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Multi-Part Lesson 1-1 Rational Numbers PART A Main Idea Express rational numbers as decimals and decimals as fractions. NGSSS Preparation for MA.8.A.6.4 Perform operations on real numbers (including integer exponents, radicals, percents, scientific notation, absolute value, rational numbers, and irrational numbers) using multi-step and real world problems. New Vocabulary rational number terminating decimal repeating decimal B C D Rational Numbers MARINE LIFE There are over 360 different species of sharks. The most common shark species found around Florida are listed below. Color Average Length (feet) Sharpnose shark brown to green-gray 3 Bonnethead shark gray or gray-brown 3 Blacknose shark green-gray 5 Blacktip shark blue-gray 6 Spinner shark gray-bronze 6 Sandbar shark brown or gray 6 Nurse shark yellow-brown 7 Scalloped hammerhead shark gray-brown 8 Lemon shark yellow-gray 9 Shark Species 1. What fraction of the shark species have an average length less than 6 feet? glencoe.com 2. What fraction of the shark species are a shade of blue? 3. What fraction of the shark species are not a shade of gray? Rational numbers are numbers that can be written as fractions. 8 -7 _ Since -7 can be written as _ , 2 2 can be written as _ , and 9% can 1 3 3 9 2 , -7, 2_ , and 9% are rational numbers. All integers, be written as _ 100 3 fractions, mixed numbers, and percents are rational numbers. Rational Numbers Words Algebra Rational numbers are numbers that can be written as fractions. a _ , where a and b are b integers and b ≠ 0 Model Rational Numbers - 28 Chapter 1 Rational Numbers and Percent Integers Whole - Numbers - Bar Notation Bar notation is often used to indicate that a digit or group of digits repeats. The bar is placed above the repeating part. To write 8.636363... −−, in bar −notation, write 8.63 −− not 8.6 or 8.636. To write 0.3444... in bar notation, −−. write 0.34−, not 0.34 Any fraction can be expressed as a decimal by dividing the numerator by the denominator. A terminating decimal, like 0.625, terminates because the division ends with a remainder of 0. If the division does not end, sometimes a pattern of digits repeats. A repeating decimal, − like 0.3, has a pattern in its digits that repeats without end. Write a Fraction as a Decimal Write each fraction or mixed number as a decimal. _5 _ -1 2 8 _5 means 5 ÷ 8. 8 3 -5 2 -1_ can be rewritten as _ . 3 3 0.625 8 5.000 Divide 5 by 8. - 48 −−−− 20 -16 −−− 40 -40 ____ 0 3 a. _ 4 Divide 5 by 3 and add a negative sign. 1.6... 5.0 3 -3 −−− 2.0 -1.8 −−−− 2 2 The mixed number -1_ −3 can be written as -1.6. 13 b. 4 _ 25 2 c. -_ 9 1 d. 3 _ 11 Repeating decimals often occur in real-world situations. However, they are usually rounded to a certain place-value position. BASEBALL In a recent season, Tampa Bay Rays fielder Carl Crawford had 184 hits in 584 at-bats. To the nearest thousandth, find his batting average. To find his batting average, divide the number of hits, 184, by the number of at-bats, 584. 184 µ 584 0.3150684932 Look at the digit to the right of the thousandths place. Since 0 < 5, round down. Carl Crawford’s batting average was 0.315. Real-World Link The Tampa Bay Rays were the thirteenth expansion team in Major League history. They played their first game on March 31, 1998. e. AUTO RACING In a recent season, NASCAR driver Jimmie Johnson won 6 of the 36 total races held. To the nearest thousandth, find the part of races he won. Lesson 1-1 Rational Numbers 29 Terminating and repeating decimals are also rational numbers because you can write them as fractions. Write Decimals as Fractions Write 0.45 as a fraction. 45 0.45 is 45 hundredths. 0.45 = _ 100 9 = _ 20 Simplify. − ALGEBRA Write 0.5 as a fraction in simplest form. − Assign a variable to the value 0.5. Let N = 0.555... . Then perform operations on N to determine its fractional value. N = 0.555... 10(N) = 10(0.555...) Multiply each side by 10 because 1 digit repeats. 10N = 5.555... - N = 0.555... −−−−−−−−−−−− 9N = 5 5 N =_ 9 Multiplying by 10 moves the decimal point 1 place to the right. Subtract N = 0.555... to eliminate the repeating part. Simplify. Divide each side by 9. − 5 The decimal 0.5 can be written as _ . 9 Write each decimal as a fraction or mixed number in simplest form. − −− g. 8.75 h. 0.27 i. -0.4 f. -0.14 Examples 1 and 2 (p. 29) Write each fraction or mixed number as a decimal. 4 1. _ 5 5 4. _ 9 Example 3 (p. 29) Examples 4 and 5 (p. 30) 16 5 5. 4_ 6 29 3. -1_ 40 5 6. -7_ 33 7. GOLF In a recent year, Tiger Woods won 7 of the 16 tournaments he entered. To the nearest thousandth, find his winning average. Write each decimal as a fraction or mixed number in simplest form. 8. 0.6 − 11. -0.5 30 9 2. _ Chapter 1 Rational Numbers and Percent 9 0.32 − 12. -3.8 10. -1.55 −− 13. 2.15 = Step-by-Step Solutions begin on page R1. Extra Practice begins on page EP2. Examples 1 and 2 (p. 29) Write each fraction or mixed number as a decimal. 1 14. _ 2 15. _ 5 4 7 18. -_ 16 4 22. _ 33 Example 3 (p. 29) 5 19. -_ 32 6 23. -_ 11 7 16. _ 33 17. _ 80 1 20. 2_ 8 40 5 21. 5_ 16 13 24. -6_ 26. FAMILIES The table shows statistics about the students at Carter Junior High. Fraction of Students Three _1 15 _1 3 _5 12 _1 Four or more 1 _ None b. Find the decimal equivalent for the number of students with three siblings. c. Write the fraction of students with one sibling as a decimal. Round to the nearest thousandth. d. Write the fraction of students with two siblings as a decimal. Round to the nearest thousandth. (p. 30) 45 Number of Siblings a. Express the fraction of students with no siblings as a decimal. Examples 4 and 5 8 25. -7_ 15 One Two 6 60 Write each decimal as a fraction or mixed number in simplest form. 27. -0.4 − 31. 0.2 28. 0.5 −− 32. -0.45 29. 5.55 −− 33. -3.09 WEATHER Write the rainfall amount for each day as a fraction or mixed number. 30. –7.32 − 34. 2.7 Day 35 Friday 36. Saturday 37. Sunday Rainfall (in.) mL 5 5 4 4 3 Friday 0.08 3 Saturday 2.4 2 2 0.035 1 1 Sunday 0 B MEASUREMENT Write the length of each insect as a fraction or mixed number and as a decimal. 38. 39. 0 in. 1 0 in. 40. FROZEN YOGURT The table shows three popular flavors according to the results of a survey. What is the decimal value of those who liked vanilla, chocolate, or strawberry? Round to the nearest hundredth. 1 Flavor Vanilla Chocolate Strawberry Fraction _3 10 _1 11 _1 18 Lesson 1-1 Rational Numbers 31 41. OPEN ENDED Give an example of a repeating decimal where two digits repeat. Explain why your number is a rational number. C 42. Which One Doesn’t Belong? Identify the fraction that does not belong with the other three. Explain your reasoning. _1 _1 _1 _4 8 4 6 5 43. CHALLENGE Explain why any rational number is either a terminating or repeating decimal. − −− 44. Compare 0.1 and 0.1, 0.13 and 0.13, and 0.157 and −−− 0.157 when written as fractions. Make a conjecture about expressing repeating decimals like these as fractions. NGSSS Practice MA.8.A.6.4 45. Which of the following is equivalent to the fraction below? 13 _ 5 46. A. 2.4 C. 2.55 B. 2.45 D. 2.6 Free Throws Made Free Throws Attempted Felisa 18 20 Morgan 13 24 Yasmine 15 22 Gail 10 14 Part A Write the fraction of free throws made in simplest form for each player. Part B Write each fraction from Part A as a decimal. Round to the nearest thousandth if necessary. Part C Which player has the greatest fraction of free throws made? 32 -6 F. _ H. 18% G. 15 I. 11 EXTENDED RESPONSE The table shows the number of free throws each player made during the last basketball season. Player 47. Which of the following is NOT an example of a rational number? Chapter 1 Rational Numbers and Percent 4.23242526. . . 48. While shopping for a new pair of jeans, Janet notices the sign below. SALE! 8cca\Xejfek_`jiXZb ( Xi\f]]k_\ * fi`^`eXcgi`Z\ (Regularly priced $29.99) Which of the following expressions can be used to estimate the total discount on a pair of jeans? A. 0.033 × $30 B. 0.33 × $30 C. 1.3 × $30 D. 33.3 × $30 Multi-Part Lesson 1-1 Rational Numbers PART Main Idea Add and subtract rational numbers. NGSSS MA.8.A.6.4 Perform operations on real numbers (including integer exponents, radicals, percents, scientific notation, absolute value, rational numbers, and irrational numbers) using multi-step and real world problems. New Vocabulary like fractions unlike fractions A B C D Add and Subtract Rational Numbers APPLES The amount of apples Oleta’s family picked is shown. Person Amount Picked (baskets) 1. What is the sum of the whole-number parts of the baskets of apples? Oleta 14 Mr. Davis 2 1 2. How many _ baskets Mrs. Davis 14 4 are there? 1 3 2 4 Alvin 3. Can you combine all of the apples into a bushel that holds five baskets? Explain. Fractions that have the same denominators are called like fractions. glencoe.com Add and Subtract Like Fractions Words To add or subtract like fractions, add or subtract the numerators and write the result over the denominator. Examples Numbers Algebra 3 1 4 _ +_=_ a a+b b _ + _ = _, where c ≠ 0 3 7 4 1 _ - _ = _ or _ a a-b b _ - _ = _, where c ≠ 0 5 8 5 8 c 5 8 c 2 c c c c You can use the rules for adding integers to determine the sign of the sum of any two signed numbers. Add Like Fractions _ ( _) 8 8 5 + (-7) _5 + -_7 = _ ) ( 8 8 8 Find 5 + - 7 . Write in simplest form. Add the numerators. The denominators are the same. -2 1 =_ or -_ Simplify. 8 5 7 a. _ + _ 9 9 4 5 1 b. -_ +_ 9 9 ( _6 ) -1 c. _ + - 5 6 Lesson 1-1 Rational Numbers 33 Subtract Like Fractions _ _ Find - 8 - 7 . Write in simplest form. 9 9 8 8 7 7 -_ -_ = -_ + -_ 9 9 9 9 -8 + (-7) =_ 9 -15 2 = _ or -1_ 9 3 ( ) -15 2 Rename _ as -1_ or -1_ . 9 6 9 3 3 5 e. _ - _ 3 4 d. -_ -_ 5 Subtract the numerators by adding the opposite of 7. 8 5 5 4 f. _ - -_ ( 7) 7 8 Fractions with unlike denominators are called unlike fractions. To add or subtract unlike fractions, rename the fractions using prime factors to find the least common denominator. Then add or subtract as with like fractions. Add and Subtract Unlike Fractions Add or subtract. Write in simplest form. _1 + (-_2 ) 3 4 _1 + -_2 = _1 · _3 + -_2 · _4 4 4 4 3 3 3 3 8 = _ + -_ 12 12 3 + (-8) =_ 12 5 = -_ 12 ( ) Least Common Denominator (LCD) To find the LCD of two fractions, write the prime factorization of each denominator. Identify common prime factors. 9=3×3 15 = 3 × 5 The LCD is the product of each common prime factor and any remaining factors. LCD = 3 × 3 × 5 or 45 ( ) ( ) Rename using the LCD. Add the numerators. Simplify. _ ( _) 9 15 -8 - - 7 8 7 8 7 -_ - -_ = -_ +_ ( 15 ) 9 6 ( 2) Chapter 1 Rational Numbers and Percent To subtract -_, add _. 7 15 15 9 5 8 7 _ = -_ · _ + _ ·3 9 5 15 3 40 21 = -_ +_ 45 45 -40 + 21 =_ 45 19 = -_ 45 5 1 g. -_ + -_ 34 The LCD is 3 · 4 or 12. The LCD is 9 · 5 or 45. Rename using the LCD. Add the numerators. Simplify. 1 3 h. _ + _ 14 7 15 4 3 5 i. -_ +_ 6 10 Add and Subtract Mixed Numbers Add or subtract. Write in simplest form. _ _ 57 + 84 9 9 7 4 7 4 5_ + 8_ = (5 + 8) + _ +_ 9 9 9 9 7 + 4 = 13 + _ 9 11 2 = 13_ or 14_ 9 9 ( ) Add the whole numbers and fractions separately. Add the numerators. 11 _ = 1_2 9 9 _ _ 23 - 31 4 3 3 10 1 11 2_ - 3_ =_ -_ 4 3 Write as improper fractions. 4 3 33 40 =_ -_ 12 12 33 - 40 -7 =_ or _ 12 12 5 4 j. 6_ + 3_ 11 _ 33 10 4 40 _ · 3 =_ and _ · _ = _ 4 3 3 12 12 Subtract the numerators. Then simplify. 5 3 k. 9_ - 3_ 7 7 5 1 m. 3_ + 2_ 6 4 4 5 2 l. -8_ + -6_ ( ( 8 8 7 2 n. 5_ - 4_ 9 3 ) ) 9 9 3 2 o. -3_ + -8_ 5 3 Sometimes you need to regroup before you can subtract. Real-World Link Dressage is an Olympic sport where a horse and rider must go through a series of tests. These tests require very controlled movements for the horse and require years of training. ANIMALS Horses are measured by a unit called a handbreadth or 1 hand. How much taller is a horse that is 14_ hands tall than one 4 3 that is 12_ hands tall? 4 1 14_ → 5 13_ 4 4 3 _ _ -12 → -12 3 4 4 2 1 1_ or 1_ 2 4 14_ = 13 + 1 + _ or 13_ 1 4 5 4 1 4 Subtract the whole numbers and fractions separately. 1 The first horse is 1_ hands taller. 2 3 p. BAKING A recipe for chocolate cookies calls for 2_ cups of flour. 4 1 If Alexis has 1_ cups of flour, how much more will she need? 4 Lesson 1-1 Rational Numbers 35 Examples 1–6 (pp. 33–35) Add or subtract. Write in simplest form. 2 4 1. _ + -_ ( 5) 3 1 5. _ + (-_ 4 6) 5 9 7 3. -_ -_ 5 1 6. -_ +_ 3 7 7. _ -_ 4 4 10 2 8 4 2 9. 5_ - 2_ 9 3 1 2. -_ +_ 8 3 2 10. -1_ + -2_ 9 ( 7 10 7 ) 4 5 2 11 -3_ + 1_ 5 6 3 7 4. _ - _ 8 8 7 2 8. _ - _ 13 9 5 1 12. 3_ - 1_ 8 3 Example 7 13. HOMEWORK Venus wrote a report for her middle school history class in (p. 35) 1 2_ hours. Her sister Tia is in high school, and she wrote a history paper 4 3 in 4_ hours. How much longer did it take Tia to write her paper? 4 = Step-by-Step Solutions begin on page R1. Extra Practice begins on page EP2. Examples 1–6 (pp. 33–35) Add or subtract. Write in simplest form. 4 1 14. -_ +_ 3 2 15. -_ + -_ 5 7 16. -_ +_ 8 5 17. _ + -_ 3 4 18. -_ -_ 15 9 19. _ -_ 1 7 20. _ -_ 2 8 21. _ - _ 1 7 22. _ + -_ 5 3 23. -_ +_ 6 1 24. -_ + -_ 5 3 25. _ + -_ 1 7 26. _ -_ 4 2 27. _ - -_ 9 9 5 7 16 5 ( 4 3 12 ) 12 12 16 9 12 7 ( 15 ) 30. ELECTIONS The table shows the fraction of students who voted for Josh or Chuan in the election for class president. What fraction of the students voted for either Josh or Chuan? 9 ( 8) 7 12 29. -_ - (-_ 25 ) 15 9 Class President 3 31. DOGS Omar feeds his dog _ cup dog food in the 4 3 2 morning, _ cup in the afternoon, and _ cup in 3 ( 9) 9 12 ( 2) 3 2 28. -_ - (-_ 9 11 ) 6 8 5 8 ( 7) Candidate Fraction of Students Josh _4 9 _2 5 Chuan 4 the evening. How many cups does he feed the dog altogether? Add or subtract. Write in simplest form. 5 5 32. 3_ + 7_ 8 9 1 33. 8_ + -2_ 8 5 5 - 3_ 36. -1_ 6 ( 10 6 2 37. 7 - 5_ 5 10 ) 1 1 34. 3_ + -8_ ( 2) 3 1 38. 8_ - (-6_ 7 2) 5 5 2 35. -15_ + 11_ 8 3 5 1 39. -8_ - 4_ 3 6 Example 7 1 40. HOME IMPROVEMENT Andrew has 42_ feet of molding to use as borders (p. 35) 2 around the windows of his house. If he uses 23_ feet of the molding on 3 3 the front windows, how much remains for the back windows? 6 41 WEATHER One year, Brady’s hometown of Powell received about 42_ 10 3 inches of snow. The following year only 14 _ inches of snow fell. What is 10 the difference in the amount of snow between the two years? 36 Chapter 1 Rational Numbers and Percent B Simplify each expression. 3 4 1 42. -7_ + 3_ - 2_ 5 5 3 1 43. -8_ - -3 _ + 6_ ( 5) 5 ( 8 6 ) 4 ALGEBRA Evaluate each expression for the given values. 1 1 and b = -2_ 44. a - b if a = 5 _ 3 3 3 7 _ 46. c - d if c = - and d = -12_ 8 4 5 1 45. x + y if x = -_ and y = -_ 12 12 5 5 _ 47. r - s if r = -_ and s = 2 6 8 1 48. ACTIVITIES Tamara played a computer game for 1_ hours, studied for 4 1 _ 2.25 hours, and did some chores for hour. How long did it take Tamara 2 Adding Rational Numbers It is helpful to write all rational numbers in the same form before adding. In Exercise 48, write all the numbers as fractions or decimals. Then add. to do these things? 49. HOMEWORK Rob recorded the amount of time he spent on homework last week. Express his total time for the week in terms of hours and minutes. 5 50. PLUMBING A plumber has a pipe that is 64_ inches 8 7 long. The plumber cuts 2_ inches off the end of the 8 3 pipe, then cuts off an additional 1_ inches. How long is 8 the remaining pipe after the last cut is made? MEASUREMENT Find the missing measure for each figure. 51. 52. 3 6 4 ft 1 1 Time Mon 2_ h Tue 2_ h Wed 1_ h Thu 2_ h Fri 1_ h 1 6 1 2 3 4 5 12 1 4 x in. 1 4 3 ft Day 7 9 2 in. 11 8 in. 4 3 ft 1 13 4 in. x ft 11 perimeter = 17 12 ft 3 perimeter = 40 4 in. 53. FIND THE DATA Refer to the Data File on pages 2–5. Choose some data and write a real-world problem in which you would add or subtract fractions or mixed numbers. C 54. OPEN ENDED Write a subtraction problem using unlike fractions with a least common denominator of 12. Find the difference. 55. NUMBER SENSE Without doing the computation, determine whether _4 + _5 is greater than, less than, or equal to 1. Explain. 7 9 56. CHALLENGE Suppose a bucket is placed under two faucets. If one faucet is turned on alone, the bucket will be filled in 5 minutes. If the other faucet is turned on alone, the bucket will be filled in 3 minutes. Write the fraction of the bucket that will be filled in 1 minute if both faucets are turned on. 57. Write a real-world situation that can be solved by adding or subtracting mixed numbers. Then solve the problem. Lesson 1-1 Rational Numbers 37 NGSSS Practice MA.6.A.1.2, MA.8.A.6.4 58. Use the figure shown below. 1 cups 59. A recipe for snack mix contains 2_ 3 1 of mixed nuts, 3_ cups of granola, and 2 1 13 2 23 _3 cup of raisins. What is the total 4 1 13 amount of snack mix? 2 F. 5_ c 2 H. 6_ c 3 7 G. 5_ c 12 What is the length of the segment connecting the centers of the two smaller circles? 3 _ denominator to simplify _ – 2? 3 2 B. 5_ units 3 1 C. 5_ units 3 5 D. 4_ units 3 A. B. C. D. Write each fraction or mixed number as a decimal. 5 62. _ 20 1 65. 2_ 4 I. 60. Which of the following shows the next step using the least common 1 A. 6_ units 14 61. _ 7 66. -3_ 9 4 _3 × _5 - _2 × _5 5 3 5 4 ( ) ( ) (_34 × _66 ) - (_23 × _55 ) (_34 × _33 ) - (_23 × _44 ) (_34 × _44 ) -( _23 × _33 ) (Lesson 1-1A) 3 64. _ 9 63. _ 6 3 7 6_ c 12 8 11 7 67. 4_ 12 8 68. 1_ 10 69. HOCKEY The sheet of ice that covers a hockey rink is created in two layers. 1 First, an _ -inch layer of ice is made for the lines to be painted on. Then, 8 6 -inch layer of ice is added on top of the painted layer for a total thickness a_ 8 7 -inch. Write the total thickness of the ice as a decimal. (Lesson 1-1A) of _ 8 Write each decimal as a fraction or mixed number in simplest form. (Lesson 1-1A) 70. 0.25 71. 1.6 72. -4.35 73. 0.94 − 74. 1.6 − 75. -2.2 − 76. 0.7 −− 77. 4.65 78. ELEVATORS In one hour, an elevator traveled up 5 floors, down 2 floors, up 8 floors, down 6 floors, up 11 floors, and down 14 floors. If the elevator started on the seventh floor, on which floor is it now? (Lessons 0-3 and 0-4) 38 Chapter 1 Rational Numbers and Percent 3 Multi-Part Lesson 1-1 Rational Numbers PART Main Idea Multiply rational numbers. NGSSS MA.8.A.6.4 Perform operations on real numbers (including integer exponents, radicals, percents, scientific notation, absolute value, rational numbers, and irrational numbers) using multi-step and real world problems. New Vocabulary dimensional analysis A B C D Multiply Rational Numbers You can use an area model to find _ of _. The model 1 2 also represents the product of _ and _. 1 2 3 4 3 4 Step 1 Draw a rectangle with four columns. 3 4 Step 2 Divide the rectangle into two rows. 3 1 Step 3 Shade a rectangle that is _ unit by _ unit 4 2 1 2 blue. The shaded area represents _ of _. 3 4 3 1 _ _ 1. What is the product of and ? 4 2 1 2 2. Use an area model to find each product. glencoe.com 3 1 a. _ · _ 2 _ b. _ ·2 1 3 c. _ · _ 2 4 d. _ · _ 4 4 5 2 3 3 5 5 3. What is the relationship between the numerators of the factors and the numerator of the product? 4. What is the relationship between the denominators of the factors and the denominator of the product? The area model suggests the following rule for multiplying fractions. Multiply Fractions Words Examples To multiply fractions, multiply the numerators and multiply the denominators. Numbers Algebra 8 2 _ 4 _ · =_ c ac a _ _ · = _, where b and d ≠ 0. 3 5 15 b d bd You can use the rules for multiplying integers to determine the sign of the product of any two signed numbers. Lesson 1-1 Rational Numbers 39 Multiply Fractions and Mixed Numbers Multiply. Write in simplest form. Negative Fractions 5 -65 , -5 , and -6 are all 6 equivalent fractions. __ _ _ _ -5 · 3 6 8 1 3 -5 _ 5 _ -_ · 3 =_ · 6 8 6/ 2 Divide 6 and 3 by their GCF, 3. 8 -5 · 1 5 =_ or -_ 2·8 16 41 · 22 2 3 9 _ 1 2 4_ · 2_ =_ ·8 2 3 2 3 _ _ 3 2 _ Rename 4_ as _ and 2_ as . 1 2 9 2 8 3 3 4 9 8 =_·_ 2 3 1 1 Divide out common factors. 3·4 12 =_ or _ 1·1 Multiply. Then simplify. 1 1 2 a. _ · _ 4 Multiply. Then simplify. The fractions have different signs, so the product is negative. 1 1 c. 2_ · 1_ 1 b. -_ ( 2 ) (-_67 ) 3 6 5 Recall that probability can be expressed as a fraction. Independent events are two or more events in which the outcome of one does not affect the outcome of the other. For example, rolling a number cube and spinning a spinner have no affect on each other. To find the probability of independent events, multiply the probability of the first event by the probability of the second event. Independent Events The spinner at the right is spun, and a coin is tossed. What is the probability of spinning an odd number and tossing tails? Probability of a Simple Event The probability of rolling an even number on a number cube is P(even) 8 1 P(tossing tails) = _ 2 6 4 1 P(spinning an odd number) = _ or _ 8 1 7 3 5 4 2 2 1 _ 1 · 1 or _ P(odd and tails) = _ 2 2 4 even numbers = __ total possible numbers 3 1 =_ or _ 6 2 Refer to the situation above to find each probability. d. P(less than 4 and heads) 40 Chapter 1 Rational Numbers and Percent e. P(prime and tails) Dimensional analysis is the process of including units of measurement when you compute. AIRCRAFT Refer to the information at the left. Suppose a VH-71 helicopter is traveling at its cruising speed. How far will it _ travel in 1 3 hours? 4 Real-World Link Marine One is the helicopter used to transport the President and Vice President. The latest model is the VH-71, which has a cruising speed of 172 miles per hour. Words Distance equals the rate multiplied by the time. Variable Let d represent the distance. Equation d = 172 miles per hour · 1 hours _3 4 172 miles 3 d=_ · 1_ hours Write the equation. 4 1 hour 172 miles hours 7 d=_·_·_ 4 1 1 hour 1_ = _ 3 4 7 4 43 172 miles _ hours d=_ · 7 ·_ 1 hour 4 1 Divide by common factors and units. 1 d = 301 miles 3 hours. A VH-71 will travel 301 miles in 1_ 4 f. AIRCRAFT The VH-71 has 200 square feet of cabin space. What is the size of its cabin space in square yards? (Hint: 1 square yard = 9 square feet) Examples 1 and 2 (p. 40) Multiply. Write in simplest form. 3 _ 1. _ ·5 5 7 -12 4. _ 13 4 _ 2. _ ·3 5 2 -_ 3 ( )( ) Example 3 (p. 40) 1 2 5. 2_ · 1_ 2 5 9 (p. 41) 1 _ 3. -_ ·4 9 3 7 6. -6_ · 1_ 9 4 8 A number cube is rolled and a marble is selected from the bag shown. Find each probability. 7. P(even and blue) Example 4 8 P(greater than 2 and yellow) 8. P(3 and red) 10. P(odd and green) 5 11. FRUIT Terrence bought 2_ pounds of grapes that cost $2 8 per pound. What was the total cost of the grapes? Use dimensional analysis to check the reasonableness of the answer. Lesson 1-1 Rational Numbers 41 = Step-by-Step Solutions begin on page R1. Extra Practice begins on page EP2. Examples 1 and 2 (p. 40) Multiply. Write in simplest form. 1 _ 12. _ ·4 12 7 9 _ 16. -_ ·2 10 3 1 _ 20. 3_ ·1 3 4 Example 3 (p. 40) 3 _ 13. _ ·1 9 15 12 _ 17. -_ 25 32 1 1 21. 4_ · 3_ 3 4 16 ( ) 9 2 15. _ · _ 5 _ 14. _ ·4 10 8 5 3 1 18. -_ -_ 5 3 3 2 22. -3_ · -_ 8 3 4 1 19. -_ -_ ( )( ) ( ) The spinner at the right is spun once and a coin is tossed. Find each probability. 24. P(even and heads) 25. P(less than 8 and heads) 9 8 7 ( 7 )( 20 ) 5 4 23. -_ · -1_ 5) 6 ( 10 1 26. P(composite and tails) 3 6 5 2 3 4 27. P(factor of 12 and tails) Example 4 (p. 41) Solve each problem. Use dimensional analysis to check the reasonableness of the answer. 3 28. BAKING A recipe calls for _ cup of sugar per batch of cookies. If Gabe 4 wants to make 6 batches of cookies, how many cups of sugar does he need? 29. POPULATION Population density measures how many people live within a certain area. In a certain city, there are about 150,000 people per 1 square mile. How many people live in an area of 2_ square miles? _ 4 _ _ _ 8 1 2 2 B ALGEBRA Evaluate each expression if r = , s = , t = , and v = - . 4 31. rt 30. rs 5 9 33 rtv 32. stv 34. GEOGRAPHY There are about 57 million square miles of land on Earth covering seven continents. a. What is the approximate land area of Europe? Approximate Fraction of Earth’s Landmass Continent _1 Africa 5 Antarctica 9 _ b. What is the approximate land area of Asia? Asia 3 _ 3 c. Only about _ of Australia’s land area Australia 11 _ is able to support agriculture. What fraction of Earth’s land is this? Europe 7 _ North America 33 _ South America 3 _ 10 100 10 200 100 200 25 Find each product. Write in simplest form. 3 _ 1 35. _ · -_ ·4 3 ( 8) 5 1 _ 38. 10 · 3.78 · 5 42 3 Chapter 1 Rational Numbers and Percent 5 2 _ 36. -_ · 1 · -_ 5 2 6 − 2 _ 39. - · 0.3 ( ) 9 ( ) 1 1 37. 3_ · 1_ ·5 3 2 7 40. -_ · (-2.375) 16 C 1 1 41. FIND THE ERROR Danielle is finding 2_ · 3_ . 2 4 Find her mistake and correct it. 1 1 1 _ 2_ • 3_ =2•3+_ •1 2 4 2 4 1 =6+_ 8 1 = 6_ 8 1 and less 42. OPEN ENDED Select two fractions with a product greater than _ 2 than 1. Use a number line to justify your answer. 3 43. CHALLENGE Find the missing fraction. _ · 4 14 1 7 1 Explain why the product of _ and _ is less than _ . 2 8 2 44. NGSSS Practice 9 =_ MA.6.A.1.2, MA.8.A.6.4 46. Find the area of the parallelogram. Use the formula A = bh. 45. A whole number greater than one is multiplied by a positive fraction less than one. The product is always 3 in. 4 A. greater than the whole number. B. between the fraction and the whole number. 3 2 5 in. C. less than the fraction. 5 2 F. _ in 19 2 H. 1_ in D. all of the above. 3 G. 2_ in2 I. 6 7 20 10 Add or subtract. Write in simplest form. 1 1 47. _ +_ 9 7 1 48. _ -_ 8 6 _4 in2 5 (Lesson 1-1B) 1 4 49. -5_ - 6_ 2 5 1 2 50. 2_ + 5_ 2 3 BIOLOGY Write the weight of each animal as a fraction or mixed number. (Lesson 1-1B) 51. queen bee 52. hummingbird Weight (ounces) 0.004 Queen Bee Hummingbird 0.11 3.5 Hamster Animal 53. hamster Divide. (Lesson 0-5) 54. 51 ÷ (-17) 55. -81 ÷ (-3) 56. -92 ÷ 4 Lesson 1-1 Rational Numbers 43 Multi-Part Lesson 1-1 Rational Numbers PART Main Idea Divide rational numbers. NGSSS MA.8.A.6.4 Perform operations on real numbers (including integer exponents, radicals, percents, scientific notation, absolute value, rational numbers, and irrational numbers) using multi-step and real world problems. New Vocabulary multiplicative inverses reciprocals A B D C Divide Rational Numbers ANIMALS An antelope is one of the fastest animals on Earth. It can run about 60 miles per hour. A squirrel runs one fifth of that speed. 1. Find the value of 60 ÷ 5. 1 2. Find the value of 60 × _ . 5 3. Compare the values of 60 ÷ 5 1 and 60 × _ . 5 4. What can you conclude about the relationship between dividing 1 by 5 and multiplying by _ ? 5 glencoe.com Two numbers with a product of 1 are multiplicative inverses, or 1 reciprocals, of each other. For example, 5 and _ are multiplicative 5 1 inverses because 5 · _ = 1. 5 Inverse Property of Multiplication Words The product of a number and its multiplicative inverse is 1. Examples Numbers Algebra 3 _ 4 _ · =1 a _ b _ · = 1, where a and b ≠ 0 4 3 b a Find a Multiplicative Inverse _ Write the multiplicative inverse of -5 2 . 3 2 17 2 _ _ _ Write -5 as an improper fraction. -5 = 3 3 3 3 3 2 17 Since -_ -_ = 1, the multiplicative inverse of -5_ is -_ . 3 3 17 17 ( ) Write the multiplicative inverse of each number. 1 a. -2_ 3 44 Chapter 1 Rational Numbers and Percent 5 b. -_ 8 c. 7 Complex Fractions Recall that a fraction bar represents division. So, _a _a ÷ _c = __bc . b d d Multiplicative inverses are used in division. Consider _a ÷ _c , b d which can be written as a fraction. _a _a · _d _c _c · _d d c _a · _d b c _ Multiply the numerator and denominator d c by _c , the multiplicative inverse of _. b c _b = _ d = d _c · _d = 1 c d 1 d = _a · _ c b d . Therefore, _a ÷ _c = _a · _ b d c b Divide Fractions Words To divide by a fraction, multiply by its multiplicative inverse. Symbols Numbers Algebra 3 2 2 4 _ ÷_=_·_ 5 4 5 3 c a a d _ ÷ _ = _ · _, where b, c and d ≠ 0 d b b c Divide Fractions and Mixed Numbers Divide. Write in simplest form. _ _ -4 ÷ 6 7 5 6 4 _ 4 -_ ÷_ =-_ ·7 7 5 6 5 The multiplicative inverse of _ is _. 6 7 7 6 2 4 7 = -_ · _ 5 Divide -4 and 6 by their GCF, 2. / 6 3 14 = -_ Multiply. 15 _ ( _) 3 2 4 2 ÷ -3 1 2 1 14 7 4_ ÷ -3 _ =_ ÷ -_ 3 2 ( ) ( ) 3 2 14 2 =_ · -_ 3 7 2 14 2 = -_ · -_ 3 ( 7) 2 4_ = _, -3_ = -_ 3 14 3 7 2 1 2 The multiplication inverse of -_ is -_ . 7 7 2 2 Divide 14 and 7 by their GCF, 7. 1 1 4 = -_ or -1_ Multiply. Dividing By a Whole Number When dividing by a whole number, rename it as an improper fraction first. Then multiply by its reciprocal. 3 3 3 1 d. _ ÷ _ 4 2 7 1 e. -_ ÷_ 4 8 3 1 f. 2_ ÷ -2_ 4 ( 5 ) 1 g. -1_ ÷ 12 2 Lesson 1-1 Rational Numbers 45 1 13 7 13 CRAFTS Lina’s class is making flags for the school’s International Day celebration. She 1 1 feet of paper for the blue portion on needs 1_ 1 6 ft 6 each flag. If the class has a 21-foot roll of blue paper, how many flags can she make? 1 Divide 21 by 1_ . 6 1 21 7 =_ ÷_ 21 ÷ 1_ 6 1 6 3 21 1 1 6 7 6 Multiply by the multiplicative inverse of _, which is _. 7 6 Divide 7 and 21 by their GCF, 7. 7 6 21 · _ =_ 1 Write 21 as _. Write 1_ as _. 7 6 1 Real-World Link The width of the blue portion of the Stars and 7 Stripes is _ of the 18 =_ or 18 1 Simplify. Lina’s class can make 18 flags using the 21-foot roll of paper. 13 width of the entire flag. The width of each 1 stripe is _ of the 1 h. LUMBER How many 1_ -inch-thick boards are in a stack that is 2 36 inches tall? 13 width of the entire flag. Example 1 (p. 44) Write the multiplicative inverse of each number. 5 1. _ Examples 2 and 3 (p. 45) (p. 46) 4 Divide. Write in simplest form. 3 2 4. _ ÷_ 3 4 4 8. _ ÷ 8 5 Example 4 3 3. -2_ 2. -12 7 5 1 5. _ ÷_ 8 2 9 9. _ ÷ 3 10 3 9 6. _ ÷ -_ ( 10 ) 5 2 10. -5_ ÷ (-4_ 6 3) 8 7 7 7. -_ ÷ -_ ( ) 8 16 5 7 11 -3_ ÷ 6_ 6 12 12. BIRDS The smallest owl found in the United 1 States is the Elf Owl, which weighs 1_ ounces. 2 One of the largest owls is the Eurasian Eagle Owl, which weighs nearly 10 pounds or 156 ounces. The Eurasian Eagle Owl is how many times as heavy as the Elf Owl? Elf Owl 46 Chapter 1 Rational Numbers and Percent Eurasian Eagle Owl = Step-by-Step Solutions begin on page R1. Extra Practice begins on page EP2. Example 1 (p. 44) Write the multiplicative inverse of each number. 7 13. -_ 5 14. -_ 9 16. 18 Example 2 and 3 (p. 45) 3 2 ÷_ 19. _ 3 2 20. _ ÷_ 8 2 1 22. _ ÷ _ 5 2 21. _ ÷_ 8 3 3 2 24. _ ÷ -_ 10 3 9 28. _ ÷3 16 1 1 32. 7_ ÷ 2_ 2 10 4 3 4 23. -_ ÷_ 5 4 2 27. _ ÷4 5 3 1 31. 3_ ÷ 2_ 2 4 (p. 46) 1 18. 4_ Divide. Write in simplest form. 5 Example 4 15. 15 8 2 _ 17. 3 5 3 ( ) 6 10 5 7 26. -_ ÷ -_ 6 12 6 30. _ ÷ 4 7 3 1 34. 10_ ÷ -_ 5 15 5 5 2 25. -_ ÷ -_ 9 3 4 29. _ ÷6 5 1 2 33. -12_ ÷ 4_ 3 4 ( ) ( ) 35. HUMAN BODY The table shows the composition of a healthy adult male’s body. Examples of body cell mass are muscle, body organs, and blood. Examples of supporting tissue are blood, plasma, and bones. ( ) Composition of Human Body Component Body Cell Mass Supporting Tissue a. How many times more of a healthy adult male’s body weight is made up of body cell mass than body fat? Body Fat Fraction of Body Weight 11 _ 20 _3 10 _3 20 b. How many times more of a healthy adult male’s body weight is made up of body cell mass than supporting tissue? 1 36. PAINTING It took 3 people 2_ hours to paint a large room. How long 2 would it take 5 people to paint a similar room? B Real-World Link 99% of the mass of the human body is made up of six elements: oxygen, carbon, hydrogen, nitrogen, calcium, and phosphorus. 37 BIOLOGY How many of the small hummingbirds need to be placed end-to-end to have the same length as the large hummingbird? 1 5 2 cm 22 cm 38. GEOMETRY The circumference C, or distance around a 44 circle, can be approximated using the formula C = _ r, 7 where r is the radius of the circle. What is the radius of the circle at the right? Round to the nearest tenth. r C = 53.2 m 39. BAKING Emily is baking chocolate cupcakes. Each batch of 20 cupcakes 2 1 requires _ cup of cocoa. If Emily has 3_ cups of cocoa, how many full 3 4 batches of cupcakes will she be able to make and how much cocoa will she have left over? Lesson 1-1 Rational Numbers 47 C 40. CHALLENGE Give a counterexample to the statement The quotient of two fractions between 0 and 1 is never a whole number. 3 3 41. NUMBER SENSE Which is greater: 30 · _ or 30 ÷ _ ? Explain. 4 4 CHALLENGE Use mental math to find each value. 43 _ 641 · 641 ÷ _ 42. _ 76 594 44. NGSSS Practice 783 _ 72 43. _ · 241 ÷ _ 594 241 783 53 Write a real-world problem that can be solved by dividing fractions or mixed numbers. Solve the problem. MA.8.A.6.4 45. Some of the ingredients required for one batch of muffins are shown below. 46. Mr. Jones is doing a science experiment with his class of 20 students. Each 3 student needs _ cup of vinegar. If he 4 currently has 15 cups of vinegar, which equation could Mr. Jones use to determine if he has enough vinegar for his entire class? Strawberry Muffins flour strawberries 2 3 cup 3 4 cup 2 Claudio’s father used 1_ cups of flour 3 7 and 1_ cups of strawberries. How many 8 batches of muffins did he make? A. 3 C. 2 1 B. 2_ 2 3 D. 1_ 4 6 8 I. x = 15(20) GRIDDED RESPONSE Lucas is storing a set of art books on a shelf that has 1 11_ inches of space. If each book is 4 _3 inch wide, how many books can be stored on the shelf? (Lesson1-1C) 5 _ 49. _ ·4 6 H. x = 20 – (15) 3 G. x = 15 ÷ _ 4 4 Multiply. Write in simplest form. 1 _ 48. _ ·3 47. F. x = 15 ÷ 20 5 _ 2 50. 1_ · 41 3 5 52. VOLUNTEERING The table shows the number of hours four students volunteered to work at an animal shelter after school. How much time did the students volunteer in all? (Lesson 1-1B) 3 53. HEALTH A newborn baby weighs 6_ pounds. Write this weight as a 4 decimal. (Lesson 1-1A) 2 1 51. _ · 3_ 3 4 Student Anabel Damon Jeremiah Meghan 48 Chapter 1 Rational Numbers and Percent Time (h) 2_ 1 3 7 _ 1 8 5 1_ 6 1 2_ 4 CHAPTE R 1 Mid-Chapter Check 7 1. Write 1_ as a decimal. 16 Multiply. Write in simplest form. (Lesson 1-1A) − 2. Write 0.4 as a fraction in simplest form. (Lesson 1-1A) 1 _ 9. -_ ·7 3 3 1 10. -2_ · -_ ( ) ( 5) 4 2 12. -2_ · -3_ 7 ( 3) 8 5 3 11. _ · _ 6 3. NGSSS PRACTICE The table gives the Year Duration (h) Challenger (41–B) 1984 191_ Discovery (51–A) 1984 191_ Endeavour (STS–57) 1992 190 _ 1999 1 191_ Discovery (STS–103) 5 4 13. WEATHER The table shows the approximate number of sunny days each year for certain 3 cities. Oklahoma City has about _ as many 5 sunny days as Phoenix. About how many sunny days each year are there in Oklahoma City? (Lesson 1-1C) durations of spaceflights. Mission 4 15 3 4 Sunny Days Per Year 1 2 6 Which of the following correctly orders these durations from least to greatest? (Lesson 1-1A) City Days Austin, TX 120 Denver, CO 115 Phoenix, AZ 215 Sacramento, CA 195 Santa Fe, NM 175 3 1 1 4 A. 190 _ , 191_ , 191_ , 191_ Divide. Write in simplest form. 3 1 4 1 , 191_ , 191_ , 190 _ B. 191_ 1 3 14. _ ÷ -_ 2 4 6 6 4 15 15 ( 4) 1 2 16. 6_ ÷ (-1_ 6 3) 2 2 3 1 1 4 , 191_ , 191_ , 191_ C. 190 _ 2 6 15 (Lesson 1-1C) 4 (Lesson 1-1D) 1 1 15. -1_ ÷ -_ ( 3 ) ( 4) 1 7 17. 8_ ÷ 1_ 2 10 3 1 4 1 , 191_ , 190 _ , 191_ D. 191_ 6 15 2 4 1 18. NGSSS PRACTICE A board that is 25_ feet Add or subtract. Write in simplest form. 2 1 long is cut into pieces that are each 1_ feet (Lesson 1-1B) 1 4 4. _ + -_ 6 4 5. -3_ - 3_ 5 7 6. _ + -_ 3 1 7. 5_ - 12_ 5 12 ( 5) ( 15 ) 7 5 2 long. Which of the steps below would give the number of pieces into which the board is cut? (Lesson 1-1D) 7 2 1 1 F. Multiply 1_ by 25_ . 8. PIZZA A pizza has 3 toppings with no 1 of toppings overlapping. Pepperoni tops _ 3 2 . The rest is the pizza and mushrooms top _ 5 topped with sausage. What fraction is topped with sausage? 2 2 1 1 G. Divide 25_ by 1_. 2 2 1 1 H. Add 25_ to 1_ . 2 2 1 1 I. Subtract 1_ from 25_ . 2 2 Chapter 1 Mid-Chapter Check 49
