I did a similar thing once (finding all lat/lon Objects surrounding a point with a max. radius) and used the formula given here:
http://www.movable-type.co.uk/scripts/latlong.html
However, that was quite time consuming. So I sort of "boxed" the objects fist. Based on the calculation above (reverted of course) I calculated the latitude and longitude of those coordinates north, west, south and east that had exactly the maximum distance. With hose max and min values (for lat and lon) I queried all objects in question. And only for those I calculated the exact distance and included them in the list of results or excluded them.

However, so far that does not exactly match your problem. But I tried to fasten the calculations even further. For that I said to myself, that I do not need the exact distance from the searched object to mine but it is enogh to know wether it is closer than one of the boxes coordinates. And that part is the one that corresponds well to your question:

Your case could be much easier. Assuming that the locations in question (the shortest once) are close to the one location which you try to assign, all this complex math may not play a role. You do not need the exact distance. What you need is the cosest one. For that I would assume that the earth is flat and that the distances between longitudes (or latitude) are linear. That is not true of course but should be good enough to figure out, which of those is the closest.
Going from there you could use pythagoras.

```
Distance = sqrt(sqr(difference-in-lat) + sqr(difference-in-lon));
```

For the mere purpose of comparing the distances and finding the shortest, you could even replace the time consuming square route with a much faster sqare operation.

```
Square-Of-Distance = sqr(difference-in-lat) + sqr(difference-in-lon).
```

And then compare the various Square-Of-Distance rather than the Distance. The result will be the same but much faster.

BTW, that was a PHP projects. That's why I cannot provide sample code but just explain the algorihm.