DeMorgan's Law: 
.
If we are given specific sets 
then we could probably calculate
the two sets equated in DeMorgan's Law and see that they are in fact equal.
To prove this law in general we can use a technique often used to prove the
equality of two sets. The idea is simply this: to prove that A=B we could
show that 
and 
This works very nicely on
DeMorgan's Law as follows.
First, assume
Second, assume that
Putting these two results together verifies DeMorgan's Law. Note that the
second argument is essentially the first argument in reverse. This is quite
often the case when showing two sets are equal by this method and you can
see that most of the work is done when the first argument is complete.
That's what makes this approach nice to use in many situations.
This says 
so there exists a 
with 
. Thus 
(for this particular 
.
This short argument establishes the fact that 
by showing that an arbitrary element of the
first set must be an element of the second.
. This says that there exists a with . Thus (for this particular ) and we
have
so This establishes the fact that 
.
Dan Rinne
Fri Aug 2 15:38:49 PDT 1996