A liquid of coefficient of viscosity `eta` is flowing steadily through a capillary tube of radius r and length I. If V is volume of liquid flowing per sec. the pressure difference P at the end of tube is given by

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

A liquid having coefficient of viscosity n flow through a tube of length at the rate of 100 cc per sec. The pressure difference between the entering and leaving end of tube is equivalent to p. A second tube of radius (r)/(2) but of same length is connected in series with first tube and is connected to the same source. If the two tubes are connected in parallel then the new rate of flow will be

A liquid having coefficient of viscosity n flow through a tube of length at the rate of 100 cc per sec. The pressure difference between the entering and leaving end of tube is equivalent to p. A second tube of radius (r)/(2) but of same length is connected in series with first tube and is connected to the same source. Rate of pressure difference across 1 and 2 tube when they are connected in series is

A dimensionally consistent relation for the volume V of a liquid of coefficiet of viscosity eta flowing per second through a tube of radius r and length l and having a pressure difference p across its end, is

A dimensionally consistent relation for the volume V of a liquid of coefficiet of viscosity eta flowing per second through a tube of radius r and length l and having a pressure difference p across its end, is

The volume of a liquid of density rho and viscosity eta flowing in time t through a capillary tube of length l and radius R, with a pressure difference P, across its ends is proportional to :