Find the pressure exerted below a column of water, open to the atmosphere, at depth
(i) 10 m " " (ii) 30 m
(Given, density of water `=1xx10^(3)kgm^(-3), g =10 ms^(-2))`

Find the pressure exerted below a column of water, open to the atmosphere, at depth (i) 5 m (ii) 20 m (Given, density of water = 1 xx 10^(3)"kg m"^(-3), g = 10 m s^(-2) )

The guage pressure exerted below a column of water, open to the earth's atmosphere at depth of 10 m is (density of water = 1000 kg/ m^3 , g = 10 m/ s^2 and 1 atm pressure = 10^5 Pa)

Density of water is ...… ("10 g cm"^(-3)//"1 g cm"^(-3)) .

The pressure at a point in water is 10 N//m^(2) . The depth below this point where the pressure becomes double is (Given density of water = 10^(3) kg m^(-3) , g = 10 m s^(-2) )

A glass full of water has a bottom of area 20 cm^(2) , top of area 20 cm , height 20 cm and volume half a litre. a. Find the force exerted by the water on the bottom. b. Considering the equilibrium of the v , after. find the resultant force exerted by the side, of the glass on the water. Atmospheric pressure = 1.0 xx 10^(5) N//m^(2) . Density of water = 1000 kg//m^(-3) and g = 10 m//s^(2)

At what depth below the surface of water will pressure be equal to twice the atmospheric pressure ? The atmospheric pressure is 10N cm^(-2) , density of water is 10^(3)kg m^(-3) and g=9.8 ms^(-2) .

Calculate the pressure due to a water column of height 100 m. (Take g=10 ms^(-2) and density of water =10^(3)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 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 pressure of water on the ground floor is 40,000 Pa and on the first floor is 10,000 Pa. Find the height of the first floor. (Take : density of water = 1000 "kg m"^(-3) , g=10 "m s"^(-2) )