For the grammar given below,what is the equivalent CFG without null productions?

```
S->ASB/epsilon
A->Aa/epsilon
B->bB/epsilon.
```

0

For the grammar given below,what is the equivalent CFG without null productions?

```
S->ASB/epsilon
A->Aa/epsilon
B->bB/epsilon.
```

0

The rule is that if X := epsilon, we can change any production Y := rXs into Y := rXs | rs and eliminate the production X := epsilon. Let's see how that works in your case. First, we can to S.

```
S -> ASB | epsilon … becomes … S -> ASB | AB
A -> Aa | epsilon
B -> bB | epsilon
```

Now we do A:

```
S -> ASB | AB … becomes … S -> ASB | SB | AB | B
A -> Aa | epsilon … becomes … A -> Aa | a
B -> bB | epsilon
```

Now we do B:

```
S -> ASB | SB | AB | B … becomes … S -> ASB | AS | SB | AB | A | B | epsilon
A -> Aa | a
B -> bB | b
```

We can't get rid of S -> epsilon since the empty string is generated by the input grammar.

`A`

yields`a*`

. You can express`aa*`

as`A->Aa|a`

. Then you just need a mechanism to make`A`

itself optional.`A`

is specified in`S`

, so you can remove it from there in one of the productions:`S->ASB|SB|epsilon`

. – Welbog May 13 at 13:28