Given

```
L1 = {w belongs to {a,b}* | has as many a as b}
```

Define a CFG G such that L(G)= L1

In my opinion these productions should be the right answer

```
1) S → aSa
2) S → bSb
3) S → ε
```

My reasoning was:

L1 contains strings like { ab,aabb,aaabbb,...etc}

Now I have a doubt: if I apply the above productions , in a nutshell:

`S → aSa`

I apply the 1) so I get `S → aSa → aaSaa`

the I choose 2) an I get `S → aSa → aaSaa → aabSbaa`

and then using the empty string I get the final string `S → aSa → aaSaa → aabSbaa → aabbaa`

Now, maybe I'm wrong but in the string `aabbaa`

the number of a is not equal to the number of b

Any help will be highly appreciated

Joachim

not matched: "abab". Therefore, the posted productionscan'tbe the right answer. Happy theoreticalstuffitizing. – user166390 Jun 25 '11 at 8:45`a`

s and`b`

s should be equal. You current solution depends on choosing the right productions but as you already noticed, this cannot be guaranteed. You have to make sure that every production generates a valid word. – Felix Kling Jun 25 '11 at 8:47