{"id":225,"date":"2023-01-08T12:35:05","date_gmt":"2023-01-08T12:35:05","guid":{"rendered":"https:\/\/aipsacademy.com\/blogs\/?p=225"},"modified":"2023-01-08T12:47:31","modified_gmt":"2023-01-08T12:47:31","slug":"introduction-to-boolean-algebra-best-concepts","status":"publish","type":"post","link":"https:\/\/aipsacademy.com\/blogs\/2023\/01\/08\/introduction-to-boolean-algebra-best-concepts\/","title":{"rendered":"Introduction to Boolean Algebra- Best concepts"},"content":{"rendered":"\n<p>In this topic we are going to learn  best concept of Introduction to Boolean Algebra. This is very important for computer science students.<\/p>\n\n\n\n<p>Boolean Algebra is a kind of algebra that is used to analyze and simplify the logic circuits. Boolean algebra is frequently used in digital electronics.  It is also known as Binary Algebra of Logical Algebra.<\/p>\n\n\n\n<p>It was developed by English mathematician <a href=\"https:\/\/en.wikipedia.org\/wiki\/George_Boole\" target=\"_blank\" aria-label=\"undefined (opens in a new tab)\" rel=\"noreferrer noopener\">George Boole<\/a> in the  in 1854.<\/p>\n\n\n\n<p>It uses only two variables  1 to represent High and 0 to represent Low.<\/p>\n\n\n\n<p>It uses three logical operators namely AND, OR, NOT . It represents the relationships between variables.<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Binary Valued Quantities <\/strong><\/h4>\n\n\n\n<p>The variables that can take only two values i.e True and False where True denotes to 1 and False Denotes to 0.<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Boolean Variable<\/strong><\/h4>\n\n\n\n<p>A Boolean variable is a variable that can contain only two types of values such as 0 and 1 where 0 denotes to FALSE and 1 denotes to TRUE. Boolean variables are used in Boolean Functions or expressions.<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Boolean Operators<\/strong><\/h4>\n\n\n\n<p>Boolean algebra contains three Boolean operators to express boolean functions. It is also known as Logical operators. The Boolean Operators are AND , OR, NOT that are used to performs logical operations.<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>AND Operator<\/strong><\/h4>\n\n\n\n<p>This operator operates on two or more operands. It is used to perform logical Multiplication in Boolean Algebra. It is denoted by symbol dot( . )<\/p>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td>A<\/td><td>B<\/td><td>Y(A.B)<\/td><\/tr><tr><td>0<\/td><td>0<\/td><td>0<\/td><\/tr><tr><td>0<\/td><td>1<\/td><td>0<\/td><\/tr><tr><td>1<\/td><td>0<\/td><td>0<\/td><\/tr><tr><td>1<\/td><td>1<\/td><td>1<\/td><\/tr><\/tbody><\/table><figcaption>Truth Table for AND Operator<\/figcaption><\/figure>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>OR Operator<\/strong><\/h4>\n\n\n\n<p>This operator operates on two or more operands. It is used to perform logical Addition in Boolean Algebra. It is denoted by symbol  Plus( +).<\/p>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td>A<\/td><td>B<\/td><td>Y(A+B)<\/td><\/tr><tr><td>0<\/td><td>0<\/td><td>0<\/td><\/tr><tr><td>0<\/td><td>1<\/td><td>1<\/td><\/tr><tr><td>1<\/td><td>0<\/td><td>1<\/td><\/tr><tr><td>1<\/td><td>1<\/td><td>1<\/td><\/tr><\/tbody><\/table><figcaption>Truth Table OR operator<\/figcaption><\/figure>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>NOT Operator<\/strong><\/h4>\n\n\n\n<p>It is an unary operator. It requires one operand to operate .  This operator is also known as inverter or complement. It returns 1 for 0 and vice versa(0 for 1).<\/p>\n\n\n\n<p>It is denoted by symbol  tilde(~) , Bar( -) or single inverted comma (&#8216;).<\/p>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td><strong>A<\/strong><\/td><td><strong>A\u2019<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><\/tr><\/tbody><\/table><figcaption>Truth Table NOT Operator<\/figcaption><\/figure>\n\n\n\n<p><\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Truth Table<\/strong><\/h4>\n\n\n\n<p>A Truth table is a table that shows all the Possibilities of a Logic Circuit.<\/p>\n\n\n\n<p>A Truth Table is a tabular form that shows all the possible values of logical variables with possible outcomes for the given condition.<\/p>\n\n\n\n<p>Example<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Literals<\/strong><\/h4>\n\n\n\n<p>A Literal is a variable or it&#8217;s complement such as A, B or A&#8217; etc. used in Boolean Expressions.  The number of literals in a Boolean  function is minimized by Algebraic manipulation to prepare a Circuit. <\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Minterms<\/strong><\/h4>\n\n\n\n<p>A Product term of all the variables in the Sum-Of-Product form in the expression.<\/p>\n\n\n\n<p>Example  <strong>AB+A&#8217;B+AB&#8217;<\/strong><\/p>\n\n\n\n<p class=\"has-vivid-red-color has-text-color\"><strong>Rules for Obtaining Minterms<\/strong><\/p>\n\n\n\n<ol class=\"wp-block-list\"><li>First of all find possible Combination of Input variables.<\/li><li>In case of Binary , Complement (Barred) literals(Variable) are represented by 0.<\/li><\/ol>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td>A<\/td><td>B<\/td><td>Minterm<\/td><td>Designator<\/td><\/tr><tr><td>0<\/td><td>0<\/td><td>A\u2019B\u2019<\/td><td>0<\/td><\/tr><tr><td>0<\/td><td>1<\/td><td>A\u2019B<\/td><td>1<\/td><\/tr><tr><td>1<\/td><td>0<\/td><td>AB\u2019<\/td><td>2<\/td><\/tr><tr><td>1<\/td><td>1<\/td><td>AB<\/td><td>3<\/td><\/tr><\/tbody><\/table><figcaption>Minterms Two  Variables <\/figcaption><\/figure>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td><strong>A<\/strong><\/td><td><strong>B<\/strong><\/td><td><strong>C<\/strong><\/td><td><strong>Minterm<\/strong><\/td><td><strong>Designator<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019B\u2019C\u2019<\/strong><\/td><td><strong>0<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019B\u2019C<\/strong><\/td><td><strong>1<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019BC\u2019<\/strong><\/td><td><strong>2<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019BC<\/strong><\/td><td><strong>3<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>AB\u2019C\u2019<\/strong><\/td><td><strong>4<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>AB\u2019C<\/strong><\/td><td><strong>5<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>ABC\u2019<\/strong><\/td><td><strong>6<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>ABC<\/strong><\/td><td><strong>7<\/strong><\/td><\/tr><\/tbody><\/table><figcaption>Three Variable Minterm<\/figcaption><\/figure>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td><strong>A<\/strong><\/td><td><strong>B<\/strong><\/td><td><strong>C<\/strong><\/td><td><strong>D<\/strong><\/td><td><strong>Minterm<\/strong><\/td><td><strong>Designator<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019B\u2019C\u2019D\u2019<\/strong><\/td><td><strong>0<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019B\u2019C\u2019D<\/strong><\/td><td><strong>1<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019B\u2019CD\u2019<\/strong><\/td><td><strong>2<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019B\u2019CD<\/strong><\/td><td><strong>3<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019BC\u2019D\u2019<\/strong><\/td><td><strong>4<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019BC\u2019D<\/strong><\/td><td><strong>5<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019BCD\u2019<\/strong><\/td><td><strong>6<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019BCD<\/strong><\/td><td><strong>7<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019BCD<\/strong><\/td><td><strong>8<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>AB\u2019C\u2019D<\/strong><\/td><td><strong>9<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>AB\u2019CD\u2019<\/strong><\/td><td><strong>10<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>AB\u2019CD<\/strong><\/td><td><strong>11<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>ABC\u2019D\u2019<\/strong><\/td><td><strong>12<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>ABC\u2019D<\/strong><\/td><td><strong>13<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>ABCD\u2019<\/strong><\/td><td><strong>14<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>ABCD<\/strong><\/td><td><strong>15<\/strong><\/td><\/tr><\/tbody><\/table><figcaption>Minterm Four Variable<\/figcaption><\/figure>\n\n\n\n<p><\/p>\n\n\n\n<p>Q. <strong>Find Minterm.<\/strong><\/p>\n\n\n\n<div class=\"wp-block-group\"><div class=\"wp-block-group__inner-container is-layout-flow wp-block-group-is-layout-flow\">\n<p><strong>A+B<\/strong><\/p>\n\n\n\n<p><strong>=A.1+B.1<\/strong><\/p>\n\n\n\n<p><strong>=A(B+B\u2019)+B(A+A\u2019)&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; Inverse law[A+A\u2019=1]<\/strong><\/p>\n\n\n\n<p><strong>=AB+AB\u2019+AB+A\u2019B&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp; Idempotent Law[A+A=A]<\/strong><\/p>\n\n\n\n<p><strong>=AB+AB\u2019+A\u2019B<\/strong><\/p>\n<\/div><\/div>\n\n\n\n<p class=\"has-vivid-red-color has-text-color\">Q.2 <strong>A+AB<\/strong><\/p>\n\n\n\n<div class=\"wp-block-group\"><div class=\"wp-block-group__inner-container is-layout-flow wp-block-group-is-layout-flow\">\n<p><strong>=A(B+B\u2019)+AB<\/strong><\/p>\n\n\n\n<p><strong>=AB+AB\u2019+AB<\/strong><\/p>\n\n\n\n<p><strong>=AB+AB\u2019<\/strong><\/p>\n<\/div><\/div>\n\n\n\n<p class=\"has-vivid-red-color has-text-color\"><strong>Shorthand Minterm Notation<\/strong><\/p>\n\n\n\n<p>Q1. Find the minterm of <strong>AB&#8217;C&#8217;D<\/strong><\/p>\n\n\n\n<p>Solution: <strong>AB&#8217;C&#8217;D<\/strong><\/p>\n\n\n\n<p> = 1 0 0 1<\/p>\n\n\n\n<p>=9<\/p>\n\n\n\n<p>m9<\/p>\n\n\n\n<h4 class=\"wp-block-heading\"><strong>Maxterm<\/strong>s<\/h4>\n\n\n\n<p>A sum term of all the variables in the Product of Sum form in the expression. In Maxterm all complements(Barred) variable is represented by 1 and unbarred number is represented by 0.<\/p>\n\n\n\n<p>example (A+B+C&#8217;)(A+B&#8217;+C) <\/p>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td>A<\/td><td>B<\/td><td>Maxterm<\/td><td>Designator<\/td><\/tr><tr><td>0<\/td><td>0<\/td><td>A+B<\/td><td>0<\/td><\/tr><tr><td>0<\/td><td>1<\/td><td>A+B\u2019<\/td><td>1<\/td><\/tr><tr><td>1<\/td><td>0<\/td><td>A\u2019+B<\/td><td>2<\/td><\/tr><tr><td>1<\/td><td>1<\/td><td>A\u2019+B\u2019<\/td><td>3<\/td><\/tr><\/tbody><\/table><figcaption>Truth Table for Maxterms  Two variables<\/figcaption><\/figure>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td><strong>A<\/strong><\/td><td><strong>B<\/strong><\/td><td><strong>C<\/strong><\/td><td><strong>Maxterm<\/strong><\/td><td><strong>Designator<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B+C<\/strong><\/td><td><strong>0<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B+C\u2019<\/strong><\/td><td><strong>1<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B\u2019+C<\/strong><\/td><td><strong>2<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B\u2019+C\u2019<\/strong><\/td><td><strong>3<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B+C<\/strong><\/td><td><strong>4<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B+C\u2019<\/strong><\/td><td><strong>5<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B\u2019+C<\/strong><\/td><td><strong>6<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B\u2019+C\u2019<\/strong><\/td><td><strong>7<\/strong><\/td><\/tr><\/tbody><\/table><figcaption>Truth table for Maxterms Three variables <\/figcaption><\/figure>\n\n\n\n<figure class=\"wp-block-table\"><table><tbody><tr><td><strong>A<\/strong><\/td><td><strong>B<\/strong><\/td><td><strong>C<\/strong><\/td><td><strong>D<\/strong><\/td><td><strong>Maxterm<\/strong><\/td><td><strong>Designator<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B+C+D<\/strong><\/td><td><strong>0<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B+C+D\u2019<\/strong><\/td><td><strong>1<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B+C\u2019+D<\/strong><\/td><td><strong>2<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B+C\u2019D\u2019<\/strong><\/td><td><strong>3<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B\u2019+C+D<\/strong><\/td><td><strong>4<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B\u2019+C+D\u2019<\/strong><\/td><td><strong>5<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A+B\u2019+C\u2019+D<\/strong><\/td><td><strong>6<\/strong><\/td><\/tr><tr><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A+B\u2019+C\u2019+D\u2019<\/strong><\/td><td><strong>7<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B+C+D<\/strong><\/td><td><strong>8<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B+C+D\u2019<\/strong><\/td><td><strong>9<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B+C\u2019+D<\/strong><\/td><td><strong>10<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B+C\u2019+D\u2019<\/strong><\/td><td><strong>11<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B\u2019+C+D<\/strong><\/td><td><strong>12<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B\u2019+C+D\u2019<\/strong><\/td><td><strong>13<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>0<\/strong><\/td><td><strong>A\u2019+B\u2019+C\u2019+D<\/strong><\/td><td><strong>14<\/strong><\/td><\/tr><tr><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>1<\/strong><\/td><td><strong>A\u2019+B\u2019+C\u2019+D\u2019<\/strong><\/td><td><strong>15<\/strong><\/td><\/tr><\/tbody><\/table><figcaption>Truth table for Maxterms Four variables<\/figcaption><\/figure>\n\n\n\n<p>Q. Find out the designator of the maxterms A&#8217;+B&#8217;+C<\/p>\n\n\n\n<p>1+1+0       <\/p>\n\n\n\n<p>m(6)  <\/p>\n\n\n\n<h4 class=\"wp-block-heading\">Canonical forms for Boolean Expression<\/h4>\n\n\n\n<p>A Boolean expression composed completely either of minterms or maxterms refers to canonical expression. A canonical expression provides two ways to represents itself.<\/p>\n\n\n\n<p>a. Sum of Product(S-O-P)<\/p>\n\n\n\n<p>b. Product of Sum (P &#8211; O -S)<\/p>\n\n\n\n<h4 class=\"wp-block-heading\">Sum of Product(S-O-P)<\/h4>\n\n\n\n<p>A Boolean Expression when composed of purely  minterms is called Sum of Product(S-O-P) expression.<\/p>\n\n\n\n<p>example <strong>F=A&#8217;BC +AB&#8217;C+ABC&#8217;<\/strong><\/p>\n\n\n\n<h4 class=\"wp-block-heading\">Product of Sum (P &#8211; O -S)<\/h4>\n\n\n\n<p>A Boolean Expression when composed of purely maxterms is called Product of Sum (P &#8211; O -S) expression.<\/p>\n\n\n\n<p>example <strong>F=(A&#8217; +B+C ) ( A+ B&#8217;+C) ( A+B+C&#8217;<\/strong>)<\/p>\n\n\n\n<p>To be continued&#8230; Please check daily for more updates..<\/p>\n\n\n\n<p>Also Read Best concept :<\/p>\n","protected":false},"excerpt":{"rendered":"<p>In this topic we are going to learn best concept of Introduction to Boolean Algebra. This is very important for computer science students. Boolean Algebra is a kind of algebra that is used to analyze and simplify the logic circuits. Boolean algebra is frequently used in digital electronics. It is also known as Binary Algebra [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":227,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[5,9],"tags":[25,24,23,22,29,28,26,31,30,27],"class_list":["post-225","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-12th-computer-science","category-cbse-12th-computer-science","tag-and-operator","tag-boolean-operators","tag-boolean-variable","tag-introduction-to-boolean-algebra","tag-maxterms","tag-minterms","tag-or-operator","tag-product-of-sum-p-o-s","tag-sum-of-products-o-p","tag-truth-table"],"_links":{"self":[{"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/posts\/225","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/comments?post=225"}],"version-history":[{"count":2,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/posts\/225\/revisions"}],"predecessor-version":[{"id":228,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/posts\/225\/revisions\/228"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/media\/227"}],"wp:attachment":[{"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/media?parent=225"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/categories?post=225"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/aipsacademy.com\/blogs\/wp-json\/wp\/v2\/tags?post=225"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}