3-6 Critical Points and Extrema

Slides:

Advertisements

Similar presentations

4.3 Connecting f’ and f’’ with the Graph of f

Advertisements

What does say about f ? Increasing/decreasing test

4.1 Extreme Values for a function Absolute Extreme Values (a)There is an absolute maximum value at x = c iff f(c)  f(x) for all x in the entire domain.

Section 3.6: Critical Points and Extrema

Unit 11 – Derivative Graphs Section 11.1 – First Derivative Graphs First Derivative Slope of the Tangent Line.

First and Second Derivative Test for Relative Extrema

Section 5.1 – Increasing and Decreasing Functions The First Derivative Test (Max/Min) and its documentation 5.2.

4.3 How Derivatives Affect the Shape of a Graph. Facts If f ’( x ) > 0 on an interval ( a,b ), then f (x) is increasing on ( a,b ). If f ’( x ) < 0 on.

Applications of Derivatives

Today in Pre-Calculus Review Chapter 1 Go over quiz Make ups due by: Friday, May 22.

Increasing/ Decreasing

In the past, one of the important uses of derivatives was as an aid in curve sketching. We usually use a calculator of computer to draw complicated graphs,

Review for Test 3 Glendale Community College Phong Chau.

Warmup  If y varies directly as the square of x and inversely as z and y =36 when x =12 and z =8, find x when y=4, and z=32.

Curve Sketching. Objective To analyze and sketch an accurate graph of a function. To analyze and sketch an accurate graph of a function.

§3.4 Concavity Concave Up Concave Down Inflection Points Concavity Changes Concave Up Concave Down.

Sketching Functions We are now going to use the concepts in the previous sections to sketch a function, find all max and min ( relative and absolute ),

What does say about f ? Increasing/decreasing test

Analyzing Rational Functions

Increasing/decreasing and the First Derivative test

Calculus Section 4.2 Find relative extrema and graph functions

Relative Extrema and More Analysis of Functions

4.3 Using Derivatives for Curve Sketching.

Calculus I (MAT 145) Dr. Day Wednesday Nov 1, 2017

Calculus I (MAT 145) Dr. Day Monday Oct 30, 2017

Extreme Values of Functions

Open intervals of increasing, decreasing & constant functions

Review Problems Sections 3-1 to 3-4

3.6 Critical Points and Extrema

Section 3.6 A Summary of Curve Sketching

Graphs and the Derivative

Chapter 12 Review Important Terms, Symbols, Concepts

Lesson 37 - Second Derivatives, Concavity, Inflection Points

Let’s get our brains back on track …

Applications of the Derivative

Chapter 12 Graphing and Optimization

Section 3.1 Day 1 Extrema on an Interval

Concavity and Second Derivative Test

3. Increasing, Decreasing, and the 1st derivative test

3.6 Critical Points.

Applications of the Derivative

Section 3.6 Calculus AP/Dual, Revised ©2017

Calculus I (MAT 145) Dr. Day Wednesday, October 17, 2018

Second Derivative Test

Concavity and the Second Derivative Test

4.5 An Algorithm for Curve Sketching

Application of Derivative in Analyzing the Properties of Functions

-20 is an absolute minimum 6 is an absolute minimum

3.6 – Critical Points & Extrema

Second Derivatives, Inflection Points and Concavity

Section 6 – Critical Points and Extrema

Self Assessment 1. Find the absolute extrema of the function

Graphs and the Derivative

WHAT YOU SHOULD HAVE ON YOUR DESK…

58 – First Derivative Graphs Calculator Required

4.3 Connecting f’ and f’’ with the graph of f

Warm Up Cinco Chapter 3.4 Concavity and the Second Derivative Test

Calculus I (MAT 145) Dr. Day Wednesday March 20, 2019

Critical Numbers – Relative Maximum and Minimum Points

Calculus I (MAT 145) Dr. Day Monday March 25, 2019

Derivatives and Graphing

3-1 Extreme Values of Functions.

4.2 Critical Points, Local Maxima and Local Minima

Copyright © Cengage Learning. All rights reserved.

- Derivatives and the shapes of graphs - Curve Sketching

Chapter 4 Graphing and Optimization

Calculus I (MAT 145) Dr. Day Wednesday March 20, 2019

Presentation transcript:

3-6 Critical Points and Extrema 5 minute check Tell which type of discontinuity : jump, hole, infinite.

Vocabulary Critical Points – points on a graph in which a line drawn tangent to the curve is horizontal or vertical Maximum Minimum Point of Inflection

Maximum When the graph of a function is increasing to the left of x = c and decreasing to the right of x = c.

Minimum When the graph of a function is decreasing to the left of x = c and increasing to the right of x = c

Relative Extrema A maximum/minimum of a function in a specific interval. It is not necessarily the max/min for the entire function

Sketch 2 graphs. One that has an absolute min and another with a relative min.