Consider the following BNF grammer (where non-terminals are enclosed in angle-brackets and `<identifier>`

matches to any legal Java variable identifier).

```
<exp> ::= <exp> + <term>
| <exp> - <term>
| <term>
<term> ::= <term> * <factor>
| <term> / <factor>
| <factor>
<factor> ::= ( <exp> )
| <identifier>
```

Produce a derivation three for the following expression:

```
(x - a) * (y + b)
```

Staring with exp:

```
<exp>
```

replace exp with term:

```
<term>
```

replace term with:

```
<term> * <factor>
```

replace term with factor:

```
<factor> * <factor>
```

replace both factors with (exp):

```
( <exp> ) * ( <exp> )
```

replace the first exp with exp - term and the second with exp + term

```
( <exp> - <term> ) * ( <exp> + <term> )
```

replace both exp's with term, and then replace all 4 terms with factors.

```
( <factor> - <factor> ) * ( <factor> + <factor> )
```

replace all factors with identifiers

```
( <identifier> - <identifier> ) * ( <identifier> + <identifier> )
```

Does this suffice?

`<exp>`

, don't you? – Jonathan Leffler Dec 7 '10 at 23:26