Answer:
4.6 m
Explanation:
First of all, we can find the frequency of the wave in the string with the formula:
[tex]f=\frac{1}{2L}\sqrt{\frac{T}{\mu}}[/tex]
where we have
L = 2.00 m is the length of the string
T = 160.00 N is the tension
[tex]\mu =7.20 g/m = 0.0072 kg/m[/tex] is the mass linear density
Solving the equation,
[tex]f=\frac{1}{2(2.00 m)}\sqrt{\frac{160.00 N}{0.0072 kg/m}}=37.3 Hz[/tex]
The frequency of the wave in the string is transmitted into the tube, which oscillates resonating at same frequency.
The n=1 mode (fundamental frequency) of an open-open tube is given by
[tex]f=\frac{v}{2L}[/tex]
where
v = 343 m/s is the speed of sound
Using f = 37.3 Hz and re-arranging the equation, we find L, the length of the tube:
[tex]L=\frac{v}{2f}=\frac{343 m/s}{2(37.3 Hz)}=4.6 m[/tex]
