A soap bubble of radius R = 3 cm and thickness `t = 10^(-2)` mm is charged to a potential of V = 0.3 volt. The bubble burst and falls as a spherical drop. Determine the potential of the drop

A conducting liquid bubble of radius a and thickness t ( tltlt a) is charged to potential V . If the bubble collapses to a droplet , find the potential on the droplet .

A conducting bubble of radius a, thickness t ( lt lt a) has a potential V. Now the bubble transforms into a droplet. Find the potential on the surface of the droplet.

There are 27 drops of a conducting fluid. Each drop has radius r , and each of them is charged to the same potential V_1 . They are then combined to from a bigger drop. The potential of the bigger drop is V_2 . Find the ratio V_2//V_1 . Ignore the change in density of the fluid on combining the drops.

A soap bubble has radius R and thickness d(ltltR) as shown. It colapses into a spherical drop. The ratio of excess pressure in the drop to the excess pressure inside the bubble is

There are 27 drops of a conducting fluid. Each has a radius r and they are charged to a potential V_(0) . They are then combined to form a bigger drop. Find its potential.

A soap bubble of radius 'r' and surface tension 'T' is given a potential of 'V' volt. If the new radiys 'R' of the bubble is related to its initial radius by equation. P_(0)[R^(3) - r^(3)] + [lambda T [R^(2) - r^(2)] - epsilon_(0) V^(2)R//2 = 0 , where P_(0) is the atmospheric pressure. Then find lambda

A soap bubble is charged to a potential 12 V. If its radius is doubled, then the potential of the bubble becomes

A soap bubble of radius r and surface tension T is given a potential V. Show that the new radius R of the bubble is related with the initial radius by the equation P(R^(3) -r^(3)) +4T (R^(2)-r^(2)) = (in_(0)V^(2)R)/(2) where P is the atmospheric pressure.

A spherical drop of water carrying a charge of 3 xx 10^(-10) C has potential of 500V at its surface. When two such drops having same charge and radius combine to from a single spherical drop, what is the potential at the surface of the new drop?

A soap bubble in vacuum has a radius of 3 cm ad another soap bubble in vacuum has a radius of 4 cm. if the two bubbles coalesce under isothermal condition, then the radius of the new bubble is