A wooden ball of density `sigma` is released from the bottom of a tank which is filled with a liquid of density `rho``(rho>sigma)`up to a height `h_(1)`. The ball rises in the liquid, emerges from its surface and attains a height `h_(2)` in air.If viscous effects are neglected,the ratio `h_(2)/h_(1)` is

A beaker is filled with a liquid of density rho upto a height h If the beaker is at rest, the mean pressure at the walls is:

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

Consider a regular tank of size (lxxb) filled with a liquid of density rho to a height H as shown in figure. Find the force at the base and on the wall of the tank.

A wooden block or mass m and density rho is tied to a string, the other end of the string is fixed to bottom of a tank. The tank is filled with a liquid of density sigma with sigmagtrho . The tension in the string will be

Assertion : A ball is released from the bottom of a tank filled with a liquid. It moves upwards . In moving upwards upthrust will decrease. Reason : Density of ball is less than the density of liquid.

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 body of density rho is dropped from reat from a height h into a lake of density sigma(sigmagtrho) . The maximum depth the body sinks inside the liquid is (neglect viscous effect of liquid)

A ball of density ais released from rest from the centre of an accelerating sealed cubical vessel completely filled with a liquid of density rho . If the trough moves with a horizontal acceleration veca_(0) find the initial acceleration of the ball.

A wooden ball of density rho is immersed in a liquid of density sigma to a depth H and then released. The height h above the surface of which the ball rises will be

A small ball of density rho is placed from the bottom of a tank in which a non viscous liquid of density 2 rho is filled . Find the time taken by the ball to reach the surface of liquid and maximum height reached above the bottom of container . (Size of the ball and any type of drag force acting on the ball are negligible )