Advances and Applications in Discrete Mathematics
Volume 4, Issue 2, Pages 147 - 150
(October 2009)
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ARITHMETIC VERSION OF BOOLEAN ALGEBRA
M. Azram (Malaysia), Jamal I. Daoud (Malaysia) and Faiz A. M. Elfaki (Malaysia)
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Abstract: In this paper, we discuss that the logical results in Boolean algebra can equally be derived with ordinary algebraic operations. We establish arithmetic versions of the common logical propositions inclusive of Sheffer stroke (Nand connective) and Peirce’s arrow (Nor connective) which are very important to design circuit diagrams. We present the comparison of some basic logical Boolean expressions and their arithmetic versions through the truth tables. Finally, we establish the fundamental logical equivalent proposition via arithmetic versions. |
Keywords and phrases: Boolean algebra, Sheffer stroke, arithmetic version, conjunction statement. |
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