A large number of liquid drops each of radius 'a' coalesce to form a single spherical drop of radius b. The energy released in the process is converted into kinetic energy of the big drops formed. The speed of big drop will be

A large number of droplets, each of radius a, coalesce to form a bigger drop of radius b . Assume that the energy released in the process is converted into the kinetic energy of the drop. The velocity of the drop is sigma = surface tension, rho = density)

n number of water droplets, each of radius r , coalese, to form a single drop of radius R . The rise in temperature d theta is

Two mercury drops each of radius r merge to form a bigger drop. Calculate the surface energy released.

A number of droplets, each of radius r , combine to form a drop of radius R . If T is the surface tension, the rise in temperature will be

A certain number of spherical drops of a liquid of radius r coalesce to form a single drop of radius R and volume V . If T is the surface tension of the liquid, then

Calculate the loss of energy when 27 drops of water each of radius 0.6mm coalesce to form a single drop.

Two drops of equal radius r coalesce to form a single drop under isothermal conditions . The radius of such a drop would be

Two drops of equal radius coalesce to form a bigger drop. What is ratio of surface energy of bigger drop to smaller one?

Two small drops of mercury each of radius r form a single large drop. The ratio of surface energy before and after this change is

If a number of little droplets of water, each of radius r , coalesce to form a single drop of radius R , show that the rise in temperature will be given by (3T)/J(1/r-1/R) where T is the surface tension of water and J is the mechanical equivalent of heat.