A string 1 has the length, twice the radius,two the tension and twice the density of another string The relation between the fundamental frequecy 1 and 2 is

A string 1 has twice the length, twice the radius, twice the tension and twice the density of another string 2. The relation between the fundamental frequency of 1 and 2 is

String B has twice the length , twice the diameter twice the tension and twice the density of string A. Then the overtone of B that will be in unison will A is

A string A has double the length, double the tension, double the diameter and double the density as another string B . Their fundamental frequencies of vibration are n_(A) and n_(B) respectively. The ratio n_(A)//n_(B) is equal to

The linear density of a stretched string is increased by 1%. Then the change in fundamental frequency of string is

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

The length , radius , tension and density of string A are twice the same parameters of string B . Find the ratio of fundamental frequency of B to the fundamental frequency of A .

The length , radius , tension and density of string A are twice the same parameters of string B . Find the ratio of fundamental frequency of B to the fundamental frequency of A .

A string is fixed at both ends. The tension in the string and density of the string are accurately known but the length and the radius of cross section of the string are known with some errorl If maximum errors made in the measurements of length and radius are 1% and 0.5% respectively them what is the maximum possible percentage error in the calculation of fundamental frequencyof the that string ?

A string is fixed at both ends. The tension in the string and density of the string are accurately known but the length and the radius of cross section of the string are known with some errorl If maximum errors made in the measurements of length and radius are 1% and 0.5% respectively them what is the maximum possible percentage error in the calculation of fundamental frequencyof the that string ?

Two wires made up of the same material are of equal lengths but their diameter are in the ratio 1:2 . On stretching each of these two strings by the same tension , then the ratio of the fundamental frequency of these strings is