`next_permutation`

will step through **all** permutations, not only through *greater* permutations. No need to revert and use `prev_permutation`

, and certainly no need to sort.

You only need take care of the fact that `next_permutation`

will return `false`

once it “rolls over” into the lexicographically lowest permutation so you need to keep track of the number of the current permutation to know when to stop.

That is, the following will iterate through all possible permutations of a range, no matter how the starting range looks like.

```
size_t const num_permutations = multinomial_coefficient(range);
for (size_t i = 0; i < num_permutations; ++i) {
next_permutation(range.begin(), range.end());
// use permutation.
}
```

Where `multinomial_coefficient`

is the multinomial coefficient of the number of distinct elements in the range. In the simple case where all elements are distinct, this is equivalent to *N*!, the factorial of the number of elements.