October 18, 2007 Welcome back! … to the cavernous pit of math.

Slides:

Advertisements

Similar presentations

10.4 The Divergence and Integral Test Math 6B Calculus II.

Advertisements

Jeopardy Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy.

TOPIC TECHNIQUES OF INTEGRATION. 1. Integration by parts 2. Integration by trigonometric substitution 3. Integration by miscellaneous substitution 4.

Chapter 7 – Techniques of Integration

In this section, we will define what it means for an integral to be improper and begin investigating how to determine convergence or divergence of such.

TECHNIQUES OF INTEGRATION

1 Chapter 8 Techniques of Integration Basic Integration Formulas.

MA132 Final exam Review. 6.1 Area between curves Partition into rectangles! Area of a rectangle is A = height*base Add those up ! (Think: Reimann Sum)

Integration of irrational functions

Techniques of Integration

BY PARTS. Integration by Parts Although integration by parts is used most of the time on products of the form described above, it is sometimes effective.

Review Of Formulas And Techniques Integration Table.

Chapter 9 Calculus Techniques for the Elementary Functions.

Chapter 7 – Techniques of Integration

Meeting 11 Integral - 3.

Jeopardy Limits Limits with Trig Slope of a Curve Continuity Potpourri $100 $200 $300 $400 $500 $100 $200 $300 $400 $500.

8.8 Improper Integrals Math 6B Calculus II. Type 1: Infinite Integrals  Definition of an Improper Integral of Type 1 provided this limit exists (as a.

Division Properties of Exponents

In this section, we will look at integrating more complicated rational functions using the technique of partial fraction decomposition.

Chapter 8 Integration Techniques. 8.1 Integration by Parts.

INTRODUCTORY MATHEMATICAL ANALYSIS For Business, Economics, and the Life and Social Sciences  2007 Pearson Education Asia Chapter 15 Methods and Applications.

INTRODUCTORY MATHEMATICAL ANALYSIS For Business, Economics, and the Life and Social Sciences  2011 Pearson Education, Inc. Chapter 15 Methods and Applications.

8.4 Improper Integrals Quick Review Evaluate the integral.

7.8 Improper Integrals Definition:

Copyright © 2007 Pearson Education, Inc. Publishing as Pearson Prentice Hall 8.4 Improper Integrals.

Section 7.7 Improper Integrals. So far in computing definite integrals on the interval a ≤ x ≤ b, we have assumed our interval was of finite length and.

September 27, 2007 Welcome to the cavernous pit of math!

SECTION 6.2 Integration by Substitution. U-SUBSTITUTION.

November 1st, 2007 Welcome to The Candy Carnival.

Section 9.3 Convergence of Sequences and Series. Consider a general series The partial sums for a sequence, or string of numbers written The sequence.

Chapter 6-Techniques of Integration Calculus, 2ed, by Blank & Krantz, Copyright 2011 by John Wiley & Sons, Inc, All Rights Reserved.

Indeterminate Forms and L’Hopital’s Rule Chapter 4.4 April 12, 2007.

Math Jeopardy! By:. CurrentReviewWord Problem

Example IMPROPER INTEGRALS Improper Integral TYPE-I: Infinite Limits of Integration TYPE-I: Infinite Limits of Integration Example TYPE-II: Discontinuous.

Improper Integrals (8.8) Tedmond Kou Corey Young.

Title Name Jeopardy – Round

Improper Integrals Lesson 7.7. Improper Integrals Note the graph of y = x -2 We seek the area under the curve to the right of x = 1 Thus the integral.

SECTION 8.4 IMPROPER INTEGRALS. SECTION 8.4 IMPROPER INTEGRALS Learning Targets: –I can evaluate Infinite Limits of Integration –I can evaluate the Integral.

Lecture 8 – Integration Basics

Chapter 5 Techniques of Integration

November 20th, 2007 Happy T-Day to You.

Type Subject Here (1). Type Subject Here (1) Type Subject Here (2)

Warm Up Find the product • 5 • 5 • • 3 • 3 27

Calculus II (MAT 146) Dr. Day Monday, September 11, 2017

Calculus II (MAT 146) Dr. Day Wednesday November 8, 2017

Integration Techniques

PROGRAMME 16 INTEGRATION 1.

PROGRAMME 15 INTEGRATION 1.

Find the area under the curve {image} from x = 1 to x = t

Section 5.4 Theorems About Definite Integrals

Evaluate the following integral: {image}

Improper Integrals Lesson 8.8.

8.4 Improper Integrals.

Series JEOPARDY.

10.3 Integrals with Infinite Limits of Integration

Calculus II (MAT 146) Dr. Day Friday, Oct 7, 2016

Improper Integrals Infinite Integrand Infinite Interval

Math – Improper Integrals.

Integration Double Jeopardy

Methods in calculus.

Chapter 9 Section 9.4 Improper Integrals

Calculus II (MAT 146) Dr. Day Monday, February 6, 2018

Calculus II (MAT 146) Dr. Day Monday, Oct 10, 2016

Chapter 7 Integration.

PROGRAMME 17 INTEGRATION 2.

Methods in calculus.

Calculus II (MAT 146) Dr. Day Monday, February 19, 2018

10.4 Integrals with Discontinuous Integrands. Integral comparison test. Rita Korsunsky.

Presentation transcript:

October 18, 2007 Welcome back! … to the cavernous pit of math

Quiz 3 Review

JEOPARDY Integration Nation CurveballsTricky TreatsPotpourri

FINAL JEOPARDY

Give one example for each technique or description. You have five minutes! 1.Algebraic simplification of the integrand 2.Rewriting the integrand using trig identities, then substitution 3.Substitution (non-trig) 4.Trig substitution 5.Parts once 6.Parts seven times 7.Substitution, then parts 8.Partial fractions 9.Type I improper integral that converges 10.Type II improper integral 11.May not be integrated using any technique

Integration Nation (100) Do the first step:

Integration Nation (200) Do the first step:

DAILY DOUBLE

Integration Nation (300) Do the first step:

Integration Nation (400) Do the first step:

Integration Nation (500) Do the first step:

Curveballs (100) Find the area under the curve for 1 ≤ x <  or show that it is infinite.

Curveballs (200) Suppose x is the number of hours it takes a random student to complete an exam and the curve is the density function for x. Find the average completion time.

Curveballs (300) Find the area under the curve Hint: there is an easy way to do this problem and a hard way to do it. Do it the easy way!

Curveballs (400) Draw a picture that explains why the statement is true: Determine whether each integral converges or diverges.

Curveballs (500) Find the area under from x = 0 to x = .

Tricky Treats (100) Evaluate

Tricky Treats (200) Suppose x is the score of a student on a test, and the density function for x is symmetric around the line x = 75. What is the median student score on the test?

Tricky Treats (300) Evaluate

Tricky Treats (400) Find a function f(x) so that BUT diverges.

DAILY DOUBLE

Tricky Treats (500) Rewrite the integral as the sum of limits of proper integrals:

Potpourri (100) Break into partial fractions:

Potpourri (200)

Potpourri (300)

Potpourri (400) Evaluate or show that it diverges:

Potpourri (500) Suppose the density function for the time spent waiting for a call to be answered is where x is the waiting time in minutes and A is a constant. Find the value of A.