LESSON Page 1 of 5 4.2 Greatest Common Factor BEFORE Vocabulary common factor, p. 177 greatest common factor (GCF), p. 177 relatively prime, p. 178 Now WHY? You found all the factors You’ll find the GCF of two or of a whole number. more whole numbers. So you can organize bands at a music camp, as in Ex. 32. Music Choir A choir director wants to divide a choir into smaller groups. The choir has 24 sopranos, 60 altos, and 36 tenors. Each group will have the same number of each type of voice. What is the greatest number of groups that can be formed? How many sopranos, altos, and tenors will be in each group? A common factor is a whole number that is a factor of two or more nonzero whole numbers. The greatest of the common factors is the greatest common factor (GCF) . Example 1 Finding the Greatest Common Factor For the choir described above, the greatest number of groups that can be formed is given by the GCF of 24, 60, and 36. You can use one of two methods to find the GCF. Method 1 List the factors of each number. Identify the greatest number that is on every list. Factors of 24: 1, 2, 3, 4, 6, 12, 24 Factors of 60: 1, 2, 3, 4, 5, 6, 10, 12, 15, 20, 30, 60 Factors of 36: 1, 2, 3, 4, 6, 9, 12, 18, 36 Watch Out In Method 2 of Example 1, the number 2 appears at least twice in the prime factorization of each number. So, include 2 twice when finding the GCF. The common factors are 1, 2, 3, 4, 6, and 12. The GCF is 12. Method 2 Write the prime factorization of each number. The GCF is the product of the common prime factors. 24 2 p 2 p 2 p 3 The common prime factors are 2, 2, and 3. The GCF is 60 2 p 2 p 3 p 5 the product 2 p 2 p 3 12. 36 2 p 2 p 3 p 3 Answer The greatest number of groups that can be formed is 12. Each group will have 24 12 2 sopranos, 60 12 5 altos, and 36 12 3 tenors. Checkpoint Find the greatest common factor of the numbers. 1. 12, 30 2. 21, 42 3. 16, 32, 40 Lesson 4.2 4. 27, 45, 90 Greatest Common Factor 177 Page 2 of 5 Relatively Prime Two or more numbers are relatively prime if their greatest common factor is 1. Example 2 Note Worthy To clarify the meaning of a vocabulary term like relatively prime, include both examples and nonexamples of the term in your notebook. Identifying Relatively Prime Numbers Find the greatest common factor of the numbers. Then tell whether the numbers are relatively prime. a. 24, 45 b. 35, 54 Solution a. List the factors of each number. Identify the greatest number that the lists have in common. Factors of 24: 1, 2, 3, 4, 6, 8, 12, 24 Factors of 45: 1, 3, 5, 9, 15, 45 The GCF is 3. So, the numbers are not relatively prime. b. Write the prime factorization of each number. 35 5 p 7 54 2 p 3 p 3 p 3 There are no common prime factors. However, two numbers always have 1 as a common factor. So, the GCF is 1, and the numbers are relatively prime. Checkpoint Find the greatest common factor of the numbers. Then tell whether the numbers are relatively prime. 5. 18, 33 6. 39, 50 7. 110, 77 8. 21, 160 9. Critical Thinking Suppose you divide two numbers by their greatest common factor. What is the relationship between the resulting quotients? Monomials and the GCF You can find the greatest common factor of two or more monomials by factoring each monomial. Example 3 Finding the GCF of Monomials Find the greatest common factor of 18xy 2 and 28x 2y 2. Factor the monomials. The GCF is the product of the common factors. 18xy 2 2 p 3 p 3 p x p y p y 28x 2y 2 2 p 2 p 7 p x p x p y p y Answer The GCF is 2xy 2. Checkpoint Find the greatest common factor of the monomials. 10. 6x, 15x 178 Chapter 4 Factors, Fractions, and Exponents 11. 20x 2, 36x 12. 32y 2, 6x 2y 13. 7xy 3, 28xy 2 Page 3 of 5 4.2 Exercises INTERNET More Practice, p. 806 CLASSZONE.COM eWorkbook Plus Guided Practice Vocabulary Check 1. What does it mean for a number to be a common factor of two numbers? 2. Find two pairs of relatively prime numbers from 5, 10, 16, and 25. Skill Check Find the greatest common factor of the numbers. Then tell whether the numbers are relatively prime. 3. 7, 28 4. 34, 38 5. 11, 51 6. 32, 81 Find the greatest common factor of the monomials. 7. 18c, 4c Guided Problem Solving 8. r, r 4 9. 5m, 20m3 10. 3x 2, 15x 3 11. Art Supplies To celebrate a grand opening, the owner of an art supplies store is making free gift bags for customers. The owner has 225 pastel crayons, 75 paintbrushes, and 120 tubes of oil paint. Each gift bag must be identical. What is the greatest number of gift bags the owner can make? 1 Write the prime factorization of each number. 2 What are the common prime factors of the numbers? What is the GCF of the numbers? 3 What does the GCF represent in this situation? Practice and Problem Solving Homework Help Example 1 2 3 Exercises 12–19, 32–33 20–27, 34–36 28–31, 37–45 Online Resources CLASSZONE.COM • More Examples • eTutorial Plus Find the greatest common factor of the numbers. 12. 28, 42 13. 21, 99 14. 34, 85 15. 12, 36 16. 32, 55 17. 54, 89 18. 76, 86 19. 120, 960 Find the greatest common factor of the numbers. Then tell whether the numbers are relatively prime. 20. 9, 26 21. 11, 55 22. 12, 33 23. 77, 51 24. 58, 60 25. 121, 280 26. 64, 144 27. 28, 84 Find the greatest common factor of the monomials. 28. 16x, 36x 29. 18m2, 7m 30. 18k, 15k 3 Lesson 4.2 31. 2x, 8x 2, 6x 3 Greatest Common Factor 179 Page 4 of 5 32. Music Camp A summer music camp has 88 participants. The camp has 32 vocalists, 16 drummers, 24 guitarists, and 16 bassists. What is the greatest number of identical bands that can be formed using all the participants? How many vocalists will be in each band? 33. Flower Bouquets The science Review Help For help with reading circle graphs, see p. 783. club is selling flowers for a fundraiser. The club wants to make bouquets from 4 types of flowers. The circle graph shows how many flowers of each type the club has. What is the greatest number of identical bouquets that can be made? What will each bouquet contain? Types of Flowers Daisy 63 Lily 56 Iris 42 Freesia 21 Tell whether the numbers are relatively prime. 34. 115, 207 35. 224, 243 36. 152, 171 Find the greatest common factor of the monomials. 37. 12m2n3, 70m3n 38. 72a3b 2, 86a 39. 44m2n, 48mn2 40. a 2b 3, ab 3 41. 3x, 7xy 2 42. 4rs 2, 27st 3 43. 18wx 2, 45wx 44. 12y 2, 15y 3, 5y 45. rs3, s3t, r 2st 2 46. Community Garden You want to cover the walkway of a community garden with square clay tiles. The space you want to cover is a rectangle 42 inches wide by 72 inches long. Assuming you want to cover the space exactly without cutting any tiles, what is the greatest side length you can use for the tiles? 47. Bracelets You want to make woven plastic bracelets. You have 3 pieces of plastic lacing with lengths 45 cm, 75 cm, and 60 cm. You need to cut the lacing into pieces of the same length. What is the greatest possible length each piece can be, without any lacing being wasted? 48. Critical Thinking The greatest common factor of 30 and a number n is 6. Find a possible value for n. Are there other possible values for n? Explain. 49. Extended Problem Solving In the future, scientists may want to In the Real World Mars Shown above is an illustration of what a base on Mars might look like. On Mars, there are about 669 solar days in one year. Assuming each day has 1480 minutes, about how many minutes are there in one year on Mars? 180 Chapter 4 make a unit of time that is convenient for people living on both Earth and Mars. The new unit of time, called the space-hour, should divide evenly into the number of minutes in each planet’s day. Under the current Earth definition of minutes, Earth has 1440 minutes per day, and Mars has approximately 1480 minutes per day. a. Analyze What is the greatest number of minutes that could be in a space-hour? b. Apply How many space-hours would there be each day on Earth? on Mars? c. A spacecraft that uses current technology can take 210 days to travel from Earth to Mars. Use a calculator to find how long this trip would be in space-hours. Factors, Fractions, and Exponents Page 5 of 5 50. Writing If a and b are nonzero whole numbers and a is a factor of b, what is the GCF of a and b? Explain your thinking and give three numerical examples to support your answer. 51. Critical Thinking If a and b are relatively prime numbers and b and c are relatively prime numbers, are a and c relatively prime numbers? Give examples to support your answer. 52. Challenge Consider the pattern 2x, 6x 2, 18x 3, 54x 4, . . . . What are the next two monomials in the pattern? What is the GCF of all the monomials in the pattern? What is the GCF of all the monomials in the pattern excluding the first monomial? Mixed Review Find the sum or difference. (p. 779) 2 5 53. 9 9 3 3 54. 7 7 8 14 55. 15 15 3 11 56. 20 20 5 59. 36 12 3 60. 49 7 Find the product. (p. 780) 3 57. 60 10 1 58. 28 4 Write the prime factorization of the number. (Lesson 4.1) 61. 125 Standardized Test Practice 62. 70 63. 52 64. 200 65. Multiple Choice Which numbers are not relatively prime? A. 32, 65 B. 34, 69 C. 63, 91 D. 26, 85 66. Short Response You are making first-aid kits to go camping. You have 48 bandages, 15 squares of gauze, 6 tubes of antibiotic ointment, and 6 ice packs. What is the greatest number of identical first-aid kits that you can make? How many of each item will each first-aid kit contain? Common Factor Commotion Each number in the third column of the table is the greatest common factor of the numbers in the same row. Each number in the first two columns has exactly one digit that is different from the number above it and exactly one digit that is different from the number below it. Copy the table and fill in each of the blanks with a number that satisfies the conditions. First number 945 ? 648 ? Second number ? 435 432 532 GCF 105 15 ? 14 Lesson 4.2 Greatest Common Factor 181