you are here->home->Mechanical Engineering->Virtual Labs for Mechanical Vibrations(M)
Virtual Labs for Mechanical Vibrations(M)

Virtual Labs for Mechanical Vibrations(M)

 Free Vibration of Spring-Mass SystemTo calculate the natural frequency and damping ratio of a spring-mass system, experimentally; and compare the results with theoretical values. Free Vibration of a Cantilever Beam with a Lumped Mass at Free EndTo calculate the natural frequency and damping ratio for free vibration of a single DOF cantilever beam system, experimentally; and compare the results with theoretical values. Forced Vibration Of a Cantilever Beam with a Lumped Mass at Free EndTo calculate the natural frequency and damping ratio for forced vibration of a single DOF cantilever beam system, experimentally; and compare the results with theoretical values. Free Vibration of a Cantilever Beam (Continuous System)To calculate the natural frequencies and damping ratio for free vibration of a cantilever beam considering as a continuous system, experimentally; and compare the results with theoretical values. Forced Vibration of a Cantilever Beam (Continuous System)To calculate the natural frequencies and damping ratio for forced vibration of a cantilever beam considering as a continuous system, experimentally; and compare the results with theoretical values. Free Vibration of a Two-DOF SystemTo find the natural frequencies of a two degrees-of-freedom (DOF) system and the phase differences between the masses in the system in different modes of vibration. Free Vibration of a Viscously Damped Single DOF SystemTo analyze the free vibration response of a single DOF system at various damping conditions. Harmonicaly Excited Forced Vibration of a Single DOF SystemTo analyze the forced vibration response of a single DOF system at different damping ratio and frequency ratio. Harmonincally Excited Rotating Unbalance of a Single DOF SystemTo analyze the forced vibration response of a single DOF system with rotating unbalance at different damping ratio and frequency ratio. Harmonically Excited Support Motion of a Single DOF SystemTo analyze the response for forced vibration of a system excited by support motion at different damping ratio and frequency ratio.