The dimensions of surface tension are
(1)
(2)
(3)
(4) This quantity S is the magnitude of surface
tension
A wooden stick 2 m long is floating on the surface of the water. The surface tension of water is 0.07 N/m. By putting soap solution on one side of the stick, the surface tension is reduced to 0.06 N/m. The net force on the stick due to surface tension will be:
1. | 0.07 N | 2. | 0.06 N |
3. | 0.01 N | 4. | 0.02 N |
Surface tension may be defined as
(1) The work done per unit area in increasing the surface area of a liquid under isothermal condition
(2) The work done per unit area in increasing the surface area of a liquid under adiabatic condition
(3) The work done per unit area in increasing the surface area of a liquid under both isothermal and adiabatic conditions
(4) Free surface energy per unit volume
The energy needed to break a drop of radius \(R\) into \(n\) drops of radii \(r\) is given by:
1. \(4 πT ( nr ^2 - R ^2 )\)
2. \(\frac{4}{3} \pi \left(r^{3} n - R^{2}\right)\)
3. \(4 πT \left(R^{2} -nr^{2}\right)\)
4. \(4 πT \left(nr^{2}+R^{2} \right)\)
The potential energy of a molecule on the surface of liquid compared to one inside the liquid is -
(1) Zero
(2) Smaller
(3) The same
(4) Greater
Two droplets merge with each other and forms a large droplet. In this process
(1) Energy is liberated
(2) Energy is absorbed
(3) Neither liberated nor absorbed
(4) Some mass is converted into energy
Work done in splitting a drop of water of 1 mm radius into droplets is (Surface tension of water )
(1)
(2)
(3)
(4)
The amount of work done in blowing a soap bubble such that its diameter increases from d to D is (T= surface tension of the solution)
1.
2.
3.
4.
A spherical drop of oil of radius 1 cm is broken into 1000 droplets of equal radii. If the surface tension of oil is 50 dynes/cm, the work done is
(1) 18 ergs
(2) 180 ergs
(3) 1800 ergs
(4) 8000 ergs
If the surface tension of a liquid is T, the gain in surface energy for an increase in liquid surface by A is
(1)
(2)
(3)
(4)