You are trying to do too much at once. Consider this state of the puzzle:

```
1 2 3 4
5 10 6 8
9 7 _ 12
13 14 11 15
```

(where `_`

is the empty space). A **permutation** (in this context) is an exchange of the empty space with a neighboring tile:

```
1 2 3 4
5 10 6 8
9 7 12 _
13 14 11 15
```

A **pattern** is a partial specification of a state, in which (in this context) some tiles may be unspecified, like this:

```
1 2 3 4
5 * * *
9 * * *
13 * * _
```

This particular pattern looks like a **target pattern**, which is to say a partial specification of the goal state. The **pattern database** of this pattern is the set of all patterns that can be obtained from this pattern by permutation, with the corresponding minimum number of moves needed to reach that state from this one. Here is another target pattern:

```
* * * *
* 6 7 8
* 10 11 12
* 14 15 _
```

Notice that these two target patterns are **disjoint** (they have no tiles in common), so their pattern databases are called **disjoint pattern databases**.

Does that help?

1)You must specify a target pattern and then construct the set of all patterns that can be obtained from the target pattern by permutation. Which part is giving you trouble?2)I have no idea; where do`(5-5-5)`

and`(6-3-2)`

come from? – Beta Apr 11 '13 at 11:46