I've used something called the Great Circle Distance to do this in the past. It treats the Earth as a perfect sphere (which it is not) and uses two sets of lat longs to determine the distance between two points on that sphere. Since the Earth is not a perfect sphere these distances are not perfectly accurate. If you are dealing with small distances and a small difference between calculated and actual is ok this would probably be fine for you. Here is a function that calculates the GCD:

```
SET QUOTED_IDENTIFIER ON
GO
SET ANSI_NULLS ON
GO
CREATE FUNCTION dbo.GreatCircleDistance
(
@Latitude1 float = NULL,
@Longitude1 float = NULL,
@Latitude2 float = NULL,
@Longitude2 float = NULL
)
RETURNS float
AS
BEGIN
IF @Latitude1 IS NULL RETURN 0.0
IF @Longitude1 IS NULL RETURN 0.0
IF @Latitude2 IS NULL RETURN 0.0
IF @Longitude2 IS NULL RETURN 0.0
DECLARE @sin1 float
,@sin2 float
,@sind float
,@cos1 float
,@cos2 float
,@cosd float
SELECT @sin1 = SIN(RADIANS(@Latitude1))
,@sin2 = SIN(RADIANS(@Latitude2))
,@sinD = SIN(RADIANS(@Longitude2 - @Longitude1))
,@cos1 = COS(RADIANS(@Latitude1))
,@cos2 = COS(RADIANS(@Latitude2))
,@cosD = COS(RADIANS(@Longitude2 - @Longitude1))
RETURN ATN2 (SQRT(SQUARE(@cos2 * @sinD) + SQUARE(@cos1 * @sin2 - @sin1 * @cos2 * @cosD))
,@sin1 * @sin2 + @cos1 * @cos2 * @cosD
) * 3959.871
END
GO
```

Stolen from here.

bad a question. – David Stratton Jun 12 '12 at 18:41that