I get this sort of information from the Aviation Formulary.

In this case:

Distance between points

The great circle distance d between
two points with coordinates
{lat1,lon1} and {lat2,lon2} is given
by:

`d=acos(sin(lat1)*sin(lat2)+cos(lat1)*cos(lat2)*cos(lon1-lon2))`

A mathematically equivalent formula,
which is less subject to rounding
error for short distances is:

```
d=2*asin(sqrt((sin((lat1-lat2)/2))^2 +
cos(lat1)*cos(lat2)*(sin((lon1-lon2)/2))^2))
```

And

Intermediate points on a great circle

In previous sections we have found
intermediate points on a great circle
given either the crossing latitude or
longitude. Here we find points
(lat,lon) a given fraction of the
distance (d) between them. Suppose the
starting point is (lat1,lon1) and the
final point (lat2,lon2) and we want
the point a fraction f along the great
circle route. f=0 is point 1. f=1 is
point 2. The two points cannot be
antipodal ( i.e. lat1+lat2=0 and
abs(lon1-lon2)=pi) because then the
route is undefined. The intermediate
latitude and longitude is then given
by:

```
A=sin((1-f)*d)/sin(d)
B=sin(f*d)/sin(d)
x = A*cos(lat1)*cos(lon1) + B*cos(lat2)*cos(lon2)
y = A*cos(lat1)*sin(lon1) + B*cos(lat2)*sin(lon2)
z = A*sin(lat1) + B*sin(lat2)
lat=atan2(z,sqrt(x^2+y^2))
lon=atan2(y,x)
```

great circleon a map with a givenprojection. Try Googling the first and then the second term. – High Performance Mark Dec 8 '09 at 16:37