TY - JOUR
T1 - Flapwise bending vibration analysis of a rotating double-tapered Timoshenko beam
AU - Ozdemir Ozgumus, O.
AU - Kaya, M. O.
PY - 2008/5
Y1 - 2008/5
N2 - In this study, free vibration analysis of a rotating, double-tapered Timoshenko beam that undergoes flapwise bending vibration is performed. At the beginning of the study, the kinetic- and potential energy expressions of this beam model are derived using several explanatory tables and figures. In the following section, Hamilton's principle is applied to the derived energy expressions to obtain the governing differential equations of motion and the boundary conditions. The parameters for the hub radius, rotational speed, shear deformation, slenderness ratio, and taper ratios are incorporated into the equations of motion. In the solution, an efficient mathematical technique, called the differential transform method (DTM), is used to solve the governing differential equations of motion. Using the computer package Mathematica the effects of the incorporated parameters on the natural frequencies are investigated and the results are tabulated in several tables and graphics.
AB - In this study, free vibration analysis of a rotating, double-tapered Timoshenko beam that undergoes flapwise bending vibration is performed. At the beginning of the study, the kinetic- and potential energy expressions of this beam model are derived using several explanatory tables and figures. In the following section, Hamilton's principle is applied to the derived energy expressions to obtain the governing differential equations of motion and the boundary conditions. The parameters for the hub radius, rotational speed, shear deformation, slenderness ratio, and taper ratios are incorporated into the equations of motion. In the solution, an efficient mathematical technique, called the differential transform method (DTM), is used to solve the governing differential equations of motion. Using the computer package Mathematica the effects of the incorporated parameters on the natural frequencies are investigated and the results are tabulated in several tables and graphics.
KW - Differential transform method
KW - Differential transformation
KW - Nonuniform Timoshenko beam
KW - Rotating Timoshenko beam
KW - Tapered Timoshenko beam
UR - http://www.scopus.com/inward/record.url?scp=43449110163&partnerID=8YFLogxK
U2 - 10.1007/s00419-007-0158-5
DO - 10.1007/s00419-007-0158-5
M3 - Article
AN - SCOPUS:43449110163
SN - 0939-1533
VL - 78
SP - 379
EP - 392
JO - Archive of Applied Mechanics
JF - Archive of Applied Mechanics
IS - 5
ER -