Mass-spring-damper model

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The mass-spring-damper model consists of discrete mass nodes distributed throughout an object and interconnected via a network of springs and dampers. This model is well-suited for modelling object with complex material properties such as nonlinearity and viscoelasticity. Packages such as MATLAB may be used to run simulations of such models.^[1] As well as engineering simulation, these systems have applications in computer graphics and computer animation.^[2]

Deriving the equations of motion for this model is usually done by summing the forces on the mass (including any applied external forces ${\displaystyle F_{\text{external}})}$:

${\displaystyle \mathrm{\Sigma }F=-kx-c\dot{x}+F_{\text{external}}=m\ddot{x}}$

By rearranging this equation, we can derive the standard form:

${\displaystyle \ddot{x}+2\zeta {\omega }_n\dot{x}+{\omega }_n^{2}x=u}$ where ${\displaystyle {\omega }_n=\sqrt{\frac{k}{m}};\zeta =\frac{c}{2m{\omega }_n};u=\frac{F_{\text{external}}}{m}}$

${\displaystyle {\omega }_n}$ is the undamped natural frequency and ${\displaystyle \zeta }$ is the damping ratio. The homogeneous equation for the mass spring system is:

${\displaystyle \ddot{x}+2\zeta {\omega }_n\dot{x}+{\omega }_n^{2}x=0}$

This has the solution:

${\displaystyle x=A{e}^{-{\omega }_{n}t(\zeta +\sqrt{{\zeta }^2-1})}+B{e}^{-{\omega }_{n}t(\zeta -\sqrt{{\zeta }^2-1})}}$

If ${\displaystyle \zeta <1}$ then ${\displaystyle {\zeta }^2-1}$ is negative, meaning the square root will be imaginary and therefore the solution will have an oscillatory component.^[3]

• Numerical methods
• Soft body dynamics#Spring/mass models
• Finite element analysis

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