A small liquid drop of radius is divided into identical liquid drops. If the surface tension is , then the work done in the process will be:
- A
- B
- C
- D
A small liquid drop of radius is divided into identical liquid drops. If the surface tension is , then the work done in the process will be:
Correct answer:A
Standard Method
Given: A liquid drop of radius is divided into identical smaller drops, and surface tension is .
Find: The work done in dividing the drop.
The work done is equal to the increase in surface energy, so we first calculate the change in total surface area.
For the original drop, the surface area is
Let the radius of each small drop be . Using volume conservation,
So,
Surface area of each small drop is
Therefore, the total surface area of smaller drops is
Hence, the increase in surface area is
Work done equals change in surface energy:
Therefore, the work done in the process is . The correct option is A.
Surface Energy Approach
Given: One spherical liquid drop of radius is broken into identical drops.
Find: The work done against surface tension.
Since the liquid volume remains constant, equate the initial and final volumes:
This gives
Now compare the initial and final surface areas:
So the extra area created is
Surface energy increase is
Therefore, the required work done is .
Using radius of each small drop as is incorrect because volume, not radius, is conserved. First write and then find .
Calculating work done from volume change is wrong here because surface tension is related to surface energy. Use the increase in surface area and apply .
Forgetting to multiply the surface area of one small drop by gives the wrong final area. After finding area of one drop, compute total area of all drops.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.