Lesson 1: Sequences An infinite sequence: A finite sequence:

Slides:

Advertisements

Similar presentations

Chapter 8 Vocabulary. Section 8.1 Vocabulary Sequences An infinite sequence is a function whose domain is the set of positive integers. The function.

Advertisements

Arithmetic Sequences and Series days Digital Lesson.

13.1 Sequences.

Geometric Sequences and Series

Arithmetic Sequences and Series

8.1 Sequences and Series Essential Questions: How do we use sequence notation to write the terms of a sequence? How do we use factorial notation? How.

Aim: What are the arithmetic series and geometric series? Do Now: Find the sum of each of the following sequences: a)

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

Sequences & Summation Notation 8.1 JMerrill, 2007 Revised 2008.

Section 8.1 Sequences & Series. Sequences & Series Definition of Sequence: An infinite sequence is a function whose domain is the set of positive integers.

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 11 Further Topics in Algebra.

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 10 Further Topics in Algebra.

Copyright © 2011 Pearson Education, Inc. Slide Sequences A sequence is a function that has a set of natural numbers (positive integers) as.

Copyright © 2011 Pearson Education, Inc. Sequences Section 8.1 Sequences, Series, and Probability.

Sequences Definition - A function whose domain is the set of all positive integers. Finite Sequence - finite number of values or elements Infinite Sequence.

Math 71B 11.1 – Sequences and Summation Notation 1.

12.1 Sequences and Series ©2001 by R. Villar All Rights Reserved.

SFM Productions Presents: Another action-packet episode of “Adventures inPre-Calculus!” 9.1Sequences and Series.

Series and Sequences An infinite sequence is an unending list of numbers that follow a pattern. The terms of the sequence are written a1, a2, a3,...,an,...

Geometric Sequences and Series Section Objectives Recognize, write, and find nth terms of geometric sequences Find the nth partial sums of geometric.

1 1 OBJECTIVE At the end of this topic you should be able to Define sequences and series Understand finite and infinite sequence,

Notes Over 11.1 Sequences and Series A sequence is a set of consecutive integers. A finite sequence contains a last term Infinite sequences continue without.

4.7 Define & Use Sequences & Series. Vocabulary  A sequence is a function whose domain is a set of consecutive integers. If not specified, the domain.

9.1 Sequences and Series. A sequence is a collection of numbers that are ordered. Ex. 1, 3, 5, 7, …. Finding the terms of a sequence. Find the first 4.

Lesson 8.1 Page #1-25(EOO), 33, 37, (ODD), 69-77(EOO), (ODD), 99, (ODD)

Sequence – a function whose domain is positive integers. Section 9.1 – Sequences.

Sequences & Series Section 13.1 & Sequences A sequence is an ordered list of numbers, called terms. The terms are often arranged in a pattern.

Chapter 11 Sequences, Induction, and Probability Copyright © 2014, 2010, 2007 Pearson Education, Inc Sequences and Summation Notation.

Sequences & Series. Sequence: A function whose domain is a set of consecutive integers. The domain gives the relative position of each term of the sequence:

Lesson 10.1, page 926 Sequences and Summation Notation Objective: To find terms of sequences given the nth term and find and evaluate a series.

9.1 Sequences and Series. Definition of Sequence  An ordered list of numbers  An infinite sequence is a function whose domain is the set of positive.

Lesson # ___ Section 9.1 A sequence is a function whose domain is the set of positive integers {1,2,3,4,5….} Sequences are listed in order so that.

For the sequence, describe the pattern and write the next term. 1.) 1, 6, 11, 16 2.) -4, 8, -12, 16 3.) 1.2, 4.2, 9.2, 16.2.

SEQUENCES OBJECTIVES: Write the first several terms of a sequence Write the terms of a sequence defined by a Recursive Formula Use Summation Notation Find.

8.1 Sequences and Series Essential Questions: How do we use sequence notation to write the terms of a sequence? How do we use factorial notation? How.

A LESSON BY U S PRAJAPATI, PGT MATH, KV KHAGAUL GEOMETRIC SEQUENCES AND SERIES.

Ch. 10 – Infinite Series 9.1 – Sequences. Sequences Infinite sequence = a function whose domain is the set of positive integers a 1, a 2, …, a n are the.

Sequences and Summation Notation. What you’ll learn Find particular terms of a sequence from the general term. Use recursion formulas. Use factorial notation.

Do Now Solve the inequality and come up with a real world scenario that fits the solution. Also Pick up a textbook.

8.1 – Sequences and Series. Sequences Infinite sequence = a function whose domain is the set of positive integers a 1, a 2, …, a n are the terms of the.

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

Essential Question: How do you find the nth term and the sum of an arithmetic sequence? Students will write a summary describing the steps to find the.

Series and Sequences An infinite sequence is an unending list of numbers that follow a pattern. The terms of the sequence are written a1, a2, a3,...,an,...

Sequences & Summation Notation

Sequences and Series 9.1.

Sect.R10 Geometric Sequences and Series

Ch. 8 – Sequences, Series, and Probability

Introduction to Sequences

Sequences and Series Section 8.1.

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Section 9.1 Sequences and Series.

Lesson # ___ Section 8.1.

DAY 30 AGENDA: Quiz Tues.

Aim: What is the sequence?

Sequences and Series.

9.1: Introduction to Sequences

Lecture 18 Section 4.1 Thu, Feb 10, 2005

9.1 Sequences Sequences are ordered lists generated by a

Sequences and Summation Notation

Sullivan Algebra and Trigonometry: Section 13.1

Chapter 9.1 Introduction to Sequences

Geometric Sequences and Series

8.1 Defining and Using Sequences and Series

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Recognizing Patterns and Sequences

10.1 Sequences and Summation Notation

Presentation transcript:

Lesson 1: Sequences An infinite sequence: A finite sequence:

Lesson 1: Sequences An infinite sequence: A function whose domain is the set of positive integers. The function values a 1, a 2, a 3, a 4,..., a n,... are the terms of the sequence. A finite sequence: A sequence whose domain of the function consists of the first n positive integers only.

Lesson 2: Finding Terms of Sequences B.

Lesson 2: Finding Terms of Sequences C. What would the estimated population of the U.S. be for 2010 based on this model? For 2015? Are all of these amounts reasonable?

Lesson 2: Finding Terms of Sequences C. What would the estimated population of the U.S. be for 2010 based on this model? For 2015? Are all of these amounts reasonable? Population of the U.S. per U.S. Census Bureau: 2000:281,421, :308,745, :321,418,820 (estimated)

Lesson 3: The Fibonacci Sequence Recursive Sequence: All other terms of the sequence are defined using previous terms.

Lesson 3: The Fibonacci Sequence

Lesson 4: Factorial Notation

Lesson 4: Factorial Notation 0! = 1! = 2! = 3! = 4! =

Lesson 4: Factorial Notation Follow order of operations (PEMDAS): 2n! = (2n)! =

Lesson 4: Factorial Notation A.Write the first 5 terms of the sequence given by

Lesson 4: Factorial Notation B.Evaluate each factorial expression.