Students will learn how to solve non-exact separable differential equations. Students will also be able to create and interpret slope fields.
Homework packet can be bought separately or bought with this product as a bundle.
Students will be able to justify where a function is increasing and decreasing, concave up and concave down. They will be able to justify a function’s extrema and inflection points. They will be able to apply the Extreme Value Theorem, the First
Students will practice how to solve both exact differential equations and non-exact separable differential equations. Students will also practice creating and interpreting slope fields.
This bundle includes both the note packet and homework
Students will be able to apply integration techniques to a variety of functions. They will be able to apply the Fundamental Theorem of Calculus both part one and two. In addition, students will be able to approximate area between a curve and the
Smart notebook presentation to go along with AP Calculus AB Areas and Volumes of Solids of Revolution note packet.
Both the smart notebook presentation and the note packet are included in this zip file. Each can be bought separately.
Students
Students will practice how to solve non-exact separable differential equations. Students will also practice creating and interpreting slope fields. Solutions included.
Note packet can be bought separately.
Students will be able to justify where a function is increasing and decreasing, concave up and concave down. They will be able to justify a function’s extrema and inflection points. They will be able to apply the Extreme Value Theorem, the First
Summary of all the Calculus theorems and definitions used for AP Calculus AB. Great tool for AP review. Includes such things like IVT, EVT. MVT, motion formulas, volumes of solids of revolution formulas, etc.
Students will learn the Fundamental Theorem of Calculus (evaluation part) and connect it with area. Students will be able to evaluate a definite integral on the graphing calculator and analyticllay. Students will learn the properties of the
Students will be able to justify where a function is increasing and decreasing, concave up and concave down. They will be able to justify a function’s extrema and inflection points. They will be able to apply the Extreme Value Theorem, the First
Students will be able to use antiderivative (indefinite integral) rules. Students will be able to approximate area under a curve using rectangle (Riemann sum) and trapezoid approximation methods.
Students will learn antiderivative (indefinite integral) rules and use them in some basic differential equations, including motion problems. Students will be able to approximate area under a curve using rectangle (Riemann sum) and trapezoid
Smart notebook presentation to go along with AP Calculus AB Areas and Volumes of Solids of Revolution note packet.
Students will be able to find the area between curves, find the volume of solids of revolution and known cross sections.
Separate
Subjects:
Calculus
Grades:
12th
Types:
Interactive Whiteboard, Internet Activities, Simulations
Students will be able to justify an optimization problem and explain a related rates problem.
This is both the student version and the answer key. Answer key and student version can both be bought separately.
Students will be able to find the area between curves, find the volume of solids of revolution and known cross sections.
Separate smart notebook presentation can be bought separately to go along with this note packet or bought as a bundle.
Students will be able to accurately sketch a curve given its derivative as well as connect the amount of increase and decrease to an integral. Students will be able to apply integrals to particle motion problems.
Students will learn the formal limit definition of the derivative and use it to evaluate derivatives. Students will be introduced to the notation of left and right hand derivatives as well as evaluating them. Students will be able to justify
Students will be able to apply the concept that "If you want the cumulative effect of a varying rate (derivative), then integrate it". Students will see this concept in a variety of real world application problems including AP free response
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TEACHING EXPERIENCE
Teaching high school mathematics in Rochester, New York since 1998.