๐”– Scriptorium
โœฆ   LIBER   โœฆ
๐Ÿ“

An Introduction to Mathematical Proofs

โœ Scribed by Nicholas A. Loehr

Publisher
CRC Press
Year
2019
Tongue
English
Leaves
413
Edition
1
Category
Library
โฌ‡  Acquire This Volume

No coin nor oath required. For personal study only.

โœฆ Table of Contents

Cover
Half Title
Series Page
Title Page
Copyright Page
Dedication
Contents
Preface
1. Logic
1.1 Propositions, Logical Connectives, and Truth Tables
1.2 Logical Equivalences and IF-Statements
1.3 IF, IFF, Tautologies, and Contradictions
1.4 Tautologies, Quanti ers, and Universes
1.5 Quantifier Properties and Useful Denials
1.6 Denial Practice and Uniqueness Statements
2. Proofs
2.1 Definitions, Axioms, Theorems, and Proofs
2.2 Proving Existence Statements and IF Statements
2.3 Contrapositive Proofs and IFF Proofs
2.4 Proofs by Contradiction and Proofs of OR-Statements
2.5 Proofs by Cases and Disproofs
2.6 Proving Quantified Statements
2.7 More Quantifier Properties and Proofs (Optional)
Review of Logic and Proofs
3. Sets
3.1 Set Operations and Subset Proofs
3.2 Subset Proofs and Set Equality Proofs
3.3 Set Equality Proofs, Circle Proofs, and Chain Proofs
3.4 Small Sets and Power Sets
3.5 Ordered Pairs and Product Sets
3.6 General Unions and Intersections
3.7 Axiomatic Set Theory (Optional)
4. Integers
4.1 Recursive Definitions and Proofs by Induction
4.2 Induction Starting Anywhere and Backwards Induction
4.3 Strong Induction
4.4 Prime Numbers and Integer Division
4.5 Greatest Common Divisors
4.6 GCDs and Uniqueness of Prime Factorizations
4.7 Consequences of Prime Factorization (Optional)
Review of Set Theory and Integers
5. Relations and Functions
5.1 Relations
5.2 Inverses, Identity, and Composition of Relations
5.3 Properties of Relations
5.4 Definition of Functions
5.5 Examples of Functions and Function Equality
5.6 Composition, Restriction, and Gluing
5.7 Direct Images and Preimages
5.8 Injective, Surjective, and Bijective Functions
5.9 Inverse Functions
6. Equivalence Relations and Partial Orders
6.1 Reflexive, Symmetric, and Transitive Relations
6.2 Equivalence Relations
6.3 Equivalence Classes
6.4 Set Partitions
6.5 Partially Ordered Sets
6.6 Equivalence Relations and Algebraic Structures (Optional)
7. Cardinality
7.1 Finite Sets
7.2 Countably Infinite Sets
7.3 Countable Sets
7.4 Uncountable Sets
Review of Functions, Relations, and Cardinality
8. Real Numbers (Optional)
8.1 Axioms for R and Properties of Addition
8.2 Algebraic Properties of Real Numbers
8.3 Natural Numbers, Integers, and Rational Numbers
8.4 Ordering, Absolute Value, and Distance
8.5 Greatest Elements, Least Upper Bounds, and Completeness
Suggestions for Further Reading
Index

๐Ÿ“œ SIMILAR VOLUMES

An Introduction to Mathematical Proofs (
๐Ÿ“ An Introduction to Mathematical Proofs (Textbooks in Mathematics)
โœ Nicholas A. Loehr ๐Ÿ“‚ Library ๐Ÿ“… 2019 ๐Ÿ› CRC Press ๐ŸŒ English

<p><b><em>An Introduction to Mathematical Proofs</em> </b>presents fundamental material on logic, proof methods, set theory, number theory, relations, functions, cardinality, and the real number system. The text uses a methodical, detailed, and highly structured approach to proof techniques and rela

Exploring Mathematics: An Engaging Intro
๐Ÿ“ Exploring Mathematics: An Engaging Introduction to Proof
โœ John Meier, Derek Smith ๐Ÿ“‚ Library ๐Ÿ“… 2017 ๐Ÿ› Cambridge University Press ๐ŸŒ English

Exploring Mathematics gives students experience with doing mathematics - interrogating mathematical claims, exploring definitions, forming conjectures, attempting proofs, and presenting results - and engages them with examples, exercises, and projects that pique their interest. Written with a minima