Two water drops each of radius \( r \) coalesce to form a bigger drop. If \( T \) is the surface tension, the surface energy released in this process is:
Show Hint
- \( 4 \pi r^2 T \)
- \( 8 \pi r^2 T \)
- \( 12 \pi r^2 T \)
- \( 6 \pi r^2 T \)
The Correct Option is B
Solution and Explanation
The surface energy of a single drop is given by \( 4 \pi r^2 T \), where \( r \) is the radius and \( T \) is the surface tension. - Initially, there are two drops, so the total surface energy is \( 2 \times 4 \pi r^2 T = 8 \pi r^2 T \). - After the two drops coalesce, the radius of the new drop becomes \( \sqrt{2}r \), so the surface energy of the new drop is \( 4 \pi (\sqrt{2}r)^2 T = 8 \pi r^2 T \). The surface energy released is the difference between the initial and final surface energy, which is \( 8 \pi r^2 T \). Thus, the correct answer is \( 8 \pi r^2 T \).
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