40 SETS Chapter 1
"conjectures." You should already have conjectured, based on earlier ex-
ercises, a large number of potential theorems. See which of your conjec-
tures are included in the following lists.
FACT 1
The following basic laws of set equality or of subsets can be proved to be theo-
rems of set theory. For all sets X, Y, and Z in any universal set U:- X=X (reflexive property of equality)
- XrX (reflexive property of
the subset relation) - If X = Y, then Y = X (symmetric property of equality)
- X = Y if and only if X c Y and Y G X (includes antisymmetric
property of subset) - If X = Y and Y = Z, then X = Z (transitive property of equality)
- If X E Y and Y c Z, then X E Z (transitive property of
the subset relation) - 0cx
- XcW
FACT 2
The following basic properties for union and intersection can be proved to be
theorems of set theory. For all sets X, Y, and Z in any universal set U:- XuX=X
- XnX=X
- Xu@=X
- Xn U=X
- Xn@=@
- XuU=U
- XuY=YuX
- XnY=YnX
- Xu(YuZ)=(XuY)uZ
- Xn(YnZ)=(XnY)nZ
- XcXu Y
- Xn YGX
FACT 3(idempotent law for union)
(idempotent law for intersection)
(identity for union)
(identity for intersection)(commutative law for union)
(commutative law for intersection)
(asso$iative law for union)
(associative law for intersectiorl)The following basic properties for set complement can be proved to be theorems
of set theory. For all sets X, Y, and Z in any universal set U:- X" = X (law of double complementation)
- XU X' = U
- Xn X'= @
24. V=@ - a'= U