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3 Chapter Chapter 2 Fractions and Mixed Numbers
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Section 3.4 Adding and Subtracting Like Fractions, Least Common Denominator, and Equivalent Fractions
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Add or Subtract Like Fractions.
Objective A Add or Subtract Like Fractions.
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Adding Like Fractions Fractions with the same denominator are called like fractions. Fractions that have different denominators are called unlike fractions. Objective A
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Adding or Subtracting Like Fractions
Adding or Subtracting Like Fractions (Fractions with the Same Denominator) If a, b, and c are numbers and b is not 0, then Objective A Continued
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Examples Add and simplify. a. b. c. Objective B
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Examples Subtract and simplify. a. b. Objective B
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Examples Add: Objective B
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Example Subtract:
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Add or Subtract Given Fractional Replacement Values.
Objective B Add or Subtract Given Fractional Replacement Values.
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Example Evaluate x + y if x = –10/12 and y = 5/12. Objective B
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Solve Problems by Adding or Subtracting Like Fractions.
Objective C Solve Problems by Adding or Subtracting Like Fractions.
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Solving Problems by Adding or Subtracting Like Fractions
Find the perimeter of the following rectangle. Rectangle Perimeter Objective B
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Example A recipe calls for 1/3 of a cup of brown sugar and 2/3 of a cup of white sugar. How much total sugar is in the recipe? Total sugar = brown sugar + white sugar The total amount of sugar needed in the recipe is 1 cup. Objective B
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Find the Least Common Denominator of a List of Fractions.
Objective D Find the Least Common Denominator of a List of Fractions.
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Finding the Least Common Multiple Using Multiples
Method 1: Find the LCM of a List of Numbers Using Multiples of the Largest Number Step 1: Write the multiples of the largest number (starting with the number itself) until a multiple common to all numbers in the list is found. Step 2: The multiple found in Step 1 is the LCM. Objective A
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Example Find the LCM of 9 and 12.
Write the multiples of 12 until we find a number that is also a multiple of 9. 12 1 = 12 Not a multiple of 9. 12 2 = 24 Not a multiple of 9. 12 3 = 36 A multiple of 9. The LCM of 9 and 12 is 36. Objective A Continued
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Finding the Least Common Multiple Using Multiples
Method 2: Find the LCM of a List of Numbers Using Prime Factorization Step 1: Write the prime factorization of each number. Step 2: For each different prime factor in step 1, circle the greatest number of times that factor occurs in any one factorization. Step 3: The LCM is the product of the circle factors. Objective A
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Example Find the LCM of 72 and 60.
Circle the greatest number of prime factors found in either factorization. Objective B The LCM is the product of the circle factors.
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Example Find the LCM of 15, 18, and 54. Objective B
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Example Find the LCD of
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Write Equivalent Fractions.
Objective E Write Equivalent Fractions.
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Writing Equivalent Fractions
To add or subtract unlike fractions, we first write equivalent fractions with the LCM as the denominator. To write an equivalent fraction, where a, b, and c are nonzero numbers. Objective A
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Example Write an equivalent fraction with the indicated denominator.
Objective B
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Example Write an equivalent fraction with the indicated denominator.
Objective B
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Example Write an equivalent fraction with the given denominator.
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