The Distributive Property is easy to remember, if you recall that “multiplication distributes over addition”. Formally, they write this property as “a(b + c) = ab + ac”. In numbers, this means, for example, that 2(3 + 4) = 2×3 + 2×4.

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## How do you remember the distributive property?

The Distributive Property is easy to remember, if you recall that “multiplication distributes over addition”. Formally, they write this property as “a(b + c) = ab + ac”. In numbers, this means, for example, that 2(3 + 4) = 2×3 + 2×4.

**What are the 4 steps in the distributive property?**

Using the distributive law with variables involved, we can isolate x:

- Multiply, or distribute, the outer term to the inner terms.
- Combine like terms.
- Arrange terms so constants and variables are on opposite sides of the equals sign.
- Solve the equation and simplify, if needed.

**What is the acronym for order of math operations?**

PEMDAS

Remember in seventh grade when you were discussing the order of operations in math class and the teacher told you the catchy acronym, “PEMDAS” (parenthesis, exponents, multiplication, division, addition, subtraction) to help you remember? Memorable acronyms aren’t the only way to memorize concepts.

### What are 2 examples of distributive property?

The distributive property of multiplication over addition can be used when you multiply a number by a sum. For example, suppose you want to multiply 3 by the sum of 10 + 2. 3(10 + 2) =? According to this property, you can add the numbers and then multiply by 3.

**What property is if a B and B C then a C?**

Transitive Property

Transitive Property: if a = b and b = c, then a = c.

**How do you remember order of operations?**

The order of operations is a rule that tells the correct sequence of steps for evaluating a math expression. We can remember the order using PEMDAS: Parentheses, Exponents, Multiplication and Division (from left to right), Addition and Subtraction (from left to right).

## What is the distributive property of 25?

25 × 2 = (20 + 5) × 2. Try again. This is an example of the distributive property. 25 × 2 is not equal to 20 + (5 × 2)….Click Go On to begin.

A × (B − C) | = | (A × B) − (A × C) |
---|---|---|

6 | = | 6 |

**How relevant is the distributive property?**

Relevant For… The distributive property is the rule that relates addition and multiplication. Specifically, it states that (a+b)c = ac + bc . (a+b)c = ac+bc. It is a useful tool for expanding expressions, evaluating expressions, and simplifying expressions.

**What does distributive mean?**

In basic operations, the Distributive Property applies to multiplication of the multiplicand to all terms inside parentheses. This is true whether you add or subtract terms:

### What is the distributive property for a sum of 3 terms?

Of course, we can also extend the Distributive Property to a sum of three or more terms: A (B + C + D) = AB + AC + AD [Distributive Property for a sum of 3 terms] A (B + C + D + E) = AB + AC + AD + AE [Distributive Property for a sum of 4 terms] and so forth. The Distributive Property works for any terms, including those with variables.

**Is 3 distributive or associative property?**

Let’s see! The answer for number 1 is the associative property, because the parentheses are moved to order the multiplication. The answer for number two is the distributive property, because 3 is multiplied by both terms in the parentheses.