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I'm trying to solve this problem using Deterministic Finite Automata :

inputs:     {a,b}
a. must have exactly 2 a  
b. have more than 2 b

so a correct input should be like this abbba or bbbaa or babab

now my question is, "is there a pattern to solve this things?"

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Start by drawing out the states that the automata may be in. Ex: If your machine finds a single 'a', what valid transitions may it make from that state? Then from each of those, keep following transitions until you have covered all cases. –  Fiarr Apr 30 '13 at 2:30
I'm having a hard time solving 2 conditions –  newbie Apr 30 '13 at 3:52
You're really looking for more of an algorithm than a pattern. –  RBarryYoung Apr 30 '13 at 6:42
@RBarryYoung can you suggest one? –  newbie Apr 30 '13 at 12:22
@newbie I like Csaba Toth's answer. –  RBarryYoung Apr 30 '13 at 12:48

2 Answers 2

up vote 2 down vote accepted

Yes there is a pattern. You can take each statement and deduct pre-states from them. Then you take the cross-product of those pre-states, which will comprise the final states. In this example:

a. will yield states: 0a, 1a, 2a, 2+a (you've seen 0 a, 1 a, 2 as or more than 2 as) b. will yield states: 0b, 1b, 2b, 2+b (you've seen 0 b, 1 b, 2 bs or more than 2 bs)

The cross product of these states result in 4x4=16 states. You'll start from {0a,0b} states. The inputs can be 3 types: a, b or something else. From that you should be able to go. Do you need more help?

(Are we solving homework?)

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sorry i don't quite get you, in the letter a. u gave 4 states which is 0a, 1a, 2a, 2+a (if i'm not mistaken) why did you give 4 states if the only need a's to be accepted is just 2? does 3 states will not do the trick? and how do i combine these two machine? (again if i'm not mistaken because it looks like 2 machine to me, machine a and b) –  newbie Apr 30 '13 at 12:16
@newbie the 2+a state means "greater than two" which you need to know because that means that the string is not a match. –  RBarryYoung Apr 30 '13 at 12:50
Terminology check: as I noted above, what's being discussed in this thread is really algorithms and not patterns. –  RBarryYoung Apr 30 '13 at 13:06
@Csaba Toth how did you come up with 4 state with the first machine? –  newbie Apr 30 '13 at 13:18
@newbie: yes, because if you get more than 2 "a"s, then you wont' meet the criteria, and you should be able to track that fact. –  Csaba Toth Apr 30 '13 at 15:19

Always draw such things first.

Feel free to give states any meanings. What you need here is states like: q2: (1 b, 2 a's). Draw states like this, until the accept state and connect them with lines. The accept state is qx: 2 a's 3 b's.

After reaching the accept state, if input is "b" that line goes to itself, the accept state. If the input is "a", draw a new state, that will get into an endless loop and goes into itself no matter what the input is.

(are we helping for an exam here?)

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the accepted is 2a's and 3 b's –  newbie Apr 30 '13 at 12:20
edited, but does it matter too much? you only should add one more state. if you want i can draw and paste it, but you didn't ask for the exact solution. you asked for pattern to solve these things. –  Ismet Alkan Apr 30 '13 at 12:31
actually i make that up problem , it's just similar to what my professor gave me, and also i want to solve it my self but i'm really having a hard time when with conditions with and and or can you tell how do you solve this kind of problem? –  newbie Apr 30 '13 at 13:17
or's generally have multiple accept states. each or'ed statement should have an accept statement of itself. and's has one accept state which conforms all of the statements. –  Ismet Alkan Apr 30 '13 at 13:48
got it. anymore advice how to solve those thing? –  newbie Apr 30 '13 at 14:11

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