A wide vessel with small hole in the bottom is filled with water and kerosence, Neglecting viscosity, the velocity of water flow v, if the thickness of water laer is `H_(1)` and that of kerosene layer is `H_(2)` is (density of water `P_(1)g//cc` and that of kerosene is `P_(2)g//cc`.

Find no protons in 180mol H_(2)O Density of water = 1 gm//ml .

A hole is made in the bottom of tank having water .If total pressure at bottom is 3 atm (1atm =10^(5)Nm^(-2)) , then the velocity of water flowing from hole is ……..

A beaker contains water up to a height h_(1) and kerosene of height h_(2) above water so that the total height of (water + kerosene) is (h_(1) + h_(2)) . Refractive index of water is mu_(1) and that of kerosene is mu_(2) . The apparent shift in the position of the bottom of the beaker when viewed from above is :-

80g NaOH was added to 2L water. Find molality of solution density of water =1g//mL .

Calculate the height to which water will rise in a capillary tube of diameter 1xx10^(-3) m [given surface tension of water is 0.072Nm^(-1) angle of contact is 0^(@),g=9.8ms^(-2) and density of water =1000kgm^(-3) ]

A vessel, whose bottom has round holes with diameter of 0.1 mm , is filled with water. The maximum height to which the water can be filled without leakage is (S.T. of water =75 dyne/cm , g=1000 cm/s)

A cylinder of height 20m is completely filled with water. The velocity of effux of water (in ms^(-1)) through a small hole on the side wall of the cylinder near its bottom is

A capillary tube of radus r is immersed in water and water rises in it to a height h. The mass of water in the capillary tube is 5g . Another capillary tube of radius 2r is immersed in water. The mass of water that will rise in this tube is …….

If it takes 5 minutes to fill a 15 litre bucket from a water tap diameter (2)/(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