The volume of a liquid (v) flowing per second through a cylindrical tube depends upon the pressure gradient `(p//l`) radius of the tube (r) coefficient of viscosity `(eta)` of the liquid by dimensional method the correct formula is  

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 .

Certain volume of a liquid is taken in a long glass tube and its temperature is increased at a uniform rate, the rate of increase in the length of the liquid depends on (a) length of the liquid coloumn (b) area of cross section of the glass tube ( c) coefficient of expansion of glass

The rate of steady volume flow of water through a capilary tube of length and radius r under a pressure difference of Pis V. This tube is connected with another tube of the same length but half the radius in series. Then the rate of steady volume flow through them under same pressure difference across the combination is