AP® Calculus AB



AP® Calculus AB - Syllabus

Course Overview

The main objective in teaching AP® Calculus is to enable students to appreciate the strength of calculus and receive a thorough foundation that will give them the tools to succeed in future mathematics courses. Calculus with Analytic Geometry I, includes the study of real numbers, limits, continuity, differential and integral calculus of functions of one variable.

Technology:

• All students have a TI-83/TI-83+/TI84 graphing calculator for use in class, at home, and on the AP exam. Students will use their graphing calculator extensively throughout the course.

• Various applets on the Internet

• APCD software

Textbook: Calculus, 2nd Edition, Robert T. Smith and Roland B. Minton, McGraw Hill

Course Planner [C2]

A Library of Functions (Chapter 0)

1st Quarter

Lab: Exploring function transformations f(x + h), f(x) + k, a*f(x), f(b*x), f(|x|),|f(x)|

1. • Multiple representations of functions

2. • Absolute value and interval notation

3. • Domain and range

4. • Categories of functions, including linear, polynomial, rational, power, exponential, logarithmic, and trigonometric

5. • Even and odd functions

6. • Function arithmetic and composition

7. • Inverse functions

8. • Parametric relations

Key Concept: Limits and Continuity (Chapter 1)

1st Quarter

1. 1. Concept of Limits

2. 2. Computation of Limits

3. 3. Continuity and its consequences

4. 4. Limits involving infinity

5. 5. Formal Definition of a limit

Differentiation (Chapter 2)

2nd Quarter

6. 1. Tangent Lines and Velocity

7. 2. The Derivative

8. 3. The Derivative at a point

1. 4. Powers and Polynomials

2. 5. The Exponential/logarithmic Function

3. 6. The Product and Quotient Rules

4. 7. The Chain Rule

5. 8. The Trigonometric Functions

6. 9. Applications of the Chain Rule and Related Rates

7. 10. Implicit Functions

8. 11. Mean Value Theorem

Activity: CBL Prime Number Lab [C3] [C5]

Activity: Graphing the Derivative of a Function (See example) [C4]

Application of the Derivative (Chapter 3)

2nd Quarter

9. 1. Linear Approximation and the Derivative

10. 2. L’Hopital’s Rule

11. 3. Newton’s Method

12. 4. Using Local Linearity to Find Limits

1. 5. Using First and Second Derivatives

2. 6. Families of Curves

3. 7. Optimization and Modeling

4. 8. Theorems About Continuous and Differentiable Functions

5.

Activity: Optimization Project [C3] [C4]

Key Concept: Integration (Chapter 4)

2nd Quarter

1. 1. How Do We Measure Distance Traveled?

2. 2. Antiderivatives Graphically and Numerically

3. Constructing Antiderivatives Analytically

4. Sums and Sigma Notation

5. Reimann Sums

Activity: Who’s winning the race? [C3][C5]

Midterm Exam

Constructing Antiderivatives (Chapter 4)

3rd Quarter

1. Fundamental Theorem of Calculus

3. 2. The Definite Integral

4. 3. Interpretations of the Definite Integral

4. Theorems About Definite Integrals

1. 5. Integration by Substitution

1. 6. Differential Equations

2. 7. Second Fundamental Theorem of Calculus

3. 8. The Equations of Motion

4. 9. Numerical Integration

Activity: Jimmy Stewart’s Car

Applications of the Definite Integral (Chapter 5)

3rd Quarter

1. Area and Volumes

2. Arc Lengths and Surface Areas

3. Projectile Motion

4. Work, Moments and Hydrostatic Force

5. Probability

Activity: Three-dimensional foam project. [C3][C4]

Exponentials, Logarithms and other Transcendental Functions (Chapter 6)

4th Quarter

1. Natural Logarithm

2. Inverse Functions

3. The Exponential Function Revisited

4. Growth and Decay Problems

5. Separable Differential Equations

6. Euler’s Method

7. Slope Fields

8. Inverse Trig

Drawing Slope Fields [C3] [C4] [C5]

C2—The course teaches all topics associated with Functions, Graphs, and Limits; Derivatives; Integrals; and Polynomial Approximations and Series as delineated in the Calculus AB Topic Outline in the AP Calculus Course Description.

C5—The course teaches students how to use graphing calculators to help solve problems, experiment, interpret results, and support conclusions.

C4—The course teaches students how to communicate mathematics and explain solutions to problems both verbally and in written sentences.

C3—Evidence of Curricular Requirement: The course provides students with the opportunity to work with functions represented in a variety of ways—graphically, numerically, analytically, and verbally—and emphasizes the connections among these representations.

Teaching Strategies

During the first few weeks of school I start with a transformation packet. This packet requires students to use their prior knowledge about all types of functions to discuss transformations. The students work alone for a time and then I have them work together in groups to discuss their findings. This is how I structure the class for the rest of the year. I incorporate the use of technology throughout the year so that students have multiple means of interpreting a problem. I encourage students to explore and discover throughout the course.

I like to incorporate whiteboard activities while learning new topics. Sometimes I will give the entire class the same problem but have them work on it in groups of two. They then have to write up their findings on the whiteboard. Once all are done I call for a “board meeting”. All the students hold up their board and we then discuss the different findings. The students enjoy this atmosphere. I use technology throughout the year. These include TI series calculators (this varies depending on which one the student owns), TI InterActive!, APCD, CBL’s, and LabPro. I use four simple rules when presenting topics. They are graphically, numerically, algebraically, and verbally. This allows the students to gain an in-depth understanding of the material.

Student Evaluation

In order to give students practice with AP type questions, I start with free-response questions after the students have mastered derivatives. I give them a question a week and we go over them on Friday’s. This allows the students to come in for help and work together on solving them. I then incorporate free-response questions into the exam for each chapter. After the December holiday break, we start working on multiple-choice questions. I use them as warm-ups and we go over them after 15 minutes of work. The number of problems I give as warm-ups depends on the difficulty of the question. Usually there are 2 to 3 questions per warm-up. We then go over the questions as a class. Oftentimes, I will select students to display their work on the board.

Example of Student Activity

Graphing with the Derivative

Work done on this assignment will be assessed against all criteria. The use of technology is required and will be assessed.

Consider the function f(x) = [pic]

1. Where are the roots of the function?

2. What are the intervals for which f is increasing and decreasing. Show all work.

3. Where are the local maxima and minima of f?

4. What are the intervals for which f is concave up and concave down?

5. Where are the inflection points?

6. Name all vertical and horizontal asymptotes.

7. Sketch the graph of f.

8. On the same grid sketch the graph of f, f’, and f’’.

9. Summarize the graph and make links to the information that you found in 1-7.

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