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The distributive property states that an expression of the form A(B + C) can be solved as A × (B + C) = AB + AC. Learn distributive property, types, examples & more!
Distributive property with variables. To apply the distributive property to an algebraic expression, you multiply each term inside the parentheses by the number or variable outside the parentheses. For example, to simplify 2 (x + 3), you would multiply 2 by both x and 3, resulting in 2x + 6.
The distributive property states that multiplying the sum of two or more numbers is the same as multiplying the addends separately. For example, When multiplying 2 \times 8, 2 × 8, you can break 8 8 up into 2 + 6. 2 + 6.
Standard 6.EE.A.3 - Practice simplifying variable expressions using the distributive property. Included Skills: Apply the properties of operations to generate equivalent expressions. For example, apply the distributive property to the expression 3 (2 + x) to produce the equivalent expression 6 + 3x; apply the distributive property to the ...
The literal definition of the distributive property is that multiplying a value by its sum or difference, you will get the same result. Let's take 7*6 for an example, which equals 42. If we split the 6 into two values, one added by another, we can get 7(2+4). 7*2=14, and 7*4=28. 14+28=42
The distributive property tells us how to solve expressions in the form of a(b + c). The distributive property is sometimes called the distributive law of multiplication and division.
This is a simplified lesson "for dummies" about the distributive property, meant for 6th grade or for anyone who has trouble understanding it. I introduce it using an area model of a two-part rectangle, and we only use it for ADDITION in this lesson (to keep things simple).
