From the root locus, the dominant closed loop pole will be the real pole between \$\small s=-2\$ and \$\small s=-3\$, since it's approximately three times further from the origin than the 2nd order complex poles.

Now, there's also a closed loop zero at \$\small s=-3\$, so you have a closed pole and a closed loop zero quite close together. In control engineering, this is called a dipole. (Note, a dipole is often created when attempting to cancel a troublesome pole by plonking a zero on top of it - in practice, there's always an error between the pole and zero values, hence a dipole is born).

The features of a dipole in the transient response are: a relatively large initial overshoot, and a long-tail (the settling time is longer than that promised by the initial response characteristic) . Both of these are apparent in your step response plot.