### 1: Read, write, and perform basic operations on complex numbers

Points in the Complex Plane

### 4: Translate and show the relationships among non-linear graphs, related tables of values, and algebraic symbolic representations

Absolute Value with Linear Functions

Linear Functions

### 5: Factor simple quadratic expressions including general trinomials, perfect squares, difference of two squares, and polynomials with common factors

Dividing Polynomials Using Synthetic Division

Factoring Special Products

### 6: Analyze functions based on zeros, asymptotes, and local and global characteristics of the function

Linear Functions

### 8: Categorize non-linear graphs and their equations as quadratic, cubic, exponential, logarithmic, step function, rational, trigonometric, or absolute value

Absolute Value with Linear Functions

### 9: Solve quadratic equations by factoring, completing the square, using the quadratic formula, and graphing

Modeling the Factorization of *x*^{2}+*bx*+*c*

Quadratics in Factored Form

Quadratics in Polynomial Form

Quadratics in Vertex Form

Roots of a Quadratic

### 10: Model and solve problems involving quadratic, polynomial, exponential, logarithmic, step function, rational, and absolute value equations using technology

Exponential Functions

Polynomials and Linear Factors

### 11: Calculate angle measures in degrees, minutes, and seconds

Triangle Angle Sum

### 12: Explain the unit circle basis for radian measure and show its relationship to degree measure of angles

Cosine Function

Sine Function

Tangent Function

### 16: Represent translations, reflections, rotations, and dilations of plane figures using sketches, coordinates, vectors, and matrices

Dilations

Rotations, Reflections, and Translations

Similar Figures

Translations

### 17: Discuss the differences between samples and populations

Polling: City

### 18: Devise and conduct well-designed experiments/surveys involving randomization and considering the effects of sample size and bias

Polling: Neighborhood

### 20: Interpret and explain, with the use of technology, the regression coefficient and the correlation coefficient for a set of data

Correlation

### 21: Describe and interpret displays of normal and non-normal distributions

Box-and-Whisker Plots

Describing Data Using Statistics

Polling: City

Populations and Samples

Real-Time Histogram

Sight vs. Sound Reactions

### 22: Explain the limitations of predictions based on organized sample sets of data

Polling: City

Polling: Neighborhood

### 24: Model a given set of real-life data with a non-linear function

Linear Functions

### 25: Apply the concept of a function and function notation to represent and evaluate functions

Linear Functions

### 26: Represent and solve problems involving nth terms and sums for arithmetic and geometric series

Arithmetic Sequences

Geometric Sequences

### 27: Compare and contrast the properties of families of polynomial, rational, exponential, and logarithmic functions, with and without technology

Logarithmic Functions

### 28: Represent and solve problems involving the translation of functions in the coordinate plane

Introduction to Exponential Functions

Rational Functions

Translating and Scaling Functions

Translations

Correlation last revised: 5/11/2018