9786131174162 - canonical form (boolean algebra): boolean algebra (logic), boolean function, canonical form (4 Ergebnisse)

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Taschenbuch. Zustand: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -High Quality Content by WIKIPEDIA articles! In Boolean algebra, any Boolean function can be expressed in a canonical form using the dual concepts of minterms and maxterms. Minterms are called products because they are the logical AND…of a set of variables, and maxterms are called sums because they are the logical OR of a set of variables (further definition appears in the sections headed Minterms and Maxterms below). These concepts are called duals because of their complementary-symmetry relationship as expressed by De Morgan's laws, which state that AND(x,y,z.) = NOR(x',y',z'.) and OR(x,y,z.) = NAND(x',y',z'.) (the apostrophe ' is an abbreviation for logical NOT, thus ' x' ' represents ' NOT x ', the Boolean usage ' x'y + xy' ' represents the logical equation ' (NOT(x) AND y) OR (x AND NOT(y)) '). The dual canonical forms of any Boolean function are a 'sum of minterms' and a 'product of maxterms.' The term 'Sum of Products' or 'SoP' is widely used for the canonical form that is a disjunction (OR) of minterms. Its De Morgan dual is a 'Product of Sums' or 'PoS' for the canonical form that is a conjunction (AND) of maxterms. 80 pp. Englisch.

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Taschenbuch. Zustand: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - High Quality Content by WIKIPEDIA articles! In Boolean algebra, any Boolean function can be expressed in a canonical form using the dual concepts of minterms and maxterms. Minterms are called products because they are the logical AND of a…set of variables, and maxterms are called sums because they are the logical OR of a set of variables (further definition appears in the sections headed Minterms and Maxterms below). These concepts are called duals because of their complementary-symmetry relationship as expressed by De Morgan's laws, which state that AND(x,y,z.) = NOR(x',y',z'.) and OR(x,y,z.) = NAND(x',y',z'.) (the apostrophe ' is an abbreviation for logical NOT, thus ' x' ' represents ' NOT x ', the Boolean usage ' x'y + xy' ' represents the logical equation ' (NOT(x) AND y) OR (x AND NOT(y)) '). The dual canonical forms of any Boolean function are a 'sum of minterms' and a 'product of maxterms.' The term 'Sum of Products' or 'SoP' is widely used for the canonical form that is a disjunction (OR) of minterms. Its De Morgan dual is a 'Product of Sums' or 'PoS' for the canonical form that is a conjunction (AND) of maxterms.

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Taschenbuch. Zustand: Neu. Canonical Form (Boolean algebra) | Boolean Algebra (logic), Boolean Function, Canonical Form | Lambert M. Surhone (u. a.) | Taschenbuch | Englisch | 2026 | OmniScriptum | EAN 9786131174162 | Verantwortliche Person für die EU: preigu GmbH & Co. KG, Lengericher Landstr. 19, 49078 Osnabrück, mail[at]preig…u[dot]de | Anbieter: preigu Print on Demand.

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Taschenbuch. Zustand: Neu. This item is printed on demand - Print on Demand Titel. Neuware -Please note that the content of this book primarily consists of articlesavailable from Wikipedia or other free sources online. In Booleanalgebra, any Boolean function can be expressed in a canonical form usingthe dual concepts of minterms… and maxterms. Minterms are called productsbecause they are the logical AND of a set of variables, and maxterms arecalled sums because they are the logical OR of a set of variables(further definition appears in the sections headed Minterms and Maxtermsbelow). These concepts are called duals because of theircomplementary-symmetry relationship as expressed by De Morgan's lawswhich state that AND(x,y,z.) = NOR(x',y',z'.) and OR(x,y,z.) =NAND(x',y',z'.) (the apostrophe ' is an abbreviation for logical NOTthus ' x' ' represents ' NOT x ', the Boolean usage ' x'y + xy' 'represents the logical equation ' (NOT(x) AND y) OR (x AND NOT(y)) ').The dual canonical forms of any Boolean function are a 'sum of minterms'and a 'product of maxterms.' The term 'Sum of Products' or 'SoP' iswidely used for the canonical form that is a disjunction (OR) ofminterms. Its De Morgan dual is a 'Product of Sums' or 'PoS' for thecanonical form that is a conjunction (AND) of maxterms.VDM Verlag, Dudweiler Landstraße 99, 66123 Saarbrücken 80 pp. Englisch.