Vibrations of a plate with an attached two degree of freedom system

In this paper the motion of a two-mass system with two degrees of freedom is discussed. The masses are connected with three springs. The motion of the system is described with a system of two coupled strong non-linear di!erential equations. For the case when the non-linearity is of a cubic type, the

In this paper, the natural frequencies and mode shapes of a Bernoulli-Euler beam with a two degree-of-freedom spring-mass system are determined by using Laplace transform with respect to the spatial variable. The deterministic and random vibration responses of the beam are obtained by using model an

Free oscillations of a non-linear system having two weakly coupled degrees of freedom in which an internal resonance may occur are treated with a modified version of the K-B-M averaging method. The method presented permits one to obtain a first approximation of the solution very easily in comparison

The free vibration of a beam with one or more elastically mounted two-degree-of-freedom systems that translate and rotate is considered in this note. The assumed-modes method is applied to formulate the equations of motion, and the natural frequencies of the system are found by solving for the roots