Discrete Mathematics | 1st Edition | ISBN: 9781577667308 | Authors: Gary Chartrand, Ping Zhang
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It was proved in Theorem 11.63 that for every two elements a and b in a Boolean algebra

Chapter 11, Problem 1

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It was proved in Theorem 11.63 that for every two elements a and b in a Boolean algebra, a + b = a b. Without using the duality principle, prove that a b = a + b for all a, b S.

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