I don't understand the question either.
Surely a rectangle can be divivded into four smaller rectangles - look at the St. George's cross.

While your waiting fault free rectangles

Yes Gef, but that subdivision is a complex subdivision because if you remove any line segment, the rectangle is still subdivided into two or three smaller rectangles.

This is an interesting problem. I'll work on it and get back to you.

Thanks newtron I now understand - no wine tonight!

Well, I really don't have the time to solve this problem, but it is intriguing. I was playing around and I found that drawing a simple subdivision is quite complex. LOL. I finally was able to construct one however. Begin by drawing a line perpendicular to the right side of your rectangle, begining at about 3/4 the length of the side from the bottom. Make this line about 3/4 the length of the top side of the rectangle. Now draw a line perpendicular from the top side that intersects you first line at a 90 degree angle. Again, make this second line about 3/4 the length of the left side of the rectangle. Draw a line perpendicular to the left side that intersects the second line at a 90 degree angle. Draw a fourth line perpendicular to the bottom of the rectangle that intersects the third and first lines at 90 degree angles. You'll end up with 5 smaller rectangles in the original rectangle. You will see a spiral- like pattern with one of the rectangles being in the center and not sharing a side with the original rectangle. I don't think you can end up with a smaller number of rectangular subdivisions by removing any one line segment. Check to make sure that is right. I hope this makes sense. Hopefully this might provide som clues on how to proceed in solving this problem. Come on ABers, this is a challenging problem!!

Actually, for the subdivision described above, you can remove any number of internal line segments and you will not be left with only rectangular subdivisions.

I hope there's a practical reason somewhere for all this?