I'm sure everyone here knows the *smarty-pants method* for doing this:

(1) firstly, it could be that the set of little rectangles, extends outside of the target big rectangle. So first, trivially trim all the little rectangles so they end at the edges of the big rectangle

(2) next, knock-out all overlaps of the little rectangles.

{*A trivial way to do that* .. Test each one against all the others. If there is an overlap cut it in to four parts and delete the overlapping part. restart the whole loop each time you chop one in to four parts.}

(3) *calculate the area* of the big rectangle ("width times height == area")

(4) *calculate the area* of all the little rectangles

(5) if 4 is equal to 3 ........ the big rectangle is covered

Also ..

(1.5) .. Note. At point 1.5, just run the area test. obviously is 4 < 3 it can never cover the big rectangle. 4 must be greater than or equal to 3, to proceed.

ROUNDING ISSUE: note that it's quite a deep issue what you mean by "covered", are they real number or rounded measurements, is it all integers, is there real world physics involved, or what. this is simply an open question that each person must answer for themselves in 5, if like me you lose sleep over that sort of thing.