if the time period of vibration of a liquid drop depends on surface tension ,radius of the drop and density of the liquid liquid, the expression of t is may be what?
Answers
Answered by
14
Time of oscillation,
t α p^a α r^k α σ^c
So, t = k(p^a)(r^k)(σ^c)
Writing dimensions of both sides,
[T] = [ML^-3]^a [L]^b [MT^-2]^c
= [M^(a+c) L^(-3a+b) T^(-2c)]
Comparing powers of M,L and T on both sides, we have
a + c = 0 …(i)
-3a + b = 0 …(ii)
-2c = 1 …(iii)
Solving eqs (i), (ii) and (iii), we get,
a = 1/2, c= -1/2, b = 3/2
Putting the values in t
t = k(p^1/2)(r^3/2)(σ^-1/2)
t α √[(pr^3)/σ]
MonaliniNayak:
thanks a lot
Answered by
0
Explanation:
your answer is in the attachment
Mark my answer as brainliest if ur satisfied
Attachments:
Similar questions