In this work the effect of the application of an alternating magnetic field on the large transverse vibration of a cantilever beam with tip mass is investigated. The governing equation of motion is derived using D’Alembert’s principle, which is reduced to its nondimensional temporal form by using the generalized Galerkin method. The temporal equation of motion of the system contains nonlinearities of geometric and inertial types along with parametric excitation and nonlinear damping terms. Method of multiple scales is used to determine the instability region and frequency response curves of the system. The influences of the damping, tip mass, amplitude of magnetic field strength, permeability, and conductivity of the beam material on the frequency response curves are investigated. These perturbation results are found to be in good agreement with those obtained by numerically solving the temporal equation of motion and experimental results. This work will find extensive applications for controlling vibration in flexible structures using a magnetic field.

1.
Dwivedy
,
S. K.
, and
Eberhard
,
P.
, 2006, “
Dynamic Analysis of Flexible Manipulators
,”
Mech. Mach. Theory
0094-114X,
41
, pp.
749
777
.
2.
Moon
,
F. C.
, and
Pao
,
Y. H.
, 1969, “
Vibration and Dynamic Instability of a Beam-Plate in a Transverse Magnetic Field
,”
ASME J. Appl. Mech.
,
36
, pp.
92
100
. 0021-8936
3.
Wu
,
G. Y.
,
Tsai
,
R.
, and
Shih
,
Y. S.
, 2000, “
The Analysis of Dynamic Stability and Vibration Motions of a Cantilever Beam With Axial Loads and Transverse Magnetic Fields
,”
Journal of the Acoustical Society of Republic of China
,
4
, pp.
40
55
.
4.
Chen
,
C. C.
, and
Yah
,
M. K.
, 2001, “
Parametric Instability of a Beam Under Electromagnetic Excitation
,”
J. Sound Vib.
,
240
, pp.
747
764
. 0022-460X
5.
Wu
,
G. Y.
, 2005, “
The Analysis of Dynamic Instability and Vibration Motions of a Pinned Beam With Transverse Magnetic Fields and Thermal Loads
,”
J. Sound Vib.
,
284
, pp.
343
360
. 0022-460X
6.
Wu
,
G. Y.
, 2007, “
The Analysis of Dynamic Instability on the Large Amplitude Vibrations of a Beam With Transverse Magnetic Fields and Thermal Loads
,”
J. Sound Vib.
,
302
, pp.
167
177
. 0022-460X
7.
Pratiher
,
B.
, and
Dwivedy
,
S. K.
, 2007, “
Parametric Instability of a Cantilever Beam With Magnetic Field and Periodic Axial Load
,”
J. Sound Vib.
,
305
, pp.
904
917
. 0022-460X
8.
Kojima
,
H.
, and
Nagaya
,
K.
, 1985, “
Nonlinear Forced Vibration of a Beam With a Mass Subjected to Alternating Electromagnetic Force
,”
Bull. JSME
0021-3764,
28
, pp.
468
474
.
9.
Lu
,
Q. S.
,
To
,
C. W. S.
, and
Huang
,
K. L.
, 1995, “
Dynamic Stability and Bifurcation of an Alternating Load and Magnetic Field Excited Magneto-Elastic Beam
,”
J. Sound Vib.
,
181
, pp.
873
891
. 0022-460X
10.
Shih
,
Y. S.
,
Wu
,
G. Y.
, and
Chen
,
J. S.
, 1998, “
Transient Vibrations of a Simply Supported Beam With Axial Loads and Transverse Magnetic Fields
,”
Mech. Struct. Mach.
0890-5452,
26
, pp.
115
130
.
11.
Liu
,
M. F.
, and
Chang
,
T. P.
, 2005, “
Vibration Analysis of a Magneto-Elastic Beam With General Boundary Conditions Subjected to Axial Load and External Force
,”
J. Sound Vib.
,
288
, pp.
399
411
. 0022-460X
12.
Nayfeh
,
A. H.
, and
Mook
,
D. T.
, 1995,
Nonlinear Oscillations
,
Wiley
,
New York
.
13.
Cartmell
,
M. P.
, 1990,
Introduction to Linear, Parametric and Nonlinear Vibrations
,
Chapman and Hall
,
London
.
14.
Szemplin'ska-Stupnicka
,
W.
, 1990,
The Behaviour of Non-Linear Vibrating Systems
, Kluwer, London, Vols.
1–2
.
15.
Nayfeh
,
A. H.
, and
Balachandran
,
B.
, 1995,
Applied Nonlinear Dynamics: Analytical, Computational and Experimental Methods
,
Wiley
,
Canada
.
16.
Zavodney
,
L. D.
, and
Nayfeh
,
A. H.
, 1989, “
The Non-Linear Response of a Slender Beam Carrying a Lumped Mass to a Principal Parametric Excitation: Theory and Experiment
,”
Int. J. Non-linear Mech.
,
24
, pp.
105
125
. 0020-7462
17.
Cuvalci
,
O.
, 2000, “
The Effect of Detuning Parameters on the Absorption Region for a Coupled System: A Numerical and Experimental Study
,”
J. Sound Vib.
,
229
, pp.
837
857
. 0022-460X
You do not currently have access to this content.