A ball of density `rho` is released from deep inside of a liquid of density `2 rho`. It will move up

A small ball of density 4rho_(0) is released from rest just below the surface of a liquid. The density of liquid increases with depth as rho=rho_(0)(1+ay) where a=2m^(-1) is a constant. Find the time period of its oscillation. (Neglect the viscosity effects).

A spherical small ball of density rho is gently released in a liquid of density sigma(rho> sigma) .The initial acceleration of the free fell of the ball will be

A ball of density rho is dropped from a height on the suraca of a non-visous liquid of dinsity 2rho . Choose the correct options.

A ball of density rho_(0) falls from rest from a point P onto the surface of a liquid of density rho in the time T. It enters the liquid, stops, moves up, and returns to P in a total time 3 T. neglect viscosity, surface tension and splashing find the ratio of (rho)/(rho_(0))

A ball of mass m and density rho is immersed in a liquid of density 3 rho at a depth h and released. To what height will the ball jump up above the surface of liqud ? (neglect the reistance of water and air).

A small ball of density rho is immersed in a liquid of density sigma(gtrho) to a depth h and released. The height above the surface of water up to which the ball will jump is

A body of density rho is released gently on the surface of a layer of liquid of depth d and density rho'(rho' lt rho) . Show that it will reach the bottom of the liquid after a time. [(2 d rho)/(g(rho-rho'))]^(1//2) .

A drop of liquid of density rho is floating half-immersed in a liquid of density d . If rho is the surface tension the diameter of the drop of the liquid is