13.7.6E: Exercises
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Practice Makes Perfect
Use the Commutative and Associative Properties
In the following exercises, simplify.
1. \(43m+(−12n)+(−16m)+(−9n)\)
- Answer
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\(27m+(−21n)\)
2. \(−22p+17q+(−35p)+(−27q)\)
3. \(\frac{3}{8}g+\frac{1}{12}h+\frac{7}{8}g+\frac{5}{12}h\)
- Answer
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\(\frac{5}{4}g+\frac{1}{2}h\)
4. \(\frac{5}{6}a+\frac{3}{10}b+\frac{1}{6}a+\frac{9}{10}b\)
5. \(6.8p+9.14q+(−4.37p)+(−0.88q)\)
- Answer
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\(2.43p+8.26q\)
6. \(9.6m+7.22n+(−2.19m)+(−0.65n)\)
7. \(−24·7·\frac{3}{8}\)
- Answer
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\(−63\)
8. \(−36·11·\frac{4}{9}\)
9. \(\left(\frac{5}{6}+\frac{8}{15}\right)+\frac{7}{15}\)
- Answer
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\(1\frac{5}{6}\)
10. \(\left(\frac{11}{12}+\frac{4}{9}\right)+\frac{5}{9}\)
11. \(17(0.25)(4)\)
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\(17\)
12. \(36(0.2)(5)\)
13. \([2.48(12)](0.5)\)
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\(14.88\)
14. \([9.731(4)](0.75)\)
15. \(12\left(\frac{5}{6}p\right)\)
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\(10p\)
16. \(20\left(\frac{3}{5}q\right)\)
Use the Properties of Identity, Inverse and Zero
In the following exercises, simplify.
17. \(19a+44−19a\)
- Answer
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\(44\)
18. \(27c+16−27c\)
19. \(\frac{1}{2}+\frac{7}{8}+\left(−\frac{1}{2}\right)\)
- Answer
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\(\frac{7}{8}\)
20. \(\frac{2}{5}+\frac{5}{12}+\left(−\frac{2}{5}\right)\)
21. \(10(0.1d)\)
- Answer
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\(d\)
22. \(100(0.01p)\)
23. \(\frac{3}{20}·\frac{49}{11}·\frac{20}{3}\)
- Answer
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\(\frac{49}{11}\)
24. \(\frac{13}{18}·\frac{25}{7}·\frac{18}{13}\)
25. \(\frac{0}{u−4.99}\), where \(u\neq 4.99\)
- Answer
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\(0\)
26. \(0÷(y−\frac{1}{6})\), where \(x \neq 16\)
27. \(\frac{32−5a}{0}\), where \(32−5a\neq 0\)
- Answer
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undefined
28. \(\frac{28−9b}{0}\), where \(28−9b\neq 0\)
29. \(\left(\frac{3}{4}+\frac{9}{10}m\right)÷0\), where \(\frac{3}{4}+\frac{9}{10}m\neq 0\)
- Answer
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undefined
30. \(\left(\frac{5}{16}n−\frac{3}{7}\right)÷0\), where \(\frac{5}{16}n−\frac{3}{7}\neq 0\)
Simplify Expressions Using the Distributive Property
In the following exercises, simplify using the Distributive Property.
31. \(8(4y+9)\)
- Answer
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\(32y+72\)
32. \(9(3w+7)\)
33. \(6(c−13)\)
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\(6c−78\)
34. \(7(y−13)\)
35. \(\frac{1}{4}(3q+12)\)
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\(\frac{3}{4}q+3\)
36. \(\frac{1}{5}(4m+20)\)
37. \(9(\frac{5}{9}y−\frac{1}{3})\)
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\(5y−3\)
38. \(10(\frac{3}{10}x−\frac{2}{5})\)
39. \(12(\frac{1}{4}+\frac{2}{3}r)\)
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\(3+8r\)
40. \(12(\frac{1}{6}+\frac{3}{4}s)\)
41. \(15⋅\frac{3}{5}(4d+10)\)
- Answer
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\(36d+90\)
42. \(18⋅\frac{5}{6}(15h+24)\)
43. \(r(s−18)\)
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\(rs−18r\)
44. \(u(v−10)\)
45. \((y+4)p\)
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\(yp+4p\)
46. \((a+7)x\)
47. \(−7(4p+1)\)
- Answer
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\(−28p−7\)
48. \(−9(9a+4)\)
49. \(−3(x−6)\)
- Answer
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\(−3x+18\)
50. \(−4(q−7)\)
51. \(−(3x−7)\)
- Answer
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\(−3x+7\)
52. \(−(5p−4)\)
53. \(16−3(y+8)\)
- Answer
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\(−3y−8\)
54. \(18−4(x+2)\)
55. \(4−11(3c−2)\)
- Answer
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\(−33c+26\)
56. \(9−6(7n−5)\)
57. \(22−(a+3)\)
- Answer
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\(−a+19\)
58. \(8−(r−7)\)
59. \((5m−3)−(m+7)\)
- Answer
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\(4m−10\)
60. \((4y−1)−(y−2)\)
61. \(9(8x−3)−(−2)\)
- Answer
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\(72x−25\)
62. \(4(6x−1)−(−8)\)
63. \(5(2n+9)+12(n−3)\)
- Answer
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\(22n+9\)
64. \(9(5u+8)+2(u−6)\)
65. \(14(c−1)−8(c−6)\)
- Answer
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\(6c+34\)
66. \(11(n−7)−5(n−1)\)
67. \(6(7y+8)−(30y−15)\)
- Answer
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\(12y+63\)
68. \(7(3n+9)−(4n−13)\)
Writing Exercises
69. In your own words, state the Associative Property of addition.
- Answer
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Answers will vary.
70. What is the difference between the additive inverse and the multiplicative inverse of a number
71. Simplify \(8(x−\frac{1}{4})\) using the Distributive Property and explain each step.
- Answer
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Answers will vary.
72. Explain how you can multiply \(4($5.97)\) without paper or calculator by thinking of \($5.97\) as \(6−0.03\) and then using the Distributive Property.
Self Check
a. After completing the exercises, use this checklist to evaluate your mastery of the objectives of this section.
b. After reviewing this checklist, what will you do to become confident for all objectives?