In law of linear density, the fundamental frequency of vibrating string is

In law of tension, the fundamental frequency of vibrating string is

In law of length , the fundamental frequency of vibrating string is

The lowest frequency of the vibrating string is

The fundamental frequency of a vibrating organ pipe is 200Hz

For a constant vibrating length, density of the material and tension in the string the fundamental frequency of the vibrating stringis

The fundamental frequency of a string is proportional to

The mass suspended from the stretched string of a sonometer is 4 kg and the linear mass density of string 4 xx 10^(-3) kg m^(-1) . If the length of the vibrating string is 100 cm , arrange the following steps in a sequential order to find the frequency of the tuning fork used for the experiment . (A) The fundamental frequency of the vibratinng string is , n = (1)/(2l) sqrt((T)/(m)) . (B) Get the value of length of the string (l) , and linear mass density (m) of the string from the data in the problem . (C) Calculate the tension in the string using , T = mg . (D) Substitute the appropriate values in n = (1)/(2l) sqrt((T)/(m)) and find the value of 'n' .

The harmonics that accompanied with the fundamental frequency of a vibrating stretched string are

A wire of length 2.00 m is stretched to a tension of 160 N. If the fundamental frequency of vibration is 100 Hz, find its linear mass density.