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Acoustic Analysis of the Viola
By Meredith Powell
Advisor: Professor Steven ErredeREU 2012
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• String Instrument, larger and lower in pitch than a violin
• Tuning: A (440 Hz)
D (294 Hz) G (196 Hz)
C (131 Hz)
• Vibration of string is transferred to bridge, then soundpost and body, to surrounding air.
2004 Andreas Eastman VA200 16” viola
The Viola
Bridge
F-holes
Finger-board
Bridge
Soundpost
Back Plate
Top Plate
Bass bar
Cross-section:
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Goal
• Understand how body vibrates
– Resonant frequencies• Wood resonances• Air resonances
– Modes of vibration
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Methods
• Spectral Analysis in frequency domain– Complex Sound Pressure and Particle Velocity– Complex Mechanical Acceleration, Velocity &
Displacement at 5 locations on instrument
• Near-field Acoustic Holography– Vibration modes at resonant frequencies
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Spectral Analysis• Excite the viola with a piezo-electric
transducer placed near bridge• Take measurements at each
frequency, from 29.5 Hz to 2030.5 Hz in 1 Hz steps using 4 lock-in amplifiers
• Measure complex pressure and particle velocity with PU mic placed at f-hole
• Measure complex mechanical displacement, velocity, acceleration with piezo transducer and accelerometer
5 locations of displacement measurement
P and U mics
Input Piezo
Output Piezo and Accelerometer
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P and U Spectra
Main Air Resonances @ f-holes:– 220Hz (Helmholtz)
– 1000Hz
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Mechanical VibrationOpen String frequencies
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Comparing to Violin
[Image courtesy of Violin Resonances. http://hyperphysics.phy-astr.gsu.edu/hbase/music/viores.html]
Violin resonances tend to lie on frequencies of open strings1
This is not the case for the viola
Cause of more subdued, mellow timbre?
1Fletcher, Neville H., and Thomas D. Rossing. The Physics of Musical Instruments. New York: Springer, 1998.
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Near-Field Acoustic Holography
• Images surface vibrations at fixed resonant frequency
• Measures complex pressure and particle velocity in proximity to the back of instrument– Impedance: Z(x,y) = P(x,y)/U(x,y)– Intensity: I(x,y) = P(x,y) U*(x,y)– Particle Displacement: D = iU– Particle Acceleration: A = (1/i) U
PU mic
XY Translation Stages
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• Mechanically excite viola by placing two super magnets on either side of the top plate as close to bridge/soundpost as possible
• A sine-wave generator is connected to a coil (in proximity to outer magnet); Creates alternating magnetic field which induces mechanical vibrations
• PU mic attached to XY translation stages carries out 2-dimensional scan in 1 cm steps
Near-Field Acoustic Holography
Magnets
Coil
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Sound Intensity Level SIL(x,y) vs. Modal Frequency:
SIL(x,y) = 10 log10(|I(x,y)|/Io) {dB}
Io = 10-12 RMS Watts/m2 (Reference Sound Intensity*)
* @ f = 1 KHz
Particle Displacement Re{D(x,y)} vs. Modal Frequency:
224 Hz 328 Hz 560 Hz 1078 Hz 1504 Hz
224 Hz 328 Hz 560 Hz 1078 Hz 1504 Hz
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Complex Specific Acoustic Impedance Z(x,y) vs. Modal Frequency:
Re{Z}: air impedance associated with propagating sound
Im{Z}: air impedance associated with non-propagating sound
Re{Z}
Im{Z}
Z(x,y) = p(x,y)/u(x,y)
{Acoustic Ohms:
Pa-s/m}
224 Hz 328 Hz 560 Hz 1078 Hz 1504 Hz
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Complex Sound Intensity I(x,y) vs. Modal Frequency:
Re{I}
Im{I}
224 Hz 328 Hz 560 Hz 1078 Hz 1504 Hz
Re{I}: propagating sound energy
Im{I}: non-propagating sound energy (locally sloshes back and forth per cycle)
I(x,y) = p(x,y) u*(x,y)
{RMS Watts/m2}
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Acoustic Energy Density w(x,y) vs. Modal Frequency:
wrad: energy density associated with propagating sound (RMS J/m3)
wvirt: energy density associated with non-propagating sound (RMS J/m3)
wrad
wvirt
224 Hz 328 Hz 560 Hz 1078 Hz 1504 Hz
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Summary• Resonant frequencies tend to lie
between the open strings frequencies causing mellower sound.
• Actual mechanical motion when playing is superposition of the various modes of vibration associated with resonant frequencies.
• Future work: Test multiple models of violas, carry out same experiments on violin/cello & compare…
Acknowledgements:
I would like to extend my gratitude to Professor Errede for all of his help and guidance throughout this project, and for teaching me so much about acoustics and physics in general!
The NSF REU program is funded by National Science Foundation Grant No. 1062690