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Its a Solution Manual for Discrete Mathematics 8th Edition by Richard Johnsonbaugh. All chapters are covered.

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Its a Solution Manual for Discrete Mathematics 8th Edition by Richard Johnsonbaugh. All chapters are covered.

Institución
Discrete Mathematics 8th Edition Richard Johnsonba
Grado
Discrete Mathematics 8th Edition Richard Johnsonba

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INSTRUCTOR’S SOLUTIONS
@ MANUAL



D ISCRETE M ATHEMATICS
A
E IGHTH E DITION
pl
us
Richard Johnsonbaugh
DePaul University, Chicago
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vi
a

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, Solutions to Selected Exercises
@
Section 1.1
2. {2, 4} 3. {7, 10} 5. {2, 3, 5, 6, 8, 9} 6. {1, 3, 5, 7, 9, 10}
A
8. A 9. ∅ 11. B 12. {1, 4} 14. {1}

15. {2, 3, 4, 5, 6, 7, 8, 9, 10} 18. {n ∈ Z+ | n ≥ 6} 19. {2n − 1 | n ∈ Z+ }

21. {n ∈ Z+ | n ≤ 5 or n = 2m, m ≥ 3} 22. {2n | n ≥ 3} 24. {1, 3, 5}
pl
25. {n ∈ Z+ | n ≤ 5 or n = 2m + 1, m ≥ 3} 27. {n ∈ Z+ | n ≥ 6 or n = 2 or n = 4}

29. 1 30. 3
us
33. We find that B = {2, 3}. Since A and B have the same elements, they are equal.

34. Let x ∈ A. Then x = 1, 2, 3. If x = 1, since 1 ∈ Z+ and 12 < 10, then x ∈ B. If x = 2, since 2 ∈ Z+ and
22 < 10, then x ∈ B. If x = 3, since 3 ∈ Z+ and 32 < 10, then x ∈ B. Thus if x ∈ A, then x ∈ B.
Now suppose that x ∈ B. Then x ∈ Z+ and x2 < 10. If x ≥ 4, then x2 > 10 and, for these values of x,
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x∈/ B. Therefore x = 1, 2, 3. For each of these values, x2 < 10 and x is indeed in B. Also, for each of
the values x = 1, 2, 3, x ∈ A. Thus if x ∈ B, then x ∈ A. Therefore A = B.

37. Since (−1)3 − 2(−1)2 − (−1) + 2 = 0, −1 ∈ B. Since −1 ∈
/ A, A 6= B.

38. Since 32 − 1 > 3, 3 ∈
/ B. Since 3 ∈ A, A 6= B. 41. Equal 42. Not equal
vi
45. Let x ∈ A. Then x = 1, 2. If x = 1,

x3 − 6x2 + 11x = 13 − 6 · 12 + 11 · 1 = 6.

Thus x ∈ B. If x = 2,
a
x3 − 6x2 + 11x = 23 − 6 · 22 + 11 · 2 = 6.
Again x ∈ B. Therefore A ⊆ B.

46. Let x ∈ A. Then x = (1, 1) or x = (1, 2). In either case, x ∈ B. Therefore A ⊆ B.

49. Since (−1)3 − 2(−1)2 − (−1) + 2 = 0, −1 ∈ A. However, −1 ∈
/ B. Therefore A is not a subset of B.

50. Consider 4, which is in A. If 4 ∈ B, then 4 ∈ A and 4 + m = 8 for some m ∈ C. However, the only value
of m for which 4 + m = 8 is m = 4 and 4 ∈ / C. Therefore 4 ∈
/ B. Since 4 ∈ A and 4 ∈
/ B, A is not a
subset of B.

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,2 SOLUTIONS


53.

U
A B




54.
@
U
A B
A
56.
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A B U
us
C



57.
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U
A
B
C
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59.
U
A B
a
C



62. 32 63. 105 65. 51

67. Suppose that n students are taking both a mathematics course and a computer science course. Then
4n students are taking a mathematics course, but not a computer science course, and 7n students are
taking a computer science course, but not a mathematics course. The following Venn diagram depicts
the situation:

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, SOLUTIONS 3


Math
'$
'$
CompSci

4n n 7n

&%
&%

Thus, the total number of students is
4n + n + 7n = 12n.

The proportion taking a mathematics course is
@
5n 5
= ,
12n 12
which is greater than one-third.

69. {(a, 1), (a, 2), (b, 1), (b, 2), (c, 1), (c, 2)}
A
70. {(1, 1), (1, 2), (2, 1), (2, 2)} 73. {(1, a, a), (2, a, a)}

74. {(1, 1, 1), (1, 2, 1), (2, 1, 1), (2, 2, 1), (1, 1, 2), (1, 2, 2), (2, 1, 2), (2, 2, 2)}
pl
77. Vertical lines (parallel) spaced one unit apart extending infinitely to the left and right.

79. Consider all points on a horizontal line one unit apart. Now copy these points by moving the horizontal
line n units straight up and straight down for all integers n > 0. The set of all points obtained in this
us
way is the set Z × Z.

80. Ordinary 3-space

82. Take the lines described in the instructions for this set of exercises and copy them by moving n units out
and back for all n > 0. The set of all points obtained in this way is the set R × Z × Z.
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84. {1, 2}
{1}, {2}

85. {a, b, c}
{a, b}, {c}
{a, c}, {b}
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{b, c}, {a}
{a}, {b}, {c}

88. False 89. True 91. False 92. True
a
94. ∅, {a}, {b}, {c}, {d}, {a, b}, {a, c}, {a, d}, {b, c}, {b, d}, {c, d}, {a, b, c}, {a, b, d},
{a, c, d}, {b, c, d}, {a, b, c, d}. All except {a, b, c, d} are proper subsets.

95. 210 = 1024; 210 − 1 = 1023 98. B ⊆ A 99. A = U

102. The symmetric difference of two sets consists of the elements in one or the other but not both.

103. A 4 A = ∅, A 4 A = U , U 4 A = A, ∅ 4 A = A

105. The set of primes

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Escuela, estudio y materia

Institución
Discrete Mathematics 8th Edition Richard Johnsonba
Grado
Discrete Mathematics 8th Edition Richard Johnsonba

Información del documento

Subido en
19 de junio de 2026
Número de páginas
212
Escrito en
2025/2026
Tipo
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