While supplies last.
This book is designed to help teachers implement the marvelous power of TI-nspire in the teaching of Algebra 2.
Table of Contents
Unit 1: Numbers & Number Systems
Exploration 1: The Fundamental Theorem of Arithmetic
Exploration 2: Greatest Common Divisor & Least Common Multiple
Exploration 3: From Integers to Rational Numbers
Exploration 4: The Discovery of Irrational Numbers
Exploration 5: The Golden Ratio & ational Aproximations
Exploration 6: Complex Numbers: Rectangular From
Exploration 7: Complex Numbers: Operations
Unit 2: Sequences, Series, & Functions
Exploration 8: Using Formulas to Define Sequences
Exploration 9: Using Recursion to Define Sequences
Exploration 10: The Sum of an Arithmetic Series
Exploration 11: The Sum of a Geometric Series
Exploration 12: Sums of Infinite Series
Exploration 13: Applications of Sequences: Future Value
Exploration 14: Applications of Sequences: Present Value
Unit 3: Matrices
Exploration 15: Matrices & Matri Transformations
Exploration 16: Products of Matrices
Exploration 17: Matrix Transformations
Exploration 18: Successive Transformations
Exploration 19: The Determinant of a Matrix
Exploration 20: The Inverse of a Matrix
Unit 4: Linear Systems
Exploration 21: Solving a Linear System Using a Table or Gaph
Exploration 22: Solving a Linear System Using Algebra
Exploration 23: Analyzing 2 x 2 Linear Systems
Exploration 24: Solving Systems of Linear Ineqalities
Exploration 25: Linear Programming
Exploration 26: Solving 3 x 3 Linear Systems
Unit 5: Quadratic Functions & Equations
Exploration 27: Quadratic Growth: From Table to Graphs
Exploration 28: Analyzing Quadratic Functions in Vertex Form
Exploration 29: Analyzing Quadratic Functions in Standard Form
Exploration 30: The Roots of a Quadratic Equation
Exploration 31: Quadratic Inequalities
Exploration 32: Using Quadratic Functions to Model Data
Unit 6: Polynomials & Polynomial Equations
Exploration 33: From Monomials to Polynomials
Exploration 34: Products & Powers of Polynomials
Exploration 35: Factoring Polynomials
Exploration 36: The Remainder Theorem & The Factor Theorem
Exploration 37: The Fundamental Theorem of Algebra
Exploration 38: Transforming Polynomial Functions
Exploration 39: Modeling Data with Polynomial Functions