Chapter 22B: AcousticsChapter 22B: AcousticsA PowerPoint Presentation byA PowerPoint Presentation by
Paul E. Tippens, Professor of PhysicsPaul E. Tippens, Professor of Physics
Southern Polytechnic State UniversitySouthern Polytechnic State University
© 2007
Objectives: Objectives: After completing this After completing this module, you should be able to:module, you should be able to:
• Compute intensity and intensity levels of sounds and correlate with the distance to a source.
• Apply the Doppler effect to predict apparent changes in frequency due to relative velocities of a source and a listener.
Acoustics DefinedAcoustics Defined
Acoustics is the branch of science that deals with the physiological aspects of sound. For example, in a theater or room, an engineer is concerned with how clearly sounds can be heard or transmitted.
Acoustics is the branch of science that deals with the physiological aspects of sound. For example, in a theater or room, an engineer is concerned with how clearly sounds can be heard or transmitted.
Audible Sound WavesAudible Sound WavesSometimes it is useful to narrow the classification of sound to those that are audible (those that can be heard). The following definitions are used:
• Audible sound: Frequencies from 20 to 20,000 Hz.
• Infrasonic: Frequencies below the audible range.
• Ultrasonic: Frequencies above the audible range.
Comparison of Sensory Effects Comparison of Sensory Effects With Physical MeasurementsWith Physical Measurements
Sensory effects Physical property
Loudness
Pitch
Quality
Intensity
Frequency
Waveform
Physical properties are measurable and repeatable.
Sound Intensity (Loudness)Sound Intensity (Loudness)
Sound intensity is the power transferred by a sound wave per unit area normal to the direction of wave propagation.
Sound intensity is the power transferred by a sound wave per unit area normal to the direction of wave propagation.
PIA
Units: W/m2
Isotropic Source of SoundIsotropic Source of SoundAn isotropic source propagates sound in ever-increasing spherical waves as shown. The Intensity I is given by:
24P PIA r
Intensity I decreases with the square of the distance r from the isotropic sound source. Intensity I decreases with the square of the distance r from the isotropic sound source.
Comparison of Sound IntensitiesComparison of Sound Intensities
The inverse square relationship means a sound that is twice as far away is one-fourth as intense, and one that is three times as far away is one-ninth as intense.
The inverse square relationship means a sound that is twice as far away is one-fourth as intense, and one that is three times as far away is one-ninth as intense.
I1
I2
r1
r2
1 214
PIr
2 224
PIr
2 21 1 2 2I r I rConstant PowerConstant Power PP
2 21 1 2 24 4P r I r I
Example 1:Example 1: A horn blows with constant power. A A horn blows with constant power. A child child 8 m8 m away hears a sound of intensity away hears a sound of intensity 0.600 0.600 W/mW/m22. What is the intensity heard by his mother . What is the intensity heard by his mother 20 m20 m away? What is the power of the source?away? What is the power of the source?
Given: Given: II11 = 0.60 W/m= 0.60 W/m22; ; rr11 = = 8 m, 8 m, rr22 = = 20 m20 m22
2 2 1 1 11 1 2 2 2 12
2 2
or I r rI r I r I Ir r
2
22
8 m0.60 W/m20 m
I
I2 = 0.096 W/m2I2 = 0.096 W/m2
Example 1: (Cont.)Example 1: (Cont.) What is the power of the What is the power of the source? Assume isotropic propagation.source? Assume isotropic propagation.
Given: Given: II11 = 0.60 W/m= 0.60 W/m22; ; rr11 = = 8 m 8 m II22 = 0.0960 W/m= 0.0960 W/m22 ; ; rr22 = = 20 m20 m
P = 7.54 WP = 7.54 W
2 2 21 1 12
1
or 4 4 (8 m) (0.600 W/m )4
PI P r Ir
The same result is found from: 22 24P r I
Range of IntensitiesRange of IntensitiesThe hearing threshold is the standard minimum of intensity for audible sound. Its value I0 is:
Hearing threshold: I0 = 1 x 10-12 W/m2
The pain threshold is the maximum intensity Ip that the average ear can record without feeling or pain.
Pain threshold: Ip = 1 W/m2
Intensity Level (Decibels)Intensity Level (Decibels)Due to the wide range of sound intensities (from 1 x 10-12 W/m2 to 1 W/m2) a logarithmic scale is defined as the intensity level in decibels:
Intensity level0
10 log II
decibels (dB)
where is the intensity level of a sound whose intensity is I and I0 = 1 x 10-12 W/m2.
Example 2:Example 2: Find the intensity level of a Find the intensity level of a sound whose intensity is sound whose intensity is 1 x 101 x 10--77 W/mW/m22
..
-7 2
-12 20
1 x 10 W/m10log 10log1 x 10 W/m
II
510log10 (10)(5)
Intensity level: = 50 dB
Intensity level: = 50 dB
Intensity Levels of Common Sounds.Intensity Levels of Common Sounds.
Hearing threshold: 0 dB Pain threshold: 120 dB
20 dB 65 dBLeaves or whisperNormal
conversation
Subway100 dB
Jet engines
140- 160 dB
Comparison of Two SoundsComparison of Two SoundsOften two sounds are compared by intensity levels. But remember, intensity levels are logarithmic. A sound that is 100 times as intense as another is only 20 dB larger!
20 dB, 1 x 10-10 W/m2Source A
40 dB, 1 x 10-8 W/m2Source
B
IB = 100 IA
Difference in Intensity LevelsDifference in Intensity Levels
Consider two sounds of intensity levels 1 and 2
2 1 2 12 1
0 0 0 0
10 log 10log 10 log logI I I II I I I
1 21 2
0 0
10 log ; 10 logI II I
2 02 1
1 0
/10 log/
I II I
22 1
1
10 log II
Example 3:Example 3: How much more intense is How much more intense is a a 60 dB60 dB sound than a sound than a 30 dB30 dB sound?sound?
22 1
1
10 log II
2 2
1 1
I60 dB 30 dB 10log and log 3I
II
Recall definition: x10log means 10N x N
32 2
1 1
I Ilog 3; 10 ; I I I2 = 1000 I1
Interference and BeatsInterference and Beats
Beat frequency = f’ - fBeat frequency = f’ - f
f
f’
f f’
+
=
The Doppler EffectThe Doppler EffectThe Doppler effect refers to the apparent change in frequency of a sound when there is relative motion of the source and listener.
vf
Right person hears a higher f due to shorter
Left person hears lower f
due to longer
Sound source moving with vs
Apparent f0 is affected by motion.
General Formula for Doppler EffectGeneral Formula for Doppler Effect
00 s
s
V vf fV v
Definition of terms:
f0 = observed frequency
fs = frequency of source
V = velocity of sound
v0 = velocity of observer
vs = velocity of source
Speeds are reckoned as positive for
approach and negative for
recession
Example 4:Example 4: A boy on a bicycle moves north at A boy on a bicycle moves north at 10 m/s10 m/s. Following the boy is a truck traveling . Following the boy is a truck traveling north at north at 30 m/s30 m/s. The truck. The truck’’s horn blows at a s horn blows at a frequency of frequency of 500 Hz500 Hz. What is the apparent . What is the apparent frequency heard by the boy? Assume sound frequency heard by the boy? Assume sound travels at travels at 340 m/s340 m/s..
30 m/s 10 m/sV = 340 m/sfs = 500 Hz
The truck is approaching; the boy is fleeing. Thus:
vs = +30 m/svs = +30 m/s v0 = -10 m/sv0 = -10 m/s
Example 4 (Cont.):Example 4 (Cont.): Apply Doppler equation.Apply Doppler equation.
vs = 30 m/s v0 = -10 m/sV = 340 m/sfs = 500 Hz
f0 = 532 Hzf0 = 532 Hz
00
340 m/s ( 10 m/s)500 Hz340 m/s - (30 m/s)s
s
V vf fV v
0330 m/s500 Hz310 m/s)
f
Summary of AcousticsSummary of Acoustics
Acoustics is the branch of science that deals with the physiological aspects of sound. For example, in
a theater or room, an engineer is concerned with how clearly sounds can be heard or transmitted.
Acoustics is the branch of science that deals with the physiological aspects of sound. For example, in
a theater or room, an engineer is concerned with how clearly sounds can be heard or transmitted.
Audible sound: Frequencies from 20 to 20,000 Hz.
Infrasonic: Frequencies below the audible range.
Ultrasonic: Frequencies above the audible range.
Summary (Continued)Summary (Continued)
Sensory effects Physical property
Loudness
Pitch
Quality
Intensity
Frequency
Waveform
Measurable physical properties that determine the sensory effects of individual sounds
Summary (Cont.)Summary (Cont.)Sound intensity is the power transferred by a sound wave per unit area normal to
the direction of wave propagation.
Sound intensity is the power transferred by a sound wave per unit area normal to
the direction of wave propagation.
PIA
Units: W/m2
Summary (Cont.)Summary (Cont.)
The inverse square relationship means a sound that is twice as far away is one-fourth as intense, and one that is three times as far away is one-ninth as intense.
The inverse square relationship means a sound that is twice as far away is one-fourth as intense, and one that is three times as far away is one-ninth as intense.
24P PIA r
2 21 1 2 2I r I r
Summary of Formulas:Summary of Formulas:
PIA
22 1
1
10 log II
Beat freq. = f’ - fBeat freq. = f’ - f 00 s
s
V vf fV v
v = fv = f
0
10 log II
Hearing threshold: I0 = 1 x 10-12 W/m2
Pain threshold: Ip = 1 W/m2
Hearing threshold: I0 = 1 x 10-12 W/m2
Pain threshold: Ip = 1 W/m2
CONCLUSION: Chapter 22BCONCLUSION: Chapter 22B AcousticsAcoustics