This Master in the Art of Teaching with a Focus on Middle Level Mathematics concentrates on developing instructional leaders and the content knowledge middle school teachers need to know in order to be effective teachers of middle level mathematics. The degree incorporates the Principles and Standards for School Mathematics as outlined by the National Council of Teachers of Mathematics (NCTM).
Students in this middle level mathematics concentration complete six core courses, three capstone projects and the specialized courses below.
For a complete listing of the core courses and capstone projects, please click here.
Based on the National Council of Teachers of Mathematics (NCTM) Principles and Standards for School Mathematics, this course establishes a foundation of mathematical content knowledge and problem-solving skills. Participants develop deeper understanding of mathematical concepts they are required to teach and engage in mathematical discourse as a means to explain their thinking and share strategies.
Covering the Van Hiele levels of geometric thought and focusing on shapes and properties, transformations, location and visualization, as well as measurement concepts and skills, course allows teachers to develop a profound understanding of key mathematical concepts as outlined in the NCTM Principles and Standards for School Mathematics. Participants engage in hands-on problem-solving activities that allow them to apply new understanding to their instructional planning and decision making.
This course focuses on developing algebraic thinking, which includes studying patterns and functions, understanding the structure of the number system, using symbolism meaningfully and using mathematical modeling to solve problems. Participants study many common misconceptions about the learning of algebra to better understand the potential gaps in students' understanding.
This course is structured around the creation and completion of a real-life data analysis project that allows participants to apply knowledge and skills from other mathematical strands. Key concepts such as data collection, graphical representations of data, and measures of center are highlighted.