Arda M.Aydogdu M.2024-06-122024-06-1220199.78304E+121013-9826https://doi.org/10.4028/www.scientific.net/KEM.799.223https://hdl.handle.net/20.500.14551/16786Conference Modern Materials and Manufacturing, MMM 2019 -- 24 April 2019 through 26 April 2019 -- -- 229609Vibration of an axially loaded viscoelastic nanobeam is analyzed in this study. Viscoelasticity of the nanobeam is modeled as a Kelvin-Voigt material. Equation of motion and boundary conditions for viscoelastic nanobeam are provided with help of Eringen's Nonlocal Elasticity Theory. Initial conditions are used in solution of governing equation of motion. Damping effect of the viscoelastic nanobeam structure is investigated. Nonlocal effect on natural frequency and damping of nanobeam and critical buckling load is obtained. © 2019 Trans Tech Publications, Switzerlanden10.4028/www.scientific.net/KEM.799.223info:eu-repo/semantics/closedAccessAxially Loaded; Initial Conditions; Nonlocal Elasticity; Viscoelastic NanobeamDamping; Elasticity; Equations Of Motion; Manufacture; Nanowires; Vibration Analysis; Axially Loaded; Critical Buckling Loads; Governing Equations; Initial Conditions; Kelvin-Voigt Material; Nano Beams; Non-Local Elasticities; Non-Local Elasticity Theories; ViscoelasticityConference Object799 KEM2232292-s2.0-85070984381Q4