A big drop is formed by coalescing small identical drops of water. If is the total surface energy of small drops and is the surface energy of the single big drop, then the ratio is where equals:
- A
- B
- C
- D
A big drop is formed by coalescing small identical drops of water. If is the total surface energy of small drops and is the surface energy of the single big drop, then the ratio is where equals:
Correct answer:C
Standard Method
Given: A big drop is formed by coalescing identical small water drops. Let the radius of each small drop be and the radius of the big drop be .
Find: The ratio .
The surface energy of a droplet is given by
where is the surface tension and is the surface area.
For one small drop,
So, for small drops, the total surface area is
Hence, the total surface energy of the small drops is
Using volume conservation
When small drops coalesce, total volume remains constant.
Volume of one small drop:
Total volume of small drops:
Volume of the large drop:
Direct scaling idea
Equating volumes,
which gives
Now surface area of the big drop is
So its surface energy is
Therefore,
Thus,
Therefore, the correct option is C and .
Why this shortcut works: on coalescing identical drops, radius scales as and surface area scales as . Hence the ratio of initial to final surface energy becomes . For , this is .
Using surface area proportional to instead of is incorrect because belongs to volume, not area. Use surface area of a sphere as when calculating surface energy.
Not applying volume conservation during coalescence is wrong because the amount of water remains the same. First equate total volume of small drops with the volume of the big drop to find .
Taking instead of is incorrect because radii are related through the cube root from volume conservation. From , the correct result is .
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