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Warm Up Find the next two numbers in the pattern, using the simplest rule you can find. 1. 1, 5, 9, 13, . . . 2. 100, 50, 25, 12.5, . . . 3. 80, 87, 94, 101, . . . 4. 3, 9, 7, 13, 11, . . . 17, 21 6.25, 3.125 45 Bus 2 Ahmedi Abdulkahar Arango Laura Blackman Tia Bohn Sebastian Burkett Jayson Cassisa Dominic Castellano Joe Coban John Correggio Joe Da Motta Livia Dasgupta Riyana Dionne Danielle Duque Michelle Gerzina Lindsey Gordon Taylor Gordon Macie Kibler Steven Lara Ariana Long Shuangxou Martins Yves Mendez Andres Midyette Angela Miller Zachary Narpiel Brandon Nathan Jordan Nelson Shannon Ollestad Stefan Orlowski Cristina Pollack Leah Pomerantz Jessica Rhodes Adam Roth Bailey Rucco Dominic Salamanca Oscar Secatello Amanda Serafini Nicole Silver Oliver Sincoff Danielle Towbin Joey Vela Melissa Walker Kirsten Webb Katarina Wiernicki Richard Woods Ashley Zhou Kelly 108, 115 17, 15
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Arithmetic Sequences 12.1 Pre-Algebra
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Learn to find terms in an arithmetic sequence.
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Vocabulary sequence term arithmetic sequence common difference
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A sequence is a list of numbers or objects, called terms, in a certain order. In an arithmetic sequence, the difference between one term and the next is always the same. This difference is called the common difference. The common difference is added to each term to get the next term.
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Example: Identifying Arithmetic Sequences
Determine if the sequence could be arithmetic. If so, give the common difference. A. 5, 8, 11, 14, 17, . . . Find the difference of each term and the term before it. , . . . 3 3 3 3 The sequence could be arithmetic with a common difference of 3.
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Example: Identifying Arithmetic Sequences
Determine if the sequence could be arithmetic. If so, give the common difference. B. 1, 3, 6, 10, 15, . . . Find the difference of each term and the term before it. , . . . 2 3 4 5 The sequence is not arithmetic.
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Example: Identifying Arithmetic Sequences
Determine if the sequence could be arithmetic. If so, give the common difference. C. 65, 60, 55, 50, 45, . . . Find the difference of each term and the term before it. , . . . –5 –5 –5 –5 The sequence could be arithmetic with a common difference of –5.
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Example: Identifying Arithmetic Sequences
Determine if the sequence could be arithmetic. If so, give the common difference. D. 5.7, 5.8, 5.9, 6, 6.1, . . . Find the difference of each term and the term before it. , . . . 0.1 0.1 0.1 0.1 The sequence could be arithmetic with a common difference of 0.1.
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Example: Identifying Arithmetic Sequences
Determine if the sequence could be arithmetic. If so, give the common difference. E. 1, 0, -1, 0, 1, . . . Find the difference of each term and the term before it. – , . . . –1 –1 1 1 The sequence is not arithmetic.
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Try This Determine if the sequence could be arithmetic. If so, give the common difference. A. 1, 2, 3, 4, 5, . . . Find the difference of each term and the term before it. , . . . 1 1 1 1 The sequence could be arithmetic with a common difference of 1.
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Try This Determine if the sequence could be arithmetic. If so, give the common difference. B. 1, 3, 7, 8, 12, … Find the difference of each term and the term before it. , . . . 2 4 1 4 The sequence is not arithmetic.
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Try This Determine if the sequence could be arithmetic. If so, give the common difference. C. 11, 22, 33, 44, 55, . . . Find the difference of each term and the term before it. , . . . 11 11 11 11 The sequence could be arithmetic with a common difference of 11.
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Try This Determine if the sequence could be arithmetic. If so, give the common difference. D. 1, 1, 1, 1, 1, 1, . . . Find the difference of each term and the term before it. , . . . The sequence could be arithmetic with a common difference of 0.
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Try This Determine if the sequence could be arithmetic. If so, give the common difference. E. 2, 4, 6, 8, 9, . . . Find the difference of each term and the term before it. , . . . 2 2 2 1 The sequence is not arithmetic.
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The nth term an of an arithmetic sequence with common difference d is
Writing Math Subscripts are used to show the positions of terms in the sequence. The first term is a1, the second is a2, and so on. FINDING THE nth TERM OF AN ARITHMETIC SEQUENCE The nth term an of an arithmetic sequence with common difference d is an = a1 + (n – 1)d. The term we are looking for. The FIRST term in the series. The NUMBER of the term we are looking for. The COMMON DIFFERENCE.
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Example an = a1 + (n – 1)d a10 = 1 + (10 – 1)2 a10 = 19
Find the given term in the arithmetic sequence. A. 10th term: 1, 3, 5, 7, . . . an = a1 + (n – 1)d a10 = 1 + (10 – 1)2 a10 = 19
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Example an = a1 + (n – 1)d a18 = 100 + (18 – 1)(–7) a18 = -19
Find the given term in the arithmetic sequence. B. 18th term: 100, 93, 86, 79, . . . an = a1 + (n – 1)d a18 = (18 – 1)(–7) a18 = -19
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Example an = a1 + (n – 1)d a21 = 25 + (21 – 1)(0.5) a21 = 35
Find the given term in the arithmetic sequence. C. 21st term: 25, 25.5, 26, 26.5, . . . an = a1 + (n – 1)d a21 = 25 + (21 – 1)(0.5) a21 = 35
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Example an = a1 + (n – 1)d a14 = 13 + (14 – 1)5 a14 = 78
Find the given term in the arithmetic sequence. D. 14th term: a1 = 13, d = 5 an = a1 + (n – 1)d a14 = 13 + (14 – 1)5 a14 = 78
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Try This an = a1 + (n – 1)d a15 = 1 + (15 – 1)2 a15 = 29
Find the given term in the arithmetic sequence. A. 15th term: 1, 3, 5, 7, . . . an = a1 + (n – 1)d a15 = 1 + (15 – 1)2 a15 = 29
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Try This an = a1 + (n – 1)d a50 = 100 + (50 – 1)(-7) a50 = –243
Find the given term in the arithmetic sequence. B. 50th term: 100, 93, 86, 79, . . . an = a1 + (n – 1)d a50 = (50 – 1)(-7) a50 = –243
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Try This an = a1 + (n – 1)d a41 = 25 + (41 – 1)(0.5) a41 = 45
Find the given term in the arithmetic sequence. C. 41st term: 25, 25.5, 26, 26.5, . . . an = a1 + (n – 1)d a41 = 25 + (41 – 1)(0.5) a41 = 45
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Try This an = a1 + (n – 1)d a2 = 13 + (2 – 1)5 a2 = 18
Find the given term in the arithmetic sequence. D. 2nd term: a1 = 13, d = 5 an = a1 + (n – 1)d a2 = 13 + (2 – 1)5 a2 = 18
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You can use the formula for the nth term of an arithmetic sequence to solve for other variables.
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Example The senior class held a bake sale. At the beginning of the sale, there was $20 in the cash box. Each item in the sale cost 50 cents. At the end of the sale, there was $63.50 in the cash box. How many items were sold during the bake sale? Identify the arithmetic sequence: , 21, 21.5, 22, . . . a1 = 20.5 Let a1 = 20.5 = money after first sale. d = 0.5 an = 63.5
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Example Let n represent the item number in which the cash box will contain $ Use the formula for arithmetic sequences. an = a1 + (n – 1) d 63.5 = (n – 1)(0.5) Solve for n. 63.5 = n – 0.5 Distributive Property. 63.5 = n Combine like terms. 43.5 = 0.5n Subtract 20 from both sides. 87 = n Divide both sides by 0.5. During the bake sale, 87 items are sold in order for the cash box to contain $63.50.
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Try This Johnnie is selling pencils for student council. At the beginning of the day, there was $10 in his money bag. Each pencil costs 25 cents. At the end of the day, he had $40 in his money bag. How many pencils were sold during the day? Identify the arithmetic sequence: 10.25, 10.5, 10.75, 11, … a1 = 10.25 Let a1 = = money after first sale. d = 0.25 an = 40
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Try This Let n represent the number of pencils in which he will have $40 in his money bag. Use the formula for arithmetic sequences. an = a1 + (n – 1)d 40 = (n – 1)(0.25) Solve for n. 40 = n – 0.25 Distributive Property. Combine like terms. 40 = n 30 = 0.25n Subtract 10 from both sides. 120 = n Divide both sides by 0.25. 120 pencils are sold in order for his money bag to contain $40.
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Lesson Quiz Determine if each sequence could be arithmetic. If so, give the common difference. 1. 42, 49, 56, 63, 70, . . . 2. 1, 2, 4, 8, 16, 32, . . . Find the given term in each arithmetic sequence. 3. 15th term: a1 = 7, d = 5 4. 24th term: 1, , , , 2 5. 52nd term: a1 = 14.2; d = –1.2 yes; 7 no 77 5 4 3 2 , or 6.75 27 4 7 4 –47
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