Math Placement Test for incoming students.
Undergraduate Courses
Course Delivery DEFINITIONS:
- Online Courses: In online teaching, 100% of instruction takes place online via Canvas and with supplemental platforms like Zoom. There are two types of online courses: asynchronous and synchronous.
- Asynchronous online: Course is fully online, with lessons, assignments, and activities posted in Canvas with due dates. Students complete coursework, engage in discussions, etc., based upon their own schedules, but are required to meet posted deadlines.
- Synchronous online: Online course that includes real-time class meetings using technology (e.g. Zoom). The number of required meetings varies based upon the particular class, but meetings take place during the scheduled class times. Faculty will inform students of the schedule for real-time meetings in their courses.
- Hybrid Courses: Hybrid courses combine both in-person, on-campus meetings with online instruction. All face-to-face activities take place during the regularly-scheduled meeting times in the rooms assigned on the course listing. The number of in-person meetings varies by course. Faculty will notify students of the exact meeting schedule for their courses.
If your class is not listed as online or hybrid, it will meet fully face-to-face following the noted class schedule.
Designed for the liberal arts student as an introduction to the real world of mathematics and financial literacy, this course takes the student through a variety of topics including consumer finances and voting systems. This course is designed as a Mathematics Liberal Arts course (MLA). Fall, Spring. (C6)
Designed for the liberal arts student as an introduction to the real world of mathematics and financial literacy, this course takes the student through a variety of topics including consumer finances and voting systems. This course is designed as a Mathematics Liberal Arts course (MLA). Fall, Spring. (C6)
Designed for the liberal arts student as an introduction to the real world of mathematics and financial literacy, this course takes the student through a variety of topics including consumer finances and voting systems. This course is designed as a Mathematics Liberal Arts course (MLA). Fall, Spring. (C6)
Designed for the liberal arts student as an introduction to the real world of mathematics and financial literacy, this course takes the student through a variety of topics including consumer finances and voting systems. This course is designed as a Mathematics Liberal Arts course (MLA). Fall, Spring. (C6)
This course is a study of the mathematical language of algebra as it pertains to basic functions such as linear, quadratic, and other polynomial functions. Students investigate how to reason with equations, graphs, and other algebraic representations and apply algebraic strategies to real-life contexts. Fall, Spring. (C6)
This course is a study of the mathematical language of algebra as it pertains to basic functions such as linear, quadratic, and other polynomial functions. Students investigate how to reason with equations, graphs, and other algebraic representations and apply algebraic strategies to real-life contexts. Fall, Spring. (C6)
This course is a study of the mathematical language of algebra as it pertains to basic functions such as linear, quadratic, and other polynomial functions. Students investigate how to reason with equations, graphs, and other algebraic representations and apply algebraic strategies to real-life contexts. Fall, Spring. (C6)
This course is a study of the mathematical language of algebra as it pertains to basic functions such as linear, quadratic, and other polynomial functions. Students investigate how to reason with equations, graphs, and other algebraic representations and apply algebraic strategies to real-life contexts. Fall, Spring. (C6)
This course is a study of the mathematical language of algebra as it pertains to basic functions such as linear, quadratic, and other polynomial functions. Students investigate how to reason with equations, graphs, and other algebraic representations and apply algebraic strategies to real-life contexts. Fall, Spring. (C6)
This course is designed for education majors to strengthen their mathematical skills. Topics covered: Numerical Classification and Rules of Divisibility, Base 10 numeration system, Ratios/Proportions/Unit Conversions, Percents, Quadrilateral Geometry, Circular Geometry, Triangular Geometry, 3-Dimensional Geometry, Graphing data and graph interpretation and Manipulatives. Prerequisite: MAT 180. Spring.
This non-calculus based course introduces students to the basic statistical concepts and techniques required for critically evaluating information, and developing decision-making skills. Topics to be studied include descriptive statistics; probability; inferential statistics; regression and correlation. Emphasis will be on understanding statistical methods, calculating statistics, and interpreting the results. Real-world applications from various fields such as business, health, behavioral and social sciences, education, biology, medicine, and industry will be discussed within each topic. After successful completion of this course, students will be able to demonstrate statistical literacy and the ability to think critically about information and how to make informed decisions and conclusions. See Placement Test policy under Academic Services. Fall, Spring. (C6)
This course provides an in-depth exploration of the common elementary functions that a student will meet in calculus: linear and higher degree polynomial functions, rational functions, exponential and logarithmic functions, and the trigonometric functions. General topics such as inverse functions, function composition, and the arithmetic for functions will also be discussed. If time allows, topics such as data analysis, matrix algebra, and difference equations will be presented. See Placement Test policy under Academic Services. Fall, Spring. (C6)
Calculus is the study of change. The topics of this first course of the calculus sequence are focused on differential calculus: continuous change and its applications. Topics include an introduction to functions, limits, continuity, differentiation, and its applications. Integration theory is also introduced. The topics are taught from the Archimedean 'Rule of Three' point of view: numerical, graphical and analytical. Use of technology is integral to this course. See Placement Test policy under Academic Services. Fall, Spring. (C6)
In the second course of the calculus sequence, the focus on integral calculus: the accumulation of quantities. The topics include techniques of integration and a variety of its applications, differential equations, and infinite sequences and series. The topics are taught from the Archimedean 'Rule of Three' point of view: numerical, graphical and analytical. Use of technology is integral to this course. See Placement Test policy under Academic Services. Prerequisite: MAT 190 with a "C" or better or equivalent 4-credit course in Calculus 1. Fall, Spring. (C6)
In the second course of the calculus sequence, the focus on integral calculus: the accumulation of quantities. The topics include techniques of integration and a variety of its applications, differential equations, and infinite sequences and series. The topics are taught from the Archimedean 'Rule of Three' point of view: numerical, graphical and analytical. Use of technology is integral to this course. See Placement Test policy under Academic Services. Prerequisite: MAT 190 with a "C" or better or equivalent 4-credit course in Calculus 1. Fall, Spring. (C6)
Linear Algebra topics encompass finite dimensional vector spaces, linear transformations of a vector space and the representation of these transformations by matrices, determinants, eigenvalues and eigenvectors. Prerequisite: MAT 191 or permission of the instructor. Offered Spring as needed.
Discrete Mathematical Structures provides an introduction to logic through truth tables, informal and formal proof; mathematical induction; sets, sequences and functions; matrices; equivalence relations; and Boolean algebra. Prerequisite: MAT 180. Fall, Spring. (C6)
Cross-listed with CSC 295 X1.
Basic Analysis is the theory of functions of a single real variable. Specifically, Analysis deals with the foundations of the Calculus and an introduction to the analysis of functions of one real variable. Topics include the real number system, basic topology of the real line, limits of sequences and functions, continuity, and differentiation. A rigorous development of the Riemann integral will also be given. Prerequisite: MAT 240 or permission of the instructor. Spring