A closed organ pipe can vibrate at a minimum frequency of 500 Hz. Find the length of the tube. Speed of sound in air `= 340 m s^-1`.

Two successive resonance frequencies in an open organ pipe are 1944 Hz and 2592 Hz. Find the length of the tube. The speed of sound in air is 324 m s^-1 .

Two successive resonance frequencies in an open organ pipe are 1944 Hz and 2592 Hz. Find the length of the tube. The speed of sound in air is 324 m s^-1 .

Two successive resonance frequencies in an open organ pipe are 1944 Hz and 2592 Hz. Find the length of the tube. The speed of sound in air is 324 m s^-1 .

Two successive resonance frequencies in an open organ pipe are 1944 Hz and 2592 Hz. Find the length of the tube. The speed of sound in air is 324 m s^-1 .

Two adjacent resonance frequency of an open organ pipe are 1800 and 2100 Hz . Find the length of the tube. The speed of sound in air is 330 m//s .

(a) A cylindrical metal tube has a length of 50 cm and is open at both ends. Find the frequencies between 1000 Hz and 2000 Hz at which the air is 340 m//s . (b) Find the greatest length of an organ pipe open at both ends that will have its fundamental frequency in the normal hearing range (20 - 20000 Hz) . Speed of sound in air = 340 m//s . (c) Two successive resonance frequencies in an open organ pipe are 1944 Hz and 2592 Hz . Find the length of the tube. The speed of sound in air is 324 m//s .

An air column in a pipe which is closed at one end will be in resonance with a vibrating tuning fork of frequency 264 Hz if the length of the air column in cm is (Speed of sound in air = 340 m/s)

Find the fundamental frequency of a closed pipe, if the length of the air column is 42 m . (speed of sound in air = 332 m/sec )

Find the fundamental frequency of a closed pipe, if the length of the air column is 42 m . (speed of sound in air = 332 m/sec )