If `f_1, f_2 and f_3` are the fundamental frequencies of three segments into which a string is divided, then the original fundamental frequency `f_0` of the whole string is

If n_(1), n_(2 ) "and" n_(3) are the fundamental frequencies of three segments into which a string is divided, then the original fundamental frequency n of the string is given by

If v_(1) , v_(2) and v_(3) are the fundamental frequencies of three segments of stretched string , then the fundamental frequency of the overall string is

If f_(1) and f_(2) be the fundamental frequencies of the two segments into which a stretched string is divided by means of a bridge , then find the original fundamental frequency f of the complete string.

If f_(1) and f_(2) be the fundamental frequencies of the two segments into which a stretched string is divided by means of a bridge , then find the original fundamental frequency f of the complete string.

When a string is divided into three segments of length l_1,l_2 and l_3 the fundamental frequencies of these three segments are f_1,f_2 and f_3 respectively. The original fundamental frequency f of the string is

The fundamental frequency of a string is proportional to

If the frequencies of the sound second and fifth harmonics of a string differ by 54 Hz. What is the fundamental frequency of the string ?

To decrease the fundamental frequency of a stretched string fixed at both ends one might

The string of a violin has a fundamental frequency of 440 Hz. If the violin string is shortend by one fifth, itd fundamental frequency will be changed to

A cylindrical tube, open at both ends, has a fundamental frequency f in air . The tube is dipped vertically in water so that half of its length is in water. The fundamental frequency of the air column is now (a) f // 2 (b) 3 f // 4 (C ) f (d) 2f