In a pipe opened at both ends `n_(1)` and `n_(2)` be the frequencies corresponding to vibrating lengths `L_(1)` and `L_(2)` respectively .The end correction is

A pipe open at both ends gives frequencies which are

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

In open organ pipe, if fundamental frequency is n then the other frequencies are

A closed organ pipe of length L and an open organ pipe contain gass of densities rho_(1) and rho_(2) , respectively. The compressibility of gass are equal in both the pipes. Both the pipes are vibrating in their first overtone with same frequency . The length of the open orange pipe 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 )

The balancing lengths for the cells of emfs E_1 and E_2 are l_1 and l_2 respectively . If they are connected separately then

Two rods, one of aluminum and the other made of steel, having initial length l_1 and l_2 are connected together to form a single rod of length l_1 + l_2 . The coefficients of linear expansion for aluminum and steel are alpha_a, and alpha_s, respectively. If the length of each rod increases by the same amount when their temperature are raised by t^@C , then find the ratio l_1/(l_1 + l_2)

n organ pipe open at both ends vibrate with a frequency 'n' which is its p^th overtone. When one end of the pipe is closed , it vibrate with a frequency N which is its q ^th overtone, show that N =(2q +1) n / 2 (p+1)

The length of pipe closed at one end and open at both ends is 32 cm each. The frequency of first overtone in a pipe closed at one end is 750 Hz . Calculate the frequency of first overtone in a pipe open at both ends.

A thin wire of 99 cm is fixed at both ends as shown in figure. The wire is kept under a tension and is divided into three segments of lengths l_(1),l_(2) and l_(3) as shown in figure. When the wire is made to vibrate, the segment vibrate respectively with their fundamental frequencies in the ratio 1:2:3 . Then the lenghts l_(1),l_(2),l_(3) of the segments respectively are (in cm)