A long capillary tube of radius `0.2 mm` is placed vertically inside a beaker of water.
If the surface tension of water is `7.2xx10^(-2)N//m` the angle of contact between glass and water is zero, then determine the height of the water column in the tube.

A long capillary tube of radius 0.2 mm is placed vertically inside a beaker of water. If the tube is now pushed into water so that only 5.0 cm of its length is above the surface, then determine the angle of contact between the liquid and glass surface.

A spherical drop of water has 2.5 mm radius. If the surface tension of water is 70 xx 10^(-3) N m^(-1) , then the excess pressure inside the drop is

If the surface tension of water is 0.06 N/m, then the capillary rise in a tube of diameter 1mm is (theta=0^(@) )

A spherical drop of water has 1mm radius. If the surface tension of water is 70xx10^(-3)N//m , then the difference of pressure between inside and outside of the spherical drop is:

A uniform capillary tube of inner radius r is dipped vertically into a beaker filled with water. The water rises to a height h in the capillary tube above the water surface in the beaker. The surface tension of water is sigma . The angle of contact between water and the wall of the capillary tube is theta . Ignore the mass of water in the meniscus. Which of the following statements is (are) true?

The rise in the water level in a capillary tube of radius 0.07 cm when dipped veryically in a beaker containing water of surface tension 0.07 N m^(-1) is (g = 10 m s^(-2) )

A capillary tube of radius 0.50 mm is dipped vertically in a pot of water. Find the difference between the pressure of the water in the tube 5.0 cm below the surface and the atmospheric pressure. Surface tension of water =0.075Nm^-1

Calculate the height to which the water will rise in a capillary tube of 1.5 mm diameter (surface tension of water =74 times 10^(-3)Nm^(-1) , angle of contact between water and glass =0^(@) ).

A capillary tube of radius 0.20 mm is dipped vertically in water. Find the height of the water column raised in the tube. Surface tension of water =0.075Nm^-1 and density of water =1000 kgm^-3. Take g=10 ms^-2 .

A spherical drop of water as 1mm radius. If the surface tension of the the water is 50xx10^-3(N)/(m) , then the difference of pressure between inside and outside the spherical drop is: