Mr. Valsa's Math Page
Home
AP Calculus AB
Course Intro
Unit 01: Limits & Continuity
>
1.1 Intro to Calculus
1.2 Defining Limits & Using Limit Notation
1.3 Estimating Limit Values from a Graph
1.4 Estimating Limit Values from a Table
1.5 Determining Limits Using Algebraic Properties
1.6 Determining Limits Using Algebraic Manipulation
1.7 Selecting Procedures for Determining Limits
1.8 Squeeze Theorem
1.9 Multiple Representations of Limits
1.10 Exploring Types of Discontinuities
1.11 Defining Continuity
1.12 Confirming Continuity over an Interval
1.13 Removing Discontinuity
1.14 Infinite Limits & Vertical Asymptotes
1.15 Connecting Limits at Infinity & Horizontal Asymptotes
1.16 Intermediate Values Theorem (IVT)
Unit 02: Intro to the Derivative
>
2.1 Defining Average & Instantaneous Rates of Change
2.2 Defining the Derivative of a Function
2.3 Estimating the Derivative at a Point
2.4 Determining When Derivatives Exist
2.5 Applying the Power Rule
2.6 Derivative Rules
2.7: Derivatives of sin, cos, e^x, ln(x)
2.8 Product Rule
2.9 Quotient Rule
2.10 Derivative of tan/cot/sec/csc
Unit 03: Advanced Differentiation
>
3.1 The Chain Rule
3.2 Implicit Differentiation
3.3 Inverse Function Derivatives
3.4 Inverse Trig Derivatives
3.5 Selecting Procedures for Calculating Derivatives
3.6 Higher Order Derivatives
Unit 04: Contextual Applications of Derivatives
>
4.1 The Meaning of the Derivative in Context
4.2 Straight Line Motion
4.3 Rates of Change in Applied Contexts
4.4 Introduction to Related Rates
4.5 Solving Related Rates Problems
4.6 Approximating Values using Linearization
4.7 L'Hospital's Rule
Unit 05: Analytical Applications
>
5.1 Using the Mean Values Theorem (MVT)
5.2 Extreme Values Theorem (EVT)
5.3 Determining where a function is increasing/decreasing
5.4 First derivative test for extrema
5.5 Candidates Test for Extreme Values
5.6 Determining Concavity of a Function
5.7 Second Derivative Test for Extrema
5.8 Sketching Functions & their Derivatives
5.9 Connecting a Function and it's 1st/2nd Derivative
5.10 Intro to Optimization Problems
5.11 Solving Optimization Problems
5.12 Exploring Implicit Relationships
Unit 06: Integration & Accumulation of Change
>
6.1 Exploring Accumulations of Change
6.2 Approximating Areas with Riemann Sums
6.3 Riemann Sums/Summation Notation/Definite Integrals Notation/
6.4 FTC (Fundamental Theorem of Calculus) & Accumulation
6.5 Interpreting the Behavior of Accumulation Functions
6.6 Applying Properties of Definite Integrals
6.7 FTC and Definite Integrals
6.8 Anti-Derivatives - Basic Rules & Notation
6.9 Integration Using Substitution
6.10 Integration by Long Division & Completing the Square
6.14 - Selecting Techniques of Anti-Differentiation
Unit 07: Differential Equations
>
7.1 Modeling Situations with Differential Equations
7.2 Verifying Solutions to Differential Equations
7.3 Sketching Slope Fields
7.4 Reasoning with Slope Fields
7.6 Finding General Solutions using Separation of Variables
7.7 Finding Particular Solutions using Initial Conditions
7.8 Exponential Models with Differential Equations
Unit 08: Applications of Integration
PreCalculus
Course Intro
Unit 01 - Function Analysis
>
1.1 Set & Interval Notation
1.2 Function Review
1.3 Domain & Range
1.4 End Behavior & Extrema
1.5 Inc/Dec/Const
1.6 Symmetry
1.7 Function Transformations
1.8 Function Operations
1.9 Inverses
Unit 02: Polynomial & Rational Functions
>
2.1 Solving Polynomials
2.2 Classifying Polynomials
2.3 Complex Numbers
2.4 End Behavior
2.5 Writing Equations of Polynomials
2.6 Solving Rational Equations
2.7 Rational Inequalities
2.8 Types of Discontinuity
2.9 Graphing Rational Functions
Unit 03 - Conic Sections
>
3.1 Intro to Conic Sections
3.2 Circles
3.3 Ellipses
3.4 Hyperbolas
3.5 Parabolas
Unit 04 - Exponents & Logarithms
>
4.1 Exponents & Logarithms
Integrated Math 3
Course Intro
Unit 01: Analytic Geometry
>
1.1 Graphing Lines
1.2 Parallel & Perpendicular
1.3 Distance & Pythagorean Theorem
1.4 Classifying Quadrilaterals
Unit 02: Geometric Proofs & Modeling
>
2.1 Surface Area & Volume
2.2 Cross Sections
Unit 03: Circles & Parabolas
>
3.1 Circles Review
3.2 Arc Length & Sector Area
3.3 Writing & Graphing Circles
3.4 Completing the Square
3.5 Parabolas
Unit 04 - Representing Functions
>
4.1 - Key Features
4-2 Even & Odd Symmetry
4.3 Graphing Review
4.4 Absolute Value Equations
4.5 Absolute Value Functions Cont.
4.6 Piecewise Functions
Math Team
Contact
6.3 Riemann Sums/Summation Notation/Definite Integrals
Home
AP Calculus AB
Course Intro
Unit 01: Limits & Continuity
>
1.1 Intro to Calculus
1.2 Defining Limits & Using Limit Notation
1.3 Estimating Limit Values from a Graph
1.4 Estimating Limit Values from a Table
1.5 Determining Limits Using Algebraic Properties
1.6 Determining Limits Using Algebraic Manipulation
1.7 Selecting Procedures for Determining Limits
1.8 Squeeze Theorem
1.9 Multiple Representations of Limits
1.10 Exploring Types of Discontinuities
1.11 Defining Continuity
1.12 Confirming Continuity over an Interval
1.13 Removing Discontinuity
1.14 Infinite Limits & Vertical Asymptotes
1.15 Connecting Limits at Infinity & Horizontal Asymptotes
1.16 Intermediate Values Theorem (IVT)
Unit 02: Intro to the Derivative
>
2.1 Defining Average & Instantaneous Rates of Change
2.2 Defining the Derivative of a Function
2.3 Estimating the Derivative at a Point
2.4 Determining When Derivatives Exist
2.5 Applying the Power Rule
2.6 Derivative Rules
2.7: Derivatives of sin, cos, e^x, ln(x)
2.8 Product Rule
2.9 Quotient Rule
2.10 Derivative of tan/cot/sec/csc
Unit 03: Advanced Differentiation
>
3.1 The Chain Rule
3.2 Implicit Differentiation
3.3 Inverse Function Derivatives
3.4 Inverse Trig Derivatives
3.5 Selecting Procedures for Calculating Derivatives
3.6 Higher Order Derivatives
Unit 04: Contextual Applications of Derivatives
>
4.1 The Meaning of the Derivative in Context
4.2 Straight Line Motion
4.3 Rates of Change in Applied Contexts
4.4 Introduction to Related Rates
4.5 Solving Related Rates Problems
4.6 Approximating Values using Linearization
4.7 L'Hospital's Rule
Unit 05: Analytical Applications
>
5.1 Using the Mean Values Theorem (MVT)
5.2 Extreme Values Theorem (EVT)
5.3 Determining where a function is increasing/decreasing
5.4 First derivative test for extrema
5.5 Candidates Test for Extreme Values
5.6 Determining Concavity of a Function
5.7 Second Derivative Test for Extrema
5.8 Sketching Functions & their Derivatives
5.9 Connecting a Function and it's 1st/2nd Derivative
5.10 Intro to Optimization Problems
5.11 Solving Optimization Problems
5.12 Exploring Implicit Relationships
Unit 06: Integration & Accumulation of Change
>
6.1 Exploring Accumulations of Change
6.2 Approximating Areas with Riemann Sums
6.3 Riemann Sums/Summation Notation/Definite Integrals Notation/
6.4 FTC (Fundamental Theorem of Calculus) & Accumulation
6.5 Interpreting the Behavior of Accumulation Functions
6.6 Applying Properties of Definite Integrals
6.7 FTC and Definite Integrals
6.8 Anti-Derivatives - Basic Rules & Notation
6.9 Integration Using Substitution
6.10 Integration by Long Division & Completing the Square
6.14 - Selecting Techniques of Anti-Differentiation
Unit 07: Differential Equations
>
7.1 Modeling Situations with Differential Equations
7.2 Verifying Solutions to Differential Equations
7.3 Sketching Slope Fields
7.4 Reasoning with Slope Fields
7.6 Finding General Solutions using Separation of Variables
7.7 Finding Particular Solutions using Initial Conditions
7.8 Exponential Models with Differential Equations
Unit 08: Applications of Integration
PreCalculus
Course Intro
Unit 01 - Function Analysis
>
1.1 Set & Interval Notation
1.2 Function Review
1.3 Domain & Range
1.4 End Behavior & Extrema
1.5 Inc/Dec/Const
1.6 Symmetry
1.7 Function Transformations
1.8 Function Operations
1.9 Inverses
Unit 02: Polynomial & Rational Functions
>
2.1 Solving Polynomials
2.2 Classifying Polynomials
2.3 Complex Numbers
2.4 End Behavior
2.5 Writing Equations of Polynomials
2.6 Solving Rational Equations
2.7 Rational Inequalities
2.8 Types of Discontinuity
2.9 Graphing Rational Functions
Unit 03 - Conic Sections
>
3.1 Intro to Conic Sections
3.2 Circles
3.3 Ellipses
3.4 Hyperbolas
3.5 Parabolas
Unit 04 - Exponents & Logarithms
>
4.1 Exponents & Logarithms
Integrated Math 3
Course Intro
Unit 01: Analytic Geometry
>
1.1 Graphing Lines
1.2 Parallel & Perpendicular
1.3 Distance & Pythagorean Theorem
1.4 Classifying Quadrilaterals
Unit 02: Geometric Proofs & Modeling
>
2.1 Surface Area & Volume
2.2 Cross Sections
Unit 03: Circles & Parabolas
>
3.1 Circles Review
3.2 Arc Length & Sector Area
3.3 Writing & Graphing Circles
3.4 Completing the Square
3.5 Parabolas
Unit 04 - Representing Functions
>
4.1 - Key Features
4-2 Even & Odd Symmetry
4.3 Graphing Review
4.4 Absolute Value Equations
4.5 Absolute Value Functions Cont.
4.6 Piecewise Functions
Math Team
Contact