![Lubricants | Free Full-Text | Discussion of Stick-Slip Dynamics of 2DOF Sliding Systems Based on Dynamic Vibration Absorbers Analysis Lubricants | Free Full-Text | Discussion of Stick-Slip Dynamics of 2DOF Sliding Systems Based on Dynamic Vibration Absorbers Analysis](https://www.mdpi.com/lubricants/lubricants-10-00113/article_deploy/html/images/lubricants-10-00113-g001-550.jpg)
Lubricants | Free Full-Text | Discussion of Stick-Slip Dynamics of 2DOF Sliding Systems Based on Dynamic Vibration Absorbers Analysis
![homework and exercises - Determining the equations of motion for a 2 DOF in 2 directions - Physics Stack Exchange homework and exercises - Determining the equations of motion for a 2 DOF in 2 directions - Physics Stack Exchange](https://i.stack.imgur.com/5iV4d.jpg)
homework and exercises - Determining the equations of motion for a 2 DOF in 2 directions - Physics Stack Exchange
![Mass-spring model of a 2-DOF system consisting of two coupled resonators. | Download Scientific Diagram Mass-spring model of a 2-DOF system consisting of two coupled resonators. | Download Scientific Diagram](https://www.researchgate.net/publication/303598579/figure/fig1/AS:416829198618624@1476391233548/Mass-spring-model-of-a-2-DOF-system-consisting-of-two-coupled-resonators.png)
Mass-spring model of a 2-DOF system consisting of two coupled resonators. | Download Scientific Diagram
![a) 2-DOF control scheme (b) realization of 2-DOF structure (c) 1-DOF... | Download Scientific Diagram a) 2-DOF control scheme (b) realization of 2-DOF structure (c) 1-DOF... | Download Scientific Diagram](https://www.researchgate.net/publication/323247592/figure/fig3/AS:728689583067138@1550744543651/a-2-DOF-control-scheme-b-realization-of-2-DOF-structure-c-1-DOF-control-scheme.png)
a) 2-DOF control scheme (b) realization of 2-DOF structure (c) 1-DOF... | Download Scientific Diagram
![SOLVED: Obtain the natural frequencies and mode shapes of the 2-DOF system shown in Fig 2. The equations of motion for free vibration are: m11 + 2k1u1 - k2u2 = 0 m22u2 - SOLVED: Obtain the natural frequencies and mode shapes of the 2-DOF system shown in Fig 2. The equations of motion for free vibration are: m11 + 2k1u1 - k2u2 = 0 m22u2 -](https://cdn.numerade.com/ask_images/c00ea9077dd94ff2a49620537f14cbda.jpg)