Answer:
the length of the pipe should be 11.7 cm
Explanation:
given information:
the length of the taut, L = 62 cm = 0.62 m
wire's mass = 7.25 g = 7.25 x 10⁻³ kg
tension, F = 4310 N
speed sound, [tex]v_{s}[/tex] = 344 m/s
to find the length of the pipe, we first calculate the speed of the wave on a string by:
v = √F/μ (1)
where
v = speed
F = tension
μ = linear density
μ = m/L, m is mass, and L is the length
thus,
v = √FL/m
= √(4310)(0.62)/(7.25 x 10⁻³)
= 607.11 m/s
now we find the frequency of the wire using
[tex]f = n\frac{v}{2L}[/tex] (n=1,2,3,.....) (2)
where
f = frequency
second overtone with very large amplitude, n = 3
so,
[tex]f = 3\frac{607.11}{2(0.62)}[/tex]
= 1468.81
now we can calculate the length of the pipe using the second equation. the frequency of the pipe and the wire is the same, therefore
[tex]f = n\frac{v}{2L}[/tex]
n = 1, fundamental frequency
[tex]L = \frac{v}{2f}[/tex]
= [tex]\frac{344}{2 (1468.81)}[/tex]
= 0.117 m
= 11.7 cm
