Understanding Mathematical Proof

Name: Understanding Mathematical Proof
Brand: Taylor & Francis Inc
SKU: 9781466514904
Price: 74.99 EUR
Availability: InStock

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€74.99

Product variants

A01=John Taylor

A01=Rowan Garnier

A12 A13a21 A22 A23 A31

Age Group_Uncategorized

and real analysis

Author_John Taylor

Author_Rowan Garnier

automatic-update

Axiom System

Background Knowledge

Category1=Non-Fiction

Category=PBCD

Compound Proposition

Consecutive Positive Integers

constructing mathematical proofs

COP=United States

Deduction Rules

Delivery_Pre-order

Direct Proof

eq_isMigrated=2

existence and uniqueness proofs

Existentially Quantied

Great Internet Mersenne Prime Search

group theory

Induction

Inductive Hypothesis

Inductive Step

Innite Sets

Jx1 X2j

Jy1 Y2j

Language_English

mathematical induction

Metric Space

Non-empty Subset

Odd Integer

PA=Temporarily unavailable

Pigeonhole Principle

Positive Integers

Price_€50 to €100

proof by contradiction

proof using contrapositive

proofs in linear algebra

Proposition P1

Propositional Function

proving mathematical theorems

PS=Active

softlaunch

structure of mathematical proof

Surjective Functions

techniques to prove mathematical results

Truth Table

Venn Euler Diagram

Product details

ISBN 9781466514904
Weight: 770g
Dimensions: 156 x 234mm
Publication Date: 21 Mar 2014
Publisher: Taylor & Francis Inc
Publication City/Country: US
Product Form: Paperback
Language: English

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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.