X-3 -1 (12-180 2. 13X- 13X-39, DIvisAly Vision: L:3 618 Chapter 9 Sequences, Series, and Probability Writing the Terms of a Recursive Sequence In Exercises 51-56, write the first five terms of the sequence defined recursively. 4. i! (-1) 74. T j! 73. 21 97. Cor in a A Finding a Sum In Exercises 75-78, use a grapling quar 51. a1 utility to find the sum. 28, ak+1 %3D = a, - 4 52. a, = 3, a+1 = 2(az - 1) give 4(-1)* 75. ) k! 4 (-1)* 76. 53. a, = 81, a +1 = 3a %3D k=0 k + 1 54. a, 25 = 14, a+1 =(-2)a 55. a, = 1, a, = 2, a = a -2 + ża -1 77. E 47 (a) 78. 2n %3D (b) 56. ao = -1, a1 = 1, ar = a; -2 + ak-1 Using Sigma Notation to Write a Sum In Exercises 79–88, use sigma notation (c) I Fibonacci Sequence In Exercises 57 and 58, use the Fibonacci sequence. (See Example 5.) write the sum. • 98. Ph 1 57. Write the first 12 terms of the Fibonacci sequence 79. 3(1) 3(2) 3(3) The per 3(9) whose nth term is a, and the first 10 terms of the sequence given by physica 5 5 80. 1 + 1 can be a 1 + 2 1 + 3 1 + 15 An+1 Pn 0. n = 7, 8 81. 2() + 3+2) + 3] + 82. [1 - (91 + [1 - (9 + + [2@) + 3 + [1 - (91 83. 3 9 + 27 - 81 + 243 – 729 58. Using the defigiton for b, in Exercise S7, stow that can be defined reeursively by where n year, wi 84. 1 - + - corr pc Comemn 128 2007. b, = 1 + 12 85. 22 32 42 72 bn-1 Nationa 24 120 40,320 Health S Writing the Terms of a Sequence Involving Factorials In Exercises 59-62, write the first five terms of the sequence. (Assume that n begins with 0.) 1 1 (a) Writ 86. 3 2 4 3 . 5 of th 10 • 12 87. + 88. + + + 15 32 + cons (b) Wha 720 64 32 part 60. an 59. ал (n + 1)! n! Finding a Partial Sum of a Series 6O Exercises 89-92, find the (a) third, (b) fourth and (c) fifth partial sums of the series. (-1)2n+1 (2n + 1)! Explorati (-1)"(n + 3)! 62. an 61. an n! True or F 8 whether th 89. Σ 6. 08 90. Σ26 Simplifying a Factorial Expression In Exercises 63-66, simplify the factorial expression. answer. i= 1 91. Σ4-) 4. 99. (i? 12! 4! 63. 6! 64. 4! • 8! 92. Σ5-4" 100. 2i (2n - 1)! 66. (n + 1)! 65. Finding the Sum of an Infinit Series In Exercises 93-96, find the sum d Arithmeti following de (2n + 1)! n! Finding a Sum In Exercises 67-74, find n measuren the infinite series. the sum. 93. 10 4 4 101. Find th 68. 10 3i2 00 67. 94. balanc 10 $604.1 70. (2i – 1) 1 \k 69. 95. of a gra - 3 j=3j² 4. Σ-) 102. Proof 72. [(i - 1)2 + (i + 1)*] 71. (k + 1)2(k – 3) 96. i= 1 10 Solis Images/Shuttersto
X-3 -1 (12-180 2. 13X- 13X-39, DIvisAly Vision: L:3 618 Chapter 9 Sequences, Series, and Probability Writing the Terms of a Recursive Sequence In Exercises 51-56, write the first five terms of the sequence defined recursively. 4. i! (-1) 74. T j! 73. 21 97. Cor in a A Finding a Sum In Exercises 75-78, use a grapling quar 51. a1 utility to find the sum. 28, ak+1 %3D = a, - 4 52. a, = 3, a+1 = 2(az - 1) give 4(-1)* 75. ) k! 4 (-1)* 76. 53. a, = 81, a +1 = 3a %3D k=0 k + 1 54. a, 25 = 14, a+1 =(-2)a 55. a, = 1, a, = 2, a = a -2 + ża -1 77. E 47 (a) 78. 2n %3D (b) 56. ao = -1, a1 = 1, ar = a; -2 + ak-1 Using Sigma Notation to Write a Sum In Exercises 79–88, use sigma notation (c) I Fibonacci Sequence In Exercises 57 and 58, use the Fibonacci sequence. (See Example 5.) write the sum. • 98. Ph 1 57. Write the first 12 terms of the Fibonacci sequence 79. 3(1) 3(2) 3(3) The per 3(9) whose nth term is a, and the first 10 terms of the sequence given by physica 5 5 80. 1 + 1 can be a 1 + 2 1 + 3 1 + 15 An+1 Pn 0. n = 7, 8 81. 2() + 3+2) + 3] + 82. [1 - (91 + [1 - (9 + + [2@) + 3 + [1 - (91 83. 3 9 + 27 - 81 + 243 – 729 58. Using the defigiton for b, in Exercise S7, stow that can be defined reeursively by where n year, wi 84. 1 - + - corr pc Comemn 128 2007. b, = 1 + 12 85. 22 32 42 72 bn-1 Nationa 24 120 40,320 Health S Writing the Terms of a Sequence Involving Factorials In Exercises 59-62, write the first five terms of the sequence. (Assume that n begins with 0.) 1 1 (a) Writ 86. 3 2 4 3 . 5 of th 10 • 12 87. + 88. + + + 15 32 + cons (b) Wha 720 64 32 part 60. an 59. ал (n + 1)! n! Finding a Partial Sum of a Series 6O Exercises 89-92, find the (a) third, (b) fourth and (c) fifth partial sums of the series. (-1)2n+1 (2n + 1)! Explorati (-1)"(n + 3)! 62. an 61. an n! True or F 8 whether th 89. Σ 6. 08 90. Σ26 Simplifying a Factorial Expression In Exercises 63-66, simplify the factorial expression. answer. i= 1 91. Σ4-) 4. 99. (i? 12! 4! 63. 6! 64. 4! • 8! 92. Σ5-4" 100. 2i (2n - 1)! 66. (n + 1)! 65. Finding the Sum of an Infinit Series In Exercises 93-96, find the sum d Arithmeti following de (2n + 1)! n! Finding a Sum In Exercises 67-74, find n measuren the infinite series. the sum. 93. 10 4 4 101. Find th 68. 10 3i2 00 67. 94. balanc 10 $604.1 70. (2i – 1) 1 \k 69. 95. of a gra - 3 j=3j² 4. Σ-) 102. Proof 72. [(i - 1)2 + (i + 1)*] 71. (k + 1)2(k – 3) 96. i= 1 10 Solis Images/Shuttersto
Algebra and Trigonometry (6th Edition)
6th Edition
ISBN:9780134463216
Author:Robert F. Blitzer
Publisher:Robert F. Blitzer
ChapterP: Prerequisites: Fundamental Concepts Of Algebra
Section: Chapter Questions
Problem 1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,...
Related questions
Question
How do you answer 63 and 64?
(This is not graded but, rather, an exercise to achieve acquisition).
![X-3 -1
(12-180
2.
13X-
13X-39,
DIvisAly
Vision:
L:3
618
Chapter 9
Sequences, Series, and Probability
Writing the Terms of a Recursive
Sequence In Exercises 51-56, write
the first five terms of the sequence defined
recursively.
4.
i!
(-1)
74. T
j!
73.
21
97. Cor
in a
A Finding a Sum In Exercises 75-78, use a grapling
quar
51. a1
utility to find the sum.
28, ak+1
%3D
= a, - 4
52. a, = 3, a+1 = 2(az - 1)
give
4(-1)*
75. )
k!
4
(-1)*
76.
53. a, = 81, a +1 = 3a
%3D
k=0 k + 1
54. a,
25
= 14, a+1 =(-2)a
55. a, = 1, a, = 2, a = a -2 + ża -1
77. E
47
(a)
78.
2n
%3D
(b)
56. ao = -1, a1 = 1, ar = a; -2 + ak-1
Using Sigma Notation to Write a Sum
In Exercises 79–88, use sigma notation
(c) I
Fibonacci Sequence In Exercises 57 and 58, use the
Fibonacci sequence. (See Example 5.)
write the sum.
• 98. Ph
1
57. Write the first 12 terms of the Fibonacci sequence
79.
3(1) 3(2)
3(3)
The per
3(9)
whose nth term is a, and the first 10 terms of the
sequence given by
physica
5
5
80.
1 + 1
can be a
1 + 2
1 + 3
1 + 15
An+1
Pn 0.
n = 7, 8
81. 2() + 3+2) + 3] +
82. [1 - (91 + [1 - (9 +
+ [2@) + 3
+ [1 - (91
83. 3 9 + 27 - 81 + 243 – 729
58. Using the defigiton for b, in Exercise S7, stow that
can be defined reeursively by
where n
year, wi
84. 1 - + -
corr pc
Comemn
128
2007.
b, = 1 +
12
85.
22
32
42
72
bn-1
Nationa
24
120
40,320
Health S
Writing the Terms of a Sequence
Involving Factorials In Exercises 59-62,
write the first five terms of the sequence.
(Assume that n begins with 0.)
1
1
(a) Writ
86.
3
2 4
3 . 5
of th
10 • 12
87. +
88. + + +
15
32 +
cons
(b) Wha
720
64
32
part
60. an
59. ал
(n + 1)!
n!
Finding a Partial Sum of a Series
6O
Exercises 89-92, find the (a) third, (b) fourth
and (c) fifth partial sums of the series.
(-1)2n+1
(2n + 1)!
Explorati
(-1)"(n + 3)!
62. an
61. an
n!
True or F
8
whether th
89. Σ 6.
08
90. Σ26
Simplifying a Factorial Expression In
Exercises 63-66, simplify the factorial
expression.
answer.
i= 1
91. Σ4-)
4.
99.
(i?
12!
4!
63.
6!
64.
4! • 8!
92. Σ5-4"
100.
2i
(2n - 1)!
66.
(n + 1)!
65.
Finding the Sum of an Infinit
Series In Exercises 93-96, find the sum d
Arithmeti
following de
(2n + 1)!
n!
Finding a Sum In Exercises 67-74, find
n measuren
the infinite series.
the sum.
93.
10
4
4
101. Find th
68. 10
3i2
00
67.
94.
balanc
10
$604.1
70. (2i – 1)
1 \k
69.
95.
of a gra
- 3
j=3j²
4.
Σ-)
102. Proof
72. [(i - 1)2 + (i + 1)*]
71. (k + 1)2(k – 3)
96.
i= 1
10
Solis Images/Shuttersto](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Ff41e2e4b-5a8b-4192-b824-708f7e11e022%2F4a0707d6-fabb-40da-bddc-3a4be672af6a%2F8bar1o.jpeg&w=3840&q=75)
Transcribed Image Text:X-3 -1
(12-180
2.
13X-
13X-39,
DIvisAly
Vision:
L:3
618
Chapter 9
Sequences, Series, and Probability
Writing the Terms of a Recursive
Sequence In Exercises 51-56, write
the first five terms of the sequence defined
recursively.
4.
i!
(-1)
74. T
j!
73.
21
97. Cor
in a
A Finding a Sum In Exercises 75-78, use a grapling
quar
51. a1
utility to find the sum.
28, ak+1
%3D
= a, - 4
52. a, = 3, a+1 = 2(az - 1)
give
4(-1)*
75. )
k!
4
(-1)*
76.
53. a, = 81, a +1 = 3a
%3D
k=0 k + 1
54. a,
25
= 14, a+1 =(-2)a
55. a, = 1, a, = 2, a = a -2 + ża -1
77. E
47
(a)
78.
2n
%3D
(b)
56. ao = -1, a1 = 1, ar = a; -2 + ak-1
Using Sigma Notation to Write a Sum
In Exercises 79–88, use sigma notation
(c) I
Fibonacci Sequence In Exercises 57 and 58, use the
Fibonacci sequence. (See Example 5.)
write the sum.
• 98. Ph
1
57. Write the first 12 terms of the Fibonacci sequence
79.
3(1) 3(2)
3(3)
The per
3(9)
whose nth term is a, and the first 10 terms of the
sequence given by
physica
5
5
80.
1 + 1
can be a
1 + 2
1 + 3
1 + 15
An+1
Pn 0.
n = 7, 8
81. 2() + 3+2) + 3] +
82. [1 - (91 + [1 - (9 +
+ [2@) + 3
+ [1 - (91
83. 3 9 + 27 - 81 + 243 – 729
58. Using the defigiton for b, in Exercise S7, stow that
can be defined reeursively by
where n
year, wi
84. 1 - + -
corr pc
Comemn
128
2007.
b, = 1 +
12
85.
22
32
42
72
bn-1
Nationa
24
120
40,320
Health S
Writing the Terms of a Sequence
Involving Factorials In Exercises 59-62,
write the first five terms of the sequence.
(Assume that n begins with 0.)
1
1
(a) Writ
86.
3
2 4
3 . 5
of th
10 • 12
87. +
88. + + +
15
32 +
cons
(b) Wha
720
64
32
part
60. an
59. ал
(n + 1)!
n!
Finding a Partial Sum of a Series
6O
Exercises 89-92, find the (a) third, (b) fourth
and (c) fifth partial sums of the series.
(-1)2n+1
(2n + 1)!
Explorati
(-1)"(n + 3)!
62. an
61. an
n!
True or F
8
whether th
89. Σ 6.
08
90. Σ26
Simplifying a Factorial Expression In
Exercises 63-66, simplify the factorial
expression.
answer.
i= 1
91. Σ4-)
4.
99.
(i?
12!
4!
63.
6!
64.
4! • 8!
92. Σ5-4"
100.
2i
(2n - 1)!
66.
(n + 1)!
65.
Finding the Sum of an Infinit
Series In Exercises 93-96, find the sum d
Arithmeti
following de
(2n + 1)!
n!
Finding a Sum In Exercises 67-74, find
n measuren
the infinite series.
the sum.
93.
10
4
4
101. Find th
68. 10
3i2
00
67.
94.
balanc
10
$604.1
70. (2i – 1)
1 \k
69.
95.
of a gra
- 3
j=3j²
4.
Σ-)
102. Proof
72. [(i - 1)2 + (i + 1)*]
71. (k + 1)2(k – 3)
96.
i= 1
10
Solis Images/Shuttersto
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