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

The rate of flow of a liquid through a capillary tube of radius r is under a pressure difference of P. Calculate the rate of flow when the diameter is reduced to half and the pressure difference is made 4 P?

Derive an expression for the rate of flow of a liquid through a capillary tube. Assume that the rate of flow depends on (i) pressure gradient (p/l) , (ii) The radius, r and (iii) the coefficient of viscosity, eta . The value of the proportionality constant k = pi/8 .

Derive an expression for the rate of flow of a liquid through a capillary tube. Assume that the rate of flow depends on (i) pressure gradient (p/l) , (ii) The radius, r and (iii) the coefficient of viscosity, eta . The value of the proportionality constant k = pi/8 .

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

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

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

Under a constant pressure head, the rate of flow of liquid through a capillary tube is v. if the length of the capillary is doubled and the diameter of the bore is halved. The rate of flow would become

Derive an expression for the rate of flow of a liquid through a capillary tube. Assume that the rate of flow depends on i) pressure gradient (P/l) , (ii) The radius, r and (iii) the coefficient of viscosity , eta . The value of the proportionally constant k =pi/8

The rate of flow of liquid through a capillary tube of length l and radius r is Q at a constant pressure p. The rate of flow of liquid through a capillary tube of radius r/2 and length 21 at the same pressure head will be_____