08 masa resorte amortiguador entrada impulso

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We describe the mathematical/dynamical model of the mechanical system mass-spring-damper using an ordinary differential equation. The analytic response of the position is obtained using the Laplace transform when the input is an impulse. This mechanism is an excellent physical example of an ordinary differential equation of second order. This configuration allows us different behaviors (damping, over-damping, under-damping) depending on the parameter values. • Related videos • 02 sistema masa resorte sin fricción / ley de Hooke •    • 02 sistema masa resorte sin fricción   • 04 animación masa-resorte •    • 04 animación de un sistema masa - res...   • Blog: http://uabc-msd.blogspot.mx • Twitter:   / s3preguntas   • Facebook:   / dr.ricardo.cuesta  

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