JAKŠIĆ, Nikola ;BOLTEŽAR, Miha . Viscously Damped Transverse Vibrations of an Axially-Moving String. Strojniški vestnik - Journal of Mechanical Engineering, [S.l.], v. 51, n.9, p. 560-569, august 2017. ISSN 0039-2480. Available at: <https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/>. Date accessed: 21 nov. 2024. doi:http://dx.doi.org/.
Jakšić, N., & Boltežar, M. (2005). Viscously Damped Transverse Vibrations of an Axially-Moving String. Strojniški vestnik - Journal of Mechanical Engineering, 51(9), 560-569. doi:http://dx.doi.org/
@article{., author = {Nikola Jakšić and Miha Boltežar}, title = {Viscously Damped Transverse Vibrations of an Axially-Moving String}, journal = {Strojniški vestnik - Journal of Mechanical Engineering}, volume = {51}, number = {9}, year = {2005}, keywords = {partial differential equations; hyperbolic equations; free damped vibrations; moving string systems; }, abstract = {In this paper the linear viscous-damping mechanism acting on an axially-moving string is analyzed. The analyzed damping model is in the form. The equation of motion, i.e., the linear partial differential equation, of the free, transverse vibrations of the strings span is solved first. Then the influence of the coefficients b1 and b2 on the natural frequencies and the free responses is studied. It was found that the values of the coefficients should be carefully selected in order to avoid physically unrealistic responses.}, issn = {0039-2480}, pages = {560-569}, doi = {}, url = {https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/} }
Jakšić, N.,Boltežar, M. 2005 August 51. Viscously Damped Transverse Vibrations of an Axially-Moving String. Strojniški vestnik - Journal of Mechanical Engineering. [Online] 51:9
%A Jakšić, Nikola %A Boltežar, Miha %D 2005 %T Viscously Damped Transverse Vibrations of an Axially-Moving String %B 2005 %9 partial differential equations; hyperbolic equations; free damped vibrations; moving string systems; %! Viscously Damped Transverse Vibrations of an Axially-Moving String %K partial differential equations; hyperbolic equations; free damped vibrations; moving string systems; %X In this paper the linear viscous-damping mechanism acting on an axially-moving string is analyzed. The analyzed damping model is in the form. The equation of motion, i.e., the linear partial differential equation, of the free, transverse vibrations of the strings span is solved first. Then the influence of the coefficients b1 and b2 on the natural frequencies and the free responses is studied. It was found that the values of the coefficients should be carefully selected in order to avoid physically unrealistic responses. %U https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/ %0 Journal Article %R %& 560 %P 10 %J Strojniški vestnik - Journal of Mechanical Engineering %V 51 %N 9 %@ 0039-2480 %8 2017-08-18 %7 2017-08-18
Jakšić, Nikola, & Miha Boltežar. "Viscously Damped Transverse Vibrations of an Axially-Moving String." Strojniški vestnik - Journal of Mechanical Engineering [Online], 51.9 (2005): 560-569. Web. 21 Nov. 2024
TY - JOUR AU - Jakšić, Nikola AU - Boltežar, Miha PY - 2005 TI - Viscously Damped Transverse Vibrations of an Axially-Moving String JF - Strojniški vestnik - Journal of Mechanical Engineering DO - KW - partial differential equations; hyperbolic equations; free damped vibrations; moving string systems; N2 - In this paper the linear viscous-damping mechanism acting on an axially-moving string is analyzed. The analyzed damping model is in the form. The equation of motion, i.e., the linear partial differential equation, of the free, transverse vibrations of the strings span is solved first. Then the influence of the coefficients b1 and b2 on the natural frequencies and the free responses is studied. It was found that the values of the coefficients should be carefully selected in order to avoid physically unrealistic responses. UR - https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/
@article{{}{.}, author = {Jakšić, N., Boltežar, M.}, title = {Viscously Damped Transverse Vibrations of an Axially-Moving String}, journal = {Strojniški vestnik - Journal of Mechanical Engineering}, volume = {51}, number = {9}, year = {2005}, doi = {}, url = {https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/} }
TY - JOUR AU - Jakšić, Nikola AU - Boltežar, Miha PY - 2017/08/18 TI - Viscously Damped Transverse Vibrations of an Axially-Moving String JF - Strojniški vestnik - Journal of Mechanical Engineering; Vol 51, No 9 (2005): Strojniški vestnik - Journal of Mechanical Engineering DO - KW - partial differential equations, hyperbolic equations, free damped vibrations, moving string systems, N2 - In this paper the linear viscous-damping mechanism acting on an axially-moving string is analyzed. The analyzed damping model is in the form. The equation of motion, i.e., the linear partial differential equation, of the free, transverse vibrations of the strings span is solved first. Then the influence of the coefficients b1 and b2 on the natural frequencies and the free responses is studied. It was found that the values of the coefficients should be carefully selected in order to avoid physically unrealistic responses. UR - https://www.sv-jme.eu/article/viscously-damped-transverse-vibrations-of-an-axially-moving-string/
Jakšić, Nikola, AND Boltežar, Miha. "Viscously Damped Transverse Vibrations of an Axially-Moving String" Strojniški vestnik - Journal of Mechanical Engineering [Online], Volume 51 Number 9 (18 August 2017)
Strojniški vestnik - Journal of Mechanical Engineering 51(2005)9, 560-569
© The Authors, CC-BY 4.0 Int. Change in copyright policy from 2022, Jan 1st.
In this paper the linear viscous-damping mechanism acting on an axially-moving string is analyzed. The analyzed damping model is in the form. The equation of motion, i.e., the linear partial differential equation, of the free, transverse vibrations of the strings span is solved first. Then the influence of the coefficients b1 and b2 on the natural frequencies and the free responses is studied. It was found that the values of the coefficients should be carefully selected in order to avoid physically unrealistic responses.