This course provides the opportunity to offer a new topic in the subject of mathematics.

Covers the material from MATH 2310 (Multivariable Calculus) plus topics from complex numbers, set theory, and linear algebra.  Prepares students for taking advanced mathematics courses at an early stage.  Success in this course and MATH 3315 (grades of B- or higher) exempts the student from the math major requirement of taking MATH 3351 and MATH 3250.

Prerequisite:  MATH 1320 or the equivalent.

Examines assumptions and methods in the original text of Euclid's Elements. Covers selected geometric topics such as symmetries, spherical geometry, curvature, the dissection theory of area, constructible numbers, and the discovery of non-Euclidean geometry. Prerequisite: Some familiarity with calculus.

Introduces fundamental concepts/techniques of probability/the theory of randomness. Focuses on problem solving/understanding key theoretical ideas. Topics include sample spaces combinatorial analysis/discrete and continuous random variables/classical distributions/expectation/Chebyshev’s inequality/independence/central limit theorem/conditional probability/generating functions. Prerequisite: MATH 1320. Recommended: knowledge of double integrals.