Fractions What is a Fraction Fraction Part of
- Slides: 54
Fractions
What is a Fraction? Fraction = Part of a Whole Top Number? Bottom Number? 3 4 Numerator = tells how many parts you have Denominator = tells how many parts are in the whole Note: the fraction bar means to divide the numerator by the denominator
One Way To Remember Numerator = North # of parts in whole 3 4 Denominator = Down # you have Divided by
What Fraction is Shaded? ⅝ ¾ 7/ 16
Identifying Forms of Fractions There are three forms of fractions: v Proper fraction: The numerator (top number) is always less than the denominator. The value of a proper fraction is less than 1. v Improper fraction: The numerator is equal to or greater than the denominator. When the numerator is equal to the denominator, an improper fraction is equal to 1. v Mixed Number: A whole number & a proper fraction are written next to each other. A mixed number always has a value of more than 1.
Example Tell whether each of the following is a proper fraction (P), an improper fraction (I) or a mixed number (M). 1 2 9 7 2 110 75 3 10 10
Group Work Tell whether each of the following is a proper fraction (P), an improper fraction (I) or a mixed number (M). 1 9 6 2 1 4 2 3 17 17
v Reducing a fraction means dividing both the numerator & the denominator (top & bottom) by a number that goes into each evenly. v Reducing changes the numbers in a fraction, but it does not change the value of a fraction. v Always check to see if you can continue to reduce. v Sometimes a fraction can be reduced more than once to reach the lowest terms
Shortcuts For Reducing v Are the numerator & denominator • both even? Divide by 2 • both end in a 0 or 5? Divide by 5 • both end in 0? Divide by 10 v Add the digits of the numerator separate from the digits of the denominator. Do they add up to a number that is divisible by 3? Divide by 3 v If no to all previous questions: You just have to try 7, 11, 13 & so on
Example v 1 Reduce each fraction to lowest terms 6 = 12 2 25 30 = 3 33 77 =
Group Work v Reduce each fraction to lowest terms 1 75 80 2 25 50 = 3 35 = 49 =
Raising Fractions to Higher Terms v Raising to higher terms is the opposite of reducing. v To reduce a fraction, you must divide both the numerator & denominator by the same number. v To raise a fraction to higher terms, multiply both the numerator & the denominator by the same number.
Example Raise each fraction to higher terms by filling in the missing numerator. 1 4 5 2 4 7 = = 30 35
Group Work Raise each fraction to higher terms by filling in the missing numerator. 1 1 3 2 5 6 = = 45 42
Changing Improper Fractions to Whole or Mixed Numbers v The answers to many fraction problems are improper fractions. • These answers are easier to read if you change them to whole numbers or mixed numbers. v To change an improper fraction, divide the denominator into the numerator.
Example Change each fraction to a whole number or a mixed number. Reducing any remaining fractions. 1 14 8 2 30 9 = =
Group Work Change each fraction to a whole number or a mixed number. Reducing any remaining fractions. 1 13 12 2 36 12 = =
Changing Mixed Numbers to Improper Fractions v When you multiply & divide fractions, you will have to change mixed numbers to improper fractions. To change a mixed number to an improper fraction, follow these steps: 1. Multiply the denominator (bottom number) by the whole number. 2. Add that product to the numerator (top number) 3. Write the sum over the denominator.
Example Change each mixed number to an improper fraction 1 3 = 2 4 2 1 9 = 2
Group Work Change each mixed number to an improper fraction 1 1 = 10 3 2 4 3 = 5
Comparing Fractions v This 1. 2. can be done in two ways Change the fractions so they have common denominators. Then compare Compare each fraction with ½. The size of the numerator compared to the size of the denominator tells you: • It is equal to ½ when the numerator is exactly half of the denominator • It is less then ½ when the numerator is less than half of the denominator • It is greater than ½ when the numerator is more than half of the denominator
Example In the box between each pair of fractions, write a symbol that makes the statement true. 3 5 1 2 8 16 1 2
Group Work In the box between each pair of fractions, write a symbol that makes the statement true. 7 20 1 2 9 15 1 2
Addition of Fractions with the Same Denominators v To add fractions with the same denominators (bottom numbers), first add the numerators. v Then write the total (or sum) over the denominator. v Don’t forget to check to see if you can reduce your answer.
Add 1 7 8 13 4 + 6 13 Example 3 12 2 8 1 9 8 2 + 10 8
Addition of Fractions with Different Denominators If the fractions in an addition problem do not have the same denominators, you must find a common denominator. v common denominator = a number that can be divided evenly by every denominator in the problem. v lowest common denominator or LCD = The lowest denominator that can be divided evenly by every denominator in the problem. v
Finding a Common Denominator v Method 1: Multiply the denominators together. v Brute force method: List the multiples of the larger number until you find a multiple of the smaller number v Prime factorization method: find prime factors of both numbers. Circle the numbers they have in common. Write those once then write in the rest of the numbers and multiply to find the LCM
Example Add 2 1 + 7 10 3 4 + 11 16 1 3 7 8
Group Work 2 1 + 5 12 5 9 + 5 7 4 9 2 3
Subtraction of Fractions v To subtract fractions with the same denominator, subtract the numerators & put the difference (the answer) over the denominator. v When fractions do not have the same denominators, first find a common denominator. v Change each fraction to a new fraction with the common denominator. v Then subtract.
Example 1 – 2 5 9 2 9 5 23 6 1 – 7 6
Example Subtract & Reduce 1 11 13 18 1 – 8 2 2 5 25 8 2 – 22 5
Group Work Subtract & Reduce 1 5 16 6 7 – 9 10 2 3 18 5 3 – 9 10
Subtraction with Regrouping v Sometimes there is no top fraction to subtract the bottom fraction from. Other times the top fraction is not big enough to subtract the bottom fraction from. To get something in the position of the top fraction, you must borrow. To borrow means to write the whole number on top as a whole number and an improper fraction. 8 v For example, 12 = 11 8. The numerator and denominator of the improper fraction should be the same as the denominator of the other fraction in the problem. v
Example Subtract. 1 3 24 16 2 – 9 3 2 2 13 9 5 – 7 6
Group Work Subtract. 1 1 30 3 8 – 16 11 2 1 12 6 7 – 10 12
Multiplication of Fractions v When you multiply whole numbers (except 1 & 0), the answer is bigger than the two numbers you multiply. v When you multiply two proper fractions, the answer is smaller than either of the two fractions. • When you multiply two fractions, you find a fraction of a fraction or a part of a part. v To multiply fractions, multiply the numerators together & the denominators. Then reduce.
Example Multiply & Reduce 1 2 4 x = 3 5 2 1 4 2 x x = 3 7 3
Group Work Multiply & Reduce 1 5 2 x = 7 9 2 2 7 1 x x = 5 9 3
Canceling v Canceling is a way of making multiplication of fractions problems easier. v Canceling is similar to reducing. v To cancel, divide a numerator and a denominator by a number that goes evenly into both of them. v You don’t have to cancel to get the right answer, but it makes the multiplication easier.
Example Multiply & Reduce 1 15 7 12 x x = 28 16 45 2 17 14 7 x x = 21 51 11
Group Work Multiply & Reduce 1 11 10 13 x x = 39 11 18 2 19 7 3 x x = 36 10 7
Multiplication with Fractions and Whole Numbers v To multiply a whole number & a fraction, first write the whole number as a fraction. • Write the whole number as the numerator & 1 a the denominator.
Example Multiply & Reduce 1 9 = 2 x 10 2 7 x 36 = 12
Group Work Multiply & Reduce 1 5 = 16 x 24 2 7 x 35 30 =
Multiplying Mixed Numbers v To multiply mixed numbers, first change the mixed numbers to improper fractions. v Then multiply the improper fractions. v Reduce the answer if necessary.
Example Multiply. 1 2 1 1 2 x 5 x 7 = 15 4 2 2 2 3 7 2 x 3 x 2 = 5 8 9
Group Work Multiply. 1 3 3 x 4 2 8 1 x 1 = 9 5 1 5 x 2 16 = 3 14
Division by Fractions v To divide fractions, invert* the divisor (the number at the right of the ÷ sign) v Then • follow the rules for multiplying fractions. To invert means to write the numerator on the bottom and the denominator on the top.
Example Divide & Reduce 1 16 21 3 = 4 12 19 18 = 38 2
Group Work Divide & Reduce 1 3 10 6 = 7 5 11 25 = 33 2
Division of Fractions and Mixed Numbers by Whole Numbers & Division by Mixed Numbers v In fraction division problems, change whole numbers & mixed numbers to improper fractions. v Then take the reciprocal of the fraction you are dividing by & follow the rules for multiplying fractions.
Example Divide & Reduce 1 56 24 = 25 3 2 7 24 5 10 8 35 = 1 4 = 2
Group Work Divide & Reduce 1 7 21 = 25 3 2 5 18 15 = 5 5 6 5 3 = 12
- 4 5 equivalent fractions
- Equivalent fractions odd one out
- What are like fractions
- How to find a fraction of a number
- Katumbas na fraction ng 2/11
- Five
- Each shape is 1 whole
- Improper fraction example
- Part whole model subtraction
- Example of footed ware
- Unit ratio definition
- The phase of the moon you see depends on ______.
- Part part whole
- 미니탭 gage r&r 해석
- What is a technical description?
- Butterfly method fractions
- Fractions
- Dessin fractions
- Numbers and operations fractions
- Multiplying and dividing fractions word problems
- Fractions
- Lesson 6-2 fractions, decimals, and percents answers
- Multiplying algebraic fractions
- Compare and order fractions and decimals
- Vocabulaire des fractions
- Egyptian fractions
- Partial fraction
- How to multiply fractions mentally
- Hardy fractions
- Unequal fractions
- Fractions of amount
- Higher terms
- Relating decimals to fractions
- Simplify the following fractions
- Task #2 equation problems answers
- How to work out mixed numbers
- Adding and subtracting complex fractions
- Writing fractions as decimals
- What are fraction
- Fractions skill score
- Converting between percents decimals and fractions
- Lesson 7-1 adding and subtracting polynomials
- Interpret percentages as operators
- Fractions dr frost
- Fractions recap
- 48 prime factorization
- Sin cos tan csc sec cot
- Factors of 150
- Odd one out fractions
- Finding fraction of a whole number
- Smiley face method fractions
- Comparing and ordering fractions examples
- Steps to adding fractions with unlike denominators
- Smile and kiss method fractions
- Equivalent fractions by dividing