The correct steps can be determined from the start without needing a trial-error search to make the right decision. Therefore this problem is not a decision problem, to which classes such as NP apply.

This is more of a function problem. The time complexity is indeed determined by the number of steps to be output, which is 2^{n}-1, i.e. *O(2*^{n}).

The corresponding class would thus be **FEXPTIME-Complete**, the prefixed *F* standing for *Function*, and *Complete* signifying that it cannot be done in less than exponential time (like *P*). It is analogous to the EXPTIME-Complete class for decision problems, i.e. *O(2*^{polynomial(n)}).

### Decision problem

There is a confusing aspect in your question: The problem statement is about printing steps, reaffirmed by *"... determine the complexity class of this problem"*. Yet some phrases down the line, you mention *"we can't check the exponential size output in polynomial time"*. So it seems you mix two different problems:

- Generating the (correct) list of steps for a given n
- Verifying the correctness given n and a list of steps.

The second *is* a decision problem, and in that case you would say it is in the EXPTIME-Complete class.