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1. Linear algebra done right [2015]
 Axler, Sheldon Jay.
 Third edition.  Cham : Springer, [2015]
 Description
 Book — xvii, 340 pages : ill. ; 25 cm.
 Summary

 Preface for the InstructorPreface for the StudentAcknowledgments1. Vector Spaces
 2. FiniteDimensional Vector Spaces
 3. Linear Maps
 4. Polynomials
 5. Eigenvalues, Eigenvectors, and Invariant Subspaces
 6. Inner Product Spaces
 7. Operators on Inner Product Spaces
 8. Operators on Complex Vector Spaces
 9. Operators on Real Vector Spaces
 10. Trace and DeterminantPhoto CreditsSymbol IndexIndex.
 (source: Nielsen Book Data)
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 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA184 .A96 2015  Unknown On reserve at Li and Ma Science Library 2hour loan 
QA184 .A96 2015  Unknown On reserve at Li and Ma Science Library 2hour loan 
MATH11301, MATH83N01
 Course
 MATH11301  Linear Algebra and Matrix Theory
 Instructor(s)
 Kazeev, Vladimir
 Course
 MATH83N01  Proofs and Modern Mathematics
 Instructor(s)
 Sauermann, Lisa
2. Understanding analysis [2015]
 Abbott, Stephen, 1964 author.
 Second edition.  New York ; Heidelberg : Springer, [2015]
 Description
 Book — xii, 312 pages : illustrations ; 25 cm.
 Summary

 Preface.
 1 The Real Numbers.
 2 Sequences and Series.
 3 Basic Topology of R.
 4 Functional Limits and Continuity.
 5 The Derivative.
 6 Sequences and Series of Functions.
 7 The Riemann Integral.
 8 Additional Topics. Bibliography. Index.
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 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA300 .A18 2015  Unknown On reserve at Li and Ma Science Library 4hour loan 
MATH83N01
 Course
 MATH83N01  Proofs and Modern Mathematics
 Instructor(s)
 Sauermann, Lisa
 Solow, Daniel, author.
 Sixth edition.  Hoboken, New Jersey : John Wiley & Sons, Inc., [2014]
 Description
 Book — xiv, 319 pages : illustrations ; 23 cm
 Summary

 Foreword xi Preface to the Student xiii Preface to the Instructor xv Acknowledgments xviii Part I Proofs
 1
 Chapter 1: The Truth of It All
 1
 2 The ForwardBackward Method
 9
 3 On Definitions and Mathematical Terminology
 25
 4 Quantifiers I: The Construction Method
 41
 5 Quantifiers II: The Choose Method
 53
 6 Quantifiers III: Specialization
 69
 7 Quantifiers IV: Nested Quantifiers
 81
 8 Nots of Nots Lead to Knots
 93
 9 The Contradiction Method
 101
 10 The Contrapositive Method
 115
 11 The Uniqueness Methods
 125
 12 Induction
 133
 13 The Either/Or Methods
 145
 14 The Max/Min Methods
 155
 15 Summary
 163 Part II Other Mathematical Thinking Processes
 16 Generalization
 179
 17 Creating Mathematical Definitions
 197
 18 Axiomatic Systems
 219 Appendix A Examples of Proofs from Discrete Mathematics
 237 Appendix B Examples of Proofs from Linear Algebra
 251 Appendix C Examples of Proofs from Modern Algebra
 269 Appendix D Examples of Proofs from Real Analysis
 287 Solutions to Selected Exercises
 305 Glossary
 357 References
 367 Index 369.
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 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA9 .S577 2014  Unknown On reserve at Li and Ma Science Library 4hour loan 
QA9 .S577 2014  Unknown On reserve at Li and Ma Science Library 4hour loan 
MATH83N01
 Course
 MATH83N01  Proofs and Modern Mathematics
 Instructor(s)
 Sauermann, Lisa