splash screen. then/now i can identify and generate geometric sequences and relate them to...
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I CAN identify and generate geometric sequences and relate them to exponential functions.
Learning Target
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• A geometric sequence is a sequence in which each term after the first is found by multiplying the previous term by a nonzero constant r called the common ratio.
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Identify Geometric Sequences
A. Determine whether each sequence is arithmetic, geometric, or neither. Explain.
0, 8, 16, 24, 32, ...
0 8 16 24 32
8 – 0 = 8
Answer: The common difference is 8. So the sequence is arithmetic.
16 – 8 = 8 24 – 16 = 8 32 – 24 = 8
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Identify Geometric Sequences
B. Determine whether each sequence is arithmetic, geometric, or neither. Explain.
64, 48, 36, 27, ...
64 48 36 27
Answer: The common ratio is , so the sequence is geometric.
__34
__34
___4864
=__34
___3648
=__34
___2736
=
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A. A
B. B
C. C
A. arithmetic
B. geometric
C. neither
A. Determine whether the sequence is arithmetic, geometric, or neither.1, 7, 49, 343, ...
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A. A
B. B
C. C
B. Determine whether the sequence is arithmetic, geometric, or neither.1, 2, 4, 14, 54, ...
A. arithmetic
B. geometric
C. neither
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Find Terms of Geometric Sequences
A. Find the next three terms in the geometric sequence.
1, –8, 64, –512, ...
1 –8 64 –512
The common ratio is –8.
= –8__1–8 ___64
–8= –8 = –8______–512
64
Step 1 Find the common ratio.
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Find Terms of Geometric Sequences
Step 2 Multiply each term by the common ratio to find the next three terms.
262,144
× (–8) × (–8) × (–8)
Answer: The next 3 terms in the sequence are 4096; –32,768; and 262,144.
–32,7684096–512
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Find Terms of Geometric Sequences
B. Find the next three terms in the geometric sequence.
40, 20, 10, 5, ....
40 20 10 5
Step 1 Find the common ratio.
= __12
___2040
= __12
___1020
= __12
___510
The common ratio is .__12
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Find Terms of Geometric Sequences
Step 2 Multiply each term by the common ratio to find the next three terms.
5 __52
__54
__58
× __12
× __12
× __12
Answer: The next 3 terms in the sequence are , __52
__54
, and .__58
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A. A
B. B
C. C
D. D
A. Find the next three terms in the geometric sequence.1, –5, 25, –125, ....
A. 250, –500, 1000
B. 150, –175, 200
C. –250, 500, –1000
D. 625, –3125, 15,625
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A. A
B. B
C. C
D. D
B. Find the next three terms in the geometric sequence.800, 200, 50, , ....__
225
A. 15, 10, 5
B. , ,
C. 12, 3,
D. 0, –25, –50
__34
__825 ____25
128___2532
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Find the nth Term of a Geometric Sequence
A. Write an equation for the nth term of the geometric sequence 1, –2, 4, –8, ... .
The first term of the sequence is 1. So, a1 = 1. Now find the common ratio.1 –2 4 –8
= –2___–21
= –2___4–2
= –2___–84
an = a1rn – 1 Formula for the nth term
an = 1(–2)n – 1 a1 = 1 and r = –2
The common ration is –2.
Answer: an = 1(–2)n – 1
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Find the nth Term of a Geometric Sequence
B. Find the 12th term of the sequence.1, –2, 4, –8, ... .
an = a1rn – 1 Formula for the nth term
a12 = 1(–2)12 – 1 For the nth term, n = 12.
= 1(–2)11 Simplify.
= 1(–2048) (–2)11 = –2048
= –2048 Multiply.
Answer: The 12th term of the sequence is –2048.
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A. A
B. B
C. C
D. D
A. Write an equation for the nth term of the geometric sequence 3, –12, 48, –192, ....
A. an = 3(–4)n – 1
B. an = 3( )n – 1
C. an = 3( )n – 1
D. an = 4(–3)n – 1
__14
__13
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A. A
B. B
C. C
D. D
A. 768
B. –3072
C. 12,288
D. –49,152
B. Find the 7th term of this sequence using the equation an = 3(–4)n – 1.
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Graph a Geometric Sequence
ART A 50-pound ice sculpture is melting at a rate in which 80% of its weight remains each hour. Draw a graph to represent how many pounds of the sculpture is left at each hour.
Compared to each previous hour, 80% of the weight remains. So, r = 0.80. Therefore, the geometric sequence that models this situation is 50, 40, 32, 25.6, 20.48,… So after 1 hour, the sculpture weighs 40 pounds, 32 pounds after 2 hours, 25.6 pounds after 3 hours, and so forth. Use this information to draw a graph.
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Graph a Geometric Sequence
Answer:
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A. A
B. B
C. C
D. D
Soccer A soccer tournament begins with 32 teams in the first round. In each of the following rounds, on half of the teams are left to compete, until only one team remains. Draw a graph to represent how many teams are left to compete in each round.
A.
B.
C.
D.