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The Rational Numbers Notes and Examples for 8/15/16

The Rational Numbers Notes and Examples for 8/15/16. Learning Targets I will define the rational numbers. I will reduce rational numbers. I will convert between mixed numbers and improper fractions. Defining the Rational Numbers.

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The Rational Numbers Notes and Examples for 8/15/16

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  1. The Rational NumbersNotes and Examples for 8/15/16

  2. Learning Targets I will define the rational numbers. I will reduce rational numbers. I will convert between mixed numbers and improper fractions.

  3. Defining the Rational Numbers • The set of rational numbers is the set of all numbers which can be expressed in the form , where a and b are integers and b is not equal to 0. • The integer a is called the numerator. • The integer b is called the denominator. The following are examples of rational numbers: ¼, ½, ¾, 5, 0

  4. Reducing a Rational Number • If is a rational number and c is any number other than 0, • The rational numbers and are called equivalent fractions. • To reduce a rational number to its lowest terms, divide both the numerator and denominator by their greatest common divisor.

  5. Example: Reducing a Rational Number Reduce to lowest terms. Solution: Begin by finding the greatest common divisor of 130 and 455. Thus, 130 = 2 · 5 · 13, and 455 = 5 · 7 · 13. The greatest common divisor is 5 · 13 or 65.

  6. Example: Reducing a Rational Number (continued) Divide the numerator and the denominator of the given rational number by 5 · 13 or 65. There are no common divisors of 2 and 7 other than 1. Thus, the rational number is in its lowest terms.

  7. Mixed Numbers and Improper Fractions • A mixed number consists of the sum of an integer and a rational number, expressed without the use of an addition sign. Example: • An improper fraction is a rational number whose numerator is greater than its denominator. Example: 19 is larger than 5

  8. Example 2: Converting a Positive Mixed Number to an Improper Fraction Example: Convert to an improper fraction. Solution:

  9. Converting a Positive Improper Fraction to a Mixed Number • Divide the denominator into the numerator. Record the quotient and the remainder. • Write the mixed number using the following form:

  10. Example 3: Converting from an Improper Fraction to a Mixed Number Convert to a mixed number. Solution: Step 1 Divide the denominator into the numerator. Step 2 Write the mixed number using Thus,

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