Physics, asked by pavanmaleppanav, 1 year ago

a stretched string of mass 20 grams vibrates with a frequency of 30 Hertz in its fundamental mode and the supports are 40 cms apart. The amplitude of vibrations at the antidote is 5 Cms. calculate the velocity of propogation of the waves in the string as well as the tension on it answer this quesstion

Answers

Answered by duragpalsingh
4
Wave Speed Formula:
v = f \lambda

Calculate the velocity of propagation of the wave in the string.
Let L be the length of string.

v = f \lambda = f2L = 30Hz \cdotp 2\cdotp0.4m = 24m/s

the tension:

We know,

v = \sqrt{ \frac{T}{\mu} }
Then, v^2 = \frac{T}{\mu}

So,
T = v^2\mu = v^2ML = 24m/s^2 \cdotp \frac{0.02 kg}{0.4m} = 28.8 N



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