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contributor authorR. M. Rosenberg
date accessioned2017-05-08T23:02:15Z
date available2017-05-08T23:02:15Z
date copyrightJune, 1960
date issued1960
identifier issn0021-8936
identifier otherJAMCAV-25541#263_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/89501
description abstractA system consisting of two unequal masses, interconnected by a coupling spring, and each connected to an anchor spring, is examined. The springs may all be unequal and nonlinear, but each resists being compressed to the same degree as being stretched. The concept of normal modes is rigorously defined, and methods of finding them are given. A knowledge of these modes reduces the coupled system to two uncoupled ones which can always be integrated in quadrature. There exists an infinity of systems, of which the linear is one, which can be integrated in closed form. This approach yields, even for the linear system, new results of great simplicity.
publisherThe American Society of Mechanical Engineers (ASME)
titleNormal Modes of Nonlinear Dual-Mode Systems
typeJournal Paper
journal volume27
journal issue2
journal titleJournal of Applied Mechanics
identifier doi10.1115/1.3643948
journal fristpage263
journal lastpage268
identifier eissn1528-9036
keywordsLinear systems AND Springs
treeJournal of Applied Mechanics:;1960:;volume( 027 ):;issue: 002
contenttypeFulltext


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