At What velocity does water emerge from an orifice in a tank in which gauge pressure is `3 xx 10^(5) Nm^(-2)` before the flow starts ? (Take the density of water `=1000 kg m^(-3)`.)

If the water emerge from an orifice in a tank in which the gauge pressure is 4xx10^(5) Nm^(-2) before the flow starts, then what will be the velocity of the water emerging out ? Take density of water is 1000 kg m^(-3)

Calculate the speed with which wafer emerges from a hole in a tank at which the gauge pressure is 3 xx10^(5) N//m^(2) ?

Calculate the molarity of water if its density is 1000 kg m^(-3)

A square plate of side 10 m is placed horizontally 1 m below the surface of water. The atmospheric pressure is 1.013xx10^(5)Nm^(-2) . Calculate the total thrust on the plate. (Density of water rho=10^(3)kg m^(-3), g=9.8ms^(-2))

The mass of a block made of certain material is 13.5 kg and its volume is 15 xx 10^(-3) m^3 . What will be the upthrust on block while floating? Take density of water = 1000 "kg m"^(-3)

The rms velocity molecules of a gas of density 4 kg m^(-3) and pressure 1.2 xx 10^(5) N m^(-2) is

The rms velocity molecules of a gas of density 4 kg m^(-3) and pressure 1.2 xx 10^(5) N m^(-2) is

A narrow capillary tube is dipped 10 cm below water surface and a liquid bubble of radius 2 mm formed at the lower end by blowing air through the tube. a. Calculate the excess pressure due to surface tension. b. What is the pressure required in the tube in order to blow a hemispherical bubble at its end in water? The surface tension of water at temperature of the experiment is 7.30xx10^(-2) N//m . 1 atmospheric pressure = 10^(5) Pa , density of water = 1000 kg//m^(3)

The lower end of a capillary tube of diameter 2.0 mm is dipped 8.00cm below the surface of water in a beaker. What is the pressure required in the tube in order to blow a hemispherical bubble at its end in water? The surface tension of water at temperature of the experiments is 7.30 xx 10^(-2) Nm^(-1) . 1 atmospheric pressure = 1.01 xx 10^(5) Pa , density of water = 1000 kg//m^(3), g=9.80 ms^(-2) . also calculate the excess pressure.

The bulk modulus of water is 2.1xx10^(9) Nm^(-2) . The pressure required ot increase the density of water by 0.1% is