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TECHNICAL PAPERS

Dynamic Response Analysis of Rotor-Bearing Systems With Cracked Shaft

[+] Author and Article Information
M. A. Mohiuddin, Y. A. Khulief

KFUPM P.O. Box 1767, King Fahd University of Petroleum & Minerals, Dhahran—31261, Saudi Arabia

J. Mech. Des 124(4), 690-696 (Nov 26, 2002) (7 pages) doi:10.1115/1.1423950 History: Received October 01, 1998; Revised May 01, 2000; Online November 26, 2002
Copyright © 2002 by ASME
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References

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Figures

Grahic Jump Location
Comparisons of the deflections of the rotating shaft due to unit step force
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Step response of the rotating tapered cracked cantilever shaft using complex modal reduction
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Step response of the rotating tapered uncracked cantilever shaft
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Impulse response of the rotating tapered cracked cantilever shaft using planar modal reduction. (– Perpendicular to Force, [[dashed_line]] Direction of Force, [[dotted_line]] Complex Reduction).
Grahic Jump Location
Step response of a cracked rotating tapered simply supported shaft using planar modal reduction. (– Perpendicular to Force, [[dashed_line]] Direction of Force, [[dotted_line]] Complex Reduction).
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Torsional response of a cracked rotating simply supported shaft due to inertial coupling
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Step response of an uncracked rotating tapered simply supported shaft
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Time response of cracked rotating tapered cantilever shaft due to a force sin(3000t). (– Perpendicular to Force, [[dashed_line]] Direction of Force, [[dotted_line]]. Complex Reduction).
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The multi-stepped rotor-bearing shaft
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Step response of cracked multi-stepped system due to excitation at node 13
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Step response of cracked multi-stepped shaft at node 1 due to excitation at node 13

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