Math 1025 - Geometry in the Real World
Course Description: This course presents topics in geometry designed to enrich the student's understanding of mathematics. Geometry as it applies to the physical world and such fields as art, music, nature, motion, architecture and city planning will be examined. This course is designed to be accessible to students of all levels. This course fulfills the University's general education mathematics proficiency requirement.
Course Description: This course presents topics in mathematics as they relate to music. Fundamental concepts of music such as intervals, scales, chords, and tuning will be explored by developing an understanding of their mathematical underpinnings. An ability to read music in treble and bass clef is strongly recommended. This course fulfills the University's general education mathematics proficiency requirement.
Course Description: This course is a study of the trigonometric and inverse trigonometric functions with emphasis on trigonometric identities and equations.
Course Description: This course provides an introduction to differential and integral calculus. Topics may include limits, derivatives, related rates, Newton's method, the Mean-Value Theorem, Max-Min problems, the integral, the Fundamental Theorem of Integral Calculus, areas, volumes, and average values.
Course Description: The beauty of calculus is that it can be applied in so many disciplines, and yet after taking a standard calculus course, students are often left wondering, “When will I use this in real life?” This course answers that question by going beyond the calculus textbook to provide a hands-on look at how differentiation and integration can be used in both the natural and social sciences. Case studies will be used to explore calculus and mathematical modeling in a variety of interesting applications from economics, statistics, biology, and more.
Course Description: This is a foundational course in math. Topics may include factoring, complex numbers, rational exponents, simplifying rational functions, functions and their graphs, transformations, inverse functions, solving linear and nonlinear equations and inequalities, polynomial functions, inverse functions, logarithms, exponentials, solutions to systems of linear and nonlinear equations, systems of inequalities, matrices, and rates of change.
Course Description: his course introduces plane analytic geometry and basic differential and integral calculus with applications to various areas. No credit for Mathematics majors.
Course Description: This course introduces logic and set theory, partitions and counting problems, elementary probability theory, stochastic processes, Markov chains, vectors and matrices, linear programming, and game theory.
Course Description: This course is an introduction to probability and statistics. Topics may include probability, descriptive statistics, discrete and continuous random variables and their distribution functions, sampling and sampling distributions, confidence intervals, and one-variable hypothesis testing.
Course Description: This course examines topics including problem solving, patterns, sets, numeration systems, whole numbers and operations, positive rational numbers and operations, and an introduction to variables and equations, with an emphasis placed on using multiple techniques for each of the aforementioned topics.
Course Description: The course will cover basic concepts and methods in probability and statistics. Topics may include descriptive statistics, probabilities of events, random variables and their distributions, sampling distributions, estimation of population parameters, confidence intervals and hypothesis testing for population means and population proportions, chi-square tests.
Course Description: Topics include an introduction to probability, statistics, and displays of data; a study of elementary geometry, including points, lines, planes, angles, properties of triangles, properties of quadrilaterals, other 2- and 3-dimensional shapes; similarity; measurement and conversions; Pythagorean Theorem; perimeter; area; surface area, and volume.