Math 20-1 Chapter 1 Sequences and Series

Slides:

Advertisements

Similar presentations

What is the sum of the following infinite series 1+x+x2+x3+…xn… where 0

Advertisements

What’s Your Guess? Chapter 9: Review of Convergent or Divergent Series.

The sum of the infinite and finite geometric sequence

Assignment Answers: Find the partial sum of the following: 1. = 250/2 ( ) = 218, = 101/2 (1/2 – 73/4) = Find the indicated n th.

Infinite Geometric Series

13.7 Sums of Infinite Series. The sum of an infinite series of numbers (or infinite sum) is defined to be the limit of its associated sequence of partial.

Section 11-1 Sequences and Series. Definitions A sequence is a set of numbers in a specific order 2, 7, 12, …

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

Geometric Sequences and Series Unit Practical Application “The company has been growing geometrically”

SEQUENCES AND SERIES Arithmetic. Definition A series is an indicated sum of the terms of a sequence.  Finite Sequence: 2, 6, 10, 14  Finite Series:2.

SERIES AND CONVERGENCE

Series and Convergence

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

Copyright © Cengage Learning. All rights reserved. Sequences and Series.

Infinite Geometric Series

Ch.9 Sequences and Series

SERIES: PART 1 Infinite Geometric Series. Progressions Arithmetic Geometric Trigonometric Harmonic Exponential.

AP Calculus Miss Battaglia  An infinite series (or just a series for short) is simply adding up the infinite number of terms of a sequence. Consider:

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.

Monday, Nov 2, 2015MAT 146 Next Test: Thurs 11/19 & Fri 11/20.

In this section, we will begin investigating infinite sums. We will look at some general ideas, but then focus on one specific type of series.

Geometric Series. In a geometric sequence, the ratio between consecutive terms is constant. The ratio is called the common ratio. Ex. 5, 15, 45, 135,...

{ 12.3 Geometric Sequence and Series SWBAT evaluate a finite geometric series SWBAT evaluate infinite geometric series, if it exists.

STROUD Worked examples and exercises are in the text Programme 11: Series 1 PROGRAMME 11 SERIES 1.

9.1 Power Series Quick Review What you’ll learn about Geometric Series Representing Functions by Series Differentiation and Integration Identifying.

Series A series is the sum of the terms of a sequence.

Math 20-1 Chapter 1 Sequences and Series 1.5 Infinite Geometric Series Teacher Notes.

Geometric Sequence – a sequence of terms in which a common ratio (r) between any two successive terms is the same. (aka: Geometric Progression) Section.

9.3 Geometric Sequences and Series. Common Ratio In the sequence 2, 10, 50, 250, 1250, ….. Find the common ratio.

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.

Copyright © Cengage Learning. All rights reserved. Sequences and Series.

Copyright © 2007 Pearson Education, Inc. Slide Geometric Series A geometric series is the sum of the terms of a geometric sequence. Sum of the.

13.5 – Sums of Infinite Series Objectives: You should be able to…

Section 1: Sequences & Series /units/unit-10-chp-11-sequences-series

Infinite Geometric Series. Find sums of infinite geometric series. Use mathematical induction to prove statements. Objectives.

Thursday, March 31MAT 146. Thursday, March 31MAT 146 Our goal is to determine whether an infinite series converges or diverges. It must do one or the.

Sequences and Series 13 Copyright © Cengage Learning. All rights reserved.

Wednesday, April 6MAT 146. Wednesday, April 6MAT 146.

S ECT. 9-2 SERIES. Series A series the sum of the terms of an infinite sequence Sigma: sum of.

PROGRAMME 13 SERIES 1.

Pre-Calculus 11 Notes Mr. Rodgers.

Series and Convergence (9.2)

nth or General Term of an Arithmetic Sequence

11.3 – Geometric Sequences and Series

Today in Precalculus Go over homework

Arithmetic and Geometric Series

8.1 and 8.2 Summarized.

Aim: What is the geometric series ?

Infinite Geometric Series

MTH1170 Series.

1.6A: Geometric Infinite Series

Math –Series.

Series and Convergence

Geometric Sequences and Series

Homework Questions.

Copyright © Cengage Learning. All rights reserved.

Infinite Series One important application of infinite sequences is in representing “infinite summations.” Informally, if {an} is an infinite sequence,

11.2 Convergent or divergent series

Determine whether the sequence converges or diverges. {image}

Objectives Find sums of infinite geometric series.

Section 2 – Geometric Sequences and Series

Warm Up Use summation notation to write the series for the specified number of terms …; n = 7.

Packet #29 Arithmetic and Geometric Sequences

Copyright © Cengage Learning. All rights reserved.

Homework Questions.

The sum of an Infinite Series

Presentation transcript:

Math 20-1 Chapter 1 Sequences and Series Teacher Notes 1.5 Infinite Geometric Series

1.5 Infinite Geometric Series Math 20-1 Chapter 1 Sequences and Series 1.5 Infinite Geometric Series Divergent Geometric sequence Geometric series n tn Sn 1 2 6 8 3 18 26 4 54 80 n tn n Sn Would the sum ever approach a fixed value? n tn n tn Sn 1 2 -6 -4 3 18 14 4 -54 -40 n Sn A geometric series with an infinite number of terms, in which the sequence of partial sums continues to grow, are considered divergent. There is no sum. 1.5.1

Consider the series Would you expect the series to be divergent? Geometric sequence Geometric series n tn n Sn n tn Sn 1 2 3 4 0.5 0.75 0.875 0.9375 Would the sum ever approach a fixed value? A geometric series with an infinite number of terms, in which the sequence of partial sums approaches a finite number, are considered convergent. There is a sum. 1.5.2

When -1 > r > 1, the infinite geometric series will diverge. http://illuminations.nctm.org/ActivityDetail.aspx?ID=153 What characteristic of an infinite geometric series distinguishes convergence (sum) from divergence (no sum)? When -1 > r > 1, the infinite geometric series will diverge. The sequence of its partial sums will not approach a finite number, there is no sum. When -1 < r < 1, the infinite geometric series will converge. The sequence of its partial sums will approach a finite number, there is a sum. The sum of an infinite geometric series that converges is given by 1.5.3

Determine whether each infinite geometric series converges of diverges Determine whether each infinite geometric series converges of diverges. Calculate the sum, if it exists. r = r = 2 The series converges. The series diverges. There is no sum. 1.5.4

Express as an infinite geometric series. 0.001 -1 < r < 1 The series will converge. Determine the sum of the series. What do you notice about the sum? 1.5.5

Assignment Suggested Questions Page 63: 1, 2a,b,c, 3a, 5a, 6, 7, 8, 9, 13, 16, 21 1.4.10