# Creating a deterministic finite automata

I need to create a non-empty DFA over the language {a,b,c} with the following properties:

1. First symbol is a.
2. Has an even number of b's.
3. Last symbol is a c.

I was just wondering, should I create 3 seperate automatas, and then combine them using intersections, or should I just create the one, and if that is the case, how can it has an even number of b's? I know I can alternate the states, but not sure how to do it with it all combined.

Thanks

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You should be able to do this with 3 states. –  Oli Charlesworth May 20 '12 at 13:55
@OliCharlesworth Yeah I know I have to start with a, and then when i go to a state from there, how can I make b have an even number of states, because an a,b, or c could be inserted into the automata after the first state. –  AkshaiShah May 20 '12 at 13:57
You need one state to represent "an odd number of b", and another state to represent "an even number of b". Each time you receive a b, transition from one state to the other. –  Oli Charlesworth May 20 '12 at 14:01
@OliCharlesworth Would this work? dropbox.com/s/c1kc9vl98kne0fw/IMG-20120520-00004.jpg –  AkshaiShah May 20 '12 at 14:03
I think I have misunderstood your language definition; I assumed you could only have strings of the form "abbbbbbbbbbc", but are you saying that you can also have e.g. "abbbaabc"? –  Oli Charlesworth May 20 '12 at 14:05

## 1 Answer

Here's your automaton (assuming that 0 is even and therefor 0 b's is ok):

``````[start](a) -> [1]
[start](b,c,<eoi>) -> [reject]

[1](a) -> [1]
[1](<eoi>) -> [reject]

[1](c) -> [2]
[1](b) -> [3]

[2](<eoi>) -> [accept]
[2](c) -> [2]
[2](a) -> [1]
[2](b) -> [3]

[3](<eoi>) -> [reject]
[3](a,c) -> [3]
[3](b)->[1]
``````

Where is "end-of-input".

State 1: even number of b's, the last symbol processed not c. State 2: even number of b's, the last symbol processed is c. State 3: odd number of b's.

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It is generally frowned upon to just do people's homework for them on SO... –  Oli Charlesworth May 20 '12 at 14:07
It did not say anywhere that it was homework. In any case, it was much easier just to implement it than to try explaining how it's done. I hope OP will learn from it. –  malenkiy_scot May 20 '12 at 14:10
Fair enough. But what would probably be more helpful is explaining the general procedure for arriving at such a solution. –  Oli Charlesworth May 20 '12 at 14:14
@malenkiy_scot It's not homework.. On the second line, what does this mean? (b,c,<eoi>) –  AkshaiShah May 20 '12 at 14:15
@malenkiy_scot I don't think your answer is correct, because it doesn't accept a word such as abcbc –  AkshaiShah May 20 '12 at 14:22