An open pipe of sufficient length is dipping in water with a speed v vertically. If at any instant l is lengths of tube avoce water. Then the rate at which fundamental frequency of pipe changes , is ( speed of sound = c)

In an organ pipe of length L open at both ends, the fundamental mode has a frequency (where v is a speed of sound in air)

Show that an organ pipe of length 2l open at both ends has the same fundamental frequency as another pipe of length I closed at one end.

How is the fundamental frequency of an open pipe related to the fundamental frequency of a closed pipe of half the length?

An open pipe of length 2m is dipped in water . To what depth x is to be immersed in water so that it may resonate with a tuning fork of frequency 170 Hz when vibrating in its overtone . Speed of sound in air is 340 m//s

A pipe open at both ends has a fundamental frequency f in air. The pipe is dipped vertically in water so that half of it is in water. The fundamental frequency of the air column is now :

A closed organ pipe and an open organ pipe are tuned to the same fundamental frequency. The ratio of their lengths is

A closed organ pipe and an open organ pipe are tuned to the same fundamental frequency. The ratio of their lengths is

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

Find the greatest length of an organ pipe open at both ends that will have its fundamental frequency in the normal hearing range (20-20,000 Hz). Speed of sound in air = 340 ms^-1 .

A pipe open at both ends has a fundamental frequency f in air. The pipe is dippoed vertically in water so that half of it is in water. The fundamental frequency of the air column is now :-