The ratio of frequency of the second harmonic emitted from an open organ pipe to the frequency of the third harmonic emitted from a similar pipe is 1 : 2 . What is the ratio of lengths of the two pipes ?

The first overtone emitted from a closed organ pipe produces resonance with the third overtone emitted from an open organ pipe. What is the ratio of lengths of the two organ pipes ?

The first harmonic emitted from a closed pipe p_(1) and the third harmonic emitted from an open pipe p_(2) produce resonance with a tuning fork. What is the ratio of lengths of p_(1) and p_(2) ?

The frequencies of the fundamental tones in a closed and an open pipe are the same . The ratio of the lengths of the two pipes is

The fundamental frequency of an air-filled open organ pipe is 500 Hz. The frequecny of the first harmonic in a carbon dioxide-filled organ pipe, closed at one end, is equal to the frequency of the first harmonic in the first pipe. Find the lengths of each of the organ pipes . The velocities of sound in air and carbon dioxide are 300 m*s^(-1) and 264 m*s^(-1) , respectively .

What should be the ratio of the lengths of a closed and an open pipe so that the frequency of the first overtone emitted from the closed pipe is in unison with that emitted from the open pipe ?

The fundamental frequency of a closed pipe is equal to the frequency of the second harmonic of an open pipe. The ratio of their lengths is

The third overtone of a closed organ pipe is found to be in unison with the first overtone of an open pipe . Find the ratio of the lengths of the pipes .