MAT 1236 Calculus III Section 11.1 Sequences Part I

Slides:

Advertisements

Similar presentations

…the study of how light and matter interact

Advertisements

MAT 3751 Analysis II Winter 2014

MAT 3749 Introduction to Analysis Fall 2013

Series Brought to you by Tutorial Services – The Math Center.

INFINITE SEQUENCES AND SERIES

CISE-301: Numerical Methods Topic 1: Introduction to Numerical Methods and Taylor Series Lectures 1-4: KFUPM.

MAT 1236 Calculus III Section 14.5 The Chain Rule

MAT 1236 Calculus III Section 14.5 The Chain Rule

MAT 1221 Survey of Calculus Section 6.4 Area and the Fundamental Theorem of Calculus

Many quantities that arise in applications cannot be computed exactly. We cannot write down an exact decimal expression for the number π or for values.

MAT 1235 Calculus II Section 6.8 Indeterminate Forms and L’Hospital Rule

MAT 1235 Calculus II Section 7.7 Approximate (Numerical) Integration

Sequences and Series (T) Students will know the form of an Arithmetic sequence.  Arithmetic Sequence: There exists a common difference (d) between each.

THE BEST CLASS EVER…ERRR…. PRE-CALCULUS Chapter 13 Final Exam Review.

MAT 1234 Calculus I 9.4 System of Linear Equations: Matrices

MAT 1234 Calculus I Section 1.6 Part II Using the Limit Laws

Honors Chemistry Class Welcome to Mrs. Pruss' Honors Chemistry Class Unit 00: Experimental Methods I. Introduction to Course Syllabus II. Introduction.

Syllabus and Class Policies MATH 130: Summer 2014.

CALCULUS II Chapter Sequences A sequence can be thought as a list of numbers written in a definite order.

EE 3561_Unit_1(c)Al-Dhaifallah EE 3561 : - Computational Methods in Electrical Engineering Unit 1: Introduction to Computational Methods and Taylor.

MAT 1235 Calculus II Section 6.1 Inverse Functions

MAT 1236 Calculus III Section 15.4 Double Integrals In Polar Coordinates

MAT 1235 Calculus II Section 6.8 Indeterminate Forms and L’Hospital Rule

MAT 1221 Survey of Calculus Exam 1 Info

MATH-102 Term 122. Meet Your Book About the cover: The cover image of a tree line on a snow- swept landscape, by the photographer Michael Kenna, was.

MAT 1236 Calculus III Appendix E Sigma Notations + Maple Lab

MAT 1234 Calculus I Section 2.4 Derivatives of Tri. Functions

MAT 1235 Calculus II 4.1, 4.2 Part I The Definite Integral

11.2 Series In this section, we will learn about: Various types of series. INFINITE SEQUENCES AND SERIES.

MAT 1234 Calculus I Section 3.4 Limit at infinity

MAT 1236 Calculus III Spring 2015

MAT 1235 Calculus II Section 6.4* General Log. and Exponential Functions

MAT 1235 Calculus II 4.4 Part II Indefinite Integrals and the Net Change Theorem

Pg. 395/589 Homework Pg. 601#1, 3, 5, 7, 8, 21, 23, 26, 29, 33 #43x = 1#60see old notes #11, -1, 1, -1, …, -1#21, 3, 5, 7, …, 19 #32, 3/2, 4/3, 5/4, …,

In section 11.9, we were able to find power series representations for a certain restricted class of functions. Here, we investigate more general problems.

MAT 1235 Calculus II Section 8.2 Area of a Surface of Revolution

MAT 1235 Calculus II Section 7.8 Improper Integrals I

Section 8.1: Sequences Practice HW from Stewart Textbook (not to hand in) p. 565 # 3-33 odd.

Section 8.2: Series Practice HW from Stewart Textbook (not to hand in) p. 575 # 9-15 odd, 19, 21, 23, 25, 31, 33.

Sequences (Sec.11.2) A sequence is an infinite list of numbers

Section 8.2: Infinite Series. Zeno’s Paradox Can you add infinitely many numbers ?? You can’t actually get anywhere because you always have to cover half.

CHAPTER Continuity Series Definition: Given a series   n=1 a n = a 1 + a 2 + a 3 + …, let s n denote its nth partial sum: s n =  n i=1 a i = a.

MAT 1234 Calculus I Section 2.7 Rates of Change in Natural and Social Sciences

Section 3.1 Introduction & Review of Power Series.

MAT 1234 Calculus I Section 2.3 Part II Differentiation Formulas

MAT 1234 Calculus I Section 1.6 Part II Using the Limit Laws

Infinite Geometric Series Recursion & Special Sequences Definitions & Equations Writing & Solving Geometric Series Practice Problems.

MAT 1235 Calculus II Section 9.1 Modeling with Differential Equations

Section 8.5: Power Series Practice HW from Stewart Textbook (not to hand in) p. 598 # 3-17 odd.

10.2 Summing an Infinite Series Feb Do Now Write the following in summation notation 1, ¼, 1/9, 1/16.

MAT 1236 Calculus III Section 14.3 Partial Derivatives

MAT 1236 Calculus III Section 11.2 Series Part II

MAT 1228 Series and Differential Equations Section 4.1 Definition of the Laplace Transform

Final Review – Exam 3 Sequences & Series Improper Integrals.

MAT 1236 Calculus III Section 12.2 Vectors

MAT 0145 College Readiness Math II Activity 3.6

MAT 1235 Calculus II 4.2 Part II The Definite Integral

1.On smart phone or laptop: please go to to fill out your contact info. See if anyone else needs to use laptop when you are finished.

Infinite Series Lesson 8.5. Infinite series To find limits, we sometimes use partial sums. If Then In other words, try to find a finite limit to an infinite.

MAT 1236 Calculus III Section 11.4 The Comparison Tests

MAT 1226 Calculus II Section 6.2* The Natural Logarithmic Function

MAT 1236 Calculus III Appendix E Sigma Notations + Maple Lab

Section 11.1 Sequences Part I

MTH1170 Series.

MAT 1236 Calculus III Section 11.7 Taylor Series

5.1 Power Series Method Section 5.1 p1.

Section 11.3 Part II The Comparison Tests

Section 8.7 Improper Integrals I

Section 4.1 Linear Approximations and Applications

Presentation transcript:

MAT 1236 Calculus III Section 11.1 Sequences Part I

Continuous Vs Discrete An understand of discrete systems is important for almost all modern technology

HW WebAssign 11.1 Part I (13 problems, 40* min.) Quiz: , 11.1part I

Chapter 11 This chapter will be covered in the second and final exam. Go over the note before you do your HW. Reading the book is very helpful. For those of you who want to become a math tutor, this is the chapter that you need to fully understand. DO NOT SKIP CLASSES.

Motivation Q: How to compute sin(0.5)? A: sin(x) can be computed by the formula

Motivation

Foundations for Applications Theory of Series Applications in Sciences and Eng. Taylor Series Fourier Series and Transforms Complex Analysis Numerical Analysis

Caution Most solutions of the problems in this chapter rely on precise arguments. Please pay extra attention to the exact arguments and presentations. ( Especially for those of you who are using your photographic RAM )

Caution WebAssign HW is very much not sufficient in the sense that… Unlike any previous calculus topics, you actually have to understand the concepts. Most students need multiple exposure before grasping the ideas. You may actually need to read the textbook, for the first time.

Come talk to me... I am not sure about the correct arguments... I suspect the series converges, but I do not know why? I think WebAssign is wrong... I think my group is all wrong... I have a question about faith...

Chocolate in my office

General Goal We want to look at infinite sum of the form Q: Can you name a concept in calculus II that involves convergent / divergent?

Sequences Before we look at the convergence of the infinite sum (series), let us look at the individual terms

Definition A sequence is a collection of numbers with an order Notation:

Example One of the possible associated sequences of the series is

Example One of the possible associated sequences of the series is

Another Example (Partial Sum Sequence) Another possible associated sequences of the series is

Another Example (Partial Sum Sequence) Another possible associated sequences of the series is

Example (Physics/Chemistry): Balmer Sequence The Balmer sequence plays a key role in spectroscopy. The terms of the sequence are the absorption wavelengths of the hydrogen atom in nanometer.

Spectroscopy Spectroscopy is the study of the interaction between radiation and matter. Spectroscopy is often used in physical and analytical chemistry for the identification of substances through the spectrum emitted from or absorbed by them.

Example 0(a)

Example 0(b)

Example 0 We want to know : As Use the limit notation, we want to know

Definition

Example 0(a)

Example 0(b)

Example 0 We want to know : As In these cases,

Question Q: Name 2 divergent sequences ( with different divergent “characteristics ”.)

Limit Laws

Remarks

Finding limits There are 5 tools that you can use to find limit of sequences

Tool #1 (Theorem)

.

.

Example 1 (a)

Expectations

Standard Formula

Example 1 (b)

Remark: (2.5)

Standard Formula

Example 2

Expectations

Remark The following notation is NOT acceptable in this class

PPFTNE Questions Q: Can we use the l’ hospital rule on sequences?

PPFTNE Questions Q: Is the converse of the theorem also true? If Yes, demonstrate why. If No, give an example to illustrate. If then and

Tool #2 Use the Limit Laws and the formula

Example 3(a)

PPFTNE Questions Q1: Can we use tool #1 to solve this problem?

PPFTNE Questions Q1: Can we use tool #1 to solve this problem? Q2: Should we use tool #1 to solve this problem?

Example 3(b)

Theorem