A pipe of length `l_(1)`, closed at one end is kept in a chamber of gas of density `rho_(1)`. A second pipe open at both ends is placed in a second chamber of gas of density `rho_(2)`. The compressibility of both the gases is equal. Calculate the length of the second pipe if frquency of first overtone in both the cases is equal

A pipe of length 10 cm, closed at one end, has a frequency equal to half the 2nd overtone of another pipe open at both the ends. What is the length of the open pipe ?

A pipe of lengths 10 cm, closed at one edn, has frequency equal to half the 2^(nd) overtone of another pipe open at the ends. The lengths of the open pipe is

A pipe of lengths 10 cm, closed at one edn, has frequency equal to half the 2^(nd) overtone of another pipe open at the ends. The lengths of the open pipe is

A closed organ pipe of length 'L' and an open organ pipe contain gases of densities rho(1) and rho_(2) respectively . The compressibility of gases are equal in both the pipes . If the frequencies of their first overtones are same then, the length of the open organ pipe is

An organ pipe P_(1) , closed at one end and containing a gas of density rho_(1) is vibrating in its first harmonic. Another organ pipe P_(2) , open at both ends and containing a gas of density rho_(2) , is vibrating in its third harmonic. Both the pipes are in resonance with a given tuning fork. If the compressibility of gases is equal in both pipes, the ratio of the lengths of P_(1) and P_(2) is (assume the given gases to be monoatomic)

An organ pipe P _(1) , closed at one end and containing a gas of density rho _(1) is vibrating in its first harmonic . Another organ pipe P_(2) , open at both ends and containing a gas of density rho _(2) is vibrating in its third harmonic. Both the pipes are in resonance with a given tuning fork . If the compressibility of gases is equal in both pipes , the ratio of the lengths of P_(1) and P_(2) (assume the given gases to be monoatomic)

A closed organ pipe of length L and an open organ pipe contain gases of densities rho_1 and rho_2 resp. The compressiblity of gases are equal in both pipes. Both pipes are vibrating in first overtones with same frequency. The length of open organ pipe is

The second overtone of a closed organ pipe is in unison with the fourth overtone of the open organ pipe. Calculate the ratio of length of the two pipes.

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.