String A has a length L, radius of cross-section r, density of material p and is under tension T. String b has all these quantities double those of string A. If `v_(a)` and `v_(b)` are the corresponding fundamentals frequinces of the vibrating string,then

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

Two vibrating string of same length, same cross section area and stretched to same tension is made of meterials with densities rho and 2rho . Each string is fixed at both ends If v_0 represents the fundamental mode of vibration of the one made with density rho and v_2 for another Then v_1//v_2 is:

The tension, length, diameter and density of a string B are double than that of another string A. Which of the following overtones of B is same as 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 .

When a string is divided into three segments of lengths l_(1),l_(2) and l_(3) the fundamental frequencies of these three segments are v_(1), v_(2) and v_(3) respectively. The original fundamental frequency (v) of the string is

A string is under tension so that its length is increased by 1//n times its original length . The ratio of fundamental frequency of longitudinal vibrations and transverse vibrations will be

A string is under tension sot that its length uncreased by 1/n times its original length . The ratio of fundamental frequency of longitudinal vibrations and transverse vibrations will be

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