This paper presents a modal analysis and the sound pressure field for the vibrator membrane of an actual portable loudspeaker. Unlike the conventional way to model the membrane’s edge under a simply supported condition, the present approach takes the glued edge to be elastically supported. With theoretical derivations for such treatment, this paper also presents the associated near-field and far-field sound pressures that have not been reported in the open literature. Fundamentally, calculation of the near-field sound pressure solution for the elastically supported membrane has difficulty with numerical convergence. In this paper, integral regularization is employed to enforce the convergence. From the viewpoint of acoustic engineers, the analysis may effectively help to tailor the design of a loudspeaker that caters to consumers’ preference.

1.
Whaley
,
P. W.
, 1980, “
Prediction of the Change in Natural Frequency of a Cantilevered Flat Plate With Added Lumped Mass
,”
J. Sound Vib.
0022-460X,
69
(
4
), pp.
519
529
.
2.
Stepanishen
,
P. R.
, and
Ebenezer
,
D. D.
, 1992, “
A Joint Wavenumber-Time Domain Technique to Determine the Transient Acoustic Radiation Loading on Planar Vibrators
,”
J. Sound Vib.
0022-460X,
157
(
3
), pp.
451
465
.
3.
Achong
,
A.
, 1996, “
Vibrational Analysis of Mass Loaded Plates and Shallow Shells by the Receptance Method With Application to the Steelpan
,”
J. Sound Vib.
0022-460X,
191
(
2
), pp.
207
217
.
4.
Pun
,
D.
,
Lau
,
S. L.
,
Law
,
S. S.
, and
Cao
,
D. Q.
, 1998, “
Forced Vibration Analysis of a Multidegree Impact Vibrator
,”
J. Sound Vib.
0022-460X,
213
(
3
), pp.
447
466
.
5.
Gladwell
,
G. M. L.
, and
Willms
,
N. B.
, 1995, “
On the Mode Shapes of the Helmholtz Equation
,”
J. Sound Vib.
0022-460X,
188
(
3
), pp.
419
433
.
6.
Buchanan
,
G. R.
, and
Peddieson
,
J.
, 2005, “
A Finite Element in Elliptic Coordinates With Application to Membrane Vibration
,”
Thin-Walled Struct.
0263-8231,
43
(
9
), pp.
1444
1454
.
7.
Wu
,
J. J.
, 2006, “
Prediction of the Dynamic Characteristics of an Elastically Supported Full-Size Flat Plate From Those of Its Complete-Similitude Scale Model
,”
Comput. Struct.
0045-7949,
84
, pp.
102
114
.
8.
Rdzanek
,
W. P.
, Jr.
,
Rdzanek
,
W. J.
, and
Engel
,
Z.
, 2003, “
Theoretical Analysis of Sound Radiation of an Elastically Supported Circular Plate
,”
J. Sound Vib.
0022-460X,
265
(
1
), pp.
155
174
.
9.
Melnikov
,
Y. A.
, 2001, “
Green’s Function of a Thin Circular Plate With Elastically Supported Edge
,”
Eng. Anal. Boundary Elem.
0955-7997,
25
(
8
), pp.
669
676
.
10.
Kononov
,
A. V.
, and
De Borst
,
R.
, 2001, “
Radiation Emitted by a Constant Load in a Circular Motion on an Elastically Supported Mindlin Plate
,”
J. Sound Vib.
0022-460X,
245
(
1
), pp.
45
61
.
11.
Narita
,
Y.
, and
Leissa
,
A. W.
, 1981, “
Flexural Vibrations of Free Circular Plates Elastically Constrained Along Parts of the Edge
,”
Int. J. Solids Struct.
0020-7683,
17
, pp.
83
92
.
12.
Azimi
,
S.
, 1988, “
Free Vibration of Circular Plates With Elastic Edge Supports Using the Receptance Method
,”
J. Sound Vib.
0022-460X,
120
(
1
), pp.
19
35
.
13.
Kantham
,
C. L.
, 1958, “
Bending and Vibration of Elastically Restrained Circular Plates
,”
J. Franklin Inst.
0016-0032,
265
(
6
), pp.
483
491
.
14.
Snowdon
,
J. C.
, 1970, “
Forced Vibration of Internally Damped Circular Plates With Supported and Free Boundaries
,”
J. Acoust. Soc. Am.
0001-4966,
47
(
3B
), pp.
882
891
.
15.
Williams
,
E. G.
, 1999,
Fourier Acoustics
,
Academic
,
New York
, p.
41
.
You do not currently have access to this content.