Membership Tables: Proving Set Identities with One Example

1. Membership Tables: Proving Set Identities with One Example

2. Proof techniques we teach in Discrete Mathematics • Direct Proofs • Proofs by Contradiction • Proofs by Contrapositive • Proofs by Cases • Mathematical Induction (Strong Form?) • Proof techniques we do NOT teach in Discrete Mathematics • Proof by one example • Proof by two examples • Proof by a few examples • Proof by many examples

3. Two sets X and Y are equal if X and Y have the same elements. • To prove sets X and Y are equal, prove if then , and if , then

4. Example: Determine the truth value of Proof: Let . Then x is a member of X, or x is a member of . Hence, x is a member of X, or x is a member of Y and x is a member of Z. If x is a member of X, then x is a member of and x is a member of . Otherwise, x is a member of Y and Z and hence a member of and . Either way, x is a member of and . Therefore, . Now show the other direction.

5. X Z Y Venn Diagram Verification

6. 4 2 1 3 6 5 7 8

7. Venn Diagrams for more than 3 sets 4 sets 5 sets Source: http://www.combinatorics.org/Surveys/ds5/VennGraphEJC.html

8. Membership Tables

9. “Never underestimate the value of a good example.” --Tom Hern, Bowling Green State University Invited Address at 2005 Fall Meeting of the Ohio Section of MAA Discrete Mathematics textbooks containing descriptions of membership tables: 1) Kenneth H. Rosen, Discrete Mathematics and Its Applications, 5th Ed., McGraw Hill, 2003, p. 91. 2) Ralph P. Grimaldi, Discrete and Combinatorial Mathematics, 5th Ed., Pearson, 2004, pp. 143-144.