I am trying to find the best way to solve the following problem. By best way I mean less complex.

As an input a list of tuples (start,length) such:

```
[(0,5),(0,1),(1,9),(5,5),(5,7),(10,1)]
```

Each element represets a sequence by its *start* and *length*, for example (5,7) is equivalent to the sequence `(5,6,7,8,9,10,11)`

- a list of 7 elements starting with 5. One can assume that the tuples are sorted by the `start`

element.

The output should return a non-overlapping combination of tuples that represent the longest continuous sequences(s). This means that, a solution is a subset of ranges with no overlaps and no gaps and is the longest possible - there could be more than one though.

For example for the given input the solution is:

`[(0,5),(5,7)]`

equivalent to `(0,1,2,3,4,5,6,7,8,9,10,11)`

is it backtracking the best approach to solve this problem ?

I'm interested in any different approaches that people could suggest.

Also if anyone knows a formal reference of this problem or another one that is similar I'd like to get references.

BTW - this is not homework.

**Edit**

Just to avoid some mistakes this is another example of expected behaviour

for an input like `[(0,1),(1,7),(3,20),(8,5)]`

the right answer is `[(3,20)]`

equivalent to (3,4,5,..,22) with length 20. Some of the answers received would give `[(0,1),(1,7),(8,5)]`

equivalent to (0,1,2,...,11,12) as right answer. But this last answer is not correct because is shorter than `[(3,20)]`

.

doesmeancontinuous2more comments