Figures shows the vibrations of foue air columns. The ratio of frequencies `n_(p):n_(q):n_(r):n_(s)` is

Figures shows the vibrations of four air column. The ratio of frequencies n_(p):n_(q):n_(r):n_(s) is

The vibrations of four air columns are represented in the adjoining figures. The ratio of frequencies n_(p) : n_(q) : n_(r) : n_(s) is

The vibrations of four air columns under identical conditions are represented in the figure below. The ratio of frequencies n_p : n_q : n_r : n_s will be

(n_(P_(r))/(n_(C_(r))))=

A sonometer wire when vibrated in full length has frequency n. Now, it is divided by the help of bridges into a number of segments of lenths l_(1),l_(2),l_(3)… when vibration these segments have frequencies n_(1), n_(2), n_(3),,, Then, the correct relation is

The frequency of vibration of air column in a pipe closed at one end is n_(1) and that of the one closed at both end is n_(2) . When both the pipes are joined to form a pipe closed atone end, the frequency of vibration of air column in it is (neglecting end correction )

Two vibrating strings of the same material but lengths L and 2L have radii 2r and r respectively. They are stretched under the same tension. Both the strings vibrate in their fundamental modes, the one of length L with frequency n_(1) and the other with frequency n_(2) the ratio n_(1)//n_(2) is given by

Prove analytically that in the case of a closed organ pipe of length I, the frequencies of the vibrating air column are given by nu =(2n + 1)(v//4L) , where n is an integer.

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

Let S_(n) denotes the sum of the first of n terms of A.P.and S_(2n)=3S_(n). then the ratio S_(3n):S_(n) is equal to