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Minimize the Boolean expression using Boolean identities: A′B+ABC′+BC’+AB′C′.(a) B(AC)’ + AC’(b) AC’ + B’(c) ABC + B’ + C(d) BC’ + A’BI had been asked this question in an online interview.This intriguing question comes from Minimization of Boolean Functions topic in chapter Boolean Algebra and Modeling Computations of Discrete Mathematics

Answer» CORRECT choice is (a) B(AC)’ + AC’

To EXPLAIN: Given: A′B+ABC′+BC’+AB′C′

= A’B + BC’ (1 + A) + AB’C”

= A’B + BC’ + AB’C’

= A’B + BC’ + BC’ + AB’C’

= B(A’ + C’) + C’(A + AB’)

= B(AC)’ + C’ A(1 + B’)

= B(AC)’ + AC’.


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