# Mathematics (MATH) 3000-level

**3415. Calculus III. 4(3-0-2)**

This course is a continuation of Math 2414. topics to be covered include sequences, series, expansion of functions, multiple integrals, and partial derivatives.

Prerequisite: MATH 2414.

**3320. Differential Equations. 3(3-0)**

The ordinary differential equations of physics, chemistry, and engineering; methods for their solution and the properties of their solution. Introduction to partial differential equations.

Prerequisite: MATH 2414.

**3325. An Introduction to Mathematical Proofs. 3(3-0)**

Principles and techniques of discovering and writing correct mathematics proofs. Independently prove theorems from various areas in mathematics, which may include topics from logic, the structure of the real number system, number theory, geometry, and algebra.

Prerequisite: MATH 2413.

**3340. Linear Algebra with Applications. 3(3-0)**

Systems of linear equations. Matrices and determinants. Vector spaces, subspaces, bases and dimension. Linear transformations and their representations by matrices. Orthogonality, eigenvectors, and diagonalization. Problem solving using difference equations. Prerequisite: MATH 2413.

**3352. Applied Fundamentals of Mathematics. 3(3-0)**

Applied projects in selected areas of mathematics, such as number systems, systems of operations, proportional reasoning, probability, statistics, measurement, and geometry. Emphasis on understanding pedagogical content for pre-service teachers in mathematics. Planning, implementing, and assessing mathematics activities during a two-week summer camp for area youth.

Prerequisite: MATH 2413.

**3360. Modern Geometry. 3(3-0)**

Historical review of set theory, logic and applications in Euclidean Geometry, Hilbert's approach and revision of Euclid's postulates, rewriting of Euclid's fifth postulate. Axiomatic approach to modern Geometry, Foundation of non-Euclidean geometry. Prerequisite: MATH 3325.

**3370. Discrete Mathematics. 3(3-0)**

This course covers many topics in mathematics which are important in computer science. some of these topics are sets, relations, functions, algorithms, graphs, monoids, lattices, Boolean algebras, and graphs.

Prerequisite: 3 semester hours of advanced mathematics.

**3371. Problem Solving with Computers. 3(3-0)**

Brief historical overview of computing and computers; strategies for solving problems by computers; programming in a higher level language. Students will be exposed to problem solving using technology, graphing calculator, and computer algebra system.

Prerequisite: MATH 2413.

**3372. Mathematical Biology. 3(3-0)**

Investigate some math biology models such as models for single species and multiple species, infectious disease models, biochemical enzyme reactions, biological oscillations and so on. Appropriate math techniques are applied to analyze the models and gain solutions. Model improvement will also be evaluated for more practical modeling effects.

Prerequisite: MATH 2413 or MATH 1325.

**3373. Mathematical Physiology. 3(3-0)**

Introduces mathematical physiology models that describe various important functioning principles of human organs. Appropriate variables are included to capture the factors of interest. Solutions re-examined for adequacy.

Prerequisite: MATH 2413 or MATH 1325.

This page was last updated on: May 16, 2017