I have been progressing through Learn Prolog Now! as self-study and am now learning about Definite Clause Grammars. I am having some difficulty with one of the Practical Session's tasks. The task reads:

The formal language a

^{n}b^{2m}c^{2m}d^{n}consists of all strings of the following form: an unbroken block ofas followed by an unbroken block ofbs followed by an unbroken block ofcs followed by an unbroken block ofds, such that theaanddblocks are exactly the same length, and thecanddblocks are also exactly the same length and furthermore consist of an even number ofcs andds respectively. For example,ε,abbccd, andaaabbbbccccdddall belong to a^{n}b^{2m}c^{2m}d^{n}. Write a DCG that generates this language.

I am able to write rules that generate a^{n}d^{n}, b^{2m}c^{2m}, and even a^{n}b^{2m} and c^{2m}d^{n}... but I can't seem to join all these rules into a^{n}b^{2m}c^{2m}d^{n}. The following are my rules that can generate a^{n}d^{n} and b^{2m}c^{2m}.

```
s1 --> [].
s1 --> a,s1,d.
a --> [a].
d --> [d].
s2 --> [].
s2 --> c,c,s2,d,d.
c --> [c].
d --> [d].
```

Is a^{n}b^{2m}c^{2m}d^{n} really a CFG, and is it possible to write a DCG using only what was taught in the lesson (no additional arguments or code, etc)? If so, can anyone offer me some guidance how I can join these so that I can solve the given task?