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Patterns Inductive Reasoning Inductive reasoning is making conclusions based on patterns you observe. You can use inductive reasoning to extend number patterns. 3, 9, 15, 21, … Describe the pattern. Then find the next two numbers in the pattern. 3 9 15 21 +6 +6 +6 The pattern is to add 6 to the previous term. To find the next number, add 6 to 21 = 27. The next term is 6 + 27 = 33. Extending Number Patterns 1, 4, 9, 16, … Describe the pattern. Then find the next two numbers in the pattern. 1 4 9 16 The pattern is to square the consecutive integers. 12, 22, 32, 42 To find the next number, square the next two consecutive integers. 52 = 25 and 62 = 36 Sequences A number pattern is also called a sequence. Each number in a sequence is a term of the sequence. An arithmetic sequence is one where you add a fixed number to the previous term. The fixed number is called a common difference. 11, 23, 35, 47, … Find the common difference of each arithmetic sequence. 11 23 35 47 The common difference is 12. +12 +12 +12 Arithmetic Sequence An arithmetic sequence has the form a1, a1 + d, a1 + 2d, …. where a1 is the first term and d is the common difference. If a1 = 2 and d = 5, then the sequence 2, 2 + 5, 2 + 2(5), …. or 2, 7, 12, …. is arithmetic. Arithmetic Sequence If the sequence is arithmetic, find the next two terms. 4, 17, 30, 43, 56, …. The first term is a1 = 4 and d = 13, then the sequence 4, 4 + 13, 4 + 2(13), …. or 4, 17, 30, 43, 56…. is arithmetic. The next two terms are 69 and 82. Arithmetic Sequence If the sequence is arithmetic, find the next two terms. 3, 5, 9, 15, 23, …. The first term is a1 = 3. a2 – a1 = 5 – 3 = 2 a 3 – a2 = 9 – 5 = 4 a4 – a3 = 15 – 9 = 6 a5 – a4 = 23 – 15 = 8 There is no common difference so the sequence is not arithmetic. Writing a rule for the nth term of a sequence Find the rule for the nth term of the sequence –4, 1, 6, 11, 16….. then find a100. The first term is a1 = –4. a2 – a1 = 1–(–4) = 5 a 3 – a2 = 6 – 1 = 5 a4 – a3 = 11 – 6 = 5 a5 – a4 = 16 – 11 = 5 The first term of the sequence is a1 = –4 and the common difference is d = 5. an = a1 + (n – 1)d an = –4 + (n – 1)5 Substitute 100 in for n. a100 = –4 + (100 – 1)5 a100 = 491 Fibonacci Rabbit Problem Mathematician and businessman Leonardo Pisano Fibonacci posed the following problem in his treatise Liber Abaci (pub. 1202): How many pairs of rabbits will be produced in a year, beginning with a single pair, if in every month, each pair bears a new pair which becomes productive from the second month on? Fibonacci Rabbit Problem The way you find the total number of rabbits for each month is to first find out how many pairs of rabbits were newly born that month. Then add that total to the number of rabbits you had before the new ones were born. So how many pairs of rabbits are newly born every month? Since it takes two months for each new pair to give birth, each pair of rabbits that was alive two months ago will give birth to a new pair. In other words, the number of new pairs in each month is equal to the number of pairs alive two months ago. Fibonacci Rabbit Problem Next we need to find the number of rabbit pairs that were alive before the new ones were born. This is the number of pairs alive the month before. In other words, to find the total number of pairs of rabbits, you simply add together the number of pairs that were alive in the preceding two months. Do you know of any series of numbers which begins with one and one and continues by adding the preceding two numbers to get the next? Of course you do. It's the Fibonacci sequence. Fibonacci Sequence The Fibonacci Sequence is the series of numbers: 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, ….. The next number is found by adding up the two numbers before it. • The 2 is found by adding the two numbers before it (1 + 1) • Similarly, the 3 is just (1 + 2), • And the 5 is just (2 + 3), • and so on! Example: the next number in the sequence above would be (21 + 34) = 55 Copyright © 2011 StudyIsland.com All rights reserved.