Introduction to Acoustics

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296 Part B Physical and Nonlinear Acoustics Part B 8 8.85 Yu.A. Kobelev, L.A. Ostrovsky: Nonlinear acoustic phenomena due to bubble drift in a gas-liquid mixture, J. Acoust. Soc. Am. 85, 621–627 (1989) 8.86 S.L. Lopatnikov: Acoustic phase echo in liquid with gas bubbles, Sov. Tech. Phys. Lett. 6, 270–271 (1980) 8.87 I.Sh. Akhatov, V.A. Baikov: Propagation of sound perturbations in heterogeneous gas-liquid systems, J. Eng. Phys. 9, 276–280 (1986) 8.88 I.Sh. Akhatov, V.A. Baikov, R.A. Baikov: Propagation of nonlinear waves in gas-liquid media with a gas content variable in space, Fluid Dyn. 7, 161–164 (1986) 8.89 E. Zabolotskaya: Nonlinear waves in liquid with gas bubbles, Trudi IOFAN (Institute of General Physics of the Academy of Sciences, Moscow) 18, 121–155 (1989), in Russian 8.90 I.Akhatov, U. Parlitz, W. Lauterborn: Pattern formation in acoustic cavitation, J. Acoust. Soc. Am. 96, 3627–3635 (1994) 8.91 I.Akhatov, U. Parlitz, W. Lauterborn: Towards a theory of self-organization phenomena in bubbleliquid mixtures, Phys. Rev. E 54, 4990–5003 (1996) 8.92 O.A. Druzhinin, L.A. Ostrovsky, A. Prosperetti: Lowfrequency acoustic wave generation in a resonant bubble-layer, J. Acoust. Soc. Am. 100, 3570–3580 (1996) 8.93 L.A. Ostrovsky, A.M. Sutin, I.A. Soustova, A.I. Matveyev, A.I. Potapov: Nonlinear, low-frequency sound generation in a bubble layer: Theory and laboratory experiment, J. Acoust. Soc. Am. 104, 722–726 (1998) 8.94 R.I. Nigmatulin: Dynamics of Multiphase Systems (Hemisphere, New York 1991) 8.95 V.E. Nakoryakov, V.G. Pokusaev, I.R. Shreiber: Propagation of Waves in Gas- and Vapour-liquid Media (Institute of Thermophysics, Novosibirsk 1983) 8.96 L. van Wijngaarden: One-dimensional flow of liquids containing small gas bubbles, Ann. Rev. Fluid Mech. 4, 369–396 (1972) 8.97 U. Parlitz, R. Mettin, S. Luther, I. Akhatov, M. Voss, W. Lauterborn: Spatiotemporal dynamics of acoustic cavitation bubble clouds, Philos. Trans. R. Soc. London Ser. A 357, 313–334 (1999) 8.98 J.G. McDaniel, I. Akhatov, R.G. Holt: Inviscid dynamics of a wet foam drop with monodisperse bubble size distribution, Phys. Fluids 14, 1886–1984 (2002) 8.99 A. Prosperetti, A. Lezzi: Bubble dynamics in a compressible liquid. Part 1. First order theory, J. Fluid Mech. 168, 457–478 (1986) 8.100 R.I. Nigmatulin, I.S. Akhatov, N.K. Vakhitova, R.T. Lahey Jr.: On the forced oscillations of a small gas bubble in a spherical liquid-filled flask, J. Fluid Mech. 414, 47–73 (2000) 8.101 A. Jeffrey, T. Kawahara: Asymptotic Methods in Nonlinear Wave Theory (Pitman, London 1982) 8.102 L. van Wijngaarden: On the equations of motion for mixtures of fluid and gas bubbles, J. Fluid Mech. 33, 465–474 (1968) 8.103 N.A. Gumerov: Propagation of long waves of finite amplitude in a liquid with polydispersed gas bubbles, J. Appl. Mech. Tech. Phys. 1, 79–85 (1992) 8.104 A. Hasegawa: Plasma Instabilities and Nonlinear Effects (Springer, Berlin, Heidelberg 1975) 8.105 N.A. Gumerov: The weak non-linear fluctuations in the radius of a condensed drop in an acoustic field, J. Appl. Math. Mech. (PMM U.S.S.R.) 53, 203–211 (1989) 8.106 N.A. Gumerov: Weakly non-linear oscillations of the radius of a vapour bubble in an acoustic field, J. Appl. Math. Mech. 55, 205–211 (1991) 8.107 N.A. Gumerov: On quasi-monochromatic weakly nonlinear waves in a low-dissipative bubbly liquid, J. Appl. Math. Mech. 56, 50–59 (1992) 8.108 S. Gavrilyuk: Large amplitude oscillations and their "thermodynamics" for continua with "memory", Euro. J. Mech. B/Fluids 13, 753–764 (1994) 8.109 S.L. Gavrilyuk, V.M. Teshukov: Generalized vorticity for bubbly liquid and dispersive shallow water equations, Continuum Mech. Thermodyn. 13, 365– 382 (2001) 8.110 L.F. McGoldrick: Resonant interactions among capillary-gravity waves, J. Fluid Mech. 21, 305–331 (1965) 8.111 D.J. Benney: A general theory for interactions between long and short waves, Studies Appl. Math. 56, 81–94 (1977) 8.112 I.Sh. Akhatov, D.B. Khismatulin: Effect of dissipation on the interaction between long and short waves in bubbly liquids, Fluid Dyn. 35, 573–583 (2000) 8.113 I.Sh. Akhatov, D.B. Khismatulin: Two-dimensional mechanisms of interaction between ultrasound and sound in bubbly liquids: Interaction equations, Acoust. Phys. 47, 10–15 (2001) 8.114 I.Sh. Akhatov, D.B. Khismatulin: Mechanisms of interaction between ultrasound and sound in liquids with bubbles: Singular focusing, Acoust. Phys. 47, 140–144 (2001) 8.115 D.B. Khismatulin, I.Sh. Akhatov: Sound – ultrasound interaction in bubbly fluids: Theory and possible applications, Phys. Fluids 13, 3582–3598 (2001) 8.116 V.E. Zakharov: Collapse of Langmuir waves, Sov. Phys. J. Exp. Theor. Phys. 72, 908–914(1972) 8.117 D.F. Gaitan, L.A. Crum, C.C. Church, R.A. Roy: An experimental investigation of acoustic cavitation and sonoluminescence from a single bubble, J. Acoust. Soc. Am. 91, 3166–3183 (1992) 8.118 Y. Tian, J.A. Ketterling, R.E. Apfel: Direct observations of microbubble oscillations, J. Acoust. Soc. Am. 100, 3976–3978 (1996) 8.119 J. Holzfuss, M. Rüggeberg, A. Billo: Shock wave emission of a sonoluminescing bubble, Phys. Rev. Lett. 81, 5434–5437 (1998) 8.120 R. Pecha, B. Gompf: Microimplosions: Cavitation collapse and shock wave emission on a nanosecond time scale, Phys. Rev. Lett. 84, 1328–1330 (2000)
8.121 E. Heim: Über das Zustandekommen der Sonolumineszenz (On the origin of sonoluminescence). In: Proceedings of the Third International Congress on Acoustics, Stuttgart, 1959, ed. by L. Cremer (Elsevier, Amsterdam 1961) pp. 343–346, in German 8.122 C.C. Wu, P.H. Roberts: A model of sonoluminescence, Proc. R. Soc. Lond. A 445, 323–349 (1994) 8.123 W.C. Moss, D.B. Clarke, D.A. Young: Calculated pulse widths and spectra of a single sonoluminescing bubble, Science 276, 1398–1401 (1997) 8.124 V.Q. Vuong, A.J. Szeri, D.A. Young: Shock formation within sonoluminescence bubbles, Phys. Fluids 11, 10–17 (1999) 8.125 B. Metten, W. Lauterborn: Molecular dynamics approach to single-bubble sonoluminescence. In: Nonlinear Acoustics at the Turn of the Millennium, ed. by W. Lauterborn, T. Kurz (Am. Inst. Physics, Melville 2000) pp. 429–432 8.126 B. Metten: Molekulardynamik-Simulationen zur Sonolumineszenz, Dissertation (Georg-August Universität, Göttingen 2000) 8.127 S.J. Ruuth, S. Putterman, B. Merriman: Molecular dynamics simulation of the response of a gas to a spherical piston: Implication for sonoluminescence, Phys. Rev. E 66, 1–14 (2002), 036310 8.128 W. Lauterborn, T. Kurz, B. Metten, R. Geisler, D. Schanz: Molecular dynamics approach to sonoluminescent bubbles. In: Theoretical and Computational Acoustics 2003, ed. by A. Tolstoy, Yu-Chiung Teng, E.C. Shang (World Scientific, New Jersey 2004) pp. 233–243 8.129 N.H. Packard, J.P. Crutchfield, J.D. Farmer, R.S. Shaw: Geometry from a time series, Phys. Rev. Lett. 45, 712–716 (1980) 8.130 F. Takens: Detecting strange attractors in turbulence. In: Dynamical Systems and Turbulence,ed.by D.A. Rand, L.S. Young (Springer, Berlin, Heidelberg 1981) pp. 366–381 8.131 H.D.I. Abarbanel: Analysis of Observed Chaotic Data (Springer, Berlin, New York 1996) 8.132 H. Kantz, T. Schreiber: Nonlinear Time Series Analysis (Cambridge Univ. Press, Cambridge 1997) Nonlinear Acoustics in Fluids References 297 8.133 U. Parlitz: Nonlinear time serie analysis. In: Nonlinear Modeling – Advanced Black Box Techniques, ed. by J.A.K. Suykens, J. Vandewalle (Kluwer Academic, Dordrecht 1998) pp. 209–239 8.134 A. Wolf, J.B. Swift, H.L. Swinney, J.A. Vastano: Determining Lyapunov exponents from time series, Physica D 16, 285–317 (1985) 8.135 W. Lauterborn, E. Cramer: Subharmonic route to chaos observed in acoustics, Phys. Rev. Lett. 47, 1445–1448 (1981) 8.136 W. Lauterborn, J. Holzfuss: Acoustic chaos, Int. J. Bifurcation Chaos 1, 13–26 (1991) 8.137 W. Lauterborn, A. Koch: Holographic observation of period-doubled and chaotic bubble oscillations in acoustic cavitation, Phys. Rev. A 35, 1774–1976 (1987) 8.138 S. Luther, M. Sushchik, U. Parlitz, I. Akhatov, W. Lauterborn: Is cavitation noise governed by a low-dimensional chaotic attractor?. In: Nonlinear Acoustics at the Turn of the Millennium, ed.by W. Lauterborn, T. Kurz (Am. Inst. Physics, Melville 2000) pp. 355–358 8.139 W. Lauterborn: Nonlinear dynamics in acoustics, Acustica acta acustica Suppl. 1 82, S46–S55 (1996) 8.140 M.E. McIntyre, R.T. Schumacher, J. Woodhouse: On the oscillation of musical instruments, J. Acoust. Soc. Am. 74, 1325–1345 (1983) 8.141 N.B. Tuffilaro: Nonlinear and chaotic string vibrations, Am. J. Phys. 57, 408–414 (1989) 8.142 C. Maganza, R. Caussé, Laloë: Bifurcations, period doublings and chaos in clarinet-like systems, Europhys. Lett. 1, 295–302 (1986) 8.143 K.A. Legge, N.H. Fletcher: Nonlinearity, chaos, and the sound of shallow gongs, J. Acoust. Soc. Am. 86, 2439–2443 (1989) 8.144 H. Herzel: Bifurcation and chaos in voice signals, Appl. Mech. Rev. 46, 399–413 (1993) 8.145 T. Yazaki: Experimental observation of thermoacoustic turbulence and universal properties at the quasiperiodic transition to chaos, Phys. Rev. E48, 1806–1818 (1993) 8.146 G.W. Swift: Thermoacoustic engines, J. Acoust. Soc. Am. 84, 1145–1180 (1988) Part B 8
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Springer Handbook of Acoustics
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Springer Handbook of Acoustics Thom
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Foreword The present handbook cover
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List of Authors Iskander Akhatov No
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Philippe Roux Université Joseph Fo
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XIV Contents 3.7 Attenuation of Sou
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XVI Contents 10 Concert Hall Acoust
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XVIII Contents 17.8 Physical Modeli
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XX Contents 24.5 Free-Field Microph
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XXII List of Abbreviations K KDP po
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Introduction 1. Introduction to Aco
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of noise have been the subject of c
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in order to understand how objectiv
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A Brief 2. A Brief History of Acous
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of 350 m/s for the speed of sound [
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number and relative strength of its
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To his contemporaries, Koenig was p
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Probably the most important use of
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piezoelectric ceramic compositions
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surveys together [2.46]. Masking of
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ther of computer music, since he de
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Basic 3. Linear Basic Linear Acoust
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M average molecular weight n unit v
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a) b) S v.n ∆t ∆S V |v| ∆t n
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temperature, q =−κ∇T , (3.16)
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The equivalent density M/V is conse
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Basic Linear Acoustics 3.3 Equation
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Because any vector field may be dec
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The latter and (3.84), in a manner
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assumed to have no ambient motion,
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Because the friction associated wit
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3.5 Waves of Constant Frequency One
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3.5.4 Time Averages of Products Whe
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as well as symmetry considerations,
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The auxiliary internal variables th
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Then the transient at a distant pos
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ω ′ = 0, and this is consistent
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1.0 10 -1 10 -2 10 -3 10 -4 10 -5 A
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This yields the interpretation that
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direction of propagation when a pla
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so the time-averaged incident energ
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Although the simple result of (3.31
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ut, also in keeping with the linear
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equation, the two differential equa
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Rodrigues relation, one has �1
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for the derivative.) In the asympto
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The differential scattering cross s
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elow) is F(t) = (2c) 1/2 �t −
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0.5 0 -0.5 -1.0 -1.5 0 Y0(η) (π/2
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is the Wronskian for the Bessel and
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The function qS is termed the sourc
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The appropriate identification for
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where jℓ is the spherical Bessel
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this subtlety taken into account, o
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U(x) Basic Linear Acoustics 3.15 Wa
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is ordinarily valid. With these ass
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along rays. These can be regarded a
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A(x0) x0 A(x) Fig. 3.53 Sketch of a
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possible, and one where neither the
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which is independent of the z-coord
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[3.108], and Carslaw [3.109]. In th
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where C(X)andS(X) are the Fresnel i
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Fig. 3.60 Characteristic diffractio
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of elastic solids, Trans. Camb. Phi
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3.101 J.B. Keller: Geometrical acou
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114 Part A Propagation of Sound Par
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Underwater 5. Underwater Acoustics
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5.1 Ocean Acoustic Environment The
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Long-Range Propagation Paths Figure
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tal direction, there is no loss ass
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equivalent circuit, as shown in Fig
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Attenuation á (dB/km) 1000 100 10
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5.2.5 Ambient Noise There are essen
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ubble natural acoustic resonance ω
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a bubbly medium (and for the simple
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As discussed, because detection inv
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(1/A)∇ 2 A ≪ K 2 )sothat(5.34)
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water, where the deep sound channel
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egion in the form p(r, z) = ψ(r, z
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5.4.6 Propagation and Transmission
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tegration interval. The source puls
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5.6 SONAR Array Processing Signal p
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former output is: �∞ b(θ,t) =
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Fig. 5.37 Angle-versus-time represe
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5.7 Active SONAR Processing Depth M
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a factor when there is a reverberan
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depth measurements that correspond
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along the cross-shelf track taken b
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time as a result of multiple paths,
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technique is very sensitive, and ex
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Fig. 5.57a,b Typical echogram obtai
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Frequency (Hz) 150 100 50 0 0 a) b)
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out. These data allow for study of
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5.59 G. Raleigh, J.M. Cioffi: Spati
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Physical 6. Physical Acou Acoustics
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where I is the intensity of the sou
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Wave velocity The wall exerts a dow
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destructively interfered with one a
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or: � � p2 � rms SPL = 10 log
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6.1.4 Wave Propagation in Solids Si
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where c is again the wave speed and
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measured. Some resonances are cause
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as 50 µmto5µm through one oscilla
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the number of false positives and m
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with the small mass), and frequency
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Laser Lens 1 Circular aperture Fig.
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Ground ring Insulator Sample Resist
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Energy ratio 1.0 0.8 0.6 0.4 Calcul
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terms. In this equation γ is the r
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directly. The nonlinearity paramete
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Thermoacoust 7. Thermoacoustics The
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Table 7.1 The acoustic-electric ana
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walls of the pores. (Positive G ind
Page 260 and 261: a) b) c) C reso d) δtherm e) p 0 U
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Page 264 and 265: tor. This eliminates the need to le
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Page 270 and 271: Washington 1986) pp. 550-554, Softw
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Page 312 and 313: Acoustics 9. Acoustics in Halls for
Page 314 and 315: parameters, so we can assist in bui
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Page 320 and 321: selected). A distance different fro
Page 322 and 323: ing sound, as will naturally be exp
Page 324 and 325: of the sound fields. Consequently,
Page 326 and 327: e derived from interrupted noise de
Page 328 and 329: Acoustics in Halls for Speech and M
Page 330 and 331: espectively, can be calculated from
Page 332 and 333: ated by the architects. However, on
Page 334 and 335: of C and G. However, as all the ind
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Page 338 and 339: HS S èn ã d0 P0 rn Position of ey
Page 340 and 341: Time T (s) 2.5 2 1.5 1 5 10 15 Acou
Page 342 and 343: floor can be tilted to reduce volum
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Page 352 and 353: Seating capacity 2662 1 915 + 324 2
Page 356 and 357: 4 3 2 1 Acoustics in Halls for Spee
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esonance (AR)andmultichannel reverb
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Concert 10. Concert Hall Acoustics
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Concert Hall Acoustics Based on Sub
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0 0 Concert Hall Acoustics Based on
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mately by Concert Hall Acoustics Ba
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10.1.5 Specialization of Cerebral H
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The other (n − 1) bits indicated
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As for the conflicting requirements
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have mainly been concerned with tem
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a) c) S S -4.3 -2.8 -2.0 -3.5 -3dB
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a model of the auditory-brain syste
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Building 11. Building Acou Acoustic
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Pressure Maximum Minimum 0 D Distan
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Table 11.1 Absorption coefficients
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Absorption coefficient α 1 0 Frequ
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is of key importance in rooms where
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Table 11.4 Transmission loss and ST
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TL of wall - (TL of door, window or
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Table 11.7 Generalized noise reduct
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Masking sound pressure level (dB) 5
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As for the room criterion (RC) meth
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11.5 Noise Control Methods for Buil
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Neoprene pads (30 durometer) with a
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Concrete Caulk around perimeter Vib
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Trim board to conceal gap (fasten o
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Gypsum board partition (as schedule
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Double-layer ribbed or waffle neopr
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11.6 Acoustical Privacy in Building
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Table 11.9 AI,SIIandPIforopenplanof
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Electronic sound masking in plenum
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E 1179 Standard Specification for S
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430 Part D Hearing and Signal Proce
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Psychoacoust 13. Psychoacoustics Ps
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Absolute threshold (dB SPL) 100 90
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the signal. By using this off-cente
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is as a crude indicator of the exci
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Relative response (dB) 100 90 80 70
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In a variation of this procedure, t
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Level of matching noise (dB) 100 90
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13.4 Temporal Processing in the Aud
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Most models include an initial stag
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The components were either uniforml
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(Frequency DL)/ERBN 0.2 0.1 0.05 0.
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elaborate place models have been pr
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13.6 Timbre Perception 13.6.1 Time-
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the duplex theory of sound localiza
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harmonic (by shifting the frequency
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sive. While some studies have been
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sentences (see Fig. 13.20). They va
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components is usually only perceive
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References 13.1 ISO 389-7: Acoustic
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13.74 D. Ronken: Monaural detection
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asymmetric function, J. Acoust. Soc
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13.211 J. Vliegen, A.J. Oxenham: Se
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534 Part E Music, Speech, Electroac
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The 16. The Human Human Voice in Sp
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uation, the effect of gravity is in
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piratory muscles (the internal inte
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Mean Ps (cm H2O) 50 40 30 20 10 0 D
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Glottal flow Closed Opening Open Cl
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Transglottal airflow (l/s) 0.4 0.2
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Mean spectrum level (dB) -30 -40 -5
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20 10 0 -10 -20 -30 -40 -50 0 i y u
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Mean level (dB) 0 -10 -20 -30 -40 1
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This topic was addressed by Ladefog
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Fig. 16.29 Acoustic consequences of
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Bass i e u Alto Tenor o ε œ æ Th
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100 80 60 40 20 0 -20 100 80 60 40
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tours for [� ]and[Ù ] sampled at
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Rapp [16.100] asked three native sp
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Utterance command T0 T3 Accent comm
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The # symbol indicates the possibil
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Second formant frequency (Hz) 2500
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tional rather than absolute (à la
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16.7 P. Ladefoged, M.H. Draper, D.
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esonance imaging: Vowels, J. Acoust
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16.139 A. Eriksson: Aspects of Swed
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Computer 17. Computer Mu Music This
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Quantum step Amplitude Quantization
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Some might notice that linear inter
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pers, textbooks, patents, etc. Furt
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0:00.0 0.5 0 Computer Music 17.3 Ad
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(0,0) (0,1) (1,1) (0,2) (1,2) (0,3)
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synthesizing vocoder. The main diff
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x(n) + z -1 z -1 Scattering junctio
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230 Hz FOF 1100 Hz FOF 1700 Hz FOF
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0 y + - Computer Music 17.8 Physica
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-1 (1-ß )×length Velocity + Veloc
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0 -30 (dB) -60 0 1.5 3 4.5 (kHz) Fi
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17.10 Composition The history of co
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and variance of the features can be
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17.20 J.L. Kelly Jr., C.C. Lochbaum
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Audio 18. Audio and Electroacoustic
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Alexander Graham Bell filed his pat
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on magnetic stripes. A common arran
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60 40 20 0 SPL-sound pressure level
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Interaural intensity difference (dB
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with equalization, without incurrin
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Fig. 18.8 Sine wave with crossover
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18.3.8 Dynamic Range Dynamic range
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Directly actuated type Diaphragm ty
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effective pickup pattern of the arr
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attempts to apply complementary com
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Most of the issues relating to spea
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nificant design considerations. At
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Some appreciation of the performanc
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pre-digital reverberators were elec
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and ‘s’ in English text - may b
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content of rest of the signal spect
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cross the head, in opposite directi
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18.2 J. Sterne: The Audible Past (D
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18.71 T. Sporer: Creating, assessin
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786 Part F Biological and Medical A
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Medical 21. Medical Acous Acoustics
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21.1 Introduction to Medical Acoust
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Auscultation location Right & left
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portance. The Strouhal number has b
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Fig. 21.3 Phono-cardiograph transdu
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Amplitude 8 6 4 2 0 -2 -4 -6 Displa
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λ1 = c1 / fus θ1 λ2 = c2 / fus
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lood flow can be resolved if the si
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vided in the image thickness direct
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not as predicted, because the wave
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Fig. 21.18a,b Quadrature Doppler de
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a) b) c) 100 0 V mV 10 0 a = 13 a =
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Ultrasound contact gel Position enc
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a) 10 cm b) c) 10 cm Fig. 21.32a-c
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a) Pin B Pin A Ultrasound line b) M
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Organ Patient Ultrasound transducer
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systems cannot tell the difference
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40 µm can be resolved. For a 10 kH
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a) b) c) d) Medical Acoustics 21.4
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Fig. 21.54 Doppler spectral wavefor
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10 20 30 10 20 30 Pre-exercise B-mo
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Vibrations in a punctured artery De
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the veins and diffuse into the inte
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21.5.3 Agitated Saline and Patent F
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transported by those cells and/or r
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1 0.8 0.6 0.4 0.2 0 Relative power
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High intensity focused ultrasound h
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a) b) c) Fig. 21.74a-c B-mode imagi
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provided simple metrics for the lik
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thickness of the carotid arteries,
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Structural 22. Structural Acoustics
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Structural Acoustics and Vibrations
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Magnitude (arb. units) 1.4 1.2 1.0
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This does not include the case wher
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the mass matrix is taken to be cons
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Magnitude (dB) -10 -30 -50 0 1 2 3
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where D(ω) = ω 4 − 2iω 3�
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form y(x, t) = � Φn(x)qn(t) . (2
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first to solve the wave equation (2
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5 3 1 -1 -3 -5 0 1 2 3 4 5 6 7 8 9
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conditions at each end) are necessa
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from which we can derive through (2
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In this case, the eigenfrequencies
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of radiation modes and their link w
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Finally, the displacement is ˜ξ(x
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notes the value of this eigenmode a
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Pm = ˙Q H [Rs + Ra] ˙Q , (22.262)
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where and Ra = 2ζaω0 M Z(s) = zL
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Radiated Power. The mean acoustic p
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(22.318) can be written ξ(x, y, t)
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Denoting the eigenfrequencies and e
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Magnitude (arb. units) 3 2 1 0 -1 -
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for any real symmetric tensor Xij.
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F(N) 1 0.5 0 -0.5 -1 -1 -0.8 -0.6 -
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whose solution is θ1 = A cos ωτ.
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4.5 3.5 2.5 1.5 A 0.5 0 0.5 1.0 1.5
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Equations (22.423) are usually writ
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3. As the amplitude reaches the top
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Shallow Spherical Shells and Plates
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22.20 L. Cremer, M. Heckl: Structur
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Noise Noise is discussed in terms o
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where the overbars represent time a
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Typical outdoor setting A-weighted
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90 dB(A)” is widely used, and imp
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Microphone, amplifier and A/D conve
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When each segment of the measuremen
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found from � LW = Lp + 10 log A +
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surement method is the ultimate use
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An intensity analyzer is more compl
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23.2.5 Criteria for Noise Emissions
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Table 23.5 Table of limit values fr
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a) Air flows freely to rotor Weak t
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Static efficiency normalized to its
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ful applications. Good results are
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Table 23.8 Crossover speeds for var
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Reduction of airplane engine noise
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A variety of materials are used to
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∆LF (dB) 0 -10 -20 α -30 0.05 0.
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Absorption coefficient 1.0 0.8 0.6
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high enough that there is little so
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23.4.4 Criteria for Noise Immission
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Table 23.10 (cont.) Some features o
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Noise 23.4 Noise and the Receiver 1
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view of administrative procedures r
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provides recommendations for a foll
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sound power levels of noise sources
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23.68 ISO: ISO 9296:1988 Acoustics
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in impedance tubes - Part 2: Transf
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23.194 Commission of the European C
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1022 Part H Engineering Acoustics P
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Sound 25. Intens Sound Intensity So
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Under such conditions the intensity
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a) Pressure and particle velocity 0
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τ is a dummy time variable. The ca
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Error in intensity (dB) 5 0 -5 -10
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8 7 6 5 4 3 2 1 0 -1 -2 -3 Error du
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crophones are calibrated with a pis
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Sound power level (dB re 1 pW) 72 7
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it is relatively straightforward si
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intensity normal to the source. Thi
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25.9 W. Maysenhölder: The reactive
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25.77 ISO: ISO 11205 Acoustics - No
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Optical 27. Optical Methods Metho f
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course also present in ordinary hol
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Optical Methods for Acoustics and V
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50 100 150 200 250 300 350 400 450
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a) b) Optical Methods for Acoustics
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nm 1000 0 -1000 150 y (mm) 100 50 O
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Laser Optical Methods for Acoustics
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References 27.1 E.F.F. Chladni: Die
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27.75 E.-L.Johansson, L. Benckert,
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About the Authors Iskander Akhatov
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Neville H. Fletcher Chapter F.19 Au
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Brian C. J. Moore Chapter D.13 Univ
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Detailed Contents List of Abbreviat
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3.8.3 Acoustic Power ..............
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4.8.3 Typical Speed of Sound Profil
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7.3 Engines .......................
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10 Concert Hall Acoustics Based on
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13.4 Temporal Processing in the Aud
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15.2.5 String-Bridge-Body Coupling
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19.6 Birds ........................
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22.4.5 Combinations of Elementary S
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24.8 Overall View on Microphone Cal
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Subject Index 3 dB bandwidth 463 A
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British Medical Ultrasound Society
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electric circuit analogues - acoust
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hyperspeech 703 hypospeech 703 I IA
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- participation factors 909 - stiff
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- musical instruments 541 - musical
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- nonlinear vibrations 957 - plate
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subjective preference theory 353 su
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Introduction to Acoustics

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