Commutative, Associative and Distributive Laws

Wow! What a mouthful of words! But the ideas are simple.

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Commutative Laws

The "Commutative Laws" say we can swap numbers over and still get the same answer ...

... when we add:

a + b  =  b + a

Example:

Commutative Law Addition

 

... or when we multiply:

a × b  =  b × a

Example:

Commutative Law multiplication

 

Percentages too!

Because a × b  =  b × a it is also true that:

a% of b  =  b% of a

Example: what is 8% of 50 ?

8% of 50 = 50% of 8
  = 4

 

commute

Why "commutative" ... ?

Because the numbers can travel back and forth like a commuter.

4591, 4599, 4615, 4639, 4647, 4592, 4600, 4616

 

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Associative Laws

The "Associative Laws" say that it doesn't matter how we group the numbers (i.e. which we calculate first) ...

... when we add:

(a + b) + c  =  a + (b + c)

Associative Law addition

... or when we multiply:

(a × b) × c  =  a × (b × c)

Associative Law multiplication

Examples:

This: (2 + 4) + 5  =  6 + 5  =  11
Has the same answer as this: 2 + (4 + 5)  =  2 + 9  =  11

This: (3 × 4) × 5  =  12 × 5  =  60
Has the same answer as this: 3 × (4 × 5)  =  3 × 20  =  60

Uses:

Sometimes it is easier to add or multiply in a different order:

What is 19 + 36 + 4?

19 + 36 + 4
=  19 + (36 + 4)  
=  19 + 40
= 59

Or to rearrange a little:

What is 2 × 16 × 5?

2 × 16 × 5
 =  (2 × 5)
× 16  
=  10
× 16
= 160

 

4603, 4610, 4627, 4631, 4643, 4654, 4606, 4612

 

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Distributive Law

The "Distributive Law" is the BEST one of all, but needs careful attention.

This is what it lets us do:

Distributive Law

3 lots of (2+4) is the same as 3 lots of 2 plus 3 lots of 4

So, the can be "distributed" across the 2+4, into 3×2 and 3×4

And we write it like this:

a × (b + c)  =  a × b  +  a × c

Try the calculations yourself:

Either way gets the same answer.

In words:

We get the same answer when we:

  • multiply a number by a group of numbers added together, or
  • do each multiply separately then add them

Uses:

Sometimes it is easier to break up a difficult multiplication:

Example: What is 6 × 204 ?

6 × 204
 =  6×200 + 6×4  
=  1,200 + 24  
=  1,224

Or to combine:

Example: What is 16 × 6 + 16 × 4?

16 × 6 + 16 × 4  =  16 × (6+4) 
= 16 × 10 
=  160

We can use it in subtraction too:

Example: 26×3 - 24×3

26×3 − 24×3
= (26 − 24) × 3  
=  2 × 3  
=  6

We could use it for a long list of additions, too:

Example: 6×7 + 2×7 + 3×7 + 5×7 + 4×7

6×7 + 2×7 + 3×7 + 5×7 + 4×7
= (6+2+3+5+4) × 7
= 20 × 7
= 140

 

5656, 5657, 5658, 5659, 5660, 5661, 3172

And those are the Laws . . .

                  . . . but don't go too far!

The Commutative Law does not work for subtraction or division:

Example:

  • 12 / 3 = 4, but
  • 3 / 12 = ¼

 The Associative Law does not work for subtraction or division:

Example:

  • (9 – 4) – 3 = 5 – 3 = 2, but
  • 9 – (4 – 3) = 9 – 1 = 8

 The Distributive Law does not work for division:

Example:

  • 24 / (4 + 8) = 24 / 12 = 2, but
  • 24 / 4 + 24 / 8 = 6 + 3 = 9

Summary

Commutative Laws:
a + b  =  b + a
a × b  =  b × a
Associative Laws:
(a + b) + c  =  a + (b + c)
(a × b) × c  =  a × (b × c)
Distributive Law:
a × (b + c)  =  a × b  +  a × c