The bachelor's degree is designed to provide students a contemporary mathematics education through constantly evolving curriculum that will:

• Empower them to obtain new skills as needed in their employment or future education
• Provide them with the skills and abilities to facilitate solving real world problems
• Allow them to be effective oral and written communicators

Students must acquire both a conceptual and operational understanding of the following core areas of the undergraduate program:

• Differential and integral calculus in one and several variables
• Abstract mathematics as represented by basic logic, set theory and methods of proof
• Linear algebra
• One area of specialization (e.g., differential equations, discrete mathematics, statistics, optimization)
• One area of breadth outside of specialty (e.g., graph theory, probability, statistics, real analysis, geometry, history of mathematics, abstract algebra, computer science)