_Algebra 2 Marking Period 1

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1 _Algebra 2 Marking Period 1 Topic Chapters Number of Blocks Dates Equations and Inequalities 1 8 9/9-9/27 PRE-TEST 1 9/27-10/2 Linear Relations and Functions /3-10/25 System of Equations and Inequalities /26-11/27 MP 1 ASSESSMENT Chapters 1-2 and parts of /30-11/6 Marking Period 2 Topic Chapters Number of Blocks Dates Quadratic Functions and Relations /2-12/20 Polynomials and Polynomial Functions /2-1/29 Inverse and Radical Functions and Relations 6 9 1/30-2/28 MP 2 ASSESSMENT Chapters /23 Marking Period 3 Topic Chapters Number of Blocks Dates Exponential and Logarithmic Functions /1-3/22 and Relations Rational Functions and Relations 8 8 3/25-4/19 MP 3 ASSESSMENT Chapters /4

2 Marking Period 4 Topic Chapters Number of Blocks Dates Statistics and Probability /22-5/10 Trigonometric Functions /13-5/31 Trigonometric Identities and Equations /3-6/10 MP 4 ASSESSMENT Chapters /12 Content Area: Mathematics Unit Title: Algebra 2- Equations and Inequalities. Target Course/Grade Level 11 th and/or 12 th graders Duration: 8 blocks Unit Overview Description : Students begin this unit by using a number line to graph and order real numbers and by identifying the properties of real numbers in operations. After evaluating and simplifying algebraic expressions, students solve linear equations. They also rewrite equations with more than one variable, including formulas. To set up and solve real-life applications, students use a general five-step problem solving plan, and implement various strategies such as drawing a model or looking for a pattern. Finally students use these skills to solve simple and compound inequalities as well as absolute value equations and inequalities. Students are evaluated by a unit test along with other alternate assessments throughout the unit. Concepts Expressions and formulas Properties of real numbers Solving equations Solving absolute value equations Solving inequalities Solving compound and absolute value inequalities Concepts & Understandings Understandings Use the order of operations to evaluate expressions. Use formulas. Classify real numbers. Use the properties of real numbers to evaluate expressions. Translate verbal expressions into algebraic expressions and equations and vice versa. Solve equations using the properties of equality.

3 Evaluate expressions involving absolute values. Solve absolute value equations. Solve one-step inequalities. Solve multi-step inequalities. Solve compound inequalities. Solve absolute value inequalities. Learning Targets CPI Codes A-APR.HS.01 A-CED.HS.04 A-REI.HS.01 A-REI.HS.03 Math Practices See addendum 21 st Century Themes and Skills See addendum Guiding Questions What is the order of operations? How do we classify real numbers? What are the common properties to evaluate expressions? How do you evaluate expressions? How do we solve absolute value equations? How do we solve one-step inequalities? How do we solve compound inequalities? How do we solve absolute value inequalities? Unit Results Students will... Use the order of operations to evaluate expressions. Use formulas. Classify real numbers. Use the properties of real numbers to evaluate expressions. Translate verbal expressions into algebraic expressions and equations and vice versa. Solve equations using the properties of equality. Evaluate expressions involving absolute values. Solve absolute value equations. Solve one-step inequalities. Solve multi-step inequalities. Solve compound inequalities. Solve absolute value inequalities.

4 Suggested Activities The following activities can be incorporated into the daily lessons: Review the graphing of equations on a plane. (y=mx + b) Apply method to real-life situations: wreaths for the holiday s problem. Discuss solutions as they relate to graphs and the kinds of solutions possible. (One, none, many). Use the linear combination method to solve a system when terms are lined up, when they are not lined up, when neither, one or both need to be multiplied in order to be solved. Determine the number of solutions to a given system and why. Use the substitution method to solve a system when it is in the y=mx+b form and when it has to be rewritten. Determine the number of solutions to a given system and why. Determine the bounds formed by constraints in order to find optimized values. Use optimization method on real-life situations. Evaluate functions of two variables. Plot points in three dimensions. Graph linear equations in three variables. Content Area: Algebra 2 Unit Title: Linear Equations and Functions Target Course/Grade Level 11 th and/or 12th Duration: Description 10 Blocks Unit Overview Students begin this unit by identifying and representing relations and functions, and by graphing and evaluating linear functions. They find the slope of a line, and identify parallel and perpendicular lines from their slopes. Students generalize slope as a rate of change. They graph linear equations using both slope-intercept and standard forms and identify and graph horizontal and vertical lines. They write equations of lines using the slope and intercept, a point and the slope, or two points. Students write direct variation equations. They explore positive and negative correlation using scatter plots, and approximate best-fitting lines. Students then complete the unit by graphing linear inequalities in two variables, piece wise functions, and absolute value functions, while using all of these to model real-life applications. Students are evaluated by a unit test along with other alternate assessments throughout the unit. Concepts Relations and functions Linear relations and functions Rate of change and slope Writing linear equations Scatter plots and lines of regression Concepts & Understandings Understandings Analyze relations and functions. Use equations of relations and functions. Identify linear relations and functions. Write linear equations in standard form. Write an equation of a line given the slope and a

5 Special functions point on the line. Parent functions and transformations Write an equation of a line parallel or perpendicular Graphing linear and absolute value inequalities to a given line. Use scatter plots and prediction equations. Model data using lines of regression. Write and graph piecewise-defined functions. Write and graph step and absolute value functions. Identify and use parent functions. Describe transformations of functions. Graph linear inequalities. Graph absolute value inequalities. Learning Targets CPI Codes A-CED.HS.02 A-REI.HS.10 A-REI.HS.11 F-IF.HS.01 F-IF.HS.02 F-IF.HS.07 S-ID.HS.07 S-ID.HS.08 Math Practices See addendum See addendum 21 st Century Themes and Skills Guiding Questions What is a function? What forms of equations do you know? What is the slope-intercept form of a line? What forms of equations do you know? What is a scatter plot? What is the first step in graphing an inequality on a plane? What does piecewise mean? What is meant by absolute value? Unit Results Students will... Analyze relations and functions. Use equations of relations and functions. Identify linear relations and functions. Write linear equations in standard form. Write an equation of a line given the slope and a point on the line. Write an equation of a line parallel or perpendicular to a given line.

6 Use scatter plots and prediction equations. Model data using lines of regression. Write and graph piecewise-defined functions. Write and graph step and absolute value functions. Identify and use parent functions. Describe transformations of functions. Graph linear inequalities. Graph absolute value inequalities. Suggested Activities The following activities can be incorporated into the daily lessons: Represent relations and functions as well as to graph and evaluate linear functions. Find slopes of lines and classify parallel and perpendicular lines as well as solving real-life problems. Use the slope-intercept form of a line to graph linear equations. Write linear equations in different forms given various types of data: slopes, points, intercepts, or graphs. Graph linear inequalities in two variables on a plane. Represent piecewise functions on a graph and to use piecewise functions to represent real-life situations. Represent and write absolute value functions. Unit Overview Content Area: Algebra 2 Unit Title: Systems of Linear Equations and Inequalities Target Course/Grade Level 11 th and/or 12th Duration: Description 10 Blocks In this unit students learn to solve systems of two linear equations in two variables algebraically and by graphing. Included are these systems with one solution, no solution, and many solutions. They also learn to graph the solutions of systems of linear inequalities. Systems of linear equations and inequalities are used to model and solve real-life problems. The work with linear equations is extended to linear programming problems, which are used to solve real-life optimization problems. Students learn to add, subtract and multiply matrices by a scalar and by another matrix. They then use these operations to solve real-world problems. Students find determinants of a 2 x 2 and a 3 x 3 matrix. Then, using Cramer's Rule, the determinants are used to solve systems of equations. Students are evaluated by a unit test along with other alternative assessments throughout the unit. The graphing calculator becomes an invaluable at this point, as the value of the determinant is calculated using this technology. Students are evaluated by a unit test along with other alternate assessments throughout the unit. Concepts Solving systems of equations Solving systems of inequalities by graphing Optimization with linear programming Concepts & Understandings Understandings Solve systems of linear equations graphically. Solve systems of linear equations algebraically. Solve systems of inequalities by graphing.

7 Systems of equations in three variables Operations with matrices Multiplying matrices Solving systems of equations using Cramer s Rule Solving systems of equations using inverse matrices Learning Targets Determine the coordinates of the vertices of a region formed by the graph of a system of inequalities. Find the maximum and minimum values of a function over a region. Solve real-world optimization problems using linear programming. Solve systems of linear equations in three variables. Solve real-world problems using systems of linear equations in three variables. Analyze data in matrices. Perform algebraic operations with matrices. Multiply matrices. Use the properties of matrix multiplication. Evaluate determinants. Solve systems of linear equations by using Cramer s Rule. Find the inverse of a 2 Write and solve matrix equations for a system of equations. CPI Codes A-REI.HS.01 A-REI.HS.05 A-REI.HS.06 A-REI.HS.10 N-VM.HS.06 N-VM.HS.07 N-VM.HS.08 N-VM.HS.09 N-VM.HS.10 N-VM.HS.11 N-VM.HS.12 Math Practices See addendum See addendum 21 st Century Themes and Skills Guiding Questions What is the order of a matrix? How do you know if you can perform operations on two matrices? What are equal matrices? What are corresponding entries?

8 How do you add or subtract two matrices? What is a scalar? How do you multiply a matrix by a scalar? How do you determine if you two matrices can be multiplied together? How do you determine the order of the product of two matrices? How do you calculate the product of two matrices? What is a square matrix? What is a determinant? How do you find the determinant of a 2x2 matrix? How do you find the determinant of a 3x3 matrix? What is Cramer's Rule? How do you solve a linear system of equations using Cramer's rule? What is and identity matrix? What does a 2x2 identity matrix look like? What does a 3x3 identity matrix look like? What are the relationship between and identity and inverse matrix? How do you determine the inverse of a 2x2 matrix? How do you determine the inverse of a 2x2 matrix? How do you solve linear systems of equations using inverse matrices? Unit Results Students will... Solve systems of linear equations graphically. Solve systems of linear equations algebraically. Solve systems of inequalities by graphing. Determine the coordinates of the vertices of a region formed by the graph of a system of inequalities. Find the maximum and minimum values of a function over a region. Solve real-world optimization problems using linear programming. Solve systems of linear equations in three variables. Solve real-world problems using systems of linear equations in three variables. Analyze data in matrices. Perform algebraic operations with matrices. Multiply matrices. Use the properties of matrix multiplication. Evaluate determinants. Solve systems of linear equations by using Cramer s Rule. Find the inverse of a 2 Write and solve matrix equations for a system of equations. Suggested Activities The following activities can be incorporated into the daily lessons: Review the graphing of equations on a plane. Apply method to real-life situations. Discuss solutions as they relate to graphs and the kinds of solutions possible. Use the linear combination method to solve a system when terms are lined up, when they are not lined up, when neither, one or both need to be multiplied in order to be solved.

9 Determine the number of solutions to a given system and why. Graph systems of inequalities on a plane Determine the bounds formed by constraints in order to find optimized values Determine the optimized value for an unbounded region. Use o Identify and compare the orders of two matrices. Add and subtract two matrices. Multiply a matrix by a scalar. Determine if two matrices can be multiplied. Describe the order of matrix products Calculate the products of two matrices. Find the determinant of a 2x2 matrix Find the determinant of a3x3 matrix. Solve a linear system of equations using Cramer's Rule. Recognize 2x2 and 3x3 identity matrices Determine the inverse of a 2x2 matrix. Optimization method on real-life situations. Plot points in three dimensions. Unit Overview Content Area: Algebra 2 Unit Title: Quadratic Functions and Relations Target Course/Grade Level 11 th and/or 12th Duration: 10 Blocks Description Students are led through all major topics involving quadratic functions. First quadratic equations are graphed and then the standard, vertex and intercept forms are introduced. These forms are used throughout the unit and students learn to convert between them. Quadratic expressions are factored then quadratic equations are solved by factoring, finding square roots, completing the square or using the Quadratic Formula. Factoring is also used to find the zeroes of quadratic function. Students solve quadratic equations with complex solutions and perform operations with complex numbers. The discriminate is used to determine the number and nature of the solutions to a quadratic equation. Students are evaluated by a unit test along with other alternate assessments throughout the unit. Concepts Graphing quadratic functions Solving quadratic equations by graphing Solving quadratic equations by factoring Complex numbers Completing the square The quadratic formula and the discriminate Transformations of quadratic graphs Concepts & Understandings Understandings Graph quadratic functions. Find and interpret the maximum and minimum values of a quadratic function. Solve quadratic equations by graphing. Estimate solutions of quadratic equations by graphing. Write quadratic equations in standard form.

10 Quadratic inequalities Solve quadratic equations by factoring. Perform operations with pure imaginary numbers. Perform operations with complex numbers. Solve quadratic equations by using the Square Root Property. Solve quadratic equations by completing the square. Solve quadratic equations by using the Quadratic Formula. Use the discriminate to determine the number and type of roots of a quadratic equation. Write a quadratic function in the form Transform graphs of quadratic functions of the form Graph quadratic inequalities in two variables. Solve quadratic inequalities in one variable. Learning Targets CPI Codes A-REI.HS.10 N-CN.HS.01 N-CN.HS.02 N-CN.HS.03 N-CN.HS.04 N-CN.HS.05 N-CN.HS.07 N-CN.HS.08 Math Practices See addendum 21 st Century Themes and Skills See addendum Guiding Questions How do we graph a quadratic function? What are the maximum and the minimum values of a quadratic function? How do we estimate the solutions of a quadratic equation? How do we factor quadratic equations? What is an imaginary number? What is a complex number? How do we perform operations with imaginary and complex numbers? What is the Square Root Property? What is the quadratic formula? How can we use the discriminate to predict the type and number of solutions in a quadratic equation? What is the vertex formula of a quadratic equation? How do we solve quadratic inequalities with one or two variables?

11 Students will... Unit Results Graph quadratic functions. Find and interpret the maximum and minimum values of a quadratic function. Solve quadratic equations by graphing. Estimate solutions of quadratic equations by graphing. Write quadratic equations in standard form. Solve quadratic equations by factoring. Perform operations with pure imaginary numbers. Perform operations with complex numbers. Solve quadratic equations by using the Square Root Property. Solve quadratic equations by completing the square. Solve quadratic equations by using the Quadratic Formula. Use the discriminate to determine the number and type of roots of a quadratic equation. Write a quadratic function in the form Transform graphs of quadratic functions of the form Graph quadratic inequalities in two variables. Solve quadratic inequalities in one variable. Suggested Activities The following activities can be incorporated into the daily lessons: Graphing quadratic function and writing it in standard form Using the quadratic model Factoring a trinomial and monomial. Solving a quadratic equation by finding the zeros Using a quadratic equation as a model. Modeling a falling object s height with a quadratic faction. Adding, subtracting, multiplying, dividing and finding the absolute value of complex numbers. Solving a quadratic equation with two real numbers and two imaginary numbers. Solving vertical motion problems. Using a quadratic inequality as a model Writing a quadratic function in a vertex form. Finding a quadratic model for data set. Using a quadratic recession to find model. Unit Overview Unit Overview Content Area: Algebra 2 Unit Title: Polynomials and Polynomial Functions Target Course/Grade Level 11 th and/or 12th

12 Duration: Description 10 Blocks Students use properties of exponents and scientific notation to simplify algebraic expressions and to model real-life problems. They use synthetic substitution to evaluate polynomial expressions. They also graph polynomials and investigate their end behavior. They will add, subtract, multiply and divide polynomial functions and will use factoring, synthetic division, and rational zero theorem to find the zeros of polynomial functions. Students will see how the fundamental theorem of algebra can be used to determine the number of solutions of a polynomial equation and will use graphing calculators to approximate the real zeros of a polynomial function. They will use zeros to write polynomial functions and they will use x-intercepts and turning points to graph polynomial functions. Students are evaluated by a unit test along with other alternative assessments throughout the unit. Concepts CPI Codes Operations with polynomials Dividing polynomials Polynomial functions Analyzing graphs of polynomial functions Solving polynomial equations The remainder and factor theorems Roots and zeros Rational zero theorem A-APR.HS.01 A-APR.HS.02 A-APR.HS.03 A-APR.HS.04 A-APR.HS.05 A-REI.HS.11 N-Q.HS.03 Concepts & Understandings Understandings Learning Targets Multiply, divide and simplify monomials and expressions involving powers. Add, subtract, and multiply polynomials. Divide polynomials using long division. Divide polynomials using synthetic division. Evaluate polynomial functions. Identify general shapes of graphs of polynomial functions. Graph polynomial functions and locate their zeros. Find the relative maxima and minima of polynomial functions. Factor polynomials. Solve polynomial equations by factoring. Evaluate functions by using synthetic substitution. Determine whether a binomial is a factor of a polynomial by using synthetic substitution. Determine the number and type of roots for a polynomial equation. Find the zeros of a polynomial function. Identify possible rational zeros of a polynomial function. Find all of the rational zeros of a polynomial function. Math Practices See addendum 21 st Century Themes and Skills See addendum

13 Guiding Questions What is a power? What is a base? What is the product of powers property? What is the power of a power property? What is the negative exponent property? What is the zero exponent property? What is the quotient of powers property? What is the power of a quotient property? How do you simplify expressions using the properties of exponents? What is a polynomial function? What is the leading coefficient? What is the degree of a polynomial function? What is the standard form of a polynomial function? How do you identify a polynomial function? How do you evaluate a polynomial function? What is direct substitution? What is synthetic substitution? How do you graph a polynomial function? How do you add polynomials? How do you subtract polynomials? How do you multiply polynomials? How do you factor a quadratic expression? How do you factor a polynomial expression? How do you factor the sum or difference of cubes? How do you factor by grouping? How do you factor polynomials in quadratic form? How do you solve polynomials equations using factoring? What is the remainder theorem? What is the factor theorem? How does the remainder theorem relate to the factor theorem? How do you divide a polynomial using polynomial long division? How do you divide a polynomial using synthetic division? What is the rational zero theorem? How do you find the rational zeros of a polynomial function using the rational zero theorem? How are zeros, factors, solutions, and x-intercepts closely related? How do you use x-intercepts to graph a polynomial function? What are turning points of a polynomial function? How do you find turning points? What is the local maximum and minimum of a polynomial function? What is a cubic function? What is a finite difference? How do you find finite differences? What are the properties of finite differences? How do you model with finite differences? How do you model with cubic regression? Unit Results Students will... Multiply, divide and simplify monomials and expressions involving powers. Add, subtract, and multiply polynomials. Divide polynomials using long division. Divide polynomials using synthetic division.

14 Evaluate polynomial functions. Identify general shapes of graphs of polynomial functions. Graph polynomial functions and locate their zeros. Find the relative maxima and minima of polynomial functions. Factor polynomials. Solve polynomial equations by factoring. Evaluate functions by using synthetic substitution. Determine whether a binomial is a factor of a polynomial by using synthetic substitution. Determine the number and type of roots for a polynomial equation. Find the zeros of a polynomial function. Identify possible rational zeros of a polynomial function. Find all of the rational zeros of a polynomial function. Suggested Activities The following activities can be incorporated into the daily lessons: Evaluate a polynomial function using direct substitution and synthetic substitution. Graph polynomials Use the properties of exponents and scientific notation in a real-life problem. Model polynomial subtraction and multiplication. Solve a polynomial equation by factoring. Divide a polynomial using polynomial long division and by using synthetic division. Find the rational zeros of a polynomial function using the rational zero theorem. Test the zeros using synthetic division. Use the fundamental theorem of Algebra to determine the number of zeros a polynomial function has. Determine the zeros of a polynomial function. Use zeros to write a polynomial function. Graph a polynomial function using x-intercepts. Find the turning points of a polynomial function. Unit Overview Content Area: Algebra 2 Unit Title: Inverses and Radical Functions and Relations Target Course/Grade Level Duration: Description 9 Blocks 11 th and/or 12th Students learn how to evaluate nth roots of real numbers using both radical and exponential notation. They use properties of rational exponents to evaluate and simplify expressions, and they evaluate power functions and perform arithmetic operations with functions as well as composition of functions. They will find inverses of functions, and they observe the graphing of square root and cube root functions. Students will solve equations that have radicals or rational exponents. They use roots, rational exponents, power functions, function operations, and radical equations to solve real-life problems. Students are evaluated by a unit test along with other alternate assessments throughout the unit. Concepts & Understandings

15 Concepts Operations on functions Inverse functions and relations Square root functions and inequalities Nth roots Operations with radical expressions Rational exponents Solving radical equations and inequalities Understandings Find the sum, difference, product, and quotient of functions. Find the composition of functions. Find the inverse of a function or relation. Determine whether two functions or relations are inverses. Graph and analyze square root functions. Graph square root inequalities. Simplify radicals. Use a calculator to approximate radicals. Simplify radical expressions. Add, subtract, multiply, and divide radical expressions. Write expressions with rational exponents in radica form and vice versa. Simplify expressions in exponential or radical form. Solve equations containing radicals. Solve inequalities containing radicals. Learning Targets CPI Codes A-REI.HS.02 F-BF.HS.04 F-IF.HS.01 F-IF.HS.02 F-IF.HS.07 F-IF.HS.08 N-RN.HS.01 N-RN.HS.02 N-RN.HS.03 Math Practices See addendum See addendum How to evaluating Nth Roots? 21 st Century Themes and Skills Guiding Questions

16 How to using Nth Roots in Real Life? How do you find the nth root of a number? How do you evaluate expressions with rational exponents? How do you solve equations using nth roots? How do you use properties of rational exponents to simplify expressions How do you use write radicals in simplest form? How do you add and subtract roots and radicals? How to use properties of rational exponents in real- life? How do you add and subtract functions? How do you multiply and divide functions? How do you find the composition of functions? Unit Results Students will... Find the sum, difference, product, and quotient of functions. Find the composition of functions. Find the inverse of a function or relation. Determine whether two functions or relations are inverses. Graph and analyze square root functions. Graph square root inequalities. Simplify radicals. Use a calculator to approximate radicals. Simplify radical expressions. Add, subtract, multiply, and divide radical expressions. Write expressions with rational exponents in radical form and vice versa. Simplify expressions in exponential or radical form. Solve equations containing radicals. Solve inequalities containing radicals. Suggested Activities The following activities can be incorporated into the daily lessons: Evaluating nth roots of real numbers using both radical notation and rational exponent notation. Using properties of rational exponents to evaluate and simplify expression Perform operations with functions including power functions. Find inverses of linear functions and find inverses of nonlinear functions. Graph square root and cube root functions. Solve equations that contain radicals or rational exponents. Use measures of central tendency and measures of dispersion to describe data sets and use box-and-whisker plots and histograms to represent data graphically.

17 Content Area: Algebra 2 Unit Overview Unit Title: Exponential and Logarithmic Functions and Relations Target Course/Grade Level 11 th and/or 12th Duration: 10 Blocks Description : The chapter begins by defining b to the x power, when x is an integer and extending the existing properties to include rational exponents. The meaning of b to the x power is extended to include irrational values of x. Students relate to the exponential functions. Students define composites and inverse functions, leading to the definition of the logarithmic function as the exponential inverse. The culmination of the topic ends in students solving equations of the type 2 to the x = 5. Students extend and apply these skills to real-life situations. Evaluation of student learning occurs via homework, quizzes and test upon completion of the chapter. Concepts CPI Codes Graphing exponential functions Solving exponential equations and inequalities Logarithms and logarithmic functions Solving logarithmic equations and inequalities Properties of logarithms Common logarithms Base e and natural logarithms Using exponential and logarithmic functions F-LE.HS.02 F-LE.HS.03 F-LE.HS.04 Concepts & Understandings Understandings Learning Targets Graph exponential growth functions. Graph exponential decay functions. Solve exponential equations. Solve exponential inequalities. Evaluate logarithmic expressions. Graph logarithmic functions. Solve logarithmic equations. Solve logarithmic inequalities. Simplify and evaluate expressions using the properties of logarithms. Solve logarithmic equations using the properties of logarithms. Solve exponential equations and inequalities using common logarithms. Evaluate logarithmic expressions using the change of base formula. Evaluate expressions involving the natural base and natural logarithm. Solve exponential equations and inequalities using natural logarithms. Use logarithms to solve problems involving exponential growth and decay. Use logarithms to solve problems involving logistic growth.

18 Math Practices See addendum 21 st Century Themes and Skills See addendum Guiding Questions What is the exponential form? What is the radical form? What is an exponent equation? What does the graph of an exponential function look like? What is the composite of the functions? What are the inverse functions? What is log? How do you write an equation in logarithmic form? How do you solve a logarithmic equation? What are the laws of logarithms? How can one use a calculator to find logarithms? How can solve an exponential equation using logarithms? What is exponential growth? What is exponential decay? What is the natural logarithm? Unit Results Students will... Graph exponential growth functions. Graph exponential decay functions. Solve exponential equations. Solve exponential inequalities. Evaluate logarithmic expressions. Graph logarithmic functions. Solve logarithmic equations. Solve logarithmic inequalities. Simplify and evaluate expressions using the properties of logarithms. Solve logarithmic equations using the properties of logarithms. Solve exponential equations and inequalities using common logarithms. Evaluate logarithmic expressions using the change of base formula. Evaluate expressions involving the natural base and natural logarithm. Solve exponential equations and inequalities using natural logarithms. Use logarithms to solve problems involving exponential growth and decay. Use logarithms to solve problems involving logistic growth. Suggested Activities The following activities can be incorporated into the daily lessons: Write an expression in exponential form Write an expression in simplest radical form Show the graph of exponential function.

19 Solve an exponential equation. Find the composition of functions. Show the inverse of a function. Evaluate functions. Write an equation in exponential form. Write an equation in logarithmic form. Simplify logarithms. Unit Overview Content Area: Algebra 2 Unit Title: Rational Functions and Relations Target Course/Grade Level 11 th and/or 12th Duration: 8 Blocks Description : Students study rational algebraic expressions studied. The laws of exponents are reviewed and extended to include zero and negative exponents. Students use scientific notation by applying the law of exponents in practical applications. They will simplify, add, subtract, multiply, and divide rational expressions in word problems. Students then extend the skills to solve equations with fractional coefficients and fractional equations. They also extend and apply these skills to real-life situations. Variation is presented by way of problems in physics and other areas. Students apply direct variation and proportion with real life application. Inverse and joint variation follows. Long division for polynomials is presented and is related synthetic division introduced. Students extend and apply these skills to real-life situations. Evaluation of student learning occurs via homework, quizzes and test upon completion of the chapter. Concepts & Understandings Concepts Understandings Multiplying and dividing rational expressions Simplify rational expressions. Adding and subtracting rational expressions. Simplify complex fractions. Graphing reciprocal functions Determine the LCM of polynomials. Graphing rational functions Add and subtract rational expressions. Variation functions Determine properties of reciprocal functions. Solving rational equations and inequalities Graph transformations of reciprocal functions. Recognize and solve direct and joint variation problems. Recognize and solve inverse and combined variation problems. Solve rational equations. Solve rational inequalities. Learning Targets CPI Codes A-APR.HS.01

20 A-APR.HS.02 A-APR.HS.03 A-APR.HS.04 A-APR.HS.06 A-APR.HS.07 A-CED.HS.01 A-SSE.HS.02 A-APR.HS.01 A-SSE.HS.03 A-SSE.HS.04 F-BF.HS.01 F-BF.HS.03 F-IF.HS.08 F-IF.HS.09 F-LE.HS.03 Math Practices See addendum See addendum 21 st Century Themes and Skills Guiding Questions How do you simplify fractions with exponents? How do you simplify expressions with zero and negative exponents? How do you write a number in scientific notation? How do you simplify rational expression? What are the domain and the zeros of a given function? How do you find a significant digit? How do you simplify rational expression using addition and subtraction? How do you simplify complex fractions? How do you solve an equation with fractional coefficients? How do you solve an inequality with fractional coefficients? How do you solve a fractional equation? What is direct variation? How to find the constant in direct variation? What is Inverse Variation? What is Joint Variation? Unit Results Students will... Simplify rational expressions. Simplify complex fractions.

21 Determine the LCM of polynomials. Add and subtract rational expressions. Determine properties of reciprocal functions. Graph transformations of reciprocal functions. Recognize and solve direct and joint variation problems. Recognize and solve inverse and combined variation problems. Solve rational equations. Solve rational inequalities. Suggested Activities The following activities can be incorporated into the daily lessons: Simplify fractions with exponents. Write expressions in simplest form without negative or zero exponents. Find a one-significant-digit estimate of each given quotient. Find the domain of each given function and its zeros, if any. Simplify given rational expressions. Solve inequality and equations. Solve problems involving direct variation and find the constant of direct variation. Use synthetic division to divide a polynomial by a binomial. Divide one polynomial by another polynomial. Unit Overview Content Area: Algebra II Unit Title: Statistics and Probability Target Course/Grade Level: 11 th and 12 th Duration: 8 blocks Description: In this unit, students will investigate the basics of statistics and probability. They will describe and analyze several different types of data display (such as bell curves, histograms, and box and whisker plots). Students will study the difference between combinations, permutations, compound and simple events. Students are evaluated by a unit test, quizzes, notebook, class participation, along with other alternate assessments throughout the unit. Concepts Samples and studies Statistics and probability Distributions of data Comparing sets of data Simulation Permutations and combinations Probability of compound events Concepts & Understandings Understandings Design surveys and evaluate results. Use permutations and combinations. Find probabilities of compound events. Design and use simulations.

22 Probability distributions CPI Codes Learning Targets S-CP.HS.02 S-IC.HS.04 S-ID.HS.02 S-ID.HS.03 Math Practices See Addendum 21 st Century Themes and Skills See Addendum Guiding Questions Is it better to have a large of small sample size? Why? What is a population parameter? How many different ways can a bell curve be shaped? Describe their forms. What is the difference between mean absolute deviation and standard deviation? What kind of information can be displayed in a histogram? A box-and-whisker plot? Describe a linear transformation. Describe the difference between theoretical and experimental probability. What is a permutation? What is a combination? Describe the difference between simple and compound events. Students will... Unit Results Classify and analyze samples and studies. Identify sample statistics and population parameters. Analyze data sets using statistics. Describe the shape of a distribution. Use the shapes of distributions to select appropriate statistics. Determine the effect that transformations of data have on measures of central tendency and variation. Compare data using measures of central tendency and variation. Calculate experimental probabilities. Design simulations and summarize data from simulations.

23 Use permutations and combinations. Find probabilities of independent and dependent events. Find probabilities of mutually exclusive events. Find probabilities by using random variables. Find the expected value of a probability distribution. Suggested Activities The following activities can be incorporated into the daily lessons: Classify random samples Determine the difference between biased and unbiased samples. Classify the different types of study techniques. Find the standard deviation of the given data set. Compare two sets of data using their standard deviation. Create a histogram. Create a box-and-whisker plot. Choose the appropriate data display to visually display different types of data sets. Transformations using addition and multiplication. Determine the theoretical and experimental probability of flipping a coin and it landing on a tails when tossed 20 different times. Design a probability simulation. Use factorials as permutations. Use the permutation formula to determine how many different ways there are to place 6 books on a bookshelf. Use the combination formula to determine how many pizzas can be made when given 5 different topping choices. Find the probability of independent and dependent events. Describe a mutually exclusive event. Create a probability distribution. Find the expected value of an event when given a probability distribution. Content Area: Algebra II Unit Title: Trigonometry Functions Target Course/Grade Level: 11 th and 12 th Duration: 10 blocks Unit Overview Description : Students are introduced to trigonometry by defining an angle using the concept of rotation. The meaning of angle is extended to include more than 180 degrees and less than 0 degrees. The six trigonometric functions of acute

24 angles are defined in terms of a right angle. Values of trigonometric functions are given for a and a degree triangle. Students are introduced to the concept of a reference angle. Students solve triangles, first with right triangles using trigonometric ratios, and then by general triangles using the law of sines and the law of cosines. Students extend and apply these skills to real-life situations. Evaluation of student learning occurs via homework, quizzes and test upon completion of the chapter. Concepts CPI Codes Concepts & Understandings Understandings Angles and Degree Measure. Directed angles and their relation to the Trigonometric Functions of Acute and General coordinate plane are analyzed. Angles New functions are defined in terms of angle Values of Trigonometric Functions measure and point on a directed ray in the Solving Right Triangles Using Trigonometry first quadrant Laws of Cosines and Sines Trigonometric function definitions are Solving General Triangles extended to general angles. Areas of Triangles Triangles are solved using trigonometric definitions. Trigonometric laws are used to solve general triangles and extended to real-life problems. Areas of triangles are calculated using trigonometric means. Learning Targets F-TF.HS.01 F-TF.HS.02 F-TF.HS.03 F-TF.HS.04 F-TF.HS.05 F-TF.HS.06 F-TF.HS.07 F-TF.HS.08 F-TF.HS.09 Math Practice See addendum 21 st Century Themes and Skills

25 See addendum Guiding Questions What are degrees? What is " triangle measurement"? What is "sine of "? What is "cosine of "? What is "tangent of "? What are the reciprocal functions? What is a reference angle? How do you use a calculator to find the trigonometric functions? How do you use the table of trigonometric functions? What is an angle of elevation? What is an angle of depression? What is the law of cosines? What is the law of sines? Which law you would use first to solve the triangle? Which triangle area formula would you use? Students will... Unit Results to use degrees to measure angles. define trigonometric functions of acute angles. define trigonometric functions of general angles. use a calculator or trigonometric tables to find values of trigonometric functions find the sides and angles of a right triangle. use the law of cosines to find sides and angles of triangles use the law of sines to find sides and angles of triangles solve any given triangle. apply triangle area formulas. Suggested Activities

26 The following activities can be incorporated into the daily lessons: Estimate the measure of an angle. Name the quadrant of each angle. Find the values of the six trigonometric functions of an angle. Find the sin, cos and tan of an acute angle. Find the measure of the reference angle Name the quadrant and the reference angle. Find each function using a calculator. Find each function value using the table. Find the angle of depression in a real-life situation. Find the angle of elevation in a real-life situation. Find an angle of any triangle using the law of cosines. Find the indicated part of a triangle using the law of sines. Solve for missing parts of a triangle using the laws of sines and cosines. Solve a real-life situation using the laws of sines and cosines. Find the area of a triangle using Hero's Formula. Unit Overview Content Area: Algebra II Unit Title: Trigonometric Identities and Equations Target Course/Grade Level: 11 th and 12 th Duration: 7 Blocks Description : The study of trigonometry is extended to circular functions. Radian measure is defined and the relationship between radians and degrees reinforced. The unit circle is introduced, circular functions defined and the similarity to triangular trigonometry noted. Students graphically represent the sine and cosine curves. Graphs are analyzed and amplitude, vertical and horizontal shifts, stretches and shifts studied by changing the a, b and c in the general equations y = a sin bx + c and y = a cos bx + c. Trigonometric identities are presented. Trigonometric proofs are introduced. If time permits, double and half angle formulas are presented. These skills are extended to be applied to real-life situations. Evaluation occurs via homework, quizzes and test upon completion of the chapter. Concepts & Understandings Concepts Radian Measure Circular Functions Periodicity and Symmetry Graphs of Sines and Cosines Graphs of other Functions Fundamental Trigonometric Identities Trigonometric Addition, Double Angle and Half angle formulas Understandings The relationship between arc length and central angle of a sector is examined. The use of radian measure in problem solving is essential for specific types of problems. Circular functions are defined and related to triangular trigonometric definitions The use of symmetry and periodicity with trigonometric graphs is examined with the

27 Formulas for Tangent Function computer and the graphing calculator. Graphs of trigonometric functions and real-life situations are presented. Fundamental trigonometric identities and their use in problem solving are examined. Specific trigonometric formulas for finding values of special angles are presented and used. Double-angle and half-angle formulas are used for tangent. CPI Codes F-TF.HS.01 F-TF.HS.02 F-TF.HS.03 F-TF.HS.04 F-TF.HS.05 F-TF.HS.06 F-TF.HS.07 F-TF.HS.08 F-TF.HS.09 Learning Targets Math Practices See addendum See Addendum 21 st Century Themes and Skills Guiding Questions How to convert degrees to radians? How to convert radians to degrees? How to find the measure of a central angle of a circle with given radius and radians? What are the Circular Functions? To find the exact values of the six trigonometric functions of the given number? How to tell the period of the periodic function whose graph is shown? How to tell whether each function is even, odd, or neither How to find the amplitude of each function? How to find the Maximum and minimum values of a function?

28 How to find the period of a function What is an asymptote? What is the period of a function? What are the Reciprocal Identities? What are the Cofunction Identities? What are the Pythagorean Identities? What are the Addition Formulas for the Sine and Cosine? What are the Double-Angle formulas for the Sine and Cosine? What are the Addition Formulas for the Tangent? What is the Double-Angle Formula for the Tangent? What are the Half-Angle Form What are the Half-Angle formulas for Sine and Cosine? Unit Results Students will... Use radians to measure angles. Define the circular functions. Use periodicity and symmetry in graphing functions. Use periodicity and symmetry in graphing functions. Graph the sine, cosine, and related functions. graph the tangent, cotangent, secant, cosecant, and related functions Simplify trigonometric expressions and to prove identities. Use formulas for the sine and cosine of a sum or difference. use the double-angle and half-angle formulas for the sine and cosine use addition, double-angle, and half-angle formulas for the tangent Suggested Activities The following activities can be incorporated into the daily lessons: Find the arc length and area of a sector. Find the exact values of the six circular functions of an angle. Find the period of the periodic function whose graph is given. Determine whether each function is even, odd, or neither. Identify each curve as sine or cosine Find the period, the maximum and minimum values of a curve. Determine whether the tangent function is even, odd, or neither. Graph one period of a function. Simplify a trigonometric function of a single angle using addition formulas for the sine and cosine. Simplify to a trigonometric function of a single angle without evaluating. Find the exact value of a trigonometric function. Identify the addition formulas for the tangent. Simplify using the double-angle and the half-angle formulas for the tangent. Prove an identity.

29 Addendum Math Practices 1. CCSS.Math.Practice.MP1 Make sense of problems and persevere in solving them. Mathematically proficient students start by explaining to themselves the meaning of a problem and looking for entry points to its solution. They analyze givens, constraints, relationships, and goals. They make conjectures about the form and meaning of the solution and plan a solution pathway rather than simply jumping into a solution attempt. They consider analogous problems, and try special cases and simpler forms of the original problem in order to gain insight into its solution. They monitor and evaluate their progress and change course if necessary. Older students might, depending on the context of the problem, transform algebraic expressions or change the viewing window on their graphing calculator to get the information they need. Mathematically proficient students can explain correspondences between equations, verbal descriptions, tables, and graphs or draw diagrams of important features and relationships, graph data, and search for regularity or trends. Younger students might rely on using concrete objects or pictures to help conceptualize and solve a problem. Mathematically proficient students check their answers to problems using a different method, and they continually ask themselves, Does this make sense? They can understand the approaches of others to solving complex problems and identify correspondences between different approaches. 2. CCSS.Math.Practice.MP2 Reason abstractly and quantitatively. Mathematically proficient students make sense of quantities and their relationships in problem situations. They bring two complementary abilities to bear on problems involving quantitative relationships: the ability to decontextualize to abstract a given situation and represent it symbolically and manipulate the representing symbols as if they have a life of their own, without necessarily attending to their referents and the ability to contextualize, to pause as needed during the manipulation process in order to probe into the referents for the symbols involved. Quantitative reasoning entails habits of creating a coherent representation of the problem at hand; considering the units involved; attending

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