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Give a Reason for Each Step in the Proof That $x = x + 0 = x + ( x \bar { x } ) = ( x + x ) ( x + \bar { x } ) = ( x + x ) \cdot 1 = 1 \cdot ( x + x ) = x + x$

Question 14

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Give a reason for each step in the proof that x + x = x is true in Boolean algebras. Your reasons should come from the following: associative laws for addition and multiplication, commutative laws for addition and multiplication, distributive law for multiplication over addition and distributive law for addition over multiplication, identity laws, unit property, and zero property. $x = x + 0 = x + ( x \bar { x } ) = ( x + x ) ( x + \bar { x } ) = ( x + x ) \cdot 1 = 1 \cdot ( x + x ) = x + x$

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Additive property of 0, multiplicative p...
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Give a Reason for Each Step in the Proof That x=x+0=x+(xxˉ)=(x+x)(x+xˉ)=(x+x)⋅1=1⋅(x+x)=x+xx = x + 0 = x + ( x \bar { x } ) = ( x + x ) ( x + \bar { x } ) = ( x + x ) \cdot 1 = 1 \cdot ( x + x ) = x + xx=x+0=x+(xxˉ)=(x+x)(x+xˉ)=(x+x)⋅1=1⋅(x+x)=x+x

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Correct Answer:VerifiedAdditive property of 0, multiplicative p...View AnswerUnlock this answer nowGet Access to more Verified Answers free of chargeView Full Answer For Free

Give a Reason for Each Step in the Proof That $x = x + 0 = x + ( x \bar { x } ) = ( x + x ) ( x + \bar { x } ) = ( x + x ) \cdot 1 = 1 \cdot ( x + x ) = x + x$

Correct Answer:
Verified
Additive property of 0, multiplicative p...
View Answer
Unlock this answer now
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