Understanding Mathematical Proof

NOTE EDITORE

The notion of proof is central to mathematics yet it is one of the most difficult aspects of the subject to teach and master. In particular, undergraduate mathematics students often experience difficulties in understanding and constructing proofs. Understanding Mathematical Proof describes the nature of mathematical proof, explores the various techniques that mathematicians adopt to prove their results, and offers advice and strategies for constructing proofs. It will improve students’ ability to understand proofs and construct correct proofs of their own. The first chapter of the text introduces the kind of reasoning that mathematicians use when writing their proofs and gives some example proofs to set the scene. The book then describes basic logic to enable an understanding of the structure of both individual mathematical statements and whole mathematical proofs. It also explains the notions of sets and functions and dissects several proofs with a view to exposing some of the underlying features common to most mathematical proofs. The remainder of the book delves further into different types of proof, including direct proof, proof using contrapositive, proof by contradiction, and mathematical induction. The authors also discuss existence and uniqueness proofs and the role of counter examples.

SOMMARIO

Introduction The need for proof The language of mathematics Reasoning Deductive reasoning and truth Example proofs Logic and ReasoningIntroduction Propositions, connectives, and truth tables Logical equivalence and logical implication Predicates and quantification Logical reasoning Sets and Functions Introduction Sets and membership Operations on setsThe Cartesian product Functions and composite functions Properties of functions The Structure of Mathematical ProofsIntroduction Some proofs dissected An informal framework for proofs Direct proof A more formal framework Finding Proofs Direct proof route maps Examples from sets and functions Examples from algebraExamples from analysis Direct Proof: Variations Introduction Proof using the contrapositive Proof of biconditional statements Proof of conjunctions Proof by contradiction Further examples Existence and Uniqueness Introduction Constructive existence proofs Non-constructive existence proofs Counter-examples Uniqueness proofs Mathematical InductionIntroduction Proof by induction Variations on proof by induction Hints and Solutions to Selected Exercises Bibliography Index

ALTRE INFORMAZIONI

• Condizione: Nuovo
• ISBN: 9781466514904
• Dimensioni: 9.25 x 6.25 in Ø 1.70 lb
• Formato: Brossura
• Illustration Notes: 62 b/w images and 11 tables
• Pagine Arabe: 414