Mathematics develops computational skills, critical thinking, and problem solving skills. The theory, discipline, and techniques taught in mathematics courses are especially important in today's society. The faculty of the Department of Mathematics recognizes this and strives to ensure that the student learner obtains this knowledge. At the same time, the faculty contributes to the discipline by fundamental research in pure and applied mathematics, statistics, and mathematics education.
For more information, please see the Academic Catalog.
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24 months | Credit Hours: 30 Teaching Option: For teachers or aspiring mathematics teachers, the M.S. Degree with a Concentration in Teaching offers mathematics courses specifically designed to address the current needs in secondary education by providing a comprehensive understanding of concepts relevant to in-class teaching. This program leads to T-5 Certification for those who enter the program with Teacher Certification. It also is suitable for those seeking to teach at the 2-year college level. It is the perfect stepping stone for those seeking to enroll in a doctoral program in Mathematics Education.Applied Option: Whether you are seeking to further your career in industry, government or teaching at the junior college level, or for those wishing to enroll in a Ph.D. program, the M.S. Degree with a Concentration in Applied Mathematics will provide you with the education you need to succeed. It has applications in a wide variety of career fields, such as economics, biology, computation, social and management sciences and engineering. This program introduces students to a set of core courses fundamental to the study of applied mathematics, a broad range of elective courses in several applied areas and a focused research project class. A limited number of Graduate Assistantships are available for qualified students.
Method of Delivery
Program is partly online.
The University of West Georgia is accredited by The Southern Association of Colleges and Schools Commission on Colleges (SACSCOC).
Credit and transfer
Total semester hours required: 30
Maximum Hours Transferable into program: 6
A transfer credit evaluation will be completed by the UWG Transfer Team (email@example.com). Course application to a program is subject to review by the department.
This program may be earned entirely face-to-face. However, depending on the courses chosen, a student may choose to take some partially or fully online courses.
UWG is often ranked as one of the most affordable accredited universities of its kind, regardless of the method of delivery chosen.
- Total tuition costs and fees may vary, depending on the instructional method of the courses in which the student chooses to enroll.
- The more courses a student takes in a single term, the more they will typically save in fees and total cost.
- Face-to-face or partially online courses are charged at the general tuition rate and all mandatory campus fees, based on the student's residency (non-residents are charged at a higher rate).
- Fully or entirely online course tuition rates and fees my vary depending on the program. Students enrolled in exclusively online courses do not pay non-Resident rates.
- Together this means that GA residents pay about the same if they take all face-to-face or partially online courses as they do if they take only fully online courses exclusively; while non-residents save money by taking fully online courses.
- One word of caution: If a student takes a combination of face-to-face and online courses in a single term, he/she will pay both all mandatory campus fees and the higher eTuition rate.
- For cost information, as well as payment deadlines, see the Bursar's Office website
There are a variety of financial assistance options for students, including scholarships and work study programs. Visit the Office of Financial Aid's website for more information.
Program is partially online.
We plan to offer 3 courses for Fall and Spring semesters and 2 during Summer and one of the courses each semester online.
MATH-5653 - Problem Solving 1: Counting and Combinatorics
MATH-6003 - Dynamical Systems and Applications
Topics included linear dynamical systems and stability of linear systems, generation of dynamical systems by systems of ODE, local theory of dynamical systems, bifurcation theory, and applications.
MATH-6043 - Topics in Number Theory
Topics include divisibility, congruences, Quadratic reciprocity and Quadratic forms, number theory functions, Diophantine equations, Farey fractions and irrational numbers, continued fractions, primes and multiplicative number theory and the Partition Functions.
MATH-6103 - Discrete Optimization
Topics include discrete optimization problems, simplex algorithms, complexity, matching and weighted matching, spanning trees, matroid theory, integer linear programming, approximation algorithms, branch-and-bound, and local search and polyhedral theory.
MATH-6203 - Applied Probability
Topics include probability counting methods, discrete and continuous random variables and their distributions, expected value, sampling distributions, Central Limit Theorem, and normal approximation to the binomial.
MATH-6213 - Statistical Methods
This course will include the following topics: estimation, confidence intervals, hypothesis tests, nonparametric tests, analysis of variance, and regression.
MATH-6233 - Geometry
An introduction to Euclidean and non-Euclidean geometries developed with the study of constructions, transformations, applications, and the rigorous proving of theorems.
MATH-6253 - Mathematical Analysis I
Topics include the Real and Complex number systems, basic topological properties, numerical sequences and series, continuity of functions, the Riemann-Stieltjes Integral, sequences and series of functions, and the Lebesque Theory.
MATH-6263 - Mathematical Analysis II
Topics include metric spaces, topological spaces, compact spaces, Banach spaces, measure and integration, measure and outer measure, the Daniell Integral, and measure and topology.
MATH-6303 - Introduction to Mathematical Control Theory
Topics include discrete-time and continuous-time systems, reachability and controllability, feedback and stabilization, and outputs.
MATH-6363 - Partial Differential Equations
Classical methods used in partial differential equations. Topics include data propagating along characteristics, classifications of systems of the first order equation, the method of transforms and separation of variables, and typical applications of the wave and heat equations.
MATH-6403 - Signal Processing
Topics include Fourier Transforms, Fourier series, Fast Fourier Transforms, Fast Fourier Transforms, FFT, filtering, sampling, and digital signal processing.
MATH-6413 - Advanced Modern Algebra I
Topics include introduction to groups, subgroups, quotient group and homomorphisms, group actions, direct and semidirect products and Abelian groups, and further topics in Group Theory.
MATH-6423 - Advanced Modern Algebra II
Topics include introduction to rings, Euclidean domains, principle ideal domains and unique factorization domains, polynomial rings, field theory, and Galois Theory.
MATH-6473 - Combinatorial Analysis
An introduction to combinatorics. Topics include the pigeon hole principle, combinations, permutations, distributions, generating functions, recurring relations, and inclusion-exclusion.
MATH-6483 - Theory of Graphs
An introduction to the fundamental concepts of graph theory. Topics include isomorphisms, Euler graphs, Hamiltonian graphs, graph colorings, trees, networks, planarity.
MATH-6503 - Numerical Methods in Applied Mathematics
Topics include norms, floating-point arithmetic and rounding errors, wellposed computations, numerical linear algebra, iterative solutions of nonlinear equations, polynomial interpolation, and numerical differentiation and integration.
MATH-6513 - Applied Linear Algebra
Topics include linear equations solving, error analysis and accuracy, linear least square problems, non-symmetric eignevalue problems, symmetric eigenvalue problems and singular value decomposition, and iterative methods for linear systems.
MATH-6613 - Inverse Problems
Topics include basis facts from Functional Analysis, ill-posed problems, regularization of the first kind, regularization by discretization, and inverse eigenvalue problems.
MATH-6663 - Problem Solving 2: Geometry and Graphs
MATH-6743 - Advanced Perspective on Secondary Mathematics
Topics include features of an advanced perspective, Real and Complex numbers, functions, equations, integers and polynomials, and number system structures.
MATH-6903 - BioMathematics
Topics include model building in development of experimental science, mathematical theories and models for growth of one-species and two or more species systems, mathematical treatment of differential equations in models stressing qualitative and graphical aspects, difference equation models, and scrutiny of biological concepts.
MATH-6982 - Directed Readings
Directed readings are for graduate students who need to conduct an independent review of the literature in a topic not offered by the program curriculum. The topic must be approved by the supervising instructor and the graduate director or department chair.
MATH-6983 - Graduate Research Project
The research course is designed to teach students methods for mathematical research. Students will conduct research under the supervision of a faculty mentor. Each student will work on a unique research project to be selected by the faculty mentor and the student. Student should have 18 hours of graduate-level mathematics and approval of faculty advisor.
Guidelines for Admittance
- All graduate applicants must complete the online Grad Application. A one-time application fee of $40 is required.
- Applicants should also review the Graduate Studies Website for individual program specific requirements and tasks that must be completed prior to admission. See Graduate Studies Application Process.
- International applicants are subject to additional requirements and application deadlines. See Procedures for International Students.
- Official transcripts from a regionally or nationally accredited institution are required and should be sent directly to the UWG Graduate Admissions Office.
Program Specific Admittance Guidelines
- 2.7 cumulative undergraduate GPA (4.0 scale)
- 3 letters of recommendation
For regular admission to the program, students are expected to have a Bachelor's degree from an accredited institution, a cumulative GPA of at least 2.7 on all college level work, completion of the calculus sequence (equivalent of UWG courses MATH 1634, MATH 2644, MATH 2654) plus at least twelve hours of mathematics courses at the advanced undergraduate level (3000 level or higher, or the equivalent). The GRE is not required but may strengthen the student’s application.
Provisional admission: Applicants applying to a master's degree program in mathematics with less than the required GPA may be considered for provisional admission. They must have a grade point average of at least 2.2. In no event may the grade point average be less than 2.2. Applicants may also be admitted provisionally for reasons other than, or in addition to, grade point average. Meeting grade point average requirements is no guarantee of admission. Provisional admission is ultimately subject to departmental approval and the Dean of the College of Science and Mathematics.
The Department of Mathematics Website includes program information, directory of instructors and their credentials, as well as other vital information.
Specific Graduate Admissions Deadlines are available via the Graduate School
* Application, app fee, and document deadline
See The Scoop for more specific deadlines.
Admission Process Checklist
The Graduate Studies Application Process checklist is available here
One exception: If you will not ever be traveling to a UWG campus or site, you may apply for an Immunization Exemption. Contact the Immunization Clerk with your request.
UWG Graduate Admissions
1601 Maple Street
Carrollton, GA 30118-416
Contact Dr. Scott Gordon, Director of Graduate Studies in Mathematics, at firstname.lastname@example.org or 678-839-4134 with any other questions.
- L1. Develop and evaluate mathematical arguments and proofs.
- L2. Coherently communicate mathematical arguments and research results both orally and in writing.
- L3. Demonstrate alternate ways of approaching problems or mathematical modeling to solve a variety of problems.