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Boolean Algebra Module M4.1 Section 5.1. Boolean Algebra and Logic Equations Switching Algebra Theorems Venn Diagrams.

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Presentation on theme: "Boolean Algebra Module M4.1 Section 5.1. Boolean Algebra and Logic Equations Switching Algebra Theorems Venn Diagrams."— Presentation transcript:

1 Boolean Algebra Module M4.1 Section 5.1

2 Boolean Algebra and Logic Equations Switching Algebra Theorems Venn Diagrams

3 One-variable Theorems OR Version AND Version X # 0 = X X # 1 = 1 X & 1 = X X & 0 = 0 Note:Principle of Duality You can change # to & and 0 to 1 and vice versa

4 One-variable Theorems OR Version AND Version X # !X = 1 X # X = X X & !X = 0 X & X = X Note:Principle of Duality You can change # to & and 0 to 1 and vice versa

5 Two-variable Theorems Commutative Laws Unity Absorption-1 Absorption-2

6 Commutative Laws X # Y = Y # X X & Y = Y & X

7 Venn Diagrams X !X

8 Venn Diagrams XY X & Y

9 Venn Diagrams X # Y XY

10 Venn Diagrams !X & Y X Y

11 Unity !X & Y X Y X & Y (X & Y) # (!X & Y) = Y Dual: (X # Y) & (!X # Y) = Y

12 Absorption-1 X Y X & Y Y # (X & Y) = Y Dual: Y & (X # Y) = Y

13 Absorption-2 !X & Y X Y X # (!X & Y) = X # Y Dual: X & (!X # Y) = X & Y

14 Three-variable Theorems Associative Laws Distributive Laws

15 Associative Laws X # (Y # Z) = (X # Y) # Z Dual: X & (Y & Z) = (X & Y) & Z

16 Associative Law 0 0 0 0 0 0 0 0 0 1 1 1 0 1 0 1 0 1 1 1 1 0 1 1 1 1 1 1 1 0 0 0 1 1 1 1 0 1 1 1 1 1 1 1 0 1 1 1 1 1 1 1 1 1 1 1 X Y Z Y # Z X # (Y # Z) X # Y (X # Y) # Z X # (Y # Z) = (X # Y) # Z

17 Distributive Laws X & (Y # Z) = (X & Y) # (X & Z) Dual: X # (Y & Z) = (X # Y) & (X # Z)

18 Distributive Law - a

19 Distributive Law - b X & (Y # Z) = (X & Y) # (X & Z)

20 Generalized De Morgan’s Theorem NOT all variables Change & to # and # to & NOT the result -------------------------------------------- F = X & Y # X & Z # Y & Z F = !((!X # !Y) & (!X # !Z) & (!Y # !Z)) F = !(!(X & Y) & !(X & Z) & !(Y & Z))

21

22 NAND Gate

23 X Y X Z Y Z F F = X & Y # X & Z # Y & Z

24 Question The following is a Boolean identity: (true or false) Y # (X & !Y) = X # Y

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