(2))

A cubical wood piece of mass 13.5 gm and volume 0.0027 m^3 float in water. It is depressed and released, then it executes simple harmonic motion. Calculate the period of oscillation ?

A cylindrical object of outer diameter 20 cm and mass 2 kg floats in water with its axis vertical. If it is slightly depressed and then released, find the time period of the resulting simple harmonic motion of the object.

A cylindrical object of outer diameter 20 cm and mass 2 kg floats in water with its axis vertical. If it is slightly depressed and then released, find the time period of the resulting simple harmonic motion of the object.

A cylindrical log of wood of height h and area of cross-section A floats in water. It is pressed and then released. Show that lon would execute SHM with a time period. T=2pisqrt((m)/(Apg)) where, m is mass of the body and p is density of the liquid.

A cylindrical log of wood of height h and area of cross-section A floats in water. It is pressed and then released. Show that lon would execute SHM with a time period. T=2pisqrt((m)/(Apg)) where, m is mass of the body and p is density of the liquid.

A cylindrical log of wood of height h and area of cross-section A floats in water. It is pressed and then released. Show that the log would execute SHM with a time period. T= 2pi sqrt((m)/(A p g)) where, m is mass of the body and p is density of the liquid. .

A force of 6.4 N stretches a vertical spring by 0.1 m. The mass (in kg) that must be suspended from the spring so that it oscillates with a time period of (pi)/(4) second.

A force of 6.4 N stretches a vertical spring by 0.1 m. The mass (in kg) that must be suspended from the spring so that it oscillates with a time period of (pi)/(4) second.

A body of mass m is suspended from vertical spring and is set into simple harmonic oscillations of time period T. Next the spring is fixed at one end on a smooth horizontal table and same body is attached at the other end. The body is pulled slightly and then released to produce horizontal oscillations of the spring. The time period of horizontal oscillations is