Algebra 1-A (1 unit, 2 semesters)
This class is the first semester of Algebra I and is covered in two semesters. Topics covered include expressions, equations, functions, rational numbers, linear equations, proportional reasoning, graphing, and solving linear inequalities. Must have a grade of D or higher in first semester to continue in second semester of this class.
Algebra 1-B (1 unit, 2 semesters)
This class is the second semester of Algebra I and is covered in two semesters. Student must have received a grade of D or better in the second semester of Algebra I-A to enroll in this class. Topics include solving systems of linear equations and inequalities, polynomials, factoring, quadratic and exponential functions, rational and radical expressions, and equations. Must have a grade of D or higher in first semester of this class to enroll in the second semester.
Algebra 1 - 1
This course provides a foundation for higher mathematics. Topics covered include solving one and two variable equations, factoring, statistics, and the graphing of linear and quadratic functions.
Algebra 2 – 1
This course continues the students’ study of advanced algebraic concepts including functions, polynomials, rational expressions, complex numbers, systems of equations and inequalities, and matrices. Emphasis is placed on practical applications and modeling. Prerequisite: Algebra I.
Geometry - 1
This course in Euclidean geometry covers definitions, theorems, and postulates with an emphasis on logic and deductive proofs. Prerequisite: Algebra I.
Pre-calculus – 1
This course is the sequel to Algebra II. It covers the concepts of trigonometry, analytic geometry, advanced algebra topics, sequences and series. Because of limited enrollment, the prospective student must have earned a “B” or better in Algebra II or teacher approval.
Calculus - 1
Prerequisite: “B” in Pre-calculus or permission of the instructor. The course will emphasize the use of technology in studying differential and integral calculus of the elementary functions (non-trigonometric) including limits, continuity, the derivative, computation of derivatives, applications of the derivative, the definite integral, the fundamental theorem of calculus, computation of anti-derivatives, and applications of
|
