Water from a pipe is coming at a rate of `100` litres per minute. If the radius of the pipe is `5cm`, the Reynolds number for the flow is of the order of : (density of water `=1000kg//m^(3)`, coefficient of viscosity of water `=1mPa s`)

Water form a pipe is coming at a rate of 100 liters per minute. If the radius of the pipe is 5 cm, the Reynolds number for the flo0w is : (density of water =1000kg//m^(3) , coefficient of viscosity of water =1mPas)

The rate of water gushing out of a pipe of radius 5 cm is 100 L m i n^(-1) . The Reynolds number for the flow is of the orderof [density of water = 1000 kg m^(-3) ,coefficient of viscosity of water = 1m Pa s ]

If it takes 5 minutes to fill a 15 litre bucket from a water tap diameter (a)/(sqrt(pi)) cm then the raynolds number for the flow is (density of water =10^(3)kg//m^(3) and viscosity of water =10^(-3)Pa .s) close to

Water flows through a horizontal pipe of varying area of cross section at the rate 15 cubic metre per minute. Find the radius of pipe where water velocity is 3 ms^(-1)

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

Water flows at a speed 5 cm s^(-1) through a pipe of radius 2 cm. The visosity of water is 0.001 PI. The Reynolds number and the nature of flow are respectively

Air is blown through a pipe AB at a rate of 15 litres per minute. The cross sectional area of the broad portion of the pipe AB is 2 cm^(2) and that of the narrow portion is 0.5 cm^(2) . The difference in water level h is (rho_("air") = 1.32 kg//m^(3))

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.