The rate of volume of flow of water (V) through a canal is found to be a function of the area of cross section A of the canal and velocity of water v. Show that the rate of volume flow is proportional to the velocity of flow of water.

The rate of volume flow of water through a canal is found to be a function of the area of cross-section of the canal and velocity of water. Show that the rate of volume flow is proportional to the velocity of flow of water.

The rate of flow of water through a horizontal pipe of changing cross section is 100 litres per hour. Calculate the velocity of water flow at a point where diameter of the tube is 4 cm?

Water flows steadily through a horizontal pipe of a variable cross-section. If the pressure of water is p at a point where the velocity of flow is v, what is the pressure at another point where the velocity of flow is 2v, rho being the density of water?

Water flows through a horizontal pipe of varying area of cross-section at the rate of 10 cubic metre per minute. Determine the velocity of water at a point where radius of pipe is 10cm.

If water falls from a tap, then the volume rate of flow of water at depth of h, ( A_0 is the area of cross-section of the mouth and A_0/2 is the corresponding area at depth h)

If water falls from a tap, then the volume rate of flow of water at depth of h, ( A_0 is the area of cross-section of the mouth and A_0/2 is the corresponding area at depth h)

Water flows through a horizontal pipe of varying cross-section at the rate of 20 litres per minutes , determine the velocity of water at a point where diameter is 4 cm