Answer:
159.1 Hz
Step-by-step explanation:
The formula for the fundamental frequency of an open pipe is given as,
f' = v/2l'....................... Equation 1
Where f' = fundamental frequency of the open pipe, v = velocity of sound in air, l' = length of the open pipe.
make l' the subject of the equation
l' = v/2f'....................... Equation 2
Given: f' = 422 Hz, v = 343 m/s
Substitute into equation 2
l' = 343/(2×422)
l' = 0.41 m.
Also, for the closed pipe
f = v/4l
Where f = fundamental frequency of the closed pipe, l = length of the closed pipe.
make l the subject of the equation
l = v/4f ............................. Equation 4
Given: f = 666 Hz, v = 343 m/s.
Substitute into equation 4
l = 343/(4×666)
l = 0.129 m.
But,
Length of the original tube = l+l' = 0.41+0.129 = 0.539 m.
L = 0.539 m.
Note: The tube is a closed pipe.
F = v/4L ................. Equation 5
Where F = Fundamental frequency of the original tube.
F = 343/(4×0.539)
F = 159.1 Hz.
Hence the fundamental frequency of the original tube = 159.1 Hz