Answer:
1070 Hz
Explanation:
First, I should point out there might be a typo in the question or the question has inconsistent values. If the tube is 40 cm long, standing waves cannot be produced at 42.5 cm and 58.5 cm lengths. I assume the length is more than the value in the question then. Under this assumption, we proceed as below:
The insert in the tube creates a closed pipe with one end open and the other closed. For a closed pipe, the difference between successive resonances is a half wavelength [tex]\frac{\lambda}{2}[/tex].
Hence, we have
[tex]\dfrac{\lambda}{2}=58.5-42.5=16 \text{ cm}[/tex]
[tex]\lambda=32\text{ cm}=0.32 \text{ m}[/tex].
The speed of a wave is the product of its wavelength and its frequency.
[tex]v=f\lambda[/tex]
[tex]f=\dfrac{v}{\lambda}[/tex]
[tex]f=\dfrac{343}{0.32}=1070 \text{ Hz}[/tex]
