An organ pipe has two successive harmonics with frequencies 400 and 560 Hz. The speed of sound in air is 344 m/s. Is this an open or closed pipe ? Answer 1 for open and 2 for closed.

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Solution

As we know that , in an open organ pipe we get all the harmonics (odd and even) and a closed organ pipe gives only odd harmonics . It is given that harmonics are successive therefore ,
for open pipe ,
let frequency of nth harmonic be $ν_{n} = 400 H z$ ,
and frequency of (n+1)th harmonic be $ν_{n + 1} = 560 H z$ ,
therefore ,
$ν_{n + 1} - ν_{n} = ν_{1}$ (fundamental fequency) ,
or $560 - 400 = ν_{1}$ ,
or $ν_{1} = 160 H z$ ,
for closed pipe ,
let frequency of nth harmonic be $ν_{n} = 400 H z$ ,
and frequency of (n+1)th harmonic be $ν_{n + 1} = 560 H z$ ,
therefore ,
$ν_{n + 1} - ν_{n} = 2 ν_{1}$ (fundamental fequency) ,
or $560 - 400 = 2 ν_{1}$ ,
or $ν_{1} = 80 H z$ ,
hence we can say that given pipe is a closed pipe because given harmonic frequencies $400 H z$ and $560 H z$ are multiples of $80 H z$ , which is the fundamental frequency of closed organ pipe .
Answer is 2.

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