# What's the difference between the dual and the complement of a boolean expression?

Its the same thing right? Or is there a slight difference? I just wanna make sure I'm not misunderstanding anything.

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"A complement is a self-dual operation": en.wikipedia.org/wiki/Boolean_algebra –  paulsm4 Aug 2 '12 at 18:21

Boolean duals are generated by simply replacing ANDs with ORs and ORs with ANDs. The complements themselves are unaffected, where as the complement of an expression is the negation of the variables WITH the replacement of ANDs with ORs and vice versa.

Consider:

``````A+B
``````

Complement: `A'B'`

Dual: `AB`

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In duality, AND are replaced by OR operator and OR are replaced by AND operator but the complements remain the same.In complements AND or replaced by OR,OR will be replaced by AND, and the complements are also changed.

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"The Dual of an identity is also an identity. This is called the Duality Principle". A Boolean Identity is X+0=X or X+X=X. There's lots of them. Duals only work with identities. To find the Dual you switch operators (+ & .) and switch identity elements (0 & 1, if there are any 0's and 1's) to change X+0=X to X.1=X and to change X+X=X to X.X=X which creates new identities which are also valid. There is no meaning to creating a Dual from an arbitrary expression like X'Y+XY'=1. A Complement depends on an arbitrary expression like f1(x,y)=X'Y+XY', the complement of which would be f2(x,y)=(X+Y').(X'+Y) which if you plug values into f1(x,y) will give you the exact opposite results if the same values are plugged into f2(x,y). A Complement is formed by negating each variable and switching each operator.

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