Properties of Multiplication

Contributed by:

Diego Tue, Jan 25, 2022 11:45 AM UTC

Commutative Property
Associative Property
Identity Property
Zero Property
Distributive Property

1.
Properties of Multiplication – Grades 3 and 4 (Standard 3AF1.5 & 4AF1.0)

Preparation: Place five poster sheets with each property and an example of the
property in different areas of the classroom. (Posters included if needed)

Commutative Property Associative Property of
of Multiplication: Multiplication:

When multiplying, the The way in which the
order of t he factors does factors are grouped does
not change the product. not change the product.

4 ! 2 = 8 (2 ! 3) ! 5 = 30

2!4 =8 2 ! (3 ! 5) = 30

Identity Property of Zero Property of

Multiplication: Multiplication:

When any number is When any number is

multiplied by 1, the multiplied by 0, the

product is that number. product is 0.

6 ! 1 = 6 8 ! 0 = 0

Distributive Property of
Multiplication:

One factor in a
multiplication problem
can be broken apart to
find partial products. He
sum of the partial
products is the product
of the two factors.

6 ! 7 = (6 ! 5) + (6 ! 2)

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2.
Introduction: Review each poster as a whole class. (This is not a time to take notes)
Tell the students you will be giving them a sheet of paper that has an example of one
of the properties. It is their job to decide which property their example represents.

Example 1: The teacher models turning the property card over (i.e. 6 X 0), decide
which property the problem is an example of (zero property), and walking to the
poster of the property and stand holding the card so all students can see the
example.

The whole class should choral respond by reading 6 X 0 = 0 is an example of the
zero property of multiplication because any number times zero equals zero.

(Teacher should model at least two cards)

Example 2: Give each student a card face down on their desk. On the signal
students turn their card over and decide which property their example represents.

The students will then walk to the property and display their card for everyone to
see.

The teacher walks to each property and asks the class if they agree everyone
belongs to the property where the teacher is standing. Have a group discussion
about similarities and difference in the examples.

Students return to their desks and the cards are all collected.

You-‐Try 1: Have each group make their own example of every property to share
with the whole class. Students should be creative in writing their examples of the
properties and not use the same examples they just saw.

The teacher will post the posters around the room and each group will take a
“gallery walk” reviewing other students’ examples. (The assumption is the class
knows how to do a gallery walk otherwise the teacher needs to take a few minutes
to review the expectations of a GW).

You-‐Try 2: Have each student write in their own notebook the definition of each
property and their own example of each property. The can share it with a partner to
check their work and reinforce the concepts. (TPS)

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3.
Date
Warm-‐Up

CST #12 N.S. 1.5 Review:
Which number means Which number makes
1000 + 600 + 8 ? this sentence true?
A. 168 7 + = 10
B. 1068
A. 0
C. 1608 B. 3
C. 7
D. 1680
D. 17
Current: Other:
Use the Commutative Kim had $19.23 in her wallet.
Property to solve the She spent $5.72 to rent a
following multiplication movie. How much money does
problems. she have left?
3! 5 =
5! 3 = A. $13.51
B. $14.41
C. $14.61
8 !10 =
2) D. $24.95
10 ! 8 =
Today’s Objective/Standards: Recognize and use the
Properties of Multiplication (3AF1.5 & 4AF1.0)
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4.
COMMUTATIVE PROPERTY:
2 FACTORS CAN BE MULTIPLIED
IN ANY ORDER AND THE
PRODUCT WILL BE THE SAME.

EXAMPLE: 2 ! 5 = 10
5 ! 2 = 10

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5.
ZERO PROPERTY:

ANY FACTOR MULTIPLIED BY
ZERO WILL EQUAL ZERO.

0!5= 0
EXAMPLE:

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6.
IDENTITY PROPERTY:

ANY FACTOR MULTIPLIED BY
ONE WILL EQUAL THAT FACTOR.

5 !1 = 5
EXAMPLE:

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7.
DISTRIBUTIVE PROPERTY:
A PROBLEM CAN BE BROKEN
APART INTO SIMPLE PROBLEMS.

EXAMPLE: 6 ! 7 = (6 ! 5) + (6 ! 2)

6 ! 5 = 30

6 ! 2 = 12

6 ! 7 = (6 ! 5) + (6 ! 2)
= 30+ 12
= 42

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8.
ASSOCIATIVE PROPERTY:

THE WAY IN WHICH THE
FACTORS ARE GROUPED DOES
NOT CHANGE THE PRODUCT.

(2×3) × 4 = 2 × (3×4)
6 × 4 = 2 × 12
24 = 24
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9.

0×5=0
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10.

0×7=0
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11.

0×19=0
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12.

0×8=0
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13.

50×0=0
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14.

14×0=0
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15.

50×1=50
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16.

13×1=13
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17.

23×1=23
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18.

1×134=134

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19.

1×22=22
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20.

1×1=1

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21.

9×6=54
6×9=54
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22.

8×7=56
7×8=56
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23.

2×12=24
12×2=24
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24.

10×5=50
5×10=50
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25.

3×9=27
9×3=27
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26.

7×3=21
3×7=21
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27.

10×13=(10×5)+(10×8)

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28.

7×4=(7×2)+(7×2)

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29.

6×7=(6×5)+(6×2)

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30.

6×7=(6×4)+(6×3)

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31.

12×13=(12×10)+(12×3)

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32.

11×9=(11×5)+(11×4)

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33.

(3×4)×7=3×(4×7)

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34.

4×(4×5)=(4×4)×5

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35.

(8×4)×2=8×(4×2)

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36.

(9×2)×4 =9×(2×4)

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37.

(3×6)×5=3×(6×5)

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38.

2×(5×4)=(2×5)× 4

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39.

1×67=67
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40.

74×0=0
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41.

(9×9)×3=9×(9×3)

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42.

7×9=63

9×7=63
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