Stupid questions?

1. Stupid questions? • Are there more integers than even integers? • Are there less primes than integers? • Are there more rational numbers than integers? • Are there more real numbers than rational numbers? • Are there more rational numbers or irrational numbers? Why?

2. Stupid questions? • Are there more integers than even integers? This question seems stupid! But – we define cardinality of a set A, |A|, in the following way: |A| = |B| if and only if there is a one-one correspondence (1-1C) between the members of A and the members of B.

3. Set Theory Here we see a bijection between the sets X and Y – the mapping is “one-one” and “onto”, Meaning every member of X corresponds to one and only one member of Y and vice versa. The existence of the bijection proves |X|=|Y|. Cantor thinks… What if X and Y are infinite sets – like the set of integers {1,2,3,4,5…} and the set of even integers {2,4,6,8,…} You can say that X is bigger than Y, but since the bijection exists – it doesn’t make sense! THE TWO SETS ARE THE SAME SIZE!

4. Set Theory The cardinality of N, |N| = |2N| (if 2N is the set of even natural numbers). 2 challenges for you: • Is |Z| = |N|? • Is |Q| = |N| ? • Hints: remember that equal cardinalities means there is a 1-1C, so try to create a 1-1C. Try to prove that they are both true (even though the second one looks very unlikely)!

5. Shocking #1: |Q|=|N|

6. Shocking #1: |Q|=|N|

7. Not shocking: |R|>|N| “reductio ad absurdum” = proof by contradiction The most beautiful proof in Mathematics? Cantor’s Diagonal Argument

8. Not shocking: |R|>|N| Concept check… • Are there more rational numbers or irrational numbers? Why? • Side note: |R| is sometimes called the “cardinality of the continuum” and is written as c.

9. “Je le vois, mais je ne le crois”:Shocking #2|R2|=|R| • This one you can try yourself! It’s not easy so here’s some hints. • Write each point on the plane as a pair of coordinates (x,y) • Think about how to match each point (x,y) with a single real number • Remember it needs to be a bijection (one-one and onto) • Use the decimal representation of real numbers, just as we did for the diagonal argument

10. Bigger and bigger infinities! • The power set of a set A is the set of all subsets of A • What is the size/cardinality of the set of all subsets of the set {1,2,3,4}? • What is the size/cardinality of the set of all subsets of the set {1,2,3,…25}? • The “set of all subsets” of A is called the “power set” of A and is written P(A) Now for your biggest challenge… Prove |P(N)| > |N|

11. A final mystery… It can be shown that c = |P(N)| so we have two “smallest” infinities: |N| < c < … The Continuum Hypothesis There is no set S such that |N| < |S| < c < … Cantor spent literally years trying to prove this, and failed…

12. Links http://plus.maths.org/content/glimpse-cantors-paradise http://duartes.org/gustavo/blog/category/compsci