Consider a linear time-invariant system whose input r(t) and output y(t) are related by the following differential equation:
\(\frac{{{d^2}y\left( t \right)}}{{d{t^2}}} + 4y\left( t \right) = 6r\left( t \right)\)
The poles of this system are at1
+2j, -2j
2
+2, -2
3
+4, -4
4
+4j, -4j