Este exemplo de verificação é baseado no exemplo de verificação 0122. A single-mass system without damping is subjected to an axial loading force. An ideal elastic-plastic material with characteristics is assumed. Determine the time course of the end-point deflection, velocity, and acceleration.
Um sistema de massa singular com folga e duas molas é desviado primeiro. Determine the natural oscillations of the system - deflection, velocity, and acceleration time course.
A single mass system is subjected to loading force. Determine a flecha do sistema.
É definida uma viga em consola com uma secção de viga em I de comprimento L. The beam has five mass points with masses m acting in the X-direction. The self-weight is neglected. The frequencies, mode shapes, and equivalent loads of this 5-DOF system are analytically calculated and compared with the results from RSTAB and RFEM.
A estrutura de pórticos de dois pisos está sujeita a cargas sísmicas. The modulus of elasticity and cross‑section of the frame beams are much larger than those of the columns, so the beams can be considered rigid. The elastic response spectrum is given by the standard SIA 261/1:2003. Neglecting self-weight and assuming the lumped masses are at the floor levels, determine the natural frequencies of the structure. For each frequency obtained, specify the standardized displacements of the floors as well as equivalent forces generated using the elastic response spectrum according to the standard SIA 261/1.2003.
Este exemplo serve para ilustrar o plano. The application is shown on a two-story structure. The structure is loaded by means of lateral forces according to Figure 1. Determine the maximum deflection of the structure ux in the direction of the loading forces using both the diaphragm constraint and the plate model of the floor.
Um sistema de duas massas é constituído por dois eixos e duas massas que são representados pelos momentos de inércia correspondentes e estão concentrados a uma dada distância como massas nodais. The left shaft is fixed, and the right mass is free. Neglecting the self‑weight of the shafts, determine the torsional natural frequencies of the system.
Um oscilador de massa duplo é constituído por duas molas lineares e massas concentradas nos nós. The self-weight of the springs is neglected. Determine the natural frequencies of the system.