12 fractions

Fractions

Back to Algebra–Ready Review Content.

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers.

pq

Fractions

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers.

pq

Fractions

36

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

pq

Fractions

36

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

Fractions

36

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

36

Fractions

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

The bottom number is the

number of equal parts in the

division and it is called the

denominator.

36

Fractions

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

The bottom number is the

number of equal parts in the

division and it is called the

denominator.

36

Fractions

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

The bottom number is the

number of equal parts in the

division and it is called the

denominator.

The top number “3” is the

number of parts that we

have and it is called the

numerator.

36

Fractions

Fractions are numbers of the form (or p/q) where

p, q 0 are whole numbers. Fractions are numbers that

measure parts of whole items.

Suppose a pizza is cut into 6 equal slices and we have 3 of

them, the fraction that represents this quantity is .

pq

36

The bottom number is the

number of equal parts in the

division and it is called the

denominator.

The top number “3” is the

number of parts that we

have and it is called the

numerator.

36

Fractions

3/6 of a pizza

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

How many slices should we cut the pizza into and how do

we do this?

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

Cut the pizza into 8 pieces,

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

Cut the pizza into 8 pieces, take 5 of them.

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

5/8 of a pizza

Cut the pizza into 8 pieces, take 5 of them.

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Cut the pizza into 12 pieces,

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Cut the pizza into 12 pieces,

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Cut the pizza into 12 pieces, take 7 of them.

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Cut the pizza into 12 pieces, take 7 of them.

or

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

7/12 of a pizza

or

Cut the pizza into 12 pieces, take 7 of them.

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Note that or is the same as 1.88

1212

7/12 of a pizza

or

For larger denominators we can use a pan–pizza for

pictures. For example,

58

Fractions

712

5/8 of a pizza

Fact: aa

Note that or is the same as 1.88

1212

= 1 (provided that a = 0.)

7/12 of a pizza

or

FractionsWe may talk about the fractional amount of a group of items.

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

100 ÷ 4 = 25

so each part is $25,

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Take 3 parts. 100 ÷ 4 = 25

so each part is $25,

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Take 3 parts. 100 ÷ 4 = 25

so each part is $25,

3 parts make $75.

So ¾ of $100 is $75.

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Take 3 parts. 100 ÷ 4 = 25

so each part is $25,

3 parts make $75.

So ¾ of $100 is $75.

712

Divide 72 people

into 12 equal parts.

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Take 3 parts. 100 ÷ 4 = 25

so each part is $25,

3 parts make $75.

So ¾ of $100 is $75.

712

Divide 72 people

into 12 equal parts.

72 ÷ 12 = 6

so each part consists of 6 people,

Fractions

Example A. a. What is ¾ of $100?

We may talk about the fractional amount of a group of items.

To calculate such amounts, we always divide the group into

parts indicated by the denominator, then retrieve the number

of parts indicated by the numerator.

b. Out of an audience of 72 people at a movie, 7/12 of them

like the show very much. How many people is that?

34 Divide $100 into

4 equal parts.

Take 3 parts. 100 ÷ 4 = 25

so each part is $25,

3 parts make $75.

So ¾ of $100 is $75.

712

Divide 72 people

into 12 equal parts.

Take 7 parts.72 ÷ 12 = 6

so each part consists of 6 people,

7 parts make 42 people.

So 7/12 of 92 people is 42 people.

Whole numbers can be viewed as fractions with denominator 1.

Fractions

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . 5

1x1

Fractions

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0. 5

1x1

0

x

Fractions

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0.

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions.

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions. 1

2=

2

4

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions. 1

2=

2

4=

3

6

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions.

… are equivalent fractions.1

2=

2

4=

3

6=

4

8

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions.

… are equivalent fractions.

The fraction with the smallest denominator of all the

equivalent fractions is called the reduced fraction.

1

2=

2

4=

3

6=

4

8

Whole numbers can be viewed as fractions with denominator 1.

Thus 5 = and x = . The fraction = 0, where x 0.

However, does not have any meaning, it is undefined.

5

1x1

0

xx0

Fractions

The Ultimate No-No of Mathematics:

The denominator (bottom) of a fraction can't

be 0. (It's undefined if the denominator is 0.)

Fractions that represents the same quantity are called

equivalent fractions.

… are equivalent fractions.

The fraction with the smallest denominator of all the

equivalent fractions is called the reduced fraction.

1

2=

2

4=

3

6=

4

8

is the reduced one in the above list.1

2

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

ab

ab =

a / c

Fractions

b / c

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1,

ab

ab =

a / c

Fractions

b / c

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

=a*cb*c

a*cb*c

1

Fractions

b / c

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

78/2

54/2

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

78/2

54/2

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

=39

27

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

78/2

54/2

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

=39/3

27/3

39

27

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

78/2

54/2= 13

9 .

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

=39/3

27/3

39

27

(Often we omit writing the 1’s after the cancellation.)

Factor Cancellation Rule

Given a fraction , then

that is, if the numerator and denominator are divided by the

same quantity c, the result will be an equivalent fraction.

In other words, a common factor of the numerator and the

denominator may be canceled as 1, i.e.

ab

ab =

a / c

ab .

=a*cb*c

=a*cb*c

1

Fractions

b / c

Example B. Reduce the fraction . 7854

78

54=

78/2

54/2= 13

9 .

To reduce a fraction, we keep divide the top and bottom by

common numbers until no more division is possible.

What's left is the reduced version.

=39/3

27/3

or divide both by 6 in one step.

39

27

(Often we omit writing the 1’s after the cancellation.)

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.A participant in a sum or a difference is called a term.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3

3

5=

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3

3

5=

This is addition. Can’t cancel!

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3

3

5=

This is addition. Can’t cancel!

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3=

1

3

3

5=

This is addition. Can’t cancel!

!?

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3=

1

3

3

5=

This is addition. Can’t cancel!

!? 2 * 12 * 3

= 1

3

Yes

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3=

1

3

3

5=

This is addition. Can’t cancel!

!?

Improper Fractions and Mixed Numbers

2 * 12 * 3

= 1

3

Yes

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3=

1

3

3

5=

This is addition. Can’t cancel!

!?

A fraction whose numerator is the same or more than its

denominator (e.g. ) is said to be improper .

Improper Fractions and Mixed Numbers

3 2

2 * 12 * 3

= 1

3

Yes

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

FractionsOne common mistake in cancellation is to cancel a common

number that is part of an addition (or subtraction) in the

numerator or denominator.

2 + 1

2 + 3= 2 + 1

2 + 3=

1

3

3

5=

This is addition. Can’t cancel!

!?

A fraction whose numerator is the same or more than its

denominator (e.g. ) is said to be improper .

We may put an improper fraction into mixed form by division.

Improper Fractions and Mixed Numbers

3 2

2 * 12 * 3

= 1

3

Yes

A participant in a sum or a difference is called a term.

The “2” in the expression “2 + 3” is a term (of the expression).

The “2” is in the expression “2 * 3” is called a factor.

Terms may not be cancelled. Only factors may be canceled.

23 4

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

23 4

23 4 = 5 with remainder 3. ··

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 +

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

We may put a mixed number into improper fraction by doing

the reverse via multiplication.

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

We may put a mixed number into improper fraction by doing

the reverse via multiplication.

Example C: Put into improper form. 5 3

4

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

5 3

4 = 4*5 + 3

4

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

We may put a mixed number into improper fraction by doing

the reverse via multiplication.

Example C: Put into improper form. 5 3

4

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

5 3

4 = 4*5 + 3

4

23

4=

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

We may put a mixed number into improper fraction by doing

the reverse via multiplication.

Example C: Put into improper form. 5 3

4

23 4

23 4 = 5 with remainder 3. Hence, ··

23

4= 5 + 5 3

4 .

5 3

4 = 4*5 + 3

4

23

4=

Improper Fractions and Mixed Numbers

Example C. Put into mixed form.

3

4 =

We may put a mixed number into improper fraction by doing

the reverse via multiplication.

Example C: Put into improper form. 5 3

4

Improper Fractions and Mixed Numbers

B. Convert the following improper fractions into mixed

numbers then convert the mixed numbers back to the

improper form.

9

2

11

3

9

4

13

5

37

1286

11

121

171. 2. 3. 4. 5. 6. 7.

Exercise. A. Reduce the following fractions.

46 ,

812 ,

159 ,

2418 ,

3042 ,

5436 ,

6048 ,

72108