1. Fractions Review

2. Fractions
1/8
55/60
11/12
1 2/10
1 ½
1/12

3. What is a fraction?
Loosely speaking, a fraction is a quantity that cannot be represented by a whole number.
Why do we need fractions?
Consider the following scenario.
Can you finish the whole cake?
If not, how many cakes did you eat?
1 is not the answer,
neither is 0.
This suggest that we need a new kind of number.

4. Definition:
A fraction is an ordered pair of whole numbers, the 1st one is usually written on top of the other, such as ½ or ¾ .
numerator
denominator
The denominator tells us how many congruent pieces the whole is divided into, thus this number cannot be 0.
The numerator tells us how many such pieces are being considered.

5. Fractions
A number in the form
Numerator
Denominator Or N D

6. The denominator can never be equal to 0.
Fractions
The denominator can never be equal to 0.
Undefined: Does not exist! 12 =

7. A fraction with a numerator of 0 equals 0.
Fractions
A fraction with a numerator of 0 equals 0. = = 4
156

8. Examples:
How much of a pizza do we have below?
we first need to know the size of the original pizza.
The blue circle is our whole.
if we divide the whole into 8
congruent pieces,
- the denominator would be 8.
We can see that we have 7 of these pieces.
Therefore the numerator is 7, and we have
of a pizza.

9. Equivalent fractions
A fraction can have many different appearances, these are called equivalent fractions
In the following picture we have ½ of a cake because the whole cake is divided into two congruent parts and we have only one of those parts.
But if we cut the cake into smaller congruent pieces, we can see that =
Or we can cut the original cake into 6 congruent pieces,

10. Equivalent fractions
A fraction can have many different appearances, these are called equivalent fractions
Now we have 3 pieces out of 6 equal pieces, but the total amount we have is still the same.
Therefore, =
If you don’t like this, we can cut the original cake into 8 congruent pieces,

11. Equivalent fractions
A fraction can have many different appearances, they are called equivalent fractions
then we have 4 pieces out of 8 equal pieces, but the total amount we have is still the same.
Therefore, =

12. Fractions
If the numerator is larger than the denominator, it is called an improper or top heavy fraction.
Find the improper (top heavy) fraction 7 10 4 56 10 11 8 9 73 12

13. Improper (Top Heavy) Fractions and Mixed Numbers
An improper fraction is a fraction with the numerator larger than or equal to the denominator.
Any whole number can be transformed into an improper fraction.
A mixed number is a whole number and a fraction together
An improper fraction can be converted to a mixed number and vice versa.

14. divide the numerator by the denominator
Improper Fractions and Mixed Numbers
Converting improper fractions into mixed numbers:
divide the numerator by the denominator
the quotient is the leading number,
the remainder as the new numerator.
More examples:
Converting mixed numbers into improper fractions.

15. How does the denominator control a fraction?
If you share a pizza evenly among two people, you will get
If you share a pizza evenly among three people, you will get
If you share a pizza evenly among four people, you will get

16. How does the denominator control a fraction?
If you share a pizza evenly among eight people, you will get only
It’s not hard to see that the slice you get becomes smaller and smaller.
Conclusion:
The larger the denominator the smaller the pieces, and if the numerator is kept fixed, the larger the denominator the smaller the fraction,

17. Examples:
Which one is larger,
Which one is larger,
Which one is larger,

18. How does the numerator affect a fraction?
Here is 1/16 ,
here is 3/16 ,
here is 5/16 ,
Do you see a trend?
Yes, when the numerator gets larger we have more pieces. And if the denominator is kept fixed, the larger numerator makes a bigger fraction.

19. Examples:
Which one is larger,
Which one is larger,
Which one is larger,

20. Comparing fractions with different numerators and different denominators.
In this case, it would be pretty difficult to tell just from the numbers which fraction is bigger, for example
This one has less pieces but each piece is larger than those on the right.
This one has more pieces but each piece is smaller than those on the left.

21. One way to answer this question is to change the appearance of the fractions so that the denominators are the same.
In that case, the pieces are all of the same size, hence the larger numerator makes a bigger fraction.
The straight forward way to find a common denominator is to multiply the two denominators together:
and
Now it is easy to tell that 5/12 is actually a bit bigger than 3/8.

22. the objects must be of the same type, i.e. we
Addition of Fractions
addition means combining objects in two or
more sets
the objects must be of the same type, i.e. we
combine bundles with bundles and sticks with
sticks.
in fractions, we can only combine pieces of the
same size. In other words, the denominators
must be the same.

23. = ? + Addition of Fractions with equal denominators Example:
= ?
Click to see animation

24. Addition of Fractions with equal denominators
Example: + =

25. = + Addition of Fractions with equal denominators Example:
The answer is
which can be simplified to
(1+3)
(8+8)
is NOT the right answer because the denominator tells
us how many pieces the whole is divided into, and in this addition problem, we have not changed the number of pieces in the whole. Therefore the denominator should still be 8.

26. Addition of Fractions with equal denominators
More examples

27. Addition of Fractions with different denominators
In this case, we need to first convert them into equivalent fraction with the same denominator by using the Lowest Common Multiple (LCM) .
Example:

28. 3 5 3 x 5 = 15 5 x 3 = 15 Denominators are equal to the LCM
Addition of Fractions with
different denominators
Finding the Lowest Common Multiple 3
Multiples are 3, 6, 9, 12, 15, 18, 21, 24, 27, 30, …
Multiples are 5, 10, 15, 20, 25, 30, 35, 40, 45, 50, … 5
Lowest Common Multiple is 15 3 x 5 = 15
Denominators are equal to the LCM 5 x 3 = 15

29. Lowest Common Multiple
Addition of Fractions with
different denominators
Multiply both numerator and denominator of each term by the same number that will move the denominator to the
Lowest Common Multiple
Therefore,

30. More Exercises: = = = = = = = = =

31. Adding Mixed Numbers
Example:

32. Adding Mixed Numbers
Another Example:

33. Subtraction of Fractions
Subtraction means taking objects away.
The objects must be of the same type, i.e. we can only take away apples from a group of apples.
In fractions, we can only take away pieces of the same size. In other words, the denominators must be the same.

34. Subtraction of Fractions with equal denominators
Example:
This means to take away
from
take away
(Click to see animation)

35. Subtraction of Fractions with equal denominators
Example:
This means to take away
from

36. Subtraction of Fractions with equal denominators
Example:
This means to take away
from

37. Subtraction of Fractions with equal denominators
Example:
This means to take away
from
Now you can see that there are only 8 pieces left,
therefore

38. Subtraction of Fractions
More examples:
Did you get all the answers right?

39. This is more difficult than before, so please take notes.
Subtraction of mixed numbers
This is more difficult than before, so please take notes.
Example:
Since 1/4 is not enough to be subtracted by 1/2, we better convert all mixed numbers into improper fractions first.

40. Multiplication
Multiply the numerators and put in the numerator of the result
Multiply the denominators and put in the denominator of the result 7 4
7 x 4 28 x = = 8 9
8 x 9 72

41. Multiplication - Let’s Try It!7 1 7 4 9 36 x x = = 9 2 18 7 11 77 7 1 7 30 7
210 x x = = 5 3 15 4 14 56

42. 210 56 These numbers get pretty big!
What if we needed to multiply again?
Let’s make the fraction more simple, so it will be easier to use in the future.

43. Simplification 28 72 Divide by the Highest (Greatest) Common Factor
But what is a Common Factor? 72

44. Factors
A factor is a number that can be divided into another number with no remainder
8’s factors are:
1 (8/1 =8)
2 (8/2 = 4)
4 (8/4 = 2)
8 (8/8 = 1)
3 is NOT a factor of 8, because 8 is not evenly divisible by 3 (8/3 = 2 with R=3)

45. Common Factors
A common factor is a factor that two numbers have in common
For example, 7 is a factor of both 21 and 105, so it is a common factor of the two.
The highest common factor is the largest factor that the two number share
So let’s go back to our simplification problem from before…

46. Simplification 28 72 28 ÷ 4 = 7 28 7 = 72 ÷ 4 = 18 72 18 So
Divide both numerator and denominator by the Highest Common Factor 28
Factors are 1, 2, 4, 7, 14, 28
Factors are 1, 2, 3, 4, 6, 8, 9, 12, 18, 24, 48, 72 72
Highest Common Factor is 4 28 ÷ 4 = 7 28 7 So = 72 ÷ 4 = 18 72 18

47. Simplification - Let’s Try It!3 1 7 1 18 2 = = = 9 3 21 3 63 7 24 2 6 2 78 13 = = = 84 7 15 5
114 19