Pen Tool McGraw-Hill Ryerson Pre-Calculus 11 Chapter 1 Sequences and Series Section 1.5 Click here to begin the lesson.

Slides:

Advertisements

Similar presentations

The Comparison Test Let 0 a k b k for all k.. Mika Seppälä The Comparison Test Comparison Theorem A Assume that 0 a k b k for all k. If the series converges,

Advertisements

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

Power Presentations CD-ROM. Overviews Using the Main Menu Navigating the Power Presentations & Images Interactives Working with the Media Gallery Accessing.

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.

12-3 Infinite Sequences and Series. Hints to solve limits: 1)Rewrite fraction as sum of multiple fractions Hint: anytime you have a number on top,

Chapter 1 Contents Lesson Minute Check Lesson Overview 5-Minute Check Lesson Overview Lesson Minute Check Lesson Overview 5-Minute Check Lesson.

EXAMPLE 1 Find partial sums SOLUTION S 1 = 1 2 = 0.5 S 2 = = S 3 = Find and graph the partial sums S n for n = 1,

Click here to begin the lesson

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.

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

Notes Over 11.4 Infinite Geometric Sequences

The purpose of this section is to discuss sums that contains infinitely many terms.

SERIES AND CONVERGENCE

Series and Convergence

Section 9.2 – Series and Convergence. Goals of Chapter 9.

In this section, we investigate convergence of series that are not made up of only non- negative terms.

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

9.1 Part 1 Sequences and Series.

Infinite Geometric Series

Ch.9 Sequences and Series

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

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.

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.

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

Splash Screen. Concept P. 683 Example 1A Convergent and Divergent Series A. Determine whether the infinite geometric series is convergent or divergent.

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

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

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

Pen Tool McGraw-Hill Ryerson Pre-Calculus 11 Chapter 8 Systems of Equations Section 8.2 Click here to begin the lesson.

Holt McDougal Algebra 2 Geometric Sequences and Series Holt Algebra 2Holt McDougal Algebra 2 How do we find the terms of an geometric sequence, including.

Pen Tool McGraw-Hill Ryerson Pre-Calculus 11 Chapter 1 Sequences and Series Section 1.4 Click here to begin the lesson.

Pre-Calculus 11 Notes Mr. Rodgers.

Series and Convergence (9.2)

To Navigate the Slideshow

Geometric Sequences and Series

Infinite Geometric Series

CLICK HERE TO BEGIN THE GAME!!

The Ratio Test.

Pre Calculus 11 Section 1.5 Infinite Geometric Series

1.6A: Geometric Infinite Series

Sequences and Series Day 7

9.3 Geometric Sequences and Series

Series and Convergence

Homework Lesson 8.3 Page #1-17 (EOO), (ODD),

Sine, Cosine and Tangent - Degrees

To Navigate the Slideshow

Math 20-1 Chapter 1 Sequences and Series

Mental Capacity Act and DoLS

To Navigate the Slideshow

To Navigate the Slideshow

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

Lesson 11-4 Comparison Tests.

Nth, Geometric, and Telescoping Test

Presentation transcript:

Pen Tool McGraw-Hill Ryerson Pre-Calculus 11 Chapter 1 Sequences and Series Section 1.5 Click here to begin the lesson

Pen Tool McGraw-Hill Ryerson Pre-Calculus 11 Teacher Notes 1. This lesson is designed to help students conceptualize the main ideas of Chapter To view the lesson, go to Slide Show > View Show (PowerPoint 2003). 3. To use the pen tool, view Slide Show, click on the icon in the lower left of your screen and select Ball Point Pen. 4. To reveal an answer, click on or follow the instructions on the slide. To reveal a hint, click on. To view the complete solution, click on the View Solution button. Navigate through the lesson using the and buttons. 5. When you exit this lesson, do not save changes.

Pen Tool Infinite Geometric Series Fill in the blanks to complete the sentences, using the words below. Chapter 1 A(n) __________________ geometric series is a geometric series that has an __________________ number of terms; that is, the series has no last term. A(n) __________________ series is a series with an infinite number of terms, in which the sequence of partial sums approaches a fixed value. A(n) ___________________ series is a series with an infinite number of terms, in which the sequence of partial sums does not approach a fixed value. convergentdivergentinfinite Answer infinite; infinite convergent divergent

Pen Tool Infinite Geometric Series Consider the sequence 120, 60, 30, 15, 7.5, 3.75,... Assume the sequence is geometric. Determine the sum of the infinite geometric series. Chapter 1 Click here for the solution. Answer The sum of the infinite geometric series is 240.

Pen Tool The following pages contain solutions for the previous questions. Click here to return to the start

Pen Tool Solutions Go back to the question Since t 1 = 120 and r = The sum of the infinite geometric series is 240.