Percent Increase and Decrease Quiz
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Programs & methods
Calculus - Studying the Behavior of Functions Graphically
Students use the graphing calculator to create graphs of f, f’, and f”, and make observations about conditions that cause f to be increasing f to be decreasing, Extrema to occur A point of inflection based upon information from various graphs. This is a great lesson for students to use prior to knowing all the analytical techniques for taking a derivative. Using the built-in features on the graphing calculator students can graph a derivative of a function and a second derivative of a f
10th - 12th, Higher Education
Calculus, Math
Calculus - How are the Graphs of f, f ', and f " interrelated?
Using the graphing calculator, students learn how the graphs of the first and second derivatives describe the behavior of the original function. The activity is composed of four parts. Students make observations based upon a series of questions about increasing, decreasing, extrema, and concavity
10th - 12th, Higher Education
Calculus, Math
Lesson: The First Derivative Test
Students often find success with the first derivative test once they understand how to apply it. By working through the examples visually and analytically, then applying the anchor chart, students can determine where the relative extrema are located. This lesson can be used as an introduction to the first derivative test, as remediation, or as review. Concepts included in this lesson are:Determining increasing and decreasing intervals. The First Derivative Test.Relative maximum and minimum
11th - 12th
Calculus, Math
Lesson: Concavity, Inflection Points, and the 2nd Derivative Test
How do my students learn the significance of taking the second derivative? This introduction to determining concavity, inflection points, and using the second derivative test is easy to follow and understand. The anchor charts lead the students into determining concavity and locating inflection points. Using the second derivative test, they will also practice determining if critical numbers are relative extrema. Included in this product:· Lesson on the Second Derivative with examples. · Guide
11th - 12th
Calculus, Math
Other Trig Derivatives - Tanx, Cotx, Secx, and Cscx
Are there derivatives for the other trig functions? Yes, there are, and we can even derive them easily. In this lesson students will learn the derivatives of all the trig functions and practice how to apply them. Concepts in this lesson are:· Derivations of other trig functions using Quotient Rule with sinx and cosx. · Determining derivatives. · Evaluating derivatives. · Comprehensive chart of all derivatives. (Chain rule not yet included.) You can print this no prep lesson and use it as
10th - 12th
Calculus, Math
Also included in: Differentiation: Definition and Fundamental Properties
Limits 3 - Laws of Limits worksheet and lesson
This worksheet packet will help your students learn to use the laws of limits to simplify an expression in order to find the value of a limit algebraically. Click here to SAVE by buying the entire Limits Bundle which includes a FREE review and test.Click here to view the instructional video that accompanies this work packet. This helpful packet includes five components:Instruction: Use the video (sold separately) in your classroom or use the teacher led portion of the packet to explain the mate
11th - 12th, Higher Education
Calculus, PreCalculus
Introduction to The Mean Value Theorem
Students often feel overwhelmed when learning about theorems. This introductory lesson offers a concise explanation to the conditions and conclusion for the Mean Value Theorem. By following the included anchor chart, students determine when and how to apply the Mean Value Theorem. Concepts included in this lesson are:Slope of a secant line.Slope of a tangent line. Conditions for the Mean Value Theorem.The Mean Value Theorem.Applying the Mean Value Theorem.Determining the value for c. You ca
11th - 12th
Calculus, Math
What is a Derivative?
No Prep. In this mini-lesson, students will explore the difference between average rate of change, a secant line, and instantaneous rate of change, a tangent line or derivative. They will approximate a derivative from tables and graphs. Easy to follow examples help students complete the guided practice. A formative assessment worksheet completes the lesson. (A solution sheet is provided for teacher ease.) Both print and digital editions are available. Use them in your class and/or with o
10th - 12th
Calculus, Math
Also included in: Differentiation: Definition and Fundamental Properties
The Quotient Rule
Are your students overwhelmed with the Quotient Rule? The Quotient Rule is a long formula, but when we compare it to the Product Rule and then practice using it, the Quotient Rule will be much less intimidating . Concepts in this lesson are:· The Quotient Rule. · Comparison of Product Rule and Quotient Rule · Applying the Quotient Rule. (Anchor Chart included.) · Derivation of the Quotient Rule. (Optional) You can print this no prep lesson and use it as an in-class activity or download the
10th - 12th
Calculus, Math
Also included in: Product and Quotient Rules
General Definition of a Derivative
Applying the definition of a derivative is difficult for many students. However, by breaking the lesson into steps, students will generally find success. This lesson begins finding the derivative at a point, and then develops the general definition of a derivative. Concepts in this lesson are:· Definition of a derivative. · Determining derivatives using the definition. · All problems can be completed using the graphic organizer. You can print this no prep lesson and use it as an in-clas
10th - 12th
Calculus, Math
Also included in: Differentiation: Definition and Fundamental Properties
Calculus 3 / Multivariable Calculus - DOUBLE INTEGRALS in Polar Coordinates
This resource is designed for CALCULUS 3 - a comprehensive and rigorous lesson on Double Integrals in Polar Coordinates, containing 23 problems. The lesson includes ◆ notes & worked out examples ( 5 problems) ◆ practice problems with hints and given answers ( 5 problems) ◆ quiz ( 4 problems) ◆ assignment problems ( 9 problems) All answer keys are included. ********************************************************************* ❣❣❣ PLEASE VIEW THE PREVIEW BEFORE YOU BUY: Please study the pr
11th - 12th, Adult Education, Higher Education
Calculus, Math
Learning Derivatives: The Chain Rule
How do I explain the Chain Rule to my students? Many students struggle with “seeing” the composition of a function, which makes applying the Chain Rule difficult. In this lesson, students will review composite functions and then learn how to apply the Chain Rule, both in a formal way and a more relatable way. Several examples are given, and then students have guided practice problems before they complete the worksheet, which can be used as a formative assessment. This lesson covers the Chain Rul
10th - 12th
Calculus, Math
Also included in: Differentiation Bundle: Composite, Implicit, and Inverse Functions
Learning Derivatives: Inverse Trig Functions
Many students have difficulty relating the inverse trig functions with their derivatives. By using a right triangle to derive some of the inverse derivatives, students can better understand these formulas. Then the students will use the inverse derivatives in the guided practice and formative assessment. The first page of the worksheet is determining derivatives containing inverse trig. The second page is determining the equation of a tangent line and finally deriving the derivative of the inver
10th - 12th
Calculus, Math
Also included in: Differentiation Bundle: Composite, Implicit, and Inverse Functions
4 Digit by 1 Digit Multiplication Worksheets -with Digital and Printable Options
Learn to multiply large numbers with these 4 Digits by 1 Digit multiplication problems workbook.A perfect way to develop advanced multiplication skills.Details:11 Practice PagesAnswer Key IncludedGuided Gridlines8.5x11 size
4th - 5th
Basic Operations, Calculus
CCSS
4.NBT.B.4
, 5.NBT.B.5
Precalculus Summer Review Packet
Precalculus Summer Review Packet | Back-to-School Algebra & Trig Skills AssessmentLooking for a powerful, no-prep way to assess your students’ readiness for Precalculus? This Precalculus Summer Review Packet is your go-to solution to pinpoint gaps in foundational skills before diving into new material. Whether you're teaching Honors Pre-Calc, College Algebra, or Precalculus with Trigonometry, this packet provides a comprehensive diagnostic review of the algebra, functions, exponents, radicals
9th - 12th
Algebra 2, Calculus, PreCalculus
Limits from Tables plus Guided Notes for Calculus
This Evaluating Limits from Tables with Guided Notes resource is designed to help your Calculus students understand and master the concepts in this section and promote fluency. What's Included?11 Task cards which include polynomial, rational, irrational, and trig functions. Students use a table to determine if a limit exists and to evaluate it, if it exists. There are also problems which students are given a table and asked to estimate the limit. Blank Task card for you to personalizeGuided
11th - 12th, Higher Education
Calculus, PreCalculus
Also included in: Limits and Continuity Calculus Unit 1 Bundle
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