You're on the right track, you just need a way to deal with the difference in counts. You can do this by adding a numeric argument to your `palindromes`

grammar term.

First I'll define an ordinary Prolog rule implementing "`B`

is two more than `A`

":

```
plus2(A,B) :- number(A), !, B is A+2.
plus2(A,B) :- number(B), !, A is B-2.
plus2(A,B) :- var(A), var(B), throw(error(instantiation_error,plus2/2)).
```

Then we'll say `palindromes(Diff)`

means any palindrome on the given alphabet where the number of `b`

letters minus the number of `a`

letters is `Diff`

. For the base cases, you know `Diff`

exactly:

```
palindromes(0) --> [].
palindromes(-1) --> [a].
palindromes(1) --> [b].
```

For the recursive grammar rules, we can use a code block in `{`

braces`}`

to check the `plus2`

predicate:

```
palindromes(DiffOuter) --> [b], palindromes(DiffInner), [b],
{ plus2(DiffInner, DiffOuter) }.
palindromes(DiffOuter) --> [a], palindromes(DiffInner), [a],
{ plus2(DiffOuter, DiffInner) }.
```

To finish off, the top-level grammar rule is simply

```
please --> palindromes(1).
```

`a`

's is one less than the number of`b`

's – joneshf May 11 '13 at 22:48