pp. 4 8: Examples 1 6 Quick Check 1 6 Exercises 1, 2, 20, 42, 43, 64

Semester 1 Text: Chapter 1: Tools of Algebra Lesson 1-1: Properties of Real Numbers Day 1 Part 1: Graphing and Ordering Real Numbers Part 1: Graphing and Ordering Real Numbers Lesson 1-2: Algebraic Expressions Day 2 Part 1: Evaluating Algebraic Expressions Part 2: Simplifying Algebraic Expressions How do we name and order real numbers, and how do we use properties of real numbers? How do we use properties and the order of operations to evaluate and simplify algebraic expressions? Lesson 1-3: Solving Equations Day 3 Part 1: Solving Equations How do we use properties of equality to solve equations? Day 4 Part 2: Writing Equations to Solve Problems Lesson 1-4: Solving Inequalities Day 5 Part 1: Solving and Graphing Inequalities Part 2: Compound Inequalities How do we relate solving inequalities to solving equations? Lesson 1-5: Absolute Value Equations and Inequalities Day 6 Part 1: Absolute Value Equations Day 7 Part 2: Absolute Value Inequalities How can we apply the definition of absolute value to solve an absolute value equation? How do we solve absolute value inequalities? Graphing and ordering real numbers. Identifying and using properties of real numbers. Evaluating algebraic expressions. Combining like terms. Learning procedures to solve equations. Solving word problems by writing and solving equations. Solving inequalities involving linear expressions in one variable. Understanding the procedures to solve an absolute value equation. Solving and graphing an absolute value inequality. pp. 4 8: Examples 1 6 Quick Check 1 6 Exercises 1, 2, 20, 42, 43, 64 pp. 12 14: Exercises 1, 2, 10, 21, 22, 50 pp. 18 19: Exercises 8, 14, 28, 37 pp. 20 21: Examples 5, 6 Quick Check 5, 6 Exercises 29, 33, 35, 48 pp. 26 29: Examples 1 6 Quick Check 1 6 Exercises 17, 18, 22, 27, 37 pp. 33 34: Exercises 6, 8, 10, 35 pp. 35 36: Examples 4 6 Quick Check 4 6 Exercises 17, 22, 28, 45 pp. 8 9: Exercises 5 37 odd, 46 54 even, 79 83 pp. 15 16: Exercises 3 15 odd, 24 44 even, 52, 63 Exercises 1 27 odd, 36 46 even Exercises 30 32, 34, 49 54 pp. 29 31: Exercises 1 15 odd, 18 26 even, 31, 33, 35, 39, 48 Exercises 1 15 odd, 34 42 even Exercises 16 20 even, 23 33 odd, 44 52 even, 55 A2.CM.12 A2.CN.3 A2.CM.11 A2.A.1 A2.A.1 p. 1

Semester 1 Lesson 1-6: Probability Day 8 Part 1: Experimental Probability Part 2: Theoretical Probability How do we calculate empirical and theoretical probabilities? Text: Chapter 2: Functions, Equations, and Graphs Lesson 2-1: Relations and Functions Day 9 Day 10 Part 1: Graphing Relations Part 2: Identifying Functions Lesson 2-2: Linear Equations Day 11 Part 1: Graphing Linear Equations Day 12 Part 2: Writing Equations of Lines Lesson 2-3: Direct Variation Day 13 Part 1: Writing and Interpreting a Direct Variation Lesson 2-4: Using Linear Models Day 14 Part 1: Modeling Real-World Data Part 2: Predicting with Linear Models What is the definition of a relation? How do we determine whether a relation is a function? How do we graph equations of lines? How do we write linear equations? How can we identify and apply direct variation? When is it appropriate to use a linear equation to model a real-world situation? Finding experimental and theoretical probabilities. Graphing a relation, identifying its domain and range. Using the vertical-line test. pp. 39 42: Exercises 4, 14, 28, 38 pp. 55 56:, Exercises 1, 5, 8, 32 pp. 55 56: Examples 4 6, Quick Check 4 6 Exercises 12, 18, 22, 36 Graphing linear equations. pp. 62 64: Exercises 2, 10, 18, 43 Writing equations of lines. Using direct variation to solve for unknown values. Using scatterplots and trendlines to make predictions. pp. 64 67: Examples 4 7 Quick Check 4 7 Exercises 20, 29, 39, 66 pp. 72 74: Exercises 23, 24, 33, 41 pp. 78 80: Exercises 3, 5, 12, 20 pp. 42 44: Exercises 1 13 odd, 15, 16, 17, 20, 22, 24 27, 29 33, 40, 41 pp. 55 56: Exercises 1 4, 6, 7, 9 11, 33-35 pp. 55 56: Exercises 13 17, 19, 20, 23 31 odd, 33, 37, 39, 40 47 pp. 67 68: Exercises 1 19 odd, 42 50 even pp. 67 68: Exercises 22 40 even, 51 61 odd, 67, 75 pp. 74 76: Exercises 1 21 odd, 25 31 odd, 34 48 even, 52 pp. 81 82: Exercises 2 10 even, 13 25 odd A2.S.13 A2.S.14 A2.A.37, A2.A.38, A2.A.39, A2.A.52 A2.PS.4, A2.RP.3 A2.A.5 A2.S.6 p. 2

Semester 1 Lesson 2-5: Absolute Value Functions and Graphs (Optional) Lesson 2-6: Families of Functions Day 15 Part 1: Translations Part 2: Stretches, Shrinks, and Reflections How can we use transformations to write equations of functions and graph equations? Performing transformations with functions. Lesson 2-7: Two-Variable Inequalities Day 16 Part 1: Graphing Linear Inequalities Part 2: Graphing Two- Variable Absolute Value Inequalities (Optional) How do we graph the solutions to a linear inequality? Text: Chapter 3: Linear Systems Lesson 3-1: Graphing Systems of Equations Day 17 Part 1: Systems of Linear Equations How do we solve a system of linear equations by graphing? Text: Lesson 3-2: Solving Systems Algebraically Day 18 Part 1: Solving Systems by Substitution When can we use substitution to solve a system of equations? Day 19 Part 2: Solving Systems by Elimination When can we use the method of elimination to solve a system of equations? Text: Lesson 3-3: Systems of Inequalities Day 20 Part 1: Solving Systems of Inequalities How do we solve a system of inequalities? Correctly graphing the boundary line and the shaded region that represent the solution region. Solving a system by graphing. Solving a system using substitution. Solving a system using elimination. Using a table or graphing to solve a systems of inequalities. pp. 94 96: Exercises 6, 12, 27, and 42 pp. 101 103: Exercises 2, 4, 23, 36 pp. 119 120: Exercises 6, 12, 25, 41 pp. 125 126: Exercises 1, 3, 13, 44 pp. 126 127: Examples 3 5 Quick Check 3 5 Exercises 18, 19, 33, 43 pp. 133 135: Exercises 4, 10, 18, 35 pp. 97 99: Exercises 1 21 odd, 24 40 even, 43 pp. 104 105: Exercises 1 19 odd, 24 28 even, 37, 38, 43 pp. 119 120 Exercises 1 23 odd, 26 44 even, 45 49 odd Exercises 3 12, 14-17 Exercises 20 40 even, 45 57 odd, 62 Exercises 1 29 odd, 30 40 even A2.A.40, A2.A.41, A2.A.46 A2.PS.2 A2.PS.10 A2.PS.4 p. 3

Semester 1 Text: Lesson 3-4: Linear Programming Day 21 Part 1: Finding Maximum and Minimum Values Part 2: Solving Problems with Linear Programming How can we use graphs of linear inequalities to solve problems? Text: Lesson 3-5: Graphs in Three Dimensions Day 22 Part 1: Graphing Points in Three Dimension Part 2: Graphing Equations in Three Dimensions (Optional) How do we locate a point in a three-dimensional coordinate system? Using graphs to of linear inequalities to represent problem situations. Graphing points with three coordinates. Text: Lesson 3-6: Systems with Three Variables (Optional) Text: Chapter 4: Matrices Lesson 4-1: Organizing Data Into Matrices Day 23 Part 1: Identifying Matrices What are matrices? Identifying the dimensions of a matrix and element of a matrix. Day 24 Part 2: Organizing Statistical Data How can we use matrices? Text: Lesson 4-2: Adding and Subtracting Matrices Day 25 Part 1: Adding and How do we add and Subtracting Matrices subtract matrices? Part 2: Solving Matrix Equations (Optional) Text: Lesson 4-3: Matrix Multiplication Day 26 Part 1: Multiplying a What is scalar Matrix by a Scalar multiplication? Part 2: Multiplying Matrices (Optional) Using matrices to organize data. Using matrix addition and subtraction. Multiplying the elements of a matrix by a scalar. pp. 139 141: Exercises 1, 7, 9, 14 pp. 146 147: Exercises 1, 9, 13, 25 pp. 168 169: Exercises 1, 2, 6, 18 pp. 169 170: Examples 3, 4 Quick Check 3, 4 Exercises 12, 14, 15, 16 pp. 174 176: Exercises 2, 3, 6, 22 pp. 182 184: Examples 1 3 Exercises 1, 5, 8, 30 Exercises 2 10 even, 11 19 odd, 20 Exercises 2 18 even, 37 46, 48 Exercises 3 5, 7 11, 20 25 Exercises 12 117, 26 Exercises 1, 4, 5, 7 9, 18 21, 23, 27 Exercises 3 12, 14-17 A2.PS.4 A2.R.1 A2.R.2 p. 4

Semester 1 Lesson 4-4: Geometric Transformation With Matrices Day 27 Part 1: Translations and Dilations with Matrices Day 28 Part 2: Reflections and Rotations with Matrices How can we use matrices to represent translations and dilations? How can we use matrices to represent reflections and rotations? Representing translations and dilations with matrices. Representing reflections and rotations with matrices. Lesson 4-5: 2 2 Matrices, Determinants, and Inverses (Optional) Lesson 4-6: 3 3 Matrices, Determinants, and Inverses (Optional) Lesson 4-7: Inverse Matrices and Systems (Optional) Lesson 4-8: Augmented Matrices and Systems (Optional) Text: Chapter 5: Quadratic Equations and Functions Lesson 5-1: Modeling Data with Quadratic functions Day 29 Part 1: Quadratic Functions and Their Graphs Part 2: Using Quadratic Models How can we use quadratic functions? Identifying the graph of a quadratic function. Lesson 5-2: Properties of Parabolas (Optional) Lesson 5-3: Transforming Parabolas Day 30 Part 1: Using Vertex Form How do we graph and write an equation of a parabola? Lesson 5-4: Factoring Quadratic Expressions Day 31 Part 1: Finding Common and Binomial Factors How do we factor a quadratic expression of the form ax 2 + bx + c? Day 32 Part 2: Factoring Special Expressions How do we factor quadratic expressions of the form a 2 ± 2ab + b 2 and a 2 b 2? Performing translations with parabolas. Finding common and binomial factors of quadratic expressions. Factoring a perfect square trinomial and the difference of two squares. pp. 191 193: Exercises 1, 5, 6, 26 pp. 193 195: Examples 3, 4 Quick Check 3, 4 Exercises 10, 13, 17, 42 pp. 238 240: Exercises 9, 12, 21, 34 pp. 252 255: Exercises 3, 15, 28, 39 pp. 259 262: Examples 1 6 Quick Check 1 6 Exercises 2, 8, 20, 25, 50 pp. 262 263: Examples 7, 8 Quick Check 7, 8 Exercises 31, 32, 44, 46, 51 Exercises 2 4, 7 9, 24, 25, 27 30, 39 41 Mixed Review 60 Exercises 11, 12, 14 16, 18 23, 31 34 Test Prep 51, 52 Exercises 2 22 even, 23 33 odd Exercises 6 20 even, 23 37 odd, 42, 43, 51 Exercises 1 39 odd, 60 62 Exercises 33 43, 47 49, 52 66 even Test Prep 82 A2.PS.4, A2.RP.1, A2.CN.3 A2.S.7, A2.A.40, A2.A.41 A2.A.46 A2.A.7 p. 5

Semester 1 Lesson 5-5: Quadratic Equations Day 33 Part 1: Solving by Factoring and Finding Square Roots Part 2: Solving by Graphing How do we solve quadratic equations that can be factored? Lesson 5-6: Complex Numbers Day 34 Day 35 Part 1: Identifying Complex Numbers Part 2: Operations with Complex Numbers What is the square root of a negative number? How do we add and multiply complex numbers? Lesson 5-7: Completing the Square Day 36 Part 1: Solving Equations by Completing the Square How can we solve a quadratic equation in standard form when the quadratic expression is not factorable? Day 37 Part 2: Rewriting a Function by Completing the Square How can we apply the technique of completing the square? Lesson 5-8: The Quadratic Formula Day 38 Part 1: Using the Quadratic Formula How do we solve quadratic equations using the quadratic formula? Day 39 Part 2: Using the Discriminant What are the relationships between the discriminant and the solutions to a quadratic equation? Solving quadratic equations by factoring completely and by graphing. Recognizing imaginary and complex numbers. Simplifying sums and products of complex numbers. Solving quadratic equations by completing the square. Rewriting a quadratic function in vertex form. Deriving and using the quadratic formula. Using the discriminant to determine the nature of the roots of a quadratic equation. pp. 267 269: Exercises 6, 12, 17, 29, 36 pp. 274 275: Exercises 10, 14, 22, 55 pp. 276 277: Examples 4 8 Quick Check 4 8 Exercises 24, 29, 41, 65 pp. 282 284: Exercises 2, 17, 25, 56 pp. 284 285: Examples 6, 7 Quick Check 6, 7 Exercises 28, 34, 37, 49 pp. 289 291: Exercises 9, 16, 29, 45 pp. 291 293: Examples 5, 6 Quick Check 5, 6 Exercises 31 33, 57 Exercises 1 11 odd, 13 30 even, 35, 37, 51, 52, 54 Exercises 1 9, 15 21 Exercises 25 28, 30 40 even, 42, 43, 47, 51, 52, 56 64 Exercises 1 11, ood, 14 26 even, 40, 41, 53 Exercises 29 33, 35, 36, 38, 39, 50 Challenge 57 Test Prep: 64, 65 Exercises 2 12 even, 13 21 odd, 22 30 even, 41 43, 49, 56, 68 Exercises 34 40, 55, 58 63, 65, 66 Test Prep 76, 77 A2.A.7 A2.N.6, A2.N.7, A2.N.9 A2.A.24, A2.N.6 A2.A.2, A2.A.25, A2.N.6 p. 6

Semester 1 Text: Chapter 6: Polynomials and Polynomial Functions Lesson 6-1: Polynomial Functions Day 40 Part 1: Exploring Polynomial Functions Part 2: Modeling Data With a Polynomial Function How is the shape of the graph of a polynomial function related to the degree of the polynomial? Lesson 6-2: Polynomials and Linear Factors Day 41 Part 1: The Factored Form of a Polynomial How do we write a polynomial in factored form? Day 42 Part 2: Factors and Zeros of a Polynomial Function What is the connection between the factors of a polynomial and the zeros of the related polynomial function? Lesson 6-3: Dividing Polynomials Day 43 Part 1: Using Long Division How do we use long division to divide polynomials? Day 44 Part 2: Using Synthetic Division What is synthetic division, and how can we use it to divide polynomials? Lesson 6-4: Solving Polynomial Equations Day 45 Part 1: Solving Equations by Graphing How can we use graphing to solve polynomial equations of degree greater than two? Classifying polynomials, and modeling data using polynomial functions. Analyzing the factored form of a polynomial. Writing a polynomial function from its zeros. Dividing polynomials using long division. Dividing polynomials using synthetic division. Using graphing to find the solutions to polynomial equations of higher degree. pp. 306 309: Exercises 10, 14, 23, 45 pp. 313 315: Exercises 4, 10, 13, 38 pp. 315 316: Examples 4 6 Quick Check 4 6 Exercises 16, 21, 34, 51 pp. 320 321: Exercises 1, 2, 9, 35 pp. 321 323: Examples 3 5 Quick Check 3 5 Exercises 13, 23, 26, 50 pp. 327 328: Exercises 1, 2, 10, 33 Exercises 1 17 odd, 18 22 even, 31, 43, 44, 46, 47 Exercises 1 11 odd, 14, 15, 39, 40, 41 49 odd Exercises 17 20, 22 28 even, 29 35 odd, 52 56 Test Prep 66, 67, 69 Exercises 3 8, 10 12, 37 41 Exercises 15 22, 24, 25, 27 33 odd, 42 49, 52, 53 Exercises 3 9, 11, 34 39, 61 65 A2.A.40, A2.A.41, A2.S.6 A2.A.7, A2.A.26 A2.A.7, A2.A.26 A2.A.26 p. 7

Semester 1 p. 8 Day 46 Part 2: Solving Equations by Factoring How can we use factoring to solve polynomial equations of degree greater than two? Lesson 6-5: Theorems About Roots of Polynomial Equations Day 47 Part 1: The Rational Root Theorem Part 2: Irrational Root Theorem and Imaginary Root Theorem How can we solve equations using the Rational Root Theorem, the Irrational Root Theorem, and the Imaginary Root Theorem? Lesson 6-6: The Fundamental Theorem of Algebra Day 48 Part 1: The Fundamental Theorem of Algebra How do we use the Fundamental Theorem of Algebra to solve polynomial equations with complex roots? Lesson 6-7: Permutations and Combinations Day 49 Part 1: Permutations How do we solve problems Part 2: Combinations involving combinatorial analysis? Lesson 6-8: The Binomial Theorem Day 50 Part 1: Binomial Expansion and Pascal s Triangle Part 2: The Binomial Theorem How can we find any given term in a binomial expansion? Text: Chapter 7: Radical Functions and Rational Exponents Lesson 7-1: Roots and Radical Expressions Day 51 Part 1: Roots and Radical Expressions How do we simplify radical expressions? Using factoring to find the solutions to polynomial equations of higher degree. Using the Rational Root Theorem to find the rational roots of a polynomial equation and using conjugates to find irrational roots of a polynomial equation. Using the Fundamental Theorem of Algebra to find all zeros of polynomial function. Finding permutations and combinations. Expanding a binomial using Pascal s Triangle and the Binomial Theorem pp. 328 329: Examples 3 6 Quick Check 3 6 Exercises 15, 22, 29, 44 pp. 335 338: Exercises 1, 7, 24, 30 pp. 341 343: Exercises 1, 7, 15, 27 pp. 345 347: Exercises 11, 27, 32, 39 pp. 353 355: Exercises 11, 13, 21, 46 Simplifying n th roots. pp. 369 317L Exercises 15, 25, 30, 34 Exercises 12 32 even, 40, 41, 43 59 odd Exercises 2 12 even, 13 31 odd, 32-36 Exercises 2 6, 9 14, 17 26 Exercises 1 9 odd, 10 26 even, 29 31, 40, 46 49, 55 Exercises 2 12 even, 13 19 odd, 23 41 odd, 43 45, 48, 54, 61 Exercises 2 28 even, 29 37 odd, 38, 43 53 odd A2.A.26 A2.N.8 A2.CN.8 A2.S.10, A2.S.22 A2.A.36, A2.S.11 A2.A.8, A2.A.13

Semester 1 Lesson 7-2: Multiplying and Dividing Rational Expressions Day 52 Part 1: Multiplying Radical Expressions How do we multiply radical expressions? Learning how to multiply radical expressions. Day 53 Part 2: Dividing Radical Expressions How do we divide radical expressions? Lesson 7-3: Binomial Radical Expressions Day 54 Part 1: Adding and Subtracting Radical Expressions How do we add and subtract radical expressions? Day 55 Part 2: Multiplying and Dividing Binomial Radical Expressions How do we multiply and divide radical expressions? Lesson 7-4: Rational Exponents Day 56 Part 1: Simplifying Expressions With Rational Exponents How do we simplify expressions with fractional exponents? Rationalizing the denominator. Lesson 7-5: Solving Square Root and Other Radical Equations Day 57 Part 1: Solving Radical Equations Lesson 7-6: Function Operations Day 58 Part 1: Operations With Functions Part 2: Composition of Functions How do we solve radical equations and check for extraneous roots? How do we perform operations on functions, including addition, subtraction, multiplication, division, and composition? Performing addition and subtraction of radical expressions. Performing multiplication and division of radical expressions. Rewriting algebraic expressions with fractional exponents in simplest form. pp. 374 375: Exercises 3, 13, 22, 56 pp. 375 377: Examples 4 6 Quick Check 4 6 Exercises 25, 28, 35, 36 pp. 380 381: Exercises 5, 6, 10, 31 pp. 381 382: Examples 4 6 Quick Check 4 6 Exercises 15, 19, 23, 40 pp. 385 388: Exercises 10, 34, 46, 69 Solving radical equations. pp. 391 394: Exercises 11, 13, 22, 33 Performing function addition, subtraction, multiplication, division, and composition. pp. 398 400: Exercises: 7, 19, 40, 62 Exercises 1, 2, 4 12, 14 21, 37 45 odd, 58 Exercises 23, 24, 26 34, 46 55, 60 Exercises 1 4, 7 9, 11, 12, 27 30, 32 Mixed Review 67-70 Exercises 14 26 even, 33 45 odd Test Prep 58 60 Exercises 5 45 odd, 62, 66 70 even Exercises 1 20 even, 21 31 odd, 32, 40, 41 Exercises 2 30 even, 31 43 odd, 53, 58, 59, 71 A2.A.13, A2.A.14, A2.A.15 A2.N.5, A2.A.13, A2.A.14 A2.A.10, A2.A.11 A2.A.11, A2.A.22 A2.A.40, A2.A.41, A2.A.42 p. 9

Semester 1 Lesson 7-7: Inverse Relations and Functions Day 59 Part 1: The Inverse of a Function How do we determine the inverse of a function? Finding the inverse of a relation or function. Lesson 7-8: Graphing Square Root and Other Radical Functions Day 60 Part 1: Radical Functions How can we use transformations to graph radical functions? Graphing square root and other radical functions. pp. 406 409: Examples 1 6 Quick Check 1 6 Exercises 9, 14, 25, 29, 41 pp. 414 417: Examples 1 6 Quick Check 1 6 Exercises 1, 5, 15, 20, 29, 48 Exercises 1, 2, 6 12 even, 15 21 odd, 24 30 even, 31 34, 37, 38, 44, 51 Exercises 2 16 even, 21, 22, 24 26, 31, 32, 43 51 odd, 52-55 A2.A.41, A2.A.44, A2.A.45 A2.A.46 p. 10

Semester 2 Text: Chapter 8: Exponential and Logarithmic Functions Lesson 8 1: Exploring Exponential Models Day 61 Day 62 Part 1: Exponential Growth Part 2: Exponential Decay How do we model exponential growth? How do we model exponential decay? Lesson 8-2: Properties of Exponential Functions Day 63 Part 1: Comparing Graphs What are the roles of the constants in y = ab cx? Day 64 Part 2: The Number e How do we use e as a base in a logarithm? Lesson 8-3: Logarithmic Functions as Inverses Day 65 Part 1: Writing and Evaluating Logarithmic Expressions How do we evaluate logarithmic expressions? Day 66 Part 2: Graphing Logarithmic Functions How do we graph logarithmic functions? Text: Lesson 8-4: Properties of Logarithms Day 67 Part 1: Using the Properties of Logarithms What are the properties of logarithms and how can we use them? Graphing functions of the form y = b x, where b > 1. Graphing functions of the form y = b x, where 0 < b < 1. Graphing the family of exponential functions. Evaluating exponential expressions with base e. Evaluating logarithmic expressions. Graphing logarithmic functions using the inverse of the related exponential function. Applying the properties of logarithms to rewrite logarithmic expressions. pp. 430 432: Exercises 1, 5, 10, 36 pp. 432 434: Examples 4 6 Quick Check 4 6 Exercises 16, 17, 34, 41 pp. 439 441: Exercises 5, 9, 16, 35 pp. 441 442: Examples 4, 5 Quick Check 4, 5 Exercises 18, 19, 25, 36 pp. 446 448: Exercises 2, 13, 14, 26, 53 pp. 448 449: Examples 5 6 Quick Check 5 6 Exercises 35, 40, 75 pp. 454 456: Exercises 15, 25, 32, 41 Exercises 2 4, 6 9, 11 15, 54, 55 Exercises 18 33, 35, 37 40, 43, 44 Exercises 2 14 even, 15, 17, 27 29, 32 34, 38 Exercises 20 24, 26, 30, 37, 40 47 Exercises 2 12 even, 15 33 odd, 41, 48 50, 54 56 Exercises 36 39, 52, 63 74 Exercises 1 9 odd, 12 30 even, 31, 33 39 odd, 42, 56, 57, 72, 75 p. 1 A2.A.6, A2.A.53 A2.A.12, A2.A.53 A2.A.18, A2.A.44, A2.A.54 A2.A.18, A2.A.19

Semester 2 Lesson 8-5: Exponential and Logarithmic Equations Day 68 Part 1: Solving Exponential Equations How do we solve exponential equations? Day 69 Part 2: Solving Logarithmic Equations Lesson 8-6: Natural Logarithms Day 70 Part 1: Natural Logarithms Part 2: Natural Logarithmic and Exponential Equations Text: Chapter 9: Rational Functions Lesson 9 1: Inverse Variation Day 71 Part 1: Using Inverse Variation Part 2: Using Joint and Other Variations (Optional) How do we solve logarithmic equations? What is the graph of the natural logarithmic functions, and how do we solve exponential equations? How can we use inverse variation? Text: Lesson 9-2: The Reciprocal Function Family (Optional) Lesson 9-3: Rational Functions and Their Graphs (Optional) Text: Lesson 9-4: Rational Expressions Day 72 Part 1: Rational Expressions Part 2: Multiplying and Dividing Rational Expressions How do we simplify, multiply, and divide rational expressions? Solving exponential equations by taking the logarithm of each side. Applying the Change of Base Formula. Graphing natural logarithmic functions and solving exponential equations. Using inverse variation to solve for unknown values. Simplifying rational expressions by factoring polynomials. pp. 461 462: Exercises 14, 18, 24, 50 pp. 462 464: Examples 5 7 Quick Check 5 7 Exercises 26, 34, 47, 55 pp. 470 472: Exercises 8, 18, 30, 56 pp. 488 489: Exercises 5, 11, 14, 49 pp. 509 511: Exercises 5, 12, 15, 23 Exercises 1 23 odd, 49, 53, 54, 58, 60 Exercises 25 41 odd, 42 46, 56 59, 64, 69 75 odd, 76, 77 Exercises 1 21 odd, 23 29, 40, 44, 55 61 odd Exercises 1 12 even, 13, 15, 28 34 even, 35, 43 48, 52 Exercises 1 4, 6 11, 14 22 even, 26, 27 31 odd p. 2 A2.A.18, A2.A.19 A2.A.27, A2.A.53 A2.A.5 A2.A.7, A2.A.17

Semester 2 Lesson 9-5: Adding and Subtracting Rational Expressions Day 73 Part 1: Adding and Subtracting Rational Expressions How do we add and subtract rational expressions? Performing addition and subtraction with rational expressions. Day 74 Part 2: Simplifying Complex Fractions How do we simplify complex fractions? Lesson 9-6: Solving Rational Equations Day 75 Part 1: Solving Rational Equations Activity Lab: Rational Inequalities pp. 528 529 How do we solve rational equations and inequalities? Day 76 Part 2: Using Rational Equations How can we use rational equations to solve problems? Text: Lesson 9-7: Probability of Multiple Events Day 77 Part 1: Finding P(A and B) Part 2: Finding P(A or B) How do we find the probability of independent, dependent, and mutually exclusive events? Text: Chapter 10: Quadratic Relations and Conic Sections Text: Lesson 10-1: Exploring Conic Sections (Optional) Text: Lesson 10-2: Parabolas (Optional) Simplifying complex fractional expressions. Solving rational equalities and inequalities. Applying rational equations. Calculating theoretical probabilities. pp. 514 516: Exercises 9, 14, 18, 37 p. 516: Example 5 Quick Check 5 Exercises 23, 29, 44 pp. 522 523: Exercises 2, 19, 47 pp. 528 529, Activity Lab: Activity 1 pp. 523 524: Examples 3, 4 Quick Check 3, 4 Exercises 23, 32 pp. 531 534: Exercises 4, 10, 20, 30 Exercises 1 8, 11 21 odd, 32 40 even, 43 Exercises 22 30 even, 45 51 odd, 52, 54 Exercises 1 9 odd, 10 20 even, 27 31 odd, 40 52 even pp. 528 529: Activities 2 and 3, Exercises 11-13, 15 Exercises 22, 24, 25, 33 38, 53, 55 Exercises 1 3, 5 25 odd, 36 40, 45 p. 3 A2.N.3, A2.A.17 A2.A.7, A2.A.17, A2.A.23

Semester 2 Lesson 10-3: Circles Day 78 Part 1: Writing the Equation of a Circle Day 79 Part 2: Using the Center and Radius of a Circle What is the standard form of an equation of a circle? How do we graph an equation of a circle? Lesson 10-4: Ellipses (Optional) Lesson 10-5: Hyperbolas (Optional) Lesson 10-6: Translating Conic Sections (Optional) Text: Chapter 11: Sequences and Series Text: Lesson 11-1: Mathematical Patterns Day 80 Part 1: Identifying Mathematical Patterns Part 2: Using Formulas to Generate Mathematical Patterns How do we use a formula to find the n th term of a sequence? Lesson 11-2: Arithmetic Sequences Day 81 Part 1: Identifying and Generating Arithmetic Sequences How do we identify an arithmetic sequence? Lesson 11-3: Geometric Sequences Day 82 Part 1: Identifying and Generating Geometric Sequences How do we identify a geometric sequence? Writing an equation of a circle in standard form. Finding the center and radius of a circle, and using them to graph a circle. Specifying terms of a sequence. Identifying an arithmetic sequence and using the arithmetic mean. Identifying a geometric sequence and using the geometric mean. pp. 561 563: Exercises 5, 15, 17, 46 pp. 563 564: Examples 4, 5 Quick Check 4, 5 Exercises 21, 29, 59 pp. 600 602: Exercises 8, 16, 20, 40 pp. 606 607: Exercises 1, 2, 18, 60 pp. 612 614: Exercises 3, 20, 26, 38 Exercises 2 18 even, 35 51 odd, 55 63 odd Exercises 19, 20, 22 28, 30 34, 55 58, 60 64 Exercises 1 23 odd, 24 38 even, 45, 49 Exercises 3 29 odd, 32 42 even, 47, 51, 55, 62 Exercises 2 12 even, 13 49 odd p. 4 A2.A.47, A2.A.48, A2.A.49 A2.A.29, A2.A.32, A2.A.33 A2.A.29, A2.A.30, A2.A.32 A2.A.31, A2.A.32

Semester 2 Lesson 11-4: Arithmetic Series Day 83 Day 84 Part 1: Writing and Evaluating Arithmetic Series Part 2: Using Summation Notation How do we determine the sum of the first n terms of an arithmetic series? How do we apply summation notation? Lesson 11-5: Geometric Series Day 85 Part 1: Evaluating a Finite Geometric Series Part 2: Evaluating an Infinite Geometric Series How do we evaluate finite and infinite geometric series? Lesson 11-6: Area Under a Curve (Optional) Text: Chapter 12: Probability and Statistics Text: Lesson 12-1: Probability Distributions (Optional) Lesson 12-2: Conditional Probability (Optional) Lesson 12-3: Analyzing Data Day 86 Part 1: Measures of How do we find mean, Central Tendency median, and mode? Part 2: Box-and- Whisker Plots How do we use box-andwhisker plots to compare sets of data? Lesson 12-4: Standard Deviation Day 87 Part 1: Finding Standard Deviation How do we find the standard deviation of a set of values? Day 88 Part 2: Using Standard Deviation How do we use standard deviation to describe data? Finding the sum of a finite arithmetic series. Knowing and applying sigma notation. Using formulas to evaluate finite geometric series and convergent infinite geometric series. Calculating measures of central tendency and measures of dispersion. Calculating standard deviation. Using standard deviation on real-world situations. pp. 619 620: Exercises 1, 10, 32 p. 621: Examples 3, 4 Quick Check 3, 4 Exercises 13, 18, 22, 34 pp. 626 628: Exercises 8, 9, 22, 34 pp. 660 664: Examples 1 6 Quick Check 1 6 Exercises 2, 6, 9, 14 pp. 668 671: Exercises 2, 4, 6, 28 pp. 671 672: Examples 4, 5 Quick Check 4, 5 Exercises 8, 11, 20 Exercises 2 9, 11, 12, 25 31, 35 37 Exercises 14 17, 19 21, 23, 24, 39 41 Exercises 1 7 odd, 10 16 even, 19 29 odd, 30, 32, 35, 38 Exercises 1, 3, 4, 5, 7, 8, 10 13, 15 21 Exercises 1 7 odd, 15 19, 22 26 Exercises 9, 10, 12 14, 21, 27 p. 5 A2.N.10, A2.A.34, A2.A.35 A2.S.3, A2.S.4 A2.S.4

Semester 2 Lesson 12-5: Working with Samples Day 89 Part 1: Sample Proportions What is a random sample? Day 90 Part 2: Sample Size and Margin of Error How do we find the margin of error? Lesson 12-6: Binomial Distributions Day 91 Part 1: Finding Binomial Probabilities What is the binomial probability formula? Day 92 Part 2: Using a Binomial Distribution How do we use binomial distributions? Lesson 12-7: Normal Distributions Day 93 Part 1: Using a Normal Distribution What are the characteristics of a normal distribution? Day 94 Part 2: Using the Standard Normal Curve How do we determine for a normal distribution the percent of data within a given interval? Determining whether there is bias in a given sample. Finding and using the margin of error. Using the binomial probability formula. Using a binomial distribution. Using and sketching a normal curve. Using the normal distribution as an approximation for binomial probabilities. pp. 677 678: Exercises 3, 6, 23 pp. 678 680: Examples 3 5 Quick Check 3 5 Exercises 11, 12, 16, 26 pp. 685 687: Exercises 1, 7, 8, 24 pp. 687 688: Example 4 Quick Check 4 Exercises 12, 25 pp. 692 693: Exercises 1, 6, 28 pp. 693 694: Examples 3, 4 Quick Check 3, 4 Exercises 9, 11, 14, 19 Exercises 1, 2, 4, 5, 24, 25 Mixed Review 38 43 Exercises 7 10, 13 15, 17 22, 27 29 Test Prep 34, 35 Exercises 2 6, 9 11, 18 21, 24, 26 Exercises 13 17, 22 Test Prep 30 35 Exercises 2 7, 8 10, 17, 27 Mixed Review 45 50 Exercises 10, 12, 13, 15, 16, 18, 20 26 Test Prep 32 35 p. 6 A2.S.2, A2.S.4 A2.S.13, A2.S.15 A2.S.5, A2.S.16

Semester 2 Chapter 13: Periodic Functions and Trigonometry Lesson 13-1: Exploring Periodic Data Day 95 Day 96 Part 1: Identifying Periodic Functions Part 2: Finding the Amplitude of a Periodic Function What are the characteristics of a periodic function? How do we find the amplitude of a periodic function given its graph? Lesson 13-2: Angles and the Circle Day 97 Part 1: Working With Angles in Standard Position How do we measure and sketch angles in the standard position? Day 98 Part 2: Using the Circle Lesson 13-3: Radian Measure Day 99 Part 1: Using Radian Measure Day 100 Part 2: Finding the Length of an Arc How do we find coordinates of points on the unit circle? What are two methods to convert between degrees and radians? How do we find the length of an arc? Identifying periodic functions, their cycles, and periods. Determining the amplitude of a periodic function. Sketching and using the reference angle for angles in standard position. Sketching the unit circle and representing angles in standard position. Converting between radian and degree measures of angles. Determining the length of an arc of a circle. pp. 710 712: Exercises 1, 6, 17 pp. 712 713: Examples 3, 4 Quick Check 3, 4 Exercises 10, 16 pp. 718 719: Exercises 1, 8, 15, 37 pp. 720 722: Examples 4, 5 Quick Check 4, 5 Exercises 22, 28, 51 pp. 726 728: Exercises 1, 8, 14, 40 pp. 728 729: Examples 4, 5 Quick Check 4, 5 Exercises 20, 27, 29 Exercises 2 5, 7 9, 18 20, 23 30 Exercises 11 15, 21, 22 Test Prep 35 40 Exercises 2 11 odd, 16 20, 38 48 even Exercises 21, 23 27, 29 36, 50 Test Prep 63 68 Exercises 2 6 even, 7 19 odd, 31 41 odd, 44, 46 Exercises 21 26, 28, 30, 45, 47, 48, 50, 51 Test Prep 58 62 p. 7 A2.A.69 A2.A.57, A2.A.60 2.A.61, A2.M.1, A2.M.2

Semester 2 p. 8 Lesson 13-4: The Sine Function Day 101 Part 1: Interpreting Sine Functions What are the properties of sine functions? Day 102 Part 2: Graphing Sine Functions How do you graph a sine function given its rule? Lesson 13-5: The Cosine Function Day 103 Part 1: Graphing and Writing Cosine Functions What are the properties of cosine functions? Day 104 Part 2: Solving Trigonometric Equations How can we solve a cosine equation? Lesson 13-6: The Tangent Function Day 105 Part 1: Graphing the Tangent Function What are the properties of tangent functions? Lesson 13-7: Translating Sine and Cosine Functions Day 106 Part 1: Graphing Translations of Trigonometric Functions How do we use phase shift to graph a horizontal translation of a trigonometric function? Day 107 Part 2: Writing Equations of Translations How do we write an equation to describe a translation? Finding the period and amplitude of sine curves. Sketching the graph of a sine function. Finding the period and amplitude of cosine curves. Using a graphing calculator to solve a cosine equation. Sketching the graph of y = tan θ. pp. 734 736: Exercises 1, 12, 15, 42 pp. 737 738: Examples 5 7 Quick Check 5 7 Exercises 16, 26, 33, 40 pp. 743 744: Exercises 1, 8, 25 pp. 744 745: Examples 3, 4 Quick Check 3, 4 Exercises 10, 13, 16, 33 pp. 749 751: Exercises 1, 11, 16, 22 Determining phase shift. pp. 756 758: Exercises 9, 18, 28, 45 Using a graph to find the values of a, b, h, and k in y = a cos b(x h) + k. pp. 759 760: Examples 5, 6 Quick Check 5, 6 Exercises 31, 37, 38 Exercises 2 11, 13, 14, 34 39, 43, 44 Exercises 17 25, 27 32, 41, 45 50 Exercises 2 7, 9, 22 24, 26 29 Mixed Review 48 50 Exercises 11, 12, 14, 15, 17 21, 30 32, 34, 35 Exercises 2 10 even, 12 15, 17 21, 23, 25, 26, 28, 29, 30, 38 41 Exercises 1, 2, 5 8, 10 14, 19 27, 29, 30 Exercises 32 36, 39 44, 46 Test Prep 55 57 A2.A.56, A2.A.69 A2.A.56, A2.A.70 A2.A.71 A2.A.69, A2.A.70

Semester 2 Lesson 13-8: Reciprocal Trigonometric Functions Day 108 Part 1: Evaluating Reciprocal Trigonometric Functions What are the cosecant, secant, and cotangent functions? Day 109 Part 2: Graphing Reciprocal Trigonometric Functions How do we graph the cosecant, secant, and cotangent functions? Chapter 14: Trigonometric Identities and Equations Lesson 14-1: Trigonometric Identities Day 110 Part 1: Verifying Trigonometric Identities What are the Pythagorean identities? Lesson 14-2: Solving Trigonometric Equations Using Inverses Day 111 Part 1: Inverses of Trigonometric Functions Day 112 Part 2: Solving Trigonometric Equations How do we evaluate inverses of trigonometric functions? How do we solve trigonometric equations? Lesson 14-3: Right Triangles and Trigonometric Ratios Day 113 Part 1: Right Triangles and Trigonometric Ratios Day 114 Part 2: Finding the Measures of Angles in a Right Triangle How are the sides of a right triangle related to the six trigonometric functions? How do we use trigonometry to find the measures of angles in a right triangle? Evaluating the cosecant, secant, and cotangent functions. Graphing the cosecant, secant, and cotangent functions. Justifying the Pythagorean identities. Restricting the domain of trigonometric functions to ensure the existence of an inverse function. Using inverse trig functions to solve trigonometric equations. Expressing trigonometric functions in terms of the sides of a right triangle. Using inverses of trigonometric functions to find measures of the acute angles in a right triangle. pp. 763 764: Exercises 5, 9, 26, 43 pp. 765 766: Examples 4 6 Quick Check 4 6 Exercises 29, 38, 39, 41 pp. 778 780: Exercises 1, 20, 32 pp. 783 784: Exercises 1, 6, 13 pp. 785 786: Examples 5 7 Quick Check 5 7 Exercises 21, 26, 34, 43 pp. 792 794: Exercises 4, 5, 34 p. 795: Examples 4, 5 Quick Check 4, 5 Exercises 9, 15, 18, 40 Exercises 2 20 even, 21 27 odd, 44 49, 54 58 Exercises 30 37, 40, 50 53, 59, 60, 61 67 odd Exercises 2 18 even, 21 51 odd Exercises 2 5, 7 11, 14, 15 Mixed Review 82 87 Exercises 16 24 even, 27 41 odd, 44, 44 56 even, 62 Exercises 1 3, 6 8, 25 33, 42 45 Exercises 10 14, 19 23, 35 39, 41, 48 p. 9 A2.A.58, A2.A.71 A2.A.58, A2.A.57 A2.A.63, A2.A.68 A2. A.55, A2.A.56

Semester 2 Lesson 14-4: Area and the Law of Sines Day 115 Part 1: Area and the Law of Sines Extension p. 807: The Ambiguous Case Given two angle measures and one side length, how can we find the remaining measures and lengths? Lesson 14-5: Law of Cosines Day 116 Part 1: The Law of Cosines How do we apply the Law of Cosines to find missing measures in any triangle? Lesson 14-6: Angle Identities Day 117 Part 1: Angle Identities How do we verify and use angle identities? Day 118 Part 2: Sum and Difference Identities How do we verify and use sum and difference identities? Lesson 14-7: Double-Angle and Half-Angle Identities Day 119 Part 1: Double-Angle Identities How do we verify and use the double-angle identities? Day 120 Part 2: Half-Angle Identities How do we verify and use the half-angle identities? Applying the Law of Sines. pp. 801 803: Exercises 4, 8, 11, 28 p. 807: Example Solving for an unknown side or angle using the Law of Cosines. Using identities to simplify and manipulate trigonometric expressions. Applying the angle sum and difference formulas. Applying the double-angle formula. Applying the half-angle formula. pp. 809 810: Exercises 4, 7, 16, 47 pp. 814 816: Exercises 4, 12, 16, 50 pp. 816 817: Examples 4, 5 Quick Check 4, 5 Exercises 18, 21, 22, 43 pp. 821 822: Exercises 1, 10, 33 pp. 822 823: Examples 3, 4 Quick Check 3, 4 Exercises 16, 19, 38 Exercises 1 9 odd, 12 24 even, 32 42 even p. 807, Exercises 1 7 Exercises 1 5 odd, 8 12 even, 13 29 odd, 34 46 even Exercises 1 5, 7 11, 13 15, 52 Mixed Review 65 74 Exercises 17, 19, 20 42 even, 45 51 odd Test Prep 58 61 Exercises 3 9, 27 29, 34 37, 42 46 Exercises 11 15, 17, 18, 20 26, 30 32, 39 41, 47 A2.A.73, A2.A.74 A2.A.75 A2.A.66, A2.A.73 A2.A.56, A2.A.76 A2.A.56, A2.A.77 p. 10