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Adding and Subtracting Rational Numbers
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Rational Numbers The term, Rational Numbers, refers to any number that can be written as a fraction. This includes fractions that are reduced, fractions that can be reduced, mixed numbers, improper fractions, and even integers and whole numbers. An integer, like 4, can be written as a fraction by putting the number 1 under it.
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Types of Rational Numbers
Reduced Fractions: Not Reduced Fractions: Mixed Numbers: Improper Fractions: Integers and Whole Numbers:
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Simplifying Fractions
Simplifying fractions by dividing the numerator (top number) and denominator (bottom number) by the same value. Repeat this until there are no more numbers that divide into both the numerator & denominator. Example:
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Simplifying Fractions
Example: Example: (Rewrite mixed numbers as improper fractions before you simplify.) Example: (If after you divide, the fraction can still be simplified, keep going.)
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Adding Fractions To add fractions, they must have a common denominator. If the denominators are the same, add the numerators, and put the result over the denominator. If the answer can be simplified, then simplify it. Example:
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Getting a Common Denominator
Use this formula to get two fractions to have a common denominator: Common Denominator = 3•5=15. Cross Multiply & Add. Simplify if possible.
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{ More Examples Cross Multiply & Add. Divide to Simplify.
Common Denominator { Divide to Simplify.
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More Examples Change Subtraction to Addition. (Keep-Change_Change.)
Note: A fraction with a negative numerator or denominator is a negative fraction.
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More Examples Change Subtraction to Addition (Keep-Change_Change.).
Change Mixed Numbers to Improper Fractions. Get Common Denominator, Cross Multiply & Add. Simplify.
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You Try It! Find each sum or difference.
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Solutions
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