Boolean Algebra: Difference between revisions

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Axiome

Kommutativ

<math>A \land B = B \land A</math>

<math>A \lor B = B \lor A</math>

Assoziativ

<math>(A \land B) \land C = A \land B \land C</math>

<math>(A \lor B) \lor C = A \lor B \lor C</math>

Distributiv

<math>(A \land B) \lor (A \land C) = A \land (B \lor C)</math>

<math>(A \lor B) \land (A \lor C) = A \lor (B \land C)</math>

Vereinfachungsregeln

<math>A \land 1 = A</math>

<math>A \lor 1 = 1</math>

<math>A \land 0 = 0</math>

<math>A \lor 0 = A</math>

<math>A \land A = A</math>

<math>A \lor A = A</math>

<math>\bar{A} \land A = 0</math>

<math>\bar{A} \lor A = 1</math>

<math>A \land (A \lor B) = A</math>

<math>A \lor (A \land B = A</math>

De Morgan Gesetze

de-wp:De_Morgansche_Gesetze

Examples

1

<math>Q = ( A \land B ) \lor ( A \land C )

   <=> A \land (B \lor C)</math>

2

<math>Q = ( C \lor B ) \land ( A \lor C )

   <=> C \lor (B \land A)</math>

3

<math>Y = ( A \land B) \lor ( C \land D) \lor ( D \land A ) \lor ( E \land C) <=>

 (A \land (B \lor D)) \lor ( C \land (D \lor E))</math>

4

<math>Z = ( A \land B ) \lor ( B \land A )

   <=> A \land B</math>

5

<math>Y = (\bar{C} \lor D \lor F) \land (\bar{C} \lor E \lor G)

   <=> \bar{C} \land ((D \land F) \land (G \lor E))</math>

6

<math>X = (( A \land B ) \lor C) \land (( A \lor B ) \lor D ))

 <=> (A \land B) \lor (C \land D)</math>

ne das is nicht richtig so!
betrachte A=0, B=1, C=1, D=0
dann gilt: der linke ausdruck ist wahr, der rechte aber nicht.

7

<math>X = ( C \lor D \lor F ) \land ( C \lor D \lor G )

 <=> (C \lor D) \lor (F \land G)</math>

8

<math>U = ( A \lor B ) \land ( A \land C )

   <=> ( A ) \land (A \land C) <=> A \land A \land C <=> A \land C</math>

9

<math>Q = (B \land C) \lor (B \land \bar{C})

   <=> B \land (C \lor \bar{C}) = B \land 0 = 0</math>

10

<math>Y = ( G \lor \bar{F}) \land (G \lor F)

   <=> G \lor (F \land \bar{F}) = G \lor 0 = G</math>

Are those right? I dont think so. Please check.