Answer:
3.89m
Explanation:
To find the length of the pipe you can use the formula for the modes of the pipe with a closed end:
[tex]f=\frac{(2n+1)v_s}{4L}[/tex]
n: mode of frequency
vs : sound speed = 343m/s
L: length of the pipe
by taking the difference between two consecutive modes you obtain:
[tex]f_n-f_{n-1}=\frac{(2n+1)v_s}{4L}-\frac{(2(n-1)+1)v_s}{4L}=\frac{v_s}{2L}[/tex]
by using two consecutive frequencies in the previous expression and replacing you get:
[tex]110-66=44=\frac{v_s}{2L}\\\\L=\frac{v_s}{2(44)/s}=\frac{343m/s}{88/s}=3.89m[/tex]
hence, the length of the pipe is 3.89m
