Assuming that the critical velocity of flow of a liquid through a narrow tube depends on the radius of the tube, density of the liquid and viscosity of the liquid, find an expression for critical velocity.

What is meant by critical velocity of a liquid?

The rate of flow of a liquid through a capillary tube is

The velocity of liquid flowing through a tube at certain distance from the axis of tube

The rate of flow of liquid through a capillary tube in an experiment to determine the viscosity of the liquid increases

The rise of liquid in a capillary tube depends on :

The rise of a liquid inn a capillary tube depends on

The viscous force on a spherical body, when it moves through a viscous liquid, depends on the radius of the body, the coefficient of viscosity of the liquid and the velocity of the body.Find an expression for the viscous force.

The viscosity of a liquid molecule depends on :

The critical velocity of the flow of a liquid through a pipe of radius 3 is given by v_c= (K eta/rp) , where p is the density and eta , is the coefficient of viscosity of liquid. Check if this relation is dimentionally correct.