A small ball of density `rho=(rho_(0))/2(alpha+betah)`. Mass of the ball is m. Select the most appropriate one option.

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 solid ball of volume V is made of a material of density rho_1 . It is falling through a liquid of density rho_2(rho_2ltrho_1) . Assume that the liquid applies a viscous force on the ball that is proportional to the square of its speed v, i.e., F_(viscous)=-kv^2(kgt0) . The terminal speed of the ball is

A spherical solild of volume V is made of a material of density rho_(1) . It is falling through a liquid of density rho_(2)(rho_(2) lt rho_(1)) . Assume that the liquid applies a viscous froce on the ball that is proportional ti the its speed v, i.e., F_(viscous)=-kv^(2)(kgt0) . The terminal speed of the ball is

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 solid sphere of radius R has a mass distributed in its volume of mass density rho=rho_(0) r, where rho_(0) is constant and r is distance from centre. Then moment of inertia about its diameter is

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 liquid of density rho=1000kg//m^(3) viscosity eta=0.1 Ns//m^(2) is flowing down in vertical pipe of large cross section. A small ball of density rho_(0)=100 kg//m^(3) and r=5cm will be at rest in flowing liquid, if velocity of flowing liquid is 10 k m//s . Then find the value of k .

A spherical ball of density rho and radius 0.003m is dropped into a tube containing a viscous fluid up to the 0 cm mark as shown in the figure. Viscosity of the fluid =1.26N-s//m^(2) and its density rho_(L)=(rho)/(2)=1260kg//m^(3) . Assume that the ball reaches a terminal speed at 10cm mark. The time taken by the ball to travel the distance between the 10cm and 20cm mark is (g=10m//s^(2))

A solid ball of density rho_(1) and radius r falls vertically through a liquid of density rho_(2) . Assume that the viscous force acting on the ball is F = krv , where k is a constant and v its velocity. What is the terminal velocity of the ball ?

The velocity of a small ball of mass M and density d when dropped in a container filled with glycerine becomes constant after sometime. If the density of glycerine is 'd/2' then the viscous force acting on the ball will be