The Mathematics major prepares you to analyze complex discipline-based issues, synthesize information from multiple sources and perspectives, communicate skillfully in oral and written forms, and use appropriate technologies. The flexibility of the major gives you enough freedom to mold your degree along your particular interest toward a career or graduate school. Many mathematics majors pursue careers in industry (e.g. engineering, finance, business), teaching, and government service immediately upon graduation. Others continue on to graduate school, then pursue careers in research and university teaching.
If you transferred into CSUMB as an AS-T-certified student in mathematics, please see the AS-T certified requirements.
If you are unsure about your transfer status, please talk to a mathematics faculty advisor as soon as possible.
All other mathematics majors, see below.
> In order to graduate, you will also need to complete your general education and university requirements.
Complete ALL of the following courses:
Complete the general requirements for a Mathematics B.S. or select a concentration from the options below.
Complete the following courses:
Complete THREE of the following MATH or STAT Electives not counted above:
Complete ALL of the following courses:
Complete ONE of the following MATH/STAT Electives not counted previously:
Complete ALL of the following courses:
Complete ONE of the following MATH/STAT Electives not counted previously:
Students demonstrate the ability to combine disciplinary knowledge and community experiences to share the relevance and importance of mathematics with culturally, linguistically, technologically and economically diverse populations in the context of issues of social responsibility, justice, diversity and compassion.
Students demonstrate the ability to: (a) place mathematical problems in context and explore their relationship with other problems; (b) solve problems using multiple methods and analyze and evaluate the efficiency of the different methods; (c) generalize solutions where appropriate and justify conclusions; and (d) use appropriate technologies to conduct investigations, make conjectures and solve problems.
Students demonstrate the ability to: (a) articulate mathematical ideas verbally and in writing, using appropriate terminology; (b) present mathematical explanations suitable to a variety of audiences with differing levels of mathematical knowledge; (c) analyze and evaluate the mathematical thinking and strategies of others; (d) use clarifying and extending questions to learn and communicate mathematical ideas; and (e) use models, charts, graphs, tables, figures, equations and appropriate technologies to present mathematical ideas and concepts.
Students demonstrate the ability to: (a) reason both deductively and inductively; (b) formulate and test conjectures, construct counter-examples, make valid arguments and judge the validity of mathematical arguments; and (c) present informal and formal proofs in oral and written formats.
Students demonstrate the ability to: (a) investigate ways mathematical topics are interrelated; (b) apply mathematical thinking and modeling to solve problems that arise in other disciplines; (c) illustrate, when possible, abstract mathematical concepts using applications; (d) recognize how a given mathematical model can represent a variety of situations; (e) create a variety of models to represent a single situation; and (f) understand the interconnectedness of topics in mathematics from a historical perspective.
Students demonstrate the ability to: (a) analyze, compare and evaluate the appropriateness of technological tools and their uses in mathematics; (b) use technological tools such as computers, calculators, graphing utilities, video and other interactive programs to learn concepts, explore new theories, conduct investigations, make conjectures and solve problems; and (c) model problem situations and solutions, and develop algorithms (including computer programming).
These pathways are examples of how you might complete all the requirements for your degree in an order that makes sense given prerequisites. They are meant to give you a general sense of what your education will look like.
Your own unique situation and a number of other factors may mean your actual pathway is different. Perhaps you'll need an extra math or language class, or one of the courses we've listed isn't offered in a particular semester. Don't worry - there is flexibility built into the curriculum. You'll want to work closely with an advisor and use the academic advisement report to take all that into account and develop a pathway that's customized for you.
In the meantime, use this example as a starting point for choosing classes or discussing your plans with an advisor. Your advisor is your best resource when it comes to figuring out how to fit all the courses you need, in the right sequence, into your personal academic plan.
* This FYS class is just an example. The FYS class you choose might meet a different GE area, so you would have to adjust your actual pathway accordingly.
*This is one possible choice for a lower divsion service learning course. If you choose another course be sure that the D1 requirement is still met by the course or another GE course.
* This FYS class is just an example. The FYS class you choose might meet a different GE area, so you would have to adjust your actual pathway accordingly.
*This is one possible choice for a lower divsion service learning course. If you choose another course be sure that the D1 requirement is still met by the course or another GE course.