Presentation is loading. Please wait.

Presentation is loading. Please wait.

RULES OF BOOLEAN ALGEBRA. BASIC RULES OF BOOLEAN ALGERBA Sr. No.Theorem 1.0’=1  1’=0 2.A+0=A 3.A+1=1 4.A+A=A 5.A+A’=1 6.(A’)’=A 7.A+AB=A 8.A+A’B=A+B.

Published byMorgan Wiggins Modified over 8 years ago

Similar presentations

Presentation on theme: "RULES OF BOOLEAN ALGEBRA. BASIC RULES OF BOOLEAN ALGERBA Sr. No.Theorem 1.0’=1  1’=0 2.A+0=A 3.A+1=1 4.A+A=A 5.A+A’=1 6.(A’)’=A 7.A+AB=A 8.A+A’B=A+B."— Presentation transcript:

1 RULES OF BOOLEAN ALGEBRA

2 BASIC RULES OF BOOLEAN ALGERBA Sr. No.Theorem 1.0’=1  1’=0 2.A+0=A 3.A+1=1 4.A+A=A 5.A+A’=1 6.(A’)’=A 7.A+AB=A 8.A+A’B=A+B 9.(A+B)’=(A)’.(B)’ 10.(A.B)’=(A)’+(B)’ 11.(A+B).(A+C)= A+BC 12.A.1=A  A.0=0 13.A.A=A  A.(A)’=0

3 D E M ORGAN ’ S T HEOREMS It states, that the complement of any expression can be obtained by replacing each variable and element with its complement and changing OR operators (+) with AND operators(.) and AND operator (.) with OR operators (+). These theorems can be expressed as follows: (A+B)’=(A)’.(B)’ First De Morgan’s Theorem. (A.B)’=(A)’+(B)’ Second De Morgan’s Theorem. De Morgan’s theorems can also applicable to expressions in which there are more than two variables.

4 T HREE STEPS OF SIMPLIFICATION ( DEMORGANIZATION ) 1. Complement each of the individual variables. 2. Change all the OR’s (+) to AND (.) and AND’s(.) to OR’s(+). 3. Complement the whole Boolean function.

5 E XAMPLES 1 Demorganize the following expression: AB’ + A’B’C +AC Step No. 1: Complement each of the individual variables Means : AB’ + A’B’C + AC  A’B’’ + A’’B’’C’ + A’C’ Step No. 2: Change all the OR’s (+) to AND (.) and AND’s(.) to OR’s(+)

6 E XAMPLES 1 Means: A’B’’ + A’’B’’C’ + A’C’  A’B + ABC’ + A’C’ A’B + ABC’ + A’C’  (A’+B ).(A+B+C’).(A’+C’) Step No. 3: Complement the whole Boolean function Means: (A’+B ).(A+B+C’).(A’+C’)  ((A’+B ).(A+B+C’).(A’+C’))’

7 T RUTH T ABLE F OR T HIS E XAMPLE 1. Before Demorganization. AB’ + A’B’C +AC ABCAB’A’B’CACR=AB’ + A’B’C + AC 0000000 0010101 0100000 0110000 1001001 1011011 1100000 1110011

8 T RUTH T ABLE F OR T HIS E XAMPLE 2. After Demorganization. ((A’+B ).(A+B+C’).(A’+C’))’ ABCA’+BA+B+C’A’+C’R=(A’+B).(A+B+C’).(A’+C’)R’ 00011110 00110101 01011110 01111110 10001101 10101001 11011110 11111001

9 T RUTH T ABLE F OR T HIS E XAMPLE Now Compare the results of the expression before and after Demorganization The Results are identical in both the tables. R=AB’ + A’B’C + AC 0 1 0 0 1 1 0 1 R=(A’+B).(A+B+C’).(A’+C’))’ 0 1 0 0 1 1 0 1 Before DemorganizationAfter Demorganization

10 E XAMPLES 1 Step No.3 A’.B+A’.B’.C+A’+B’(A’.B+A’.B’.C+A’+B’)’ Step No. 2 (A’+B’’).(A’+B’+C’’).(A’B’)A’.B+A’.B’.C+A’+B’ Step No. 1 (A+B’).(A+B+C’).(AB)(A’+B’’).(A’+B’+C’’).(A’B’)

11 T RUTH T ABLE F OR T HIS E XAMPLE 1. Before Demorganization. (A+B’).(A+B+C’).(AB) ABCA+B’(A+B+C’)(AB)R=(A+B’).(A+B+C’).(AB) 0001100 0011000 0100100 0110100 1001100 1011100 1101111 1111111

12 T RUTH T ABLE F OR T HIS E XAMPLE 2. After Demorganization. (A’.B+A’.B’.C+A’+B’)’ ABCA’.BA’.B’.CA’+B’R=A’.B+A’.B’.C+A’+B’R’ 00000110 00101110 01010110 01110110 10000110 10100110 11000001 11100001

13 T RUTH T ABLE F OR T HIS E XAMPLE Now Compare the results of the expression before and after Demorganization The Results are identical in both the tables. R=(A+B’).(A+B+C’).(AB) 0 0 0 0 0 0 1 1 R=(A’.B+A’.B’.C+A’+B’)’ 0 0 0 0 0 0 1 1 Before DemorganizationAfter Demorganization

Download ppt "RULES OF BOOLEAN ALGEBRA. BASIC RULES OF BOOLEAN ALGERBA Sr. No.Theorem 1.0’=1  1’=0 2.A+0=A 3.A+1=1 4.A+A=A 5.A+A’=1 6.(A’)’=A 7.A+AB=A 8.A+A’B=A+B."

Similar presentations

D IGITAL L OGIC Number Systems By: Safwan Mawlood Digital Principles and Logic Design, A.Saha &N.Manna.

D IGITAL L OGIC Number Systems By: Safwan Mawlood Digital Principles and Logic Design, A.Saha &N.Manna.
CSE 20 Lecture 9 Boolean Algebra: Theorems and Proofs CK Cheng April 26, 2011 Lecture notes 1.

CSE 20 Lecture 9 Boolean Algebra: Theorems and Proofs CK Cheng April 26, 2011 Lecture notes 1.
1 CSE 20 – Discrete Math Lecture 10 CK Cheng 4/28/2010.

1 CSE 20 – Discrete Math Lecture 10 CK Cheng 4/28/2010.
Boolean Algebra Supplementary material. A Boolean algebra B is a boolean algebra means B is a set with elements in it a,b,…,0,1Є B and operators * (and),

Boolean Algebra Supplementary material. A Boolean algebra B is a boolean algebra means B is a set with elements in it a,b,…,0,1Є B and operators * (and),
Chapter 3 Boolean Algebra and Logic Gate (Part 2).

Chapter 3 Boolean Algebra and Logic Gate (Part 2).
Relationship Between Basic Operation of Boolean and Basic Logic Gate The basic construction of a logical circuit is gates Gate is an electronic circuit.

Relationship Between Basic Operation of Boolean and Basic Logic Gate The basic construction of a logical circuit is gates Gate is an electronic circuit.
Lecture 1: Introduction to Digital Logic Design CK Cheng Thursday 9/26/02.

Lecture 1: Introduction to Digital Logic Design CK Cheng Thursday 9/26/02.
ENGIN112 L5: Boolean Algebra September 12, 2003 ENGIN 112 Intro to Electrical and Computer Engineering Lecture 5 Boolean Algebra.

ENGIN112 L5: Boolean Algebra September 12, 2003 ENGIN 112 Intro to Electrical and Computer Engineering Lecture 5 Boolean Algebra.
1 CSE 20: Lecture 7 Boolean Algebra CK Cheng 4/21/2011.

1 CSE 20: Lecture 7 Boolean Algebra CK Cheng 4/21/2011.
ENGG 1203 Tutorial Combinational Logic (I) 1 Feb Learning Objectives

ENGG 1203 Tutorial Combinational Logic (I) 1 Feb Learning Objectives
Boolean Algebra and Logic Simplification. Boolean Addition & Multiplication Boolean Addition performed by OR gate Sum Term describes Boolean Addition.

Boolean Algebra and Logic Simplification. Boolean Addition & Multiplication Boolean Addition performed by OR gate Sum Term describes Boolean Addition.
Boolean Algebra Dr. Bernard Chen Ph.D. University of Central Arkansas Spring 2009.

Boolean Algebra Dr. Bernard Chen Ph.D. University of Central Arkansas Spring 2009.
CHAPTER 2 Boolean Algebra

CHAPTER 2 Boolean Algebra
DeMorgan Theorem, Computer Simulation Exercises

DeMorgan Theorem, Computer Simulation Exercises
Lecture 22: 11/19/2002CS170 Fall 20021 CS170 Computer Organization and Architecture I Ayman Abdel-Hamid Department of Computer Science Old Dominion University.

Lecture 22: 11/19/2002CS170 Fall CS170 Computer Organization and Architecture I Ayman Abdel-Hamid Department of Computer Science Old Dominion University.
Boolean Algebra & Logic Prepared by Dr P Marais (Modified by D Burford)

Boolean Algebra & Logic Prepared by Dr P Marais (Modified by D Burford)
LOGIC GATES AND CIRCUITS Digital systems are said to be constructed by using logic gates. These gates are the AND, OR, NOT, NAND, NOR, EXOR and EXNOR gates.

LOGIC GATES AND CIRCUITS Digital systems are said to be constructed by using logic gates. These gates are the AND, OR, NOT, NAND, NOR, EXOR and EXNOR gates.
Laws (Theorems) of Boolean algebra Laws of Complementation oThe term complement means, to invert or to change 1's to 0's and 0's to 1's, for which purpose.

Laws (Theorems) of Boolean algebra Laws of Complementation oThe term complement means, to invert or to change 1's to 0's and 0's to 1's, for which purpose.
Logic Gates By Taweesak Reungpeerakul

Logic Gates By Taweesak Reungpeerakul
6 - 1 Simplification Theorems Useful for simplification of expressions & therefore simplification of the logic network which results. XY + XY' = ( X +

6 - 1 Simplification Theorems Useful for simplification of expressions & therefore simplification of the logic network which results. XY + XY' = ( X +

Similar presentations

Ads by Google