Featured here are textbooks published by the MAA. Many of these may be used as your primary text (P) or as a supplement (S) for another course you are teaching. Listed below each topic are book suggestions.
Abstract Algebra
Field Theory and Its Classical Problems (S)
Learning Modern Algebra: From early Attempts to Prove Fermat's Last Theorem (P)
Visual Group Theory (S)
Actuarial Science
Mathematical Interest Theory (P)
Analysis
The Lebesgue Integral for Undergraduates
Calculus
Calculus: An Active Approach with Projects (P)
The Calculus Collection: A Resource for AP* and Beyond (S)
Calculus for the Life Sciences: A Modeling Approach (P)
College Calculus: A One-Term Course for Students with Previous Calculus Experience (P)
Counterexamples in Calculus (S)
Mathematical Modeling in the Environment (S)
Real Infinite Series (S)
Capstone
Field Theory and Its Classical Problems (P)
College Algebra
Functions, Data, and Models: An Applied Approach to College Algebra (P)
Combinatorics
Combinatorics: A Guided Tour (P)
Combinatorics: A Problem Oriented Approach (S)
Mathematics of Choice: How to Count without Counting (P)
Proofs that Really Count: The Art of Combinatorial Proof (P)
Complex Analysis
Invitation to Complex Analysis (P)
Complex Variables
Complex Numbers & Geometry (S)
Cryptology
Cryptological Mathematics (P)
Elementary Cryptanalysis: A Mathematical Approach (P)
Differential Geometry
Differential Geometry and Its Applications (P)
Fourier Analysis
Fourier Series (P)
Game Theory
Game Theory and Strategy (P)
The Mathematics of Games and Gambling (P)
General Education Mathematics
Understanding our Quantitative World (P)
Geometry
Complex Numbers & Geometry (S)
Field Theory and Its Classical Problems (S)
Geometry Illuminated: An Illustrated Introduction to Euclidean and Hyperbolic Plane Geometry
Geometry Revisited (P)
Thinking Geometrically: A Survey of Geometries
Graph Theory
Graph Theory: A Problem Oriented Approach (P)
Group Theory
Visual Group Theory (S)
History of Mathematics
An Episodic History of Mathematics: Mathematical Culture Through Problem Solving (P)
Field Theory and Its Classical Problems (S)
History of Mathematics: Highways and Byways (P)
Math through the Ages: A Gentle History for Teachers and Others, Expanded 2nd Edition (P)
A Radical Approach to Real Analysis (P, S)
Honors Calculus
Calculus Deconstructed: A Second Course in First-Year Calculus (P, S)
Introduction to Mathematical Modeling
A Course in Mathematical Modeling (P)
Mathematical Modeling in the Environment (P)
Introduction to Topology
First Concepts of Topology: The Geometry of Mappings of Segments, Curves, Circles, and Disks (P)
Topology Now! (P)
Knot Theory
Knot Theory (P)
Liberal Arts Mathematics
Combinatorics: A Problem Oriented Approach (P)
Cryptological Mathematics (P)
Game Theory and Strategy (P)
Graph Theory: A Problem Oriented Approach (P)
Mathematical Connections: A Companion for Teachers and Others (P)
Mathematics of Choice: How to Count without Counting (P)
The Mathematics of Games and Gambling (P)
Number Theory Through Inquiry (P)
Proofs that Really Count: The Art of Combinatorial Proof (P)
Lie Groups
Lie Groups: A Problem-Oriented Introduction via Matrix Groups (P)
Linear Algebra
Lie Groups: A Problem-Oriented Introduction via Matrix Groups (S)
Mathematical Modeling in the Environment (S)
Mathematics for Business Decisions
Mathematics for Business Decisions (with Interdisciplinary Multimedia Projects) (P)
Most Undergraduate Curriculum
Calculus Gems: Brief Lives and Memorable Moments (S)
Number Theory
Cryptological Mathematics (S)
Learning Modern Algebra: From early Attempts to Prove Fermat's Last Theorem (S)
Number Theory Through Inquiry (P)
Ordinary Differential Equations
Ordinary Differential Equations: From Calculus to Dynamical Systems (P)
Partial Differential Equations
Mathematical Interest Theory (S)
Probability
Mathematical Modeling in the Environment (S)
The Mathematics of Games and Gambling (S)
Problem Solving
Combinatorics: A Problem Oriented Approach (P)
Proofs that Really Count: The Art of Combinatorial Proof (P)
Real Infinite Series (S)
Teaching Secondary Mathematics
Mathematical Connections: A Companion for Teachers and Others (P)
Mathematics for Secondary School Teachers (P)
Transition to Proof
Bridge to Abstract Mathematics (P)
Calculus Deconstructed: A Second Course in First-Year Calculus (P, S)
Distilling Ideas: An Introduction to Mathematical Thinking (P)
Lie Groups: A Problem-Oriented Introduction via Matrix Groups (P)
Number Theory Through Inquiry (P) A TeXas Style Introduction to Proof
Real Analysis
Calculus Deconstructed: A Second Course in First-Year Calculus (P, S)
Counterexamples in Calculus (S)
Invitation to Complex Analysis (S)
An Invitation to Real Analysis
Mathematical Interest Theory (S)
A Primer of Real Functions (P, S)
A Radical Approach to Real Analysis (P)
Real Infinite Series (S)
Special Topics
Field Theory and Its Classical Problems (P)
Statistics
Teaching Statistics Using Baseball