Final answer:
To find the transfer function, take the Laplace transform of the impulse response. The transfer function is H(s) = sH(s-2) * COS(s + π/4). The order of the system is 1.
Step-by-step explanation:
The transfer function of a system can be determined by taking the Laplace transform of its impulse response. In this case, the impulse response is h(t) = t * e^(2t) * Cos(t + π/4).
To find the transfer function, we first take the Laplace transform of h(t):
L{h(t)} = L{t * e^(2t) * Cos(t + π/4)}
Using the time-shift property, we have:
L{e^(2t) * Cos(t + π/4)} = H(s-2) * COS(s + π/4)
So, the transfer function of the system is H(s) = L{h(t)} = sH(s-2) * COS(s + π/4).
The order of a system can be determined by counting the number of poles in the transfer function. In this case, the transfer function has one pole at s = 2, so the order of the system is 1.