Distributive Property Math Examples

The distributive property is easy to remember if you recall that multiplication distributes over addition.

Distributive property math examples. It is easier to understand the meaning if you look at the examples below. Notice that the distributive property combines both multiplication and addition. The distributive property helps in making difficult problems simpler. Using the distributive property printable worksheets multiplication addition.

5 x 4 7 x 4 3 x 4. 15 x 4. Rational and irrational numbers. Distributive property over addition.

Factor with the distributive property no variables distributive property review. Here s an example of how the result does not change when solved normally and when solved using the distributive property. 9 x 9 5 81. 9x 45 45 81 45.

Let s look at the distributive property with this example. 2 3 5 2 8 16. 2 3 2 5 6 10 16. Distributive property when multiplying.

The distributive property of multiplication over addition allows the user to multiply a value of the sum by multiplying the addends individually. Let s check to see if this is true. The individual products are then added to get the final answer. Any time a computation depends on multiplying through a parentheses or factoring something out they want.

Solve the following equation using distributive property. According to the distributive property 2 3 5 will be equal to 2 3 2 5. Formally they write this property as a b c ab ac. Distributive property over subtraction.

Distributive property exercise examples. An intuitive example using arithmetic. Arrange the terms in a way that constant term s and variable term s are on the opposite of the equation. Any time they refer in a problem to using the distributive property they want you to take something through the parentheses or factor something out.

In both cases we get the same result 16 and therefore we can show that the distributive property of multiplication is correct. 6 10 5 6 10 5 6 10 5 6 10 5 6 10 6 5 6 10 6 5 6 10 6 5 6 10 6 5 60 30 60 30. Consider the first example the distributive property lets you distribute the 5 to both the x and the 2. 5 7 3 x 4.

M n p m n m p. 60 30 60 30. Find some good examples here showing you how to use this property. In numbers this means for example that 2 3 4 2 3 2 4.

9 x 5 81. 9x 45 81. Find the product of a number with the other numbers inside the parenthesis. The distributive property states that multiplying a number by an addition problem is the same as multiplying the number by each addend in the addition problem and then adding the products.

90 90.