Multiple Choice
Identify the
choice that best completes the statement or answers the question.
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1.
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Which of the following numbers occurs in the sequence 1, 9, 17, 25, 33, . .
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2.
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The common difference in the arithmetic sequence 4, –4, –12,
–20, . . . is
A |  | C | –8 | B | –16 | D | 8 |
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3.
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The common difference in the arithmetic sequence  ,  ,  ,
 ,  , . . . is A |  | C | 9 | B | 3 | D |  |
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4.
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In the formula for the general term of an arithmetic sequence
tn = 6 + (n – 1) ´ (–5.75), the
common difference is
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5.
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The first three terms of the sequence defined by  are A | 0.5, 0.8, 1.1 | C | 0.2, –0.1, –0.4 | B | –0.3, 0.2,
0.7 | D | –0.3, –0.8,
–1.3 |
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6.
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The sum of the series (–9) + (–7) + (–5) +  + (1)
is
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7.
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The sum of an arithmetic series where t1 = –3,
t3 = 2, and n = 8 is
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8.
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The sum of an arithmetic series where  ,  , and
n = 56 is
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9.
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For the arithmetic series (–275) + (–299) + (–323) +  +
(–1091), the values of  , d, and n are A |  = 275, d = 24, n = 34 | C |  = 275,
d = –24, n = 34 | B |  , d = –24, n =
35 | D |  =
–275, d = 24, n = 35 |
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10.
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On the first day of the month, Michael places 1¢ in a jar. The next day, he
places 4¢ in the jar. The third day, he places 7¢ in the jar, and so on for 52 days. What
amount will be in the jar at the end of this period of time?
A | $41.08 | C | $40.82 | B | $40.04 | D | $40.30 |
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Short Answer
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Determine whether each sequence is geometric, arithmetic, or neither. Justify
your answer.
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1.
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2.
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For each arithmetic series, determine
a) an explicit formula for
the general term
b) a formula for the general sum
c) 
d) 
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3.
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–12 – 9 – 6 –  + 12
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Determine the sum of each arithmetic series.
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4.
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Problem
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1.
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In a lottery to join a golf club, the first person drawn from the names must pay
$14 000. Each subsequent person drawn pays $250 less than the person before. The last person
drawn pays $8000 for a membership.
a) Write the first four terms of the sequence that
represents the cost of a membership.
b) Determine t1 and d for the
sequence.
c) Determine an explicit formula for the general term.
d) What will the
10th golfer pay for a membership?
e) How many golfers will be able to join the club?
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2.
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The sum of the first two terms of an arithmetic series is 15 and the sum of the
next two terms is 43. What are the first four terms of the series?
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