Respuesta :
Incomplete question as we have not told to find which quantity.The complete question is here
A flutist assembles her flute in a room where the speed of sound is 340 m/s. When she plays the note A, it is in perfect tune with a 440 Hz tuning fork. After a few minutes, the air inside her flute has warmed to where the speed of sound is 347 m/s .
(a)How many beats per second will she hear if she now plays the note A as the tuning fork is sounded?
(b) How far does she need to extend the "tuning joint" of her flute to be in tune with the tuning fork?
Answer:
(a)[tex]f_{beat}=9.06Hz[/tex]
(b) The flutist extends to the turning joint of her flute by 1.363×10⁻⁵m
Explanation:
Part A
The wavelength of sound wave of the note A
λ=v/f
Where v speed of sound
f is frequency
Substitute the given values
So
λ=(340m/s)÷440Hz
λ=0.7727 m
The new frequency of note A when the air inside the flute has warmed
f¹=v¹/λ
f¹=(347m/s)/0.7727 m
f¹=449.05Hz
The Beat frequency of two waves is:
[tex]f_{beat}=|f_{1}-f_{2} |\\f_{beat}=|449.05Hz-440Hz | \\f_{beat}=9.06Hz[/tex]
Part B
Frequencies of standing waves modes of an open tube of Length L:
[tex]f_{m}=m(v/2L)\\where\\m=1,2,3,4........[/tex]
So
[tex]L=m(v/2f_{m} )[/tex]
L=mλ/2
From part (a) The wavelength of sound of note A is 0.7727m and m=1
So
[tex]L=(0.7727/2)=0.38635m[/tex]
When the air inside the flute has warmed.Then the new length is given below at same frequency of 440 Hz
So
[tex]L_{a}=v/2f\\L_{a}=340m/s/2*440Hz\\L_{a}=0.38636m[/tex]
So the length the flutist extends to the turning joint for the flute to be:
ΔL=La-L
ΔL=0.38636m - 0.38635
ΔL=1.363×10⁻⁵m
The flutist extends to the turning joint of her flute by 1.363×10⁻⁵m
Answer:
Explanation:
Let L = length of flute used in playing A-note (open ends forming antinodes, L= lamda/2)
f1 = v1/2L = 440
340/2L = 440
2L = 340/440
= 0.386 m.
At v2 = 347 m/s,
f2 = v2/2L
= 347/2L
= 347 * 440/340
= 449.06 Hz
Beat frequency, f = f2 - f1
= 347 * 440/340 - 440
f = 9.06 beats/s
B.
f2 > f1 because now length is not able to keep ratio with increased speed of sound, so lets increase L to (L+x), f2' = f1 (again resonates) or beats f = 0
347/(2*(L + x)) = 440
2L + 2x = 347/440
340/440 + 2x = 347/440
2x = 7/440
x = 0.00795 m
= 7.95 mm.
