I have 2 six faced solids. The only guarantee is that they each have 8 vertex3f's (verticies with x,y and z components). Given this, how can I find out if these are colliding?

It seems I'm too dumb to quit. Consider this. If any edge of solid 1 intersects any face of solid 2, you have a collision. That's not quite comprehensive because there are case when one is is fully contained in the other, which you can test by determining if the center of either is contained in the other. Checking edge face intersection works like this.
This will work. For eloquence, I rather prefer R..'s solution. If you need speed...well, you'll just have to try them and see. 


I'm hesitant to answer after you deleted your last question while I was trying to answer it and made me lose my post. Please don't do that again. Anyway: Not necessarily optimal, but obviously correct, based on constructive solid geometry:
It sounds like a bit of work, but there's nothing complicated. Only dot products, cross products (to get the initial representation), and projections. 


Suppose one of your hexahedrons If the interval If any of the intervals do overlap, you'll have to move on to more precise collision detection. This will be a lot trickier. The obvious brute force method is to check if any of the edges of one intersects any of the faces of the other, but I imagine you can do a lot better than that. The brute force way to check if an edge intersects a face... First you'd find the intersection of the line defined by the edge with the plane defined by the face (see wikipedia, for example). Then you have to check if that point is actually on the edge and the face. The edge is easy  just see if the coordinates are between the coordinates of the two vertices defining the edge. The face is trickier, especially with no guarantees about it being convex. In the general case, you'll have to just see which side of the halfplanes defined by each edge it's on. If it's on the inside halfplane for all of them, it's inside the face. I unfortunately don't have time to type that all up now, but I bet googling could aid you some there. But of course, this is all brute force, and there may be a better way. (And dmckee points out a special case that this doesn't handle) 

