# SQL Distance Query without Trigonometry

I have an SQLite database, which does not support trig functions. I would like to sort a set of lat,lng pairs in my table by distance as compared to a second lat,lng pair. I'm familiar with the standard haversine distance formula for sorting lat,lng pairs by distance.

In this case I don't care particularly for precision, my points are separated by large distances, so I don't mind rounding off the distances by treating curves as straight lines.

My question, is there a generally accepted formula for this kind of query? Remember no trig functions!

• Could you get the distances of lat and long separately (absolute values), then apply pythag (no trig there) to get a number representing the length of the distance between the points. Ignore me if this is rubbish - don't know much about geo, but it struck me that you could treat everything as triangles. – Jon Egerton Jul 1 '11 at 14:05

If your points are within reasonable distance of each other (i.e. not across half the world, and not across the date line), you can make a correction for the difference between latitude and longitude (as a longitude degree is shorter, except at the Equator), and then just calculate the distance as if the earth was flat.

As you just want to sort the values, you don't even have to use the square root, you can just add the squares of the differences.

Example, where `@lat` and `@lng` is your current position, and `2` is the difference correction:

``````select *
from Points
order by (lat - @lat) * (lat - @lat) + ((lng - @lng) * 2) * ((lng - @lng) * 2)
``````

You can calculate the difference correction for a specific latitude as `1 / cos(lat)`.

Cees Timmerman came up with this formula which also works across the date line:

``````pow(lat-lat2, 2) + pow(2 * min(abs(lon-lon2), 360 - abs(lon-lon2)), 2)
``````
• Thanks this is what I had in mind, its up and running now :) – Ben Holland Jul 1 '11 at 15:36
• @downvoter: Why the downvote? If you don't explain what you think is wrong, it can't improve the answer. – Guffa Jul 1 '11 at 17:49
• I don't understand why there was a downvote on this answer either. Please explain. – Ben Holland Jul 3 '11 at 15:21
• `pow(lat - @lat, 2) + pow(2 * (lon - @lon), 2)` is shorter and different from a language var, but what is the final query that corrects for the latitude? Does this have possible Russia-Alaska issues? – Cees Timmerman Mar 29 '12 at 9:17
• As long as you don't cross the poles, `pow(lat - lat2, 2) + pow(2 * min(abs(lon - lon2), abs((180 - abs(lon)) + (180 - abs(lon2)))), 2)` should do. (14400.0 from Sterling to Russia.) – Cees Timmerman Apr 1 '12 at 7:48

If you want proper spatial data in your model then use SpatiaLite, a spatially-enabled version of SQLite:

http://www.gaia-gis.it/spatialite/

Its like PostGIS is for PostgreSQL. All your SQLite functionality will work perfectly and unchanged, and you'll get spatial functions too.

• Thanks, this is interesting, but I'm not sure I want to change over my database connectors at this time. Upvote for the cool link though! – Ben Holland Jul 1 '11 at 15:35
• But this is the proper way to do it. You should bite the bullet now and move on to something really spatial - it will be worth the pain down the road – TheSteve0 Jul 20 '11 at 11:51

You could always truncate the Taylor series expansion of sine and use the fact that sin^2(x)+cos^2(x)=1 to get the approximation of cosine. The only tricky part would be using Taylor's theorem to estimate the number of terms that you'd need for a given amount of precision.

Change "*" with "/" works for me:

select * from Points order by (lat - @lat) * (lat - @lat) + ((lng - @lng) / 2) * ((lng - @lng) / 2)