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An air column open at both ends is 1.00 m long. If the speed of sound is 340 m/s and resonance occurs, what are the two lowest resonant frequencies, and what relationship exists between these two notes?

User FishingIsLife
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1 Answer

18 votes
18 votes

We are asked to determine the frequency of an open air column. To do that we will use the following formula:


f_1=(V)/(2L)

Where:


\begin{gathered} V=\text{ sp}eed\text{ of sound} \\ L=\text{ length} \\ f_1=\text{ frequency} \end{gathered}

Substituting the values:


f_1=(340(m)/(s))/(2(1m))

Solving the operations we get:


f_1=170Hz

Therefore, the first frequency is 170 Hz.

To determine the second frequency we use the following formula:


f_2=(V)/(L)

Substituting the values we get:


f_2=(340(m)/(s^2))/(1m)

Solving the operation we get:


f_2=340Hz

Therefore, the second frequency is 340 Hz.

We notice that the relationship between frequency is:


f_1=2f_2