Properties of Multiplication
Properties of Multiplication
Have you ever looked at a math problem and thought it looked too hard to solve in your head? The properties of multiplication are like secret shortcuts that make multiplying numbers much easier and faster. Let's learn the three main properties!
The Commutative Property
The commutative property tells us that you can multiply numbers in any order, and the product (the answer) will always be the same.
Rule: aÃb=bÃa
Example: What is 8Ã5? It is exactly the same as 5Ã8. Both equal 40. If you forget a multiplication fact, try flipping the numbers around!
The Associative Property
The associative property says that when you are multiplying three or more numbers, it doesn't matter how you group them. You can move the parentheses around to make the math easier.
Rule: (aÃb)Ãc=aÃ(bÃc)
Example: Rewrite 4Ã7Ã25 to make it easier to compute. Instead of multiplying 4Ã7 first, we can group 4 and 25 together because 4Ã25 is a friendly number (100). 4Ã7Ã25=(4Ã25)Ã7 100Ã7=700
The Distributive Property
The distributive property lets you break apart a larger number into smaller, easier numbers (usually tens and ones), multiply each part, and then add them together.
Rule: aÃ(b+c)=(aÃb)+(aÃc)
Example: Use the distributive property to find 6Ã48. Break 48 into 40+8. 6Ã48=6Ã(40+8) Now, multiply 6 by both parts: (6Ã40)+(6Ã8)=240+48=288
Putting It All Together
Let's use properties to calculate 5Ã36Ã2. Using the commutative property, we can swap the 36 and the 2: 5Ã2Ã36 Using the associative property, we group 5 and 2 first: (5Ã2)Ã36 10Ã36=360
By using these properties, a difficult problem becomes a quick mental math trick!