Density of a liquid varies with depth as `rho=alpha`h. A small ball of density `rho_(0)` is released from the free surface of the liquid. Then

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

A liquid of density rho is filled in a vessel up to height H and a hole of cross section area A is made at a depth h below the free surface of liquid. The speed of liquid coming out of the hole is independent of

A uniform solid sphere of radius R is in equilibrium inside a liquid whose density varies with depth from free surface as rho=rho_(0)(1+h/(h_(0))) where h is depth from free surface. Density of sphere sigma will be :

A beaker containing a liquid of density rho moves up with an acceleration a . The pressure due to the liquid at a depth h below the free surface of the liquid is.

A liquid of density rho is in a bucket that spins with angular velocity 'omega' as shown in figure. Prove that the free surface of the liquid has a parabolic shape. Find equation of this. .

A small ball of density rho_(0) is released from the surface of a liquid whose density varies with depth h as rho=(rho_(0))/2(alpha+betah) . Mass of the ball is m. Select the most appropriate one option.

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 )

A circular tube of uniform cross section is filled with two liquids densities rho_(1) and rho_(2) such that half of each liquid occupies a quarter to volume of the tube. If the line joining the free surfaces of the liquid makes an angle theta with horizontal find the value of theta.

In the arrangement as shown, m_(B)=3m , density of liquid is rho and density of block B is 2rho . The system is released from rest so that block B moves up when in liquid and moves down when out of liquid with the same acceleration. Find the mass of block A .

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).