2. Mach Cone
⢠The shape of the wake of air is known
as a Mach Cone. The width of a Mach
Cone varies, depending on the speed of
the object as it moves through the air.
Sometimes, part of the Mach Cone
becomes visible as water vapor in the
air gets trapped between pressure
waves and it briefly condenses, causing
a cloud of condensed vapor to form a
halo around the object.
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What IS Sound?
⢠Sound is really tiny fluctuations of air pressure
â units of pressure: N/m2 or psi (lbs/square-inch)
⢠Carried through air at 345 m/s (770 m.p.h) as
compressions and rarefactions in air pressure
wavelength
compressed gas
rarefied gas
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Properties of Waves
⢠Wavelength ( ) is measured from crest-to-crest
â or trough-to-trough, or upswing to upswing, etc.
⢠For traveling waves (sound, light, water), there is a speed (v)
⢠Frequency (f) refers to how many cycles pass by per second
â measured in Hertz, or Hz: cycles per second
â associated with this is period: T = 1/f
⢠These three are closely related:
f = v
or T
horizontal axis could be:
space: representing
snapshot in time
time: representing
sequence at a par-
ticular point in space
pressure
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Longitudinal vs. Transverse Waves
⢠Sound is a longitudinal wave, meaning that the
motion of particles is along the direction of
propagation
⢠Transverse wavesâwater waves, lightâhave things
moving perpendicular to the direction of propagation
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Why is Sound Longitudinal?
⢠Waves in air canât really be transverse, because the
atoms/molecules are not bound to each other
â canât pull a (momentarily) neighboring molecule sideways
â only if a ârubber bandâ connected the molecules would this
work
â fancy way of saying this: gases canât support shear loads
⢠Air molecules can really only bump into one another
⢠Imagine people in a crowded train station with hands
in pockets
â pushing into crowd would send a wave of compression into
the crowd in the direction of push (longitudinal)
â jerking people back and forth (sideways, over several
meters) would not propagate into the crowd
â but if everyone held hands (bonds), this transverse motion
would propagate into crowd
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Sound Wave Interference and Beats
⢠When two sound waves are present, the
superposition leads to interference
â by this, we mean constructive and destructive addition
⢠Two similar frequencies produce beats
â spend a little while in phase, and a little while out of phase
â result is âbeatingâ of sound amplitude
signal A
signal B
A + B beat
(interference)
in phase: add
out of phase: cancel
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Speed of Sound
⢠Sound speed in air is related to the frantic motions of
molecules as they jostle and collide
â since air has a lot of empty space, the communication that a
wave is coming through has to be carried by the motion of
particles
⢠Solids have faster sound speeds because atoms are
hooked up by âspringsâ (bonds)
â donât have to rely on atoms to traverse gap
â spring compression can (and does) travel faster than actual
atom motion
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Example Sound Speeds
Medium sound speed (m/s)
air (20 C) 343
water 1497
gold 3240
brick 3650
wood 3800â4600
glass 5100
steel 5790
aluminum 6420
http://hypertextbook.com/physics/waves/sound/
10. Speed of Sound Temperature
Dependency
⢠At normal atmospheric pressure, the temperature
dependence of the speed of a sound wave
through dry air is approximated by the following
equation:
⢠v = 331 m/s + (0.6 m/s/C)â˘T
â where T is the temperature of the air in degrees Celsius.
Using this equation to determine the speed of a sound wave
in air at a temperature of 20 degrees Celsius yields the
following solution.
v = 331 m/s + (0.6 m/s/C)â˘T
v = 331 m/s + (0.6 m/s/C)â˘(20 C)
v = 331 m/s + 12 m/s
v = 343 m/s
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11. 11
Acoustic parameters are expressed as
logarithmic ratio of the measured value to a
reference value
The Bel (B) is a unit of measurement invented
by Bell Labs and named after Alexander
Graham Bell.
The Bel was too large, so the deciBel(dB),
equal to 0.1 B, became more commonly used as
a unit for measuring sound intensity
dB SCALE
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Threshold of hearing 0 dB Motorcycle (30 feet) 88 dB
Rustling leaves 20 dB Foodblender (3 feet) 90 dB
Quiet whisper (3 feet) 30 dB Subway (inside) 94 dB
Quiet home 40 dB Diesel truck (30 feet) 100 dB
Quiet street 50 dB Power mower (3 feet) 107 dB
Normal conversation 60 dB Pneumatic riveter (3 feet) 115 dB
Inside car 70 dB Chainsaw (3 feet) 117 dB
Loud singing (3 feet) 75 dB Amplified Rock and Roll (6 feet) 120 dB
Automobile (25 feet) 80 dB Jet plane (100 feet) 130 dB
Typical average decibel levels (dBA) of some common sounds.
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Sound hitting your eardrum
⢠Pressure variations displace membrane (eardrum,
microphone) which can be used to measure sound
â my speaking voice is moving your eardrum by a mere
1.5 10-4 mm = 150 nm = 1/4 wavelength of visible light!
â threshold of hearing detects 5 10-8 mm motion, one-half the
diameter of a single atom!!!
â pain threshold corresponds to 0.05 mm displacement
⢠Ear ignores changes slower than 20 Hz
â so though pressure changes even as you climb stairs, it is
too slow to perceive as sound
⢠Eardrum canât be wiggled faster than about 20 kHz
â just like trying to wiggle resonant system too fast produces
no significant motion
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Speakers: Inverse Eardrums
⢠Speakers vibrate and push on the air
â pushing out creates compression
â pulling back creates rarefaction
⢠Speaker must execute complex motion according to
desired waveform
⢠Speaker is driven via âsolenoidâ idea:
â electrical signal (AC) is sent into coil that surrounds a
permanent magnet attached to speaker cone
â depending on direction of current, the induced magnetic field
either lines up with magnet or is opposite
â results in pushing or pulling (attracting/repelling) magnet in
coil, and thus pushing/pulling on center of cone
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Push Me, Pull Me
⢠When the center of the speaker cone is kicked, the whole cone
canât respond instantaneously
â the fastest any mechanical signal can travel through a material is at
the speed of sound in the material
⢠The whole cone must move into place well before the wave
period is complete
â otherwise, different parts of the cone might be moving in while
others are moving out (thus canceling the sound)
â if we require the signal to travel from the center to the edge of the
cone in 1/N of a wave cycle (N is some large-ish number):
⢠available time is t = 1/Nf = /Ncair
⢠ripple in cone travels ccone t, so radius of cone must be < ccone/Ncair
â basic point is that speaker size is related to wavelength of sound
⢠low frequency speakers are big, high frequency small