Find the response of a damped single-degree-of-freedom system with the equation of motion [m ddot{x}+c dot{x}+k x=F(t)]
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Find the response of a damped single-degree-of-freedom system with the equation of motion
\[m \ddot{x}+c \dot{x}+k x=F(t)\]
using the numerical method of Section 4.9. Assume that \(m=500 \mathrm{~kg}, c=200 \mathrm{~N}-\mathrm{s} / \mathrm{m}, k=\) \(750 \mathrm{~N} / \mathrm{m}\), and the values of the forcing function \(F(t)\) at discrete times are as indicated below:
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