An organ pipe of cross-sectional area 100 `cm^(2)` resonates with a tuning fork of frequency 1000 Hz in fundamental tone. The minimum volume of water to be drained so the pipe again resonates with the same tuning fork is
(Take velocity of wave = 320 m `s^(-1)`)

An organ pipe closed at one end restonates with a tuning fork of frequencies 180 Hz and 300 Hz it will also resonate with tuning fork of frequencies

In one metre long open pipe what is the harmonic of resonance obtained with a tuning fork of frequency 480 Hz

What is minimum length of a tube, open at both ends, that resonates with tuning fork of frequency 350 Hz ? [velocity of sound in air = 350 m/s ]

A stretched string resonates with a tuning fork of frequency 480 Hz, when the length of the string is 60 cm. The length of the same string required to vibrate resonantly with a tuning fork of frequency 240 Hz will be

A tuning fork is vibrating at 250 Hz. The length of the shortest closed organ pipe that will resonate with the tuning fork will be (Take speed of sound in air as 340 ms^( -1) )

A pipe open at the top end is held vertically with some of its lower portion dipped in water. At a certain depth of immersion, the air column of length 3/8 m in the pipe resonates with a tuning fork of frequency 680 Hz. The speed of sound in air is 340 m/s. The pipe is now raised up by a distance 'X' until it resonates in the next overtone' with the same tuning fork. The value of 'X' is

A sonometer wire of length 65cm is in resonance with a tuning fork of frequency N. If the length of the wire is decreased by 1cm and it is vibrated with the same tuning fork, 8 beats/s are heard, then the frequency of the tuning fork will be