Course Descriptions

MATH 102X Problem-Solving (.25)

The course will offer students the opportunity to solve challenging mathematical problems unlike standard homework problems in any course. Class time will be spent studying problems, discovering solutions, writing up solutions formally, and discussing the important ideas of each solution. Most problems will be of the kind appearing on the Putnam Exam, an annual international mathematics competition. This course may be repeated for credit.

• Offering: Fall
• Instructor: Staff

MATH 130 (QA*) Contemporary Mathematics (1)

A survey of contemporary topics in mathematics such as: voting systems and power, apportionment, fair division of divisible and indivisible assets, efficient distribution, scheduling and routing, growth and decay in nature and economics, symmetry and fractal geometry, probability and statistics.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Offering: Every semester
• Instructor: Staff

MATH 138 (QA*) Statistics (1)

This course is an introduction to descriptive and inferential statistical analysis. The following topics will be examined: scales of measurement; frequency distributions; graphing data; measures of central tendency, dispersion and skewness; sampling distributions; probability distributions; the binomial, Poisson and normal distributions; hypothesis testing; confidence intervals and interval estimation; t-tests; analysis of variance; correlational analysis; regression analysis; and analysis of nominal-level data.

• Prerequisite: Cannot take after ECON 230, PSYC 253, SOC 401, IDS 138 or AP Stat credit
• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Offering: Every semester
• Instructor: Staff

MATH 140 (QA*) Modeling with Calculus (1)

Modeling with Calculus introduces and applies the concept of calculus to solve open-ended, real-word problems, especially those in the natural and social sciences. The emphasis is on developing and interpreting mathematical models. Topics include differential calculus, linear algebra, and differential equations. This course takes advantage of computational tools so that the focus can be on calculus concepts useful in applied work. This course is appropriate for students with no prior calculus experience.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Prerequisite: Not to be taken after MATH 152, or MATH 249. 0.5 credits if taken after MATH 151.
• Offering: Every semester
• Instructor: Starr, Janeba, Otto, McNicholas, Johnson, Laison, Nyman

MATH 151 (QA*) Accelerated Calculus (.5)

A first course in calculus for students with some previous exposure to the subject. Topics covered include limits; continuity; derivatives of algebraic, trigonometric, and exponential functions; implicit differentiation; the Mean Value Theorem; and optimization.

• Prerequisite: Not to be taken after AP Calculus credit, MATH 152, MATH 153, MATH 249
• General Education Requirement Fulfillment: One-half Quantitative and Analytical Reasoning*
• Offering: Every semester
• Instructor: Staff

MATH 152 (QA*) Accelerated Calculus II (.5)

A second course in Calculus. Topics covered include definite and indefinite integrals, the Fundamental Theorem of Calculus, volume, arc length and surface areas, integration techniques, improper integrals, polar coordinates, and parametric equations.

• Prerequisite: Prior Calculus experience with derivatives. Not to be taken after AP Calculus credit, MATH 153, or MATH 249
• General Education Requirement Fulfillment: One-half Quantitative and Analytical Reasoning*
• Offering: Every semester
• Instructor: Staff

MATH 153 (QA*) Sequences and Series (.5)

A half-semester course on sequences and series. Topics covered include sequences and series, Taylor Polynomials, Taylor Series, convergence, and Fourier Series.

• General Education Requirement Fulfillment: One-half Quantitative and Analytical Reasoning*
• Prerequisites: Prior calculus experience with integrals
• Offering: Every semester
• Instructor: Staff

MATH 163 (QA*) Discrete Mathematics (1)

Introduction to basic techniques and modes of reasoning in combinatorial problem-solving. Topics will be chosen from combinatorial mathematics, logic and Boolean algebra, difference equations, graph theory and applied algebra.

• Prerequisites: Not to be taken after MATH 251W
• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning*
• Offering: Spring
• Instructor: Staff

MATH 239 (QA*) Accelerated Statistics (1)

The general linear model is a fundamental tool frequently implemented by statisticians to describe the relationship between a quantitative response variable and one or more qualitative and/or quantitative explanatory variables. In this course, we will explore the implementation of the general linear model which will ultimately lead us to common model fitting techniques, including one-sample t-tests, two-sample t-tests, simple and multiple linear regressing, ANOVA, and ANCOVA. While theoretical results will occasionally be covered to provide necessary justification, the primary focus of the class will be on applying the aforementioned model fitting techniques to real data sets. The statistical software R will be used throughout the course to perform data analysis. Students enrolled in this course are presumed to have strong quantitative backgrounds and/or previous statistics experience.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Offering: Every semester
• Instructor: Otto, Purdy

MATH 249 (QA*) Multivariable Calculus (1)

Three-dimensional analytic geometry; partial differentiation; maxima-minima problems; multiple integrals; vector fields, curl and divergence; line and surface integrals; applications.

Successful completion of MATH 249 fulfills both QA/QA* General Education Requirements

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Prerequisite: Prior calculus experience with integrals
• Offering: Every semester
• Instructor: Staff

MATH 251W Foundations of Advanced Mathematics (1)

This course is intended as the first course after calculus for those students intending to major or minor in mathematics. It provides an introduction to logic and the methods of proof commonly used in mathematics. Applications covered in the course are the foundations of set theory, the real number system, elementary number theory and other basic areas of mathematics.

• General Education Requirement Fulfillment: Writing-centered
• Prerequisite: AP Calculus credit, MATH 152, or consent of instructor
• Offering: Every semester
• Instructor: Staff

MATH 253 (QA) Linear Algebra (1)

Systems of linear equations, matrices, vector spaces and linear transformations.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning
• Prerequisite: MATH 251W
• Offering: Every semester
• Instructor: Staff

MATH 256 (QA) Differential Equations (1)

Elementary differential equations; linear differential equations of second order; Laplace transformations; infinite series solutions; systems of linear differential equations.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning
• Prerequisite: MATH 249. MATH 253 recommended.
• Offering: Fall
• Instructor: Staff

MATH 266 (QA*) Probability and Statistics (1)

A calculus-based introduction to probability and statistics. Topics include summary statistics, probability theory, discrete and continuous random variables, distribution, limit theorems, estimation, hypothesis testing, and linear regression.

• General Education Requirement Fulfillment: Quantitative and Analytical Reasoning (*)
• Prerequisite: AP Calculus credit or MATH 152.
• Offering: Spring
• Instructor: Staff

MATH 345 Complex Variables (1)

Complex numbers, limits, differentiation, analytic functions, integration, conformal mapping, Riemann surfaces and applications.

• Prerequisite: MATH 249
• Offering: Alternate years in fall
• Instructor: Staff

MATH 356 Number Theory (1)

An introduction to the theory of numbers to include such topics as divisibility, congruence, diophantine equations, quadratic reciprocity, the theory of prime numbers and analytic number theory.

• Prerequisite: MATH 251W
• Offering: Alternate years in spring
• Instructor: Staff

MATH 376 Topics in Mathematics (1)

This course offers timely exposure to topics in mathematics which are not part of the regular curriculum. Examples of topics which might be offered: Graph Theory, Advanced Linear Algebra, Operations Research.

• Offering: Alternate years
• Instructor: Staff

MATH 446 Real Analysis I (1)

Rigorous study of the real numbers and real-valued functions. Topics include: limits and continuity on the real line, elementary topology of the real numbers, pathological examples. Other topics may include metric spaces, differentiation, vector-valued functions.

• Prerequisite: MATH 253 or consent of instructor
• Offering: Twice every five semesters
• Instructor: Staff

MATH 447 Real Analysis II (1)

A continuation of MATH 446. Topics include: Differentiation and Riemann integration, sequences of functions. Other topics may include point-set topology of the reals, vector-valued functions, topological vector spaces, Lebesgue intetration, introductory measure theory.

• Prerequisite: MATH 446
• Offering: Alternate years
• Instructor: Staff

MATH 456 Abstract Algebra I (1)

Number systems, elementary number theory, groups, rings, fields, polynomials and applications. Additional topics may be chosen from linear algebra, multilinear algebra, Sylow theory and Galois theory.

• Prerequisite: MATH 253 or consent of instructor
• Offering: Alternate years
• Instructor: Staff

MATH 457 Abstract Algebra II (1)

Course will build on the topics studies in MATH 456, Abstract Algebra I. In addition to Groups, Rings, and Fields, topics may include Galois Theory, Sylow Theory, Cayley Graphs, etc..

• Prerequisite: MATH 456 or consent of instructor
• Offering: Alternate years
• Instructor: Staff

MATH 470 Topology (1)

Elementary point-set topology with an introduction to combinatorial topology and homotopy.

• Prerequisite: MATH 251W, 253 or consent of instructor
• Offering: Alternate years
• Instructor: Staff

MATH 476 Modern Geometry (1)

A modern approach to geometry. Topics will be chosen from Euclidean, non-Euclidean, affine, projective and differential geometry.

• Prerequisite: MATH 253 or consent of instructor
• Offering: Twice every five semesters
• Instructor: Staff

MATH 490 Independent Research (.5)

Directed research to investigate topics of special interest under the guidance of a faculty member. Topics chosen on the basis of the background and interests of the individual student.

• Prerequisite: Consent of instructor
• Offering: On demand
• Instructor: Staff

MATH 491 Advanced Independent Study (.5)

A course of directed research designed to enable the exceptional student to continue the investigation of topics of special interest under the guidance of a faculty member.

• Prerequisite: Consent of instructor
• Offering: On demand
• Instructor: Staff

MATH 499W Seminar in Mathematics (1)

Study selected in consultation with the mathematics faculty and presented to the class. The seminar serves as the Senior Year Experience and involves oral and written presentation of research and reading topics. Required for Mathematics majors.

• General Education Fulfillment Requirement: Writing-centered
• Prerequisite: Senior standing and consent of instructor
• Offering: Spring
• Instructor: Staff