Course description
In Transition Algebra, students will extend their Algebra I and Geometry skills to solve problems in greater depth. Students are expected to master algebraic mechanics, understand the underlying theory, as well as apply the concepts to real-world situations in a meaningful way. Students extend knowledge and understanding of the real number system and its properties through the study of variables, expressions, equations, inequalities, and the analysis of data from real world phenomena. Emphasis is placed on algebraic connections to arithmetic, geometry, and statistics. Students investigate properties of triangles, quadrilaterals, polygons, circles, and solids using inductive and deductive reasoning.