7.3 Distributive property

Prealgebra Page 1 / 2

By the end of this section, you will be able to:

Simplify expressions using the distributive property
Evaluate expressions using the distributive property

Before you get started, take this readiness quiz.

Multiply: $3 (0.25) .$
If you missed this problem, review Decimal Operations
Simplify: $10 - (−2) (3) .$
If you missed this problem, review Subtract Integers
Combine like terms: $9 y + 17 + 3 y - 2 .$
If you missed this problem, review Evaluate, Simplify and Translate Expressions .

Simplify expressions using the distributive property

Suppose three friends are going to the movies. They each need $$9.25;$ that is, $9$ dollars and $1$ quarter. How much money do they need all together? You can think about the dollars separately from the quarters.

The image shows the equation 3 times 9 equal to 27. Below the 3 is an image of three people. Below the 9 is an image of 9 one dollar bills. Below the 27 is an image of three groups of 9 one dollar bills for a total of 27 one dollar bills.

The image shows the equation 3 times 25 cents equal to 75 cents. Below the 3 is an image of three people. Below the 25 cents is an image of a quarter. Below the 75 cents is an image of three quarters.

They need $3$ times $$9,$ so $$27,$ and $3$ times $1$ quarter, so $75$ cents. In total, they need $$27.75 .$

If you think about doing the math in this way, you are using the Distributive Property.

Distributive property

If $a, b, c$ are real numbers, then

a (b + c) = a b + a c

Back to our friends at the movies, we could show the math steps we take to find the total amount of money they need like this:

\begin{matrix} 3 (9.25) \\ 3 (9 & + & 0.25) \\ 3 (9) & + & 3 (0.25) \\ 27 & + & 0.75 \\ 27.75 \end{matrix}

In algebra, we use the Distributive Property to remove parentheses as we simplify expressions. For example, if we are asked to simplify the expression $3 (x + 4),$ the order of operations says to work in the parentheses first. But we cannot add $x$ and $4,$ since they are not like terms. So we use the Distributive Property, as shown in [link] .

Simplify: $3 (x + 4) .$

Solution

	$3 (x + 4)$
Distribute.	$3 \cdot x + 3 \cdot 4$
Multiply.	$3 x + 12$

If $a, b, c$ are real numbers, then	$a (b + c) = a b + a c$
Other forms:	$a (b - c) = a b - a c$ $(b + c) a = b a + c a$

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Distribute.
Simplify.

7.3 Distributive property

Simplify expressions using the distributive property

Distributive property

Solution

Solution

Distributive property

Solution

Solution

Solution

Solution

Solution

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