Methods of Proof

Induction

Relations

Functions

Cardinality

5 main Theorems

100

A least element of A.

(Let Ø ≠ A ⊆ ℝ.) What is a number m ∈ A if m ≤ x for all x ∈ A?

100

A relation R on A if aRa for all a in A.

What is a reflexive relation?

100

f(A₁ ∩ A₂) = f(A₁) ∩ f(A₂) (T/F)

False. f(A1 ∩ A2) ⊆ f(A1) ∩ f(A2

100

A is infinite.

What is A if it is not finite?

100

This proves the set ℚ+ of positive rational numbers is countable.

1/1 1/2 1/3 1/4....

2/1 2/2 2/3 2/4...

3/1 3/2 3/3 3/4...

4/1 4/2 4/3 4/4...

....

200

It is well-ordered.

What is a nonempty subset A ⊆ ℝ if every nonempty subset of A has a least element?

200

An equivalence relation.

What is a relation that is reflexive, symmetric, and transitive?

200

The inverse of f.

The function f^-1: B→A defined by f^-1(b) = a if any only if f(a) = b is what?

200

(The pigeonhole principle) There is no injective function from A to B.

What if A and B are finite and |B| < |A|?

200

The contradiction in the proof for Euclid's Theorem.

What is "if there are a finite number of primes 'a', then construct a number (1 x 2 x 3 x 5...x a) + 1 = k, then k must be both prime and composite"?

300

The cardinality of the set is 2ⁿ.

What is the cardinality of the power set?

300

The two sets are disjoint.

Sets A and B are what, if A n B=∅?

300

If g○f is bijective.

When is f injective when g is surjective?

300

That's why the proof for |ℝ| = Ĉ doesn't work for ℚ.

What is important about the fact that b is irrational in the proof for "(1,0) is uncountable"?

300

The Division Algorithm. (The Theorem)

What is "let a, m in ℤ. Then there exist unique q, r in ℤ such that a = qm + r and 0 ≤ r ≤ m"?

400

The premises for strong induction.

What are "

Fix m ∈ ℕ and let S = {i ∈ ℤ | i ≧ m}
Let P(s) be an open sentence for which s ∈ S"?

400

{b in B | (a,b) in R for some a in A}

What is the range of A?

400

Let f: A →B and let C ⊆ A. the function f|_c = C →B defined by f|_c (x) = f(x).

What is the restriction of f to C.

400

There exists 0 ⪬ m < n such that |B| = m, and |B| ≠ n.

Let A be a set with |A| = n > 0. If B is a proper subset of A, then what?

400

The number created for the proof of "(0, 1) is uncountable."

What is 0.b₁b₂b₃... where b_i = {1 if i≠1, 2 if i=1?

500

We can conclude that P(S) is true for all s in S.

What can we conclude if:

(i) P(m) is true

(ii) ∀ k ∈ S, P(k) ⇒ P(k + 1) is true?

500

The family is a partition on X.

What do you call a relation that is pairwise disjoint and whose union (of all sets), is all of X?

500

The inclusion mapping.

What is the function I that defines A ⊆ B. define i: A→B by i(a) = a?

500

Prove "Theorem 7.18: |ℝ| = Ĉ" the fastest.

Check!

500

The contradiction in Cantor's Theorem.

What is "Define B = {a in A | a not in g(a)}. If z in B then z not in g(z) = B, If z not in B then z in g(z) = B"?