Vectors and multivariable calculus with applications.

This course introduces students to number theory. Topics include modular arithmetic, basic prime number theorems, congruences, and finite fields.  

This course introduces students to point-set topology. Topics include metric spaces, open and closed sets, cardinality, limits and continuity of functions.

An introduction to the fundamental algebraic, logical, and combinatorial concepts of mathematics that provides a foundation for the study of computer science.

This course is an introduction to Group Theory.

The development of selected mathematical concepts will be traced from the Greek era. The course will focus on mathematical creation as a human endeavor done within a cultural context.

A study of the properties and applications of matrices, including systems of equations, determinants, factorizations, and eigenvalues. An introduction to vector spaces and linear transformations.

Topics in geometry including Euclidean axiom systems and transformations and topics from non-Euclidean geometries. May include topics such as spherical and hyperbolic geometry, topology of surfaces, and basic graph theory.

This course is an introduction to the theory of rings and fields.

An introduction to combinatorics and finite math. This course covers basic counting techniques, including the pigeonhole principle, enumeration of sets, permutations, combinations, partitions and the Binomial Theorem. Combinatorial and algebraic patterns of polynomials are also studied.