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Download The Distributive Property is used constantly in class for mental Math
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USING GENERIC RECTANLGES TO MODEL THE DISTRIBUTIVE PROPERTY! copyright©amberpasillas2010 The Distributive Property is used constantly in class for mental Math. That means it is used to solve hard Multiplication problems in your head. Just watch! copyright©amberpasillas2010 1 Let’s say we want to multiply 53 x 6 Doing 53 x 6 in your head can be a challenge. So let’s break it apart to make it easier. We know that: 53 = 50 + 3 (50 • 6) + (3 • 6) (300) + (18) = 318 So 53 • 6 = 318 copyright©amberpasillas2010 Let’s try more mental Math! 16 • 8 24 • 7 (10 • 8) + (6 • 8) (20 • 7) + (4 • 7) (80) + (48) = 128 (140) + (28) = 168 This works because of the DISTRIBUTIVE PROPERTY!!! copyright©amberpasillas2010 2 A generic rectangle can be used to model the Distributive Property. The Distributive Property wants you to distribute what is on the outside of the parenthesis to the inside of the parenthesis. copyright©amberpasillas2010 Let’s say we want to do the following problem using mental Math. 3 • 19 3(10 + 9) 10 + 9 3 3(10) + 3(9) = 3(10) + 3(9) 10 + 9 3 30 + 27 = 30 + 27 = 57 copyright©amberpasillas2010 3 Now let’s try a problem using a variable. 4(x + 5) 4(x + 5) x + 5 4 4(x) + 4(5) = 4(x) + 4(5) x + 5 4 4x + 20 = 4x + 20 copyright©amberpasillas2010 A generic rectangle can be used to model the Distributive Property. The Distributive Property wants you to distribute what is on the outside of the parenthesis to the inside of the parenthesis. x + 4 5(x + 4) 5 5(x)+ 5(4) = 5x + 20 y –7 3(y –7) 3 3(y) – 3(7) = 3y– 21 copyright©amberpasillas2010 4 Simplify using the distributive property. 1) 5(x + 3) 2) 6(y + 7) 5• x + 5•3 6• y + 6•7 5x + 15 6y + 42 copyright©amberpasillas2010 Simplify using the distributive property. 3) 3(a − 9) 3• a − 3• 9 4) 4(3 − y) 4•3 − 4• y 12 − 4y 3a − 27 copyright©amberpasillas2010 5 Simplify using the distributive property. 5) 10(x + 6) 10 • x + 10 • 6 10x + 60 6) 4(g − 2) 4•g − 4•2 4g − 8 copyright©amberpasillas2010 Simplify using the distributive property. 7) x(2x − 8) x • 2x − x • 8 2x 2 − 8x 8) 7(5 − y) 7•5 −7• y 35 − 7y copyright©amberpasillas2010 6 Simplify using the distributive property. 9) 3(a + b + c) 3 • a +3 • b +3 • c 3a + 3b + 3c 10) 4(x − 2 + m) 4 • x −4 • 2 +4 • m 4x − 8 + 4m Try these! They are challenging! copyright©amberpasillas2010 THE END! Take out your study guide copyright©amberpasillas2010 7 #7 A generic rectangle can be used to model the Distributive Property. The Distributive Property wants you to distribute what is on the outside of the parenthesis to the inside of the parenthesis. x + 4 3(x + 4) 3 3(x)+ 3(4) = 3x + 12 y –7 5(y –7) 5 5(y) – 5(7) = 5y– 35 copyright©amberpasillas2010 #8 a(b + c) = ab + ac The distributive property is very useful for mental math! Ex: 16 • 8 (10 • 8) + (6 • 8) (80) + (48) = 128 4(x+5) = 4(x) + 4(5) 6(y-2) = 6(y)– 6(2) = 4x + 20 = 6y – 12 -3(a+7) = -3(a) + -3(7) = -3a + -21 http://www.mathslideshows.com 8
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