<img src="http://www.coe.uncc.edu/~jcarter/Elet3285/pageicon.gif"> Boolean Reduction ... Page 1 of 2
Examples in Boolean Expression Simplification:
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C + (BC)
Expression Rule(s) Used
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C + (BC) Original Expression
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C + (B + C) DeMorgan's Law
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(C + C) + B Commutative, Associative Laws
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1 + B Compliment Law
1 Identity Law
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(AB)(A + B)(B + B)
Expression Rule(s) Used
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(AB)(A + B)(B + B) Original Expression
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(AB)(A + B)(1) Compliment law, Identity law
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(A + B)(A + B) De Morgan's Law (AND with 1 was dropped because A*1=A)
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A A + A B + B A + B B Distributive Law
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A + A(B + B) + 0 Redundancy (on As), Identities
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A + A(1)
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A
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(A + C)(AD + AD) + AC + C
Expression Rule(s) Used
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(A + C)(AD + AD) + AC + C Original Expression
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(A + C)A(D + D) + AC + C Distributive.
(A + C)A + AC + C Compliment, Identity.
AA + AC + AC + C Distributive.
A + AC + C Redundancy
A + C + C Identity (A + AC = A + C)
A + C Redundancy
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(A)(A + B) + (B + A)(A + B)
Expression Rule(s) Used
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(A)(A + B) + (B + A)(A + B) Original Expression
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(A)A + (A)B + (B + A)A + (B + A)(B) Distributive
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(A)B + (B + A)A + (B + A)(B) AA = 0
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(A)B + BA + AA + B(B) + A(B) Redundancy and Identity
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Examples in Boolean Expression Simplification:
__
C + (BC)
Expression Rule(s) Used
____
C + (BC) Original Expression
_ _
C + (B + C) DeMorgan's Law
_ _
(C + C) + B Commutative, Associative Laws
_
1 + B Compliment Law
1 Identity Law
__ _ _
(AB)(A + B)(B + B)
Expression Rule(s) Used
__ _ _
(AB)(A + B)(B + B) Original Expression
__ _
(AB)(A + B)(1) Compliment law, Identity law
_ _ _
(A + B)(A + B) De Morgan's Law (AND with 1 was dropped because A*1=A)
_ _ _ _ _ _
A A + A B + B A + B B Distributive Law
_ _ _ _
A + A(B + B) + 0 Redundancy (on As), Identities
_ _
A + A(1)
_
A
_
(A + C)(AD + AD) + AC + C
Expression Rule(s) Used
_
(A + C)(AD + AD) + AC + C Original Expression
_
(A + C)A(D + D) + AC + C Distributive.
(A + C)A + AC + C Compliment, Identity.
AA + AC + AC + C Distributive.
A + AC + C Redundancy
A + C + C Identity (A + AC = A + C)
A + C Redundancy
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(A)(A + B) + (B + A)(A + B)
Expression Rule(s) Used
_ _
(A)(A + B) + (B + A)(A + B) Original Expression
_ _ _
(A)A + (A)B + (B + A)A + (B + A)(B) Distributive
_ _ _
(A)B + (B + A)A + (B + A)(B) AA = 0
_ _ _
(A)B + BA + AA + B(B) + A(B) Redundancy and Identity
_ _