Abstract/Overview
In this paper, we examine conservative autonomous dynamic vibration equation, f(x) = sech x which is time vibration of the displacement of a structure due to the internal forces, with no damping or external forcing. Numerical results using New mark method are tabulated and then represented graphically. Further the stability of the algorithms employed is also discussed
A.</div>, < (2024). Numerical solution of dynamic vibration equation, ܠሷൌ ܐ܋܍ܛ ܠ. Afribary. Retrieved from https://tracking.afribary.com/works/numerical-solution-of-dynamic-vibration-equation
A.</div>, <div>Ochieng "Numerical solution of dynamic vibration equation, ܠሷൌ ܐ܋܍ܛ ܠ" Afribary. Afribary, 04 Jun. 2024, https://tracking.afribary.com/works/numerical-solution-of-dynamic-vibration-equation. Accessed 06 Oct. 2024.
A.</div>, <div>Ochieng . "Numerical solution of dynamic vibration equation, ܠሷൌ ܐ܋܍ܛ ܠ". Afribary, Afribary, 04 Jun. 2024. Web. 06 Oct. 2024. < https://tracking.afribary.com/works/numerical-solution-of-dynamic-vibration-equation >.
A.</div>, <div>Ochieng . "Numerical solution of dynamic vibration equation, ܠሷൌ ܐ܋܍ܛ ܠ" Afribary (2024). Accessed October 06, 2024. https://tracking.afribary.com/works/numerical-solution-of-dynamic-vibration-equation