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Question

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

A
Energy =3VT(1r+1R) is released
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B
Energy =3VT(1r+1R) is absorbed
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C
Energy =3VT(1r1R) is released
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D
Energy =3VT(1r1R) is absorbed
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Solution

The correct option is C Energy =3VT(1r1R) is released
Given,
Radius of smaller liquid drop =r
Radius of larger drop =R
Volume of larger drop =V
Surface tension of the liquid =T
Let us suppose n drops coaslece to form a bigger drop.
As volume of liquid will be same,
Volume of n smaller drops = volume of single bigger drop
n×43πr3=43πR3=V
n×4πr3=4πR3=3V ........(1)
We know, surface energy = surface tension × change in surface area
E=TΔA
=T [4πR2n×4πr2]
=T[4πR3Rn×4πr3r]
=T[3VR3Vr] ......[ from (1) ]
=3VT[1R1r]
As R>r 1R<1r
E is negative.
Hence, 3VT[1r1R] energy will be released.

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