200
Bridges the gap between computational, algorithmic mathematics courses and more abstract, theoretical courses. Emphasizes the structure of modern mathematics: axioms, postulates, definitions, examples conjectures, counterexamples, theorems, and proofs. Builds skill in reading and writing proofs. Includes careful treatment of sets, functions, relations, cardinality, and construction of the integers, and the rational, real, and complex number systems.
Vector spaces, linear independence, basis and dimension, linear mappings, matrices, linear equations, determinants, Eigen values, and quadratic forms.
Students on an F-1 visa are eligible to work off campus to provide additional experience so long as the employment relates directly to the student's major area of study. The practical experience gained outside the traditional classroom supplements the theoretical and/or applied knowledge as a part of the student's coursework. The registration process for this course must be completed every term (including summers), as students must have their work authorization reissued each term to ensure continued enrollment. Jobs must be approved and verified by the International Programs Office before work may begin.