# Answer For a SQL Quiz

My friend asked me a question which I've struggled to find an answer for. I know how it could be answered using Cursors but he said that it must be answered in the form of a `SELECT` statement. I was able to obtain a partially correct answer using `JOIN`s but wondering if anyone knows the correct way of answering this.

Given table `segments` with the following structure:

``````create table segments (
l integer not null,
r integer not null,
check(l <= r),
unique(l,r) );
``````

Write a SQL query returing the total length of segments represented in table `segments`. Please note that length overlapped by several segments should be counted only once.

For example for:

``````l | r
-----
1 | 5
2 | 3
4 | 6
8 | 11
``````

Your query should return 8 because 6 (end bound of one segment) - 1 (beginning bound of the segment) is 5 and 11 - 8 is 3. Add them together for the total length of 8.

-
Probably using a recursive CTE or an auxiliary numbers table. Is there a maximum bound to the segment dimensions? –  Martin Smith Nov 3 '11 at 0:53
I updated your example to reflect and clarify my understanding of the puzzle. Please confirm that this is accurate. –  Joel Coehoorn Nov 3 '11 at 0:54
Hi Joel your understanding is correct –  n00b Nov 3 '11 at 1:57

There are several steps to the answer:

1. Join the table to itself, so that each record can be matched to the others for overlapping segments. The result of this should be an expression that indicates the smaller l and larger r value of the overlapped segment.
2. A recursive CTE will allow you to continue this operation until all overlapping segments (and not immediate neighbors) are linked together.
3. select from the recursive CTE and group by l and r to get a unique record for each segment, rather than the same unified segment repeated for each smaller component from the original table that contributed to it.
4. select Sum(r-l) to get the final length of all segments

I'll leave the actual code to the reader, since this is meant to be a puzzle. I will add that the real trick here is the base case for step two, such that function doesn't recurse forever (that's the hard part for recursive CTE's anyway).

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Hi Joel, I figured a way of doing without recursive CTE (Couldn't figure out how to work it with a recursive CTE). Would you be kind enough to show me the solution using recursive CTE and how would it compare in terms of performance to the solution I've implemented below? (Will post my answer till 2 hours later when SO allows me to) Thanks –  n00b Nov 3 '11 at 6:17
@n00b - I did a recursive CTE answer and didn't bother posting it. When you post yours I'll post mine! –  Martin Smith Nov 3 '11 at 11:16

My solution that uses a temporary table but not a recursion

``````WITH JoinedSegments (l, r)
AS
(
SELECT A.L, MAX(B.R) AS R
FROM Segments A INNER JOIN Segments B ON (A.R > B.L AND A.L <= B.L AND A.R <= B.R)
GROUP BY A.L
)

SELECT SUM(r-l) as distance
FROM    (SELECT 0 as ID, * FROM JoinedSegments
EXCEPT
SELECT 0 as ID,A.*
FROM JoinedSegments A INNER JOIN JoinedSegments B ON ((A.L = B.L AND A.R < B.R) OR (A.L > B.L AND A.R = B.R) OR (A.L > B.L AND A.R < B.R))) AS A
GROUP BY ID
``````
-
I've added my recursive CTE answer now. Quassnoi's one will be faster as it uses a single scan of the data but relies on an undocumented aspect of variable assignment. –  Martin Smith Nov 4 '11 at 11:43

A recursive CTE method

``````WITH data(l,r) AS
(
SELECT 1,5 UNION ALL
SELECT 2,3 UNION ALL
SELECT 4,6 UNION ALL
SELECT 8,11
),RecursiveCTE
AS      (
SELECT TOP 1 l, r, 1 AS grp
FROM data
ORDER BY l
UNION   ALL
SELECT  R.l, R.r, R.grp
FROM    (
SELECT  T.*,
CASE WHEN T.l > R.r + 1 THEN grp +1 ELSE grp END AS grp,
rn = ROW_NUMBER() OVER (ORDER BY T.l)
FROM    data T
JOIN    RecursiveCTE R
ON  R.l < T.l
) R
WHERE   R.rn = 1
),
Grouped As
(
SELECT  MAX(r) - MIN(l) AS SegmentLength
FROM    RecursiveCTE
GROUP BY grp
)
SELECT SUM(SegmentLength)
FROM Grouped
OPTION  (MAXRECURSION 0);
``````
-

A solution without recursive `CTE` or cursors:

``````DECLARE @maxr INT = 0;
DECLARE @len INT = 0;
WITH    data AS
(
SELECT  *
FROM    (
VALUES
(1, 5),
(2, 3),
(4, 6),
(8, 11)
) q (l, r)
)
SELECT  @len = @len +
CASE
WHEN r -
CASE
WHEN l < @maxr THEN
@maxr
ELSE
l
END > 0 THEN
r -
CASE
WHEN l < @maxr THEN
@maxr
ELSE
l
END
ELSE
0
END,
@maxr = CASE WHEN r > @maxr THEN r ELSE @maxr END
FROM    data
ORDER BY
l

SELECT  @len
``````

Someone please tell Microsoft to implement `LEAST` and `GREATEST`.

-
wow interesting solution Quassnoi. So the maxr will be updated as each row is selected from table 'data'? I never knew you could do something like that! –  n00b Nov 4 '11 at 6:01

I have got another solution using pure ANSI (ofcourse it is slower than Quassnoi's one):

``````select
( -- all segments without totally inside another
select sum(s1.r-s1.l) from segments s1
where not exists (
select * from segments s2
where (s2.l <> s1.l or s2.r <> s1.r)
and s2.l <= s1.l and s2.r >= s1.r
)
)
-
( -- common part of segments
select sum(s1.r-s2.l)
from segments s1
join segments s2
where s2.l <> s1.l and s2.r <> s1.r
and s2.l < s1.r and s2.r > s1.r
and not exists (
select * from segments s3
where (s3.l <> s1.l or s3.r <> s1.r)
and s3.l <= s1.l and s3.r >= s1.r
)
)
;
``````
-