I don't have a code fragment handy, but a simple way to do this is with the Sutherland-Hodgman clipping algorithm.
Basically, you treat your plane as a ordered list of points and your cube as a set of 6 planes. For each plane, you loop through the list of points keeping track of when they cross the plane, and make a new list of points. You then use that new list for the next plane. When you're done, you've got the polygon which is the intersection of the cube and the plane. In this case, that polygon could be anywhere from empty to 6-sided.
If you google, you'll probably find MATLAB implementations of Sutherland-Hodgman, but it's the simplest of the polygon clipping algorithms to implement if you'd like to give it a go yourself. Note that it's limited to the case where the clipping volume is convex, but that's true of your cube in this case.
