First of all, observe that if a sentence has 5 times as many characters as the other, it'll always look something like `aaabaabaaaaa`

. So one sentence can be `aaaaab`

or `aaabaa`

. Another observation is that whenever we add a `b`

, we must add five `a`

characters.

The following grammar indeed has five times as many `a`

characters as `b`

characters:

```
S = AS | λ
A = Baaaaa | aBaaaa | aaBaaa | aaaBaa | aaaaBa | aaaaaB
B = bS | Sb
```

We start with `S`

which can either by empty (which satisfies the requirement) or `A`

.

The rule for `A`

produces at least 5 `a`

characters and a `B`

. Now for `B`

, we can either place `b`

and stop there (by choosing the empty string for `S`

) or by starting again (by choosing `A`

for `S`

). This guarantees that we're always placing 5 times as many `a`

characters as `b`

characters.

Lastly, this grammar can easily be generalized to a grammar than needs to contain `n`

times as many characters of one as the other (by straightforwardly extending rule `A`

).