Secant Method. Civil Engineering Majors Authors: Autar Kaw, Jai Paul http://numericalmethods.eng.usf.edu Transforming Numerical Methods Education for STEM Undergraduates. Secant Method http://numericalmethods.eng.usf.edu. Secant Method – Derivation. Newton’s Method. (1).

BySecant Method. Civil Engineering Majors Authors: Autar Kaw, Jai Paul http://numericalmethods.eng.usf.edu Transforming Numerical Methods Education for STEM Undergraduates. Secant Method http://numericalmethods.eng.usf.edu. Secant Method – Derivation. Newton’s Method. (1).

By§ 7.3. Maxima and Minima of Functions of Several Variables. Section Outline. Relative Maxima and Minima First Derivative Test for Functions of Two Variables Second Derivative Test for Functions of Two Variables Finding Relative Maxima and Minima. Relative Maxima & Minima.

By§ 7.3. Maxima and Minima of Functions of Several Variables. Section Outline. Relative Maxima and Minima First Derivative Test for Functions of Two Variables Second Derivative Test for Functions of Two Variables Finding Relative Maxima and Minima. Relative Maxima & Minima.

By§ 7.3. Maxima and Minima of Functions of Several Variables. Section Outline. Relative Maxima and Minima First Derivative Test for Functions of Two Variables Second Derivative Test for Functions of Two Variables Finding Relative Maxima and Minima. Relative Maxima & Minima.

ByCalculus: The Basics. By: Rosed Serrano and Dominique McKnight. Table of Contents. About the Authors page 2 Chapter 1: Limits and Continuity page 3 Chapter 2: Derivatives page 8 Chapter 3: Anti-derivatives page 13 Chapter 4: Applications page 19. Rosed Serrano (left)

ByLearning Target: I will determine if a function is increasing or decreasing and find extrema using the first derivative. Section 3: Increasing & Decreasing functions & the first derivative test. AP Exam Practice. A function, f, is increasing on an interval for any

ByCalculus!. Lesson 66 – Derivative Tests. October 30, 2013 Fernando Morales, Human Being. What type of slope is there between each of the intervals?. Between A and B the tangent lines have positive slope so f ’(x) > 0.

ByCURVE SKETCHING. RATIONAL FUNCTIONS. RATIONAL FUNCTIONS EXAMPLE 1 a) Domain Since x 2 + x – 2 ≠ 0 ( x + 2)( x – 1) ≠ 0 x ≠ – 2 x ≠ 1 x e R b) x -intercepts y - intercept c) Tests for symmetry Circle the correct answer.

By4.3. Connecting f ’ and f ” with the graph of f. Quick Review. Quick Review. Quick Review Solutions. Quick Review Solutions. What you’ll learn about. First Derivative Test for Local Extrema Concavity Points of Inflection Second Derivative Test for Local Extrema

ByHow Derivatives Affect The Shape of a Graph. Section 4.3. Definition of concavity . Let be differentiable on an open interval: i . The graph of is concave upward if is increasing on the interval.

BySecond Derivative Test, Graphical Connections. Section 4.3b. Do Now: #30 on p.204 (solve graphically). (a) Local Maximum at. (b) Local Minimum at. (c) Points of Inflection:. Second Derivative Test for Local Extrema. If and , then has a

ByCalculus Section 4.3 Determine the concavity of a function. Intuitively , a graph is concave up if it “holds water”. It is concave down if it will not “hold water”. A graph is concave up when the tangent line is below the graph. It is concave down when the tangent line is above the graph.

ByCurve Sketching. section 3-A continued . A nalyzing the graph of a function Domain and Range: All real numbers except ___ Extrema and the intervals where increasing and decreasing (first derivative test) Intercepts : where the graph crosses the x-axis and the y-axis

ByConcavity and the Second Derivative Test. Calculus 3.4. Concavity. f is differentiable on an open interval The graph is concave upward if f ´ is increasing on the interval. Graph lies above its tangent lines Graph “holds water”

BySecond Derivative Test. Concavity. If the graph of a function f lies above all of its tangents, then it is called concave upward If the graph of a function f lies below all of its tangents, then it is called concave downward. Test for Concavity.

ByAP Calculus BC Wednesday , 16 October 2013. OBJECTIVE TSW determine intervals of concavity and points of inflection (POI) by using the second derivative test. ASSIGNMENT DUE TEST DAY Sec. 3.3: pp. 186-187 (1-37 odd, 55-60 all) Sec. 3.4: p. 195 (1-37 eoo )

ByMAT 1234 Calculus I. Section 3.3 How Derivatives Affect the Shape of a Graph (II). http://myhome.spu.edu/lauw. Next. Wednesday Quiz: 3.3,3.4 Exam II: Next Thursday. Preview. We know the critical numbers give the potential local max/min. How to determine which one is local max/min?.

By3.4 Concavity and the Second Derivative Test. Definition of Concavity. Let f be differentiable on an open interval I. The graph of f is concave upward on I if f’ is increasing on the interval and concave downward of I if f’ is decreasing on the interval. The graph is concave up

ByDid you Check your Endpoints?. 1 st & 2 nd Derivative Tests Today you will apply and formally define the first and second derivative tests. Discussion. 1 st Derivative Test. 2 nd Derivative Test. Solving Extrema Problems.

ByView Derivative test PowerPoint (PPT) presentations online in SlideServe. SlideServe has a very huge collection of Derivative test PowerPoint presentations. You can view or download Derivative test presentations for your school assignment or business presentation. Browse for the presentations on every topic that you want.