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