Pre-Calculus Scope and Sequence
Tutor: Kim Nelson
Text: PreCalculus,
Larson/Hostetler, 6th Edition
Chapter 1: Functions and Their Graphs
Sec. 1.1 Graphs of Equations
Graphing using tables
Intercepts
Symmetry
Circles
Application
Sec. 1.2 Linear Equations in 2
Variables
Using Slope
Finding the Slope
Writing Linear Equations
Parallel & Perpendicular
lines
Application
Sec. 1.3 Functions
Introductions to Functions
Function Notation
Domain of a Function
Applications
Sec. 1.4 Analyzing Graphs of Functions
Graph of a Function
Zeros of a Function
Increasing and Decreasing
Functions
Even and Odd Functions
Sec. 1.5 A
Library of Functions
Linear and Squaring Functions
Cubic, Square Root, and
Reciprocal Functions
Step and
Piecewise-defined Functions
Common Functions
Sec. 1.6 Shifting, Reflecting, and Stretching
Graphs
Shifting Graphs
Reflecting Graphs
Nonrigid
Transformations
Sec. 1.7 Combinations of Functions
Artihmetic
Combinations of Functions
Composition of Functions
Application
Sec. 1.8 Inverse Functions
Inverse Functions
Graph of an Inverse Function
One-to-One Functions
Finding Inverse
Functions Algebraically
Sec. 1.9 Mathematical Modeling
Introduction
Direct Variation
Direct Variationas an Nth Power
Inverse Variation
Joint Variation
CHAPTER 1 REVIEW
Chapter 2: Polynomial and Rational Functions
Sec. 2.1 Quadratic Functions
Graph of a Quadratic Function
Standard Form of a
Quadratic Function
Application
Sec. 2.2 Polynomial Functions of Higher Degree
Graphs of Polynomial Functions
Leading Coefficient Test
Zeros of Polynomial Functions
Intermediate Value
Theorem
Section 2.3 Polynomial and Synthetic Division
Long Division of Polynomials
Synthetic Division
The Remainder and Factor
Theorems
Section 2.4 Complex Numbers
The Imaginary Unit i
Operations with Complex
Numbers
Complex Conjugates
Complex Solutions of Quadratic
Equations
Sec. 2.5 Zeros of Polynomial Functions
The Fundamental Theorem
of Algebra
The Rational Zero Test
Conjugate Pairs
Factoring a Polynomial
Other Tests of Zeros of Polynomials
Sec. 2.6 Rational Functions
Horizontal and Vertical
Asymptotes
Analyzing Graphs of Rational
Functions
Slant Asymptotes
Applications
CHAPTER 2 REVIEW
Chapter 3: Exponential and Logarithmic Functions
Sec. 3.1 Exponential Functionsand
Their Graphs
Exponential Functions
Graphs of Exponential Functions
Natural Base e
Applications
Sec. 3.2 Logarithmic Functions and Their Graphs
Logarithmic Functions
Graphs of Logarithmic Functions
The Natural Logarithmic
Function
Application
Sec. 3.3 Properties of Logarithms
Change of Base
Properties of Logarithms
Rewriting Logarithmic Expressions
Application
Sec. 3.4 Exponential and Logarithmic Equations
Introduction
Solving Exponential Equations
Solving Logarithmic Equations
Application
CHAPTER 3 REVIEW
Chapter 4: Trigonometry
Sec. 4.1 Radian and Degree Measure
Angles
Radian Measure
Degree
Measure
Applications
Trigonometric Functions: The Unit Circle
The Unit Circle
Trigonometric
Functions
Domain
and Period of Sine and Cosine
Evaluating Trigonometric
Functions With a Calculator
Sec. 4.3 Right Triangle Trigonometry
The Six Trigonometric Functions
Trigonometric Identities
Evaluating Trigonometric
Functions with a Calculator
Applications Involving
Right Triangles
Sec. 4.4 Trigonometric Functions of Any Angle
Introduction
Reference Angles
Trigonometric Functions
of Real Numbers
Sec. 4.5 Graphs of Sine and Cosine Functions
Basic Sine and Cosine Curves
Amplitude and Period
Translation of Sine and Cosine Curves
Mathematical Modeling
Sec. 4.6 Graphs of other Trig Functions
Graph of the Tangent Function
Graph of the Cotangent Function
Graphs of Reciprocal Functions
Damped Trigonometric Graphs
Sec. 4.7 Inverse Trigonometric Functions
Inverse Sine Function
Other Inverse Trigonometric
Functions
Composition of Functions
Sec. 4.8 Applications and Models
Applications Involving
Right Triangles
Trigonometry and Bearings
Harmonic Motion
CHAPTER 4 REVIEW
Chapter 5: Analytic Trigonometry
Sec. 5.1 Using Fundamental Identities
Introduction
Using the Fundamental Identities
Sec. 5.2 Verifying Trig Identities
Introduction
Verifying Trigonometric
Identities
Sec. 5.3 Solving Trig Equations
Introduction
Equations of Quadratic Type
Functions Involving
Multiple Angles
Using Inverse Functions
Sec. 5.4 Sum and Difference Formulas
Using sum and Difference
Formulas
Sec. 5.5 Multiple-Angle and Product-to-Sum
Formulas
Multiple-Angle Formulas
Power-Reducing formulas
Half-Angle Formulas
CHAPTER 5 REVIEW
Chapter 6: Additional Topics in Trigonometry
Sec. 6.1 Law of Sines
Introduction
The Ambiguous Case (SSA)
Area of an Oblique Triangle
Application
Sec. 6.2 Law of Cosines
Introduction
Applications
Heron's Area Formula
Sec. 6.3 Vectors in the plane
Introduction
Component Form of a Vector
Vector
Operations
Sec. 6.4 Vectors and Dot Products
The Dot Product of Two
Vectors
The Angle Between Two Vectors
CHAPTER 6 REVIEW
Chapter 7: Systems of Equations and Inequalities
Sec. 7.1 Solving Systems of Equations
The Method of Substitution
Graphical Approach to
Finding Solutions
Applications
Sec. 7.2 Two-Variable Linear Systems
The Method of
Elimination
Graphical Interpretation
of Solutions
Applications
Sec. 7.3 Multivariable Linear Systems
Row-Echelon Form and
Back-Substitution
Gaussian Elimination
Nonsquare
Systems
Applications
Sec. 7.4 Systems of Inequalities
The Graph of an
Inequality
Systems of Inequalities
Applications
Sec. 7.5 Linear Programming
Linear Programming: A Graphical Approach
Applications
CHAPTER 7 REVIEW
Chapter 8: Matrices and Determinants
Sec. 8.1 Matrices and Systems of Equations
Matrices
Elementary Row
Operations
Gaussian Elimination
with Back-Substitution
Gauss-Jordon Elimination
Sec. 8.2 Operations with Matrices
Equality of Matrices
Matrix Addition and
Scalar Multiplication
Matrix Multiplication
Applications
Sec. 8.3 The Inverse of a Square Matrix
The Inverse of a Matrix
Finding Inverse Matrices
The Inverse of a 2 x 2
Matrix
Systems of Linear Equations
Sec. 8.4 The Determinant of a Square Matrix
The Determinant of a 2 x
2 Matrix
Minors and Cofactors
The Determinant of a
Square Matrix
Sec. 8.5 Applications of Matrices
and Determinants
Cramer’s Rule
Area of a Triangle
Lines in a Plane
Cryptography
CHAPTER 8 REVIEW
Chapter 9: Sequences, Series, and Probability
Sec. 9.1 Sequences and Series
Sequences
Factorial Notation
Summation Notation
Application
Sec. 9.2 Arithmetic Sequences and Partial Sums
Arithmetic Sequences
The Sum of a Finite
Arithmetic Sequence
Applications
Sec. 9.3 Geometric Sequences and Series
Geometric Sequences
The Sum of a Finite
Geometric Sequence
Geometric Series
Application
Sec. 9.5 The Binomial Theorem
Binomial Coefficients
Pascal’s Triangle
Binomial Expansions
Sec. 9.6 Counting Principles
Simple Counting Problems
The Fundamental Counting
Principle
Permutations
Combinations
Sec. 9.7 Probability
The Probability of an
Event
Mutually Exclusive
Events
Independent Events
The Complement of an
Event
CHAPTER 9 REVIEW
Chapter 10: Topics in Analytic Geometry
Sec. 10.1 Lines
Inclination of a Line
The Angle Between Two Lines
The Distance Between a Point and a Line
Sec. 10.2 Introduction to
Conics: Parabolas
Conics
Parabolas
Application
Sec. 10.3 Ellipses
Introduction
Application
Eccentricity
Sec. 10.4 Hyperbolas
Introduction
Asymptotes of a
Hyperbola
Applications
General Equations of
Conics
Sec. 10.6 Parametric Equations
Plane Curve
Sketching a Plane Curve
Eliminating a Parameter
Finding Parametric
Equations for Graph
Sec. 10.7 Polar Coordinates
Introduction
Coordinate Conversion
Equation Conversion
Sec. 10.8 Graphs of Polar Equations
Introduction
Symmetry
Zeros and Maximum
r-Values
Sketch Polar Graphs