I have no idea what the accepted language is.
From looking at it you can get several end results:
1.) bb 2.) ab(a,b) 3.) bbab(a, b) 4.) bbaaa
How to write regular expression for a DFA
In any automata, the purpose of state is like memory element. A state stores some information in automate like ON-OFF fan switch.
Let's see what information stored in the DFA (refer my colorful figure).
State-1: is START state and information stored in it is even number of
State-4: Odd number of
Figure: a BLUE states = EVEN number of
State-5: comes after
You can write for state-5 : Yellow-b followed-by any string of a, b that is =
State-6: Just to differentiate whether odd
State-2: comes after even
State-3: comes after state-2 then first
Because in our DFA, we have three final states so language accepted by DFA is union (+ in RE) of three RL (or three RE).
I forgot to explain
English Description of Language: DFA accepts union of three languages
English Description is complex but this the only way to describe the language. You can improve it by first convert given DFA into minimized DFA then write RE and description.
Also, there is a Derivative Method to find RE from a given Transition Graph using Arden's Therm I have explained here How to write regular expression for a DFA using Arden theorem. Transition graph first has to be convert into standard form that without null-move and single start state. But I like to learn Theory of computation by analysis instead of Mathematical derivation approach.
I guess this question isn't relevant anymore :) and it's probably better to guide you through it then just stating the answer, but I think I got a basic expression that covers it (it's probably minimizable), so i'll just write it down for future searchers
The examples (1 - 4) that you give there are not the language accepted by the DFA. They are merely strings that belong to the language that the DFA accepts. Therefore, they all fall in the same language.
If you want to figure out the regular expression that defines that DFA, you will need to do something called k-path induction, and you can read up on it here.