Consider the second-order underdamped system of Problem 9.5. Identify the system using "deconvolution" process for the same value of \(m, T\) and similar input in NOBPF and OBPF approaches. Compared to direct expansions in respective domains, compute percentage error for each segment and make your observation with respect to oscillation in the result.

Data From Problem 9.5

Consider an underdamped system having a transfer function \(G(s)=\) \(\left(s^{2}+2 s+2ight)^{-1}\). Find its output \(c(t)\) in BPF domain as well as in NOBPF domain, for a step input \(u(t)\) using the convolution matrix. Consider \(m=4\) and \(T=1 \mathrm{~s}\). Determine the percentage errors of different coefficients. Finally, compare the two results of the output and discuss.