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4-5 Equivalent Fractions Warm Up Problem of the Day Lesson Presentation Lesson Quizzes 4-5 Equivalent Fractions Warm Up List the factors of each number. 1. 8 1, 2, 4, 8 2. 10 1, 2, 5, 10 3. 16 1, 2, 4, 8, 16 4. 20 1, 2, 4, 5, 10, 20 5. 30 1, 2, 3, 5, 6, 10, 15, 30 4-5 Equivalent Fractions Problem of the Day John has 3 coins, 2 of which are the same. Ellen has 1 fewer coin than John, and Anna has 2 more coins than John. Each girl has only 1 kind of coin. Who has coins that could equal the value of a half dollar? Ellen and Anna 4-5 Equivalent Fractions Learn to write equivalent fractions. 4-5 Equivalent Fractions Vocabulary equivalent fractions simplest form 4-5 Equivalent Fractions Fractions that represent the same value are equivalent fractions. So are equivalent fractions. 1 2 = 2 4 = 4 8 4-5 Equivalent Fractions Additional Example 1: Finding Equivalent Fractions Find two equivalent fractions for 10 ___ 12 = 15 ___ 18 = 10 ___ . 12 5 __ 6 The same area is shaded when the rectangle is divided into 12 parts, 18 parts, and 6 parts. 10 ___ 15 ___ 5 __ So 12 , 18 , and 6 are all equivalent fractions. 4-5 Equivalent Fractions Check It Out: Example 1 Find two equivalent fractions for 4 __ 6 = 8 ___ 12 = 4 __ 6 . 2 __ 3 The same area is shaded when the rectangle is divided into 6 parts, 12 parts, and 3 parts. 4 , ___ 8 , and __ 2 are all equivalent fractions. So __ 6 12 3 4-5 Equivalent Fractions Additional Example 2A: Multiplying and Dividing to Find Equivalent Fractions Find the missing number that makes the fractions equivalent. 3 __ 5 = ___ 20 3•4 ______ 12 = ____ 5• 4 20 3 __ In the denominator, 5 is multiplied by 4 to get 20. Multiply the numerator, 3, by the same number, 4. 12 ___ So 5 is equivalent to 20 . 3 __ 5 = 12 ___ 20 4-5 Equivalent Fractions Additional Example 2B: Multiplying and Dividing to Find Equivalent Fractions Find the missing number that makes the fractions equivalent. 4 __ 5 = 80 ___ 4 • 20 ____ 80 ______ = 5 • 20 100 4 __ In the numerator, 4 is multiplied by 20 to get 80. Multiply the denominator by the same number, 20. 80 ___ So 5 is equivalent to 100 . 4 __ 5 = 80 ___ 100 4-5 Equivalent Fractions Check It Out: Example 2A Find the missing number that makes the fraction equivalent. 3 __ 9 = ___ 27 3•3 ______ 9 = ____ 9• 3 27 3 __ In the denominator, 9 is multiplied by 3 to get 27. Multiply the numerator, 3, by the same number, 3. 9 ___ So 9 is equivalent to 27 . 3 __ 9 = 9 ___ 27 4-5 Equivalent Fractions Check It Out: Example 2B Find the missing number that makes the fraction equivalent. 2 __ 4 = 40 ___ 2 • 20 ____ 40 ______ = 4 • 20 80 2 __ In the numerator, 2 is multiplied by 20 to get 40. Multiply the denominator by the same number, 20. 40 ___ So 4 is equivalent to 80 . 2 __ 4 = 40 ___ 80 4-5 Equivalent Fractions Every fraction has one equivalent fraction that is called the simplest form of the fraction. A fraction is in simplest form when the GCF of the numerator and the denominator is 1. Example 3 shows two methods for writing a fraction in simplest form. 4-5 Equivalent Fractions Additional Example 3A: Writing Fractions in Simplest Form Write each fraction in simplest form. 20 ___ 48 20 ___ The GCF of 20 and 48 is 4, so 48 is not in simplest form. Method 1: Use the GCF. 20 ÷ 4 _______ 48 ÷ 4 = 5 __ 12 Divide 20 and 48 by their GCF, 4. 4-5 Equivalent Fractions Additional Example 3A Continued Method 2: Use prime factorization. 20 ___ 48 = 2 •2•5 _________________ 5 = ___ 2 • 2 • 2 •2•3 12 So 20 ___ 48 Write the prime factors of 20 and 48. Simplify. 5 ___ written in simplest form is 12 . Helpful Hint Method 2 is useful when you know that the numerator and denominator have common factors, but you are not sure what the GCF is. 4-5 Equivalent Fractions Additional Example 3B: Writing Fractions in Simplest Form Write the fraction in simplest form. 7 ___ 10 7 is already The GCF of 7 and 10 is 1 so ___ 10 in simplest form. 4-5 Equivalent Fractions Check It Out: Example 3A Write each fraction in simplest form. 12 ___ 16 12 ___ The GCF of 12 and 16 is 4, so 16 is not in simplest form. Method 1: Use the GCF. 12 ÷ 4 _______ 16 ÷ 4 = 3 __ 4 Divide 12 and 16 by their GCF, 4. 4-5 Equivalent Fractions Check It Out: Example 3A Continued Method 2: Use prime factorization. 12 ___ 16 = 2 •2•3 _____________ 2 • 2 • 2 •2 3 = ___ 4 Write the prime factors of 12 and 16. Simplify. 12 written in simplest form is ___ 3 . So ___ 16 4 4-5 Equivalent Fractions Check It Out: Example 3B Write the fraction in simplest form. 3 ___ 10 3 The GCF of 3 and 10 is 1, so ___ is already in 10 simplest form. 4-5 Equivalent Fractions Lesson Quizzes Standard Lesson Quiz Lesson Quiz for Student Response Systems 4-5 Equivalent Fractions Lesson Quiz Find two equivalent fractions for each given fraction. Possible answers: 8 2 , ___ ___ 4 1. ___ 5 10 20 7 2. ___ 14 1 , ___ 14 ___ 2 28 Find the missing number that makes the fractions equivalent. 2 3. __ = 7 ___ 21 6 4 20 4. __ = ___ 15 75 Write each fraction in simplest form. 4 5. __ 8 1 __ 2 7 6. ___ 49 1 ___ 7 4-5 Equivalent Fractions Lesson Quiz for Student Response Systems 1. Identify two equivalent fractions for A. C. B. D. . 4-5 Equivalent Fractions Lesson Quiz for Student Response Systems 2. Identify two equivalent fractions for A. C. B. D. . 4-5 Equivalent Fractions Lesson Quiz for Student Response Systems 3. Identify the missing number that makes the given fractions equivalent. A. 3 C. 6 B. 4 D. 9 4-5 Equivalent Fractions Lesson Quiz for Student Response Systems 4. Identify the missing number that makes the given fractions equivalent. A. 24 C. 40 B. 32 D. 48 4-5 Equivalent Fractions Lesson Quiz for Student Response Systems 5. Identify the simplest form of the fraction A. C. B. D.