# How do I express a boolean expression comprised of AND, OR and NOT using only AND and NOT?

Say I have the following boolean expression:

``````(A^B^C) v (~A^~C)
``````

How could I express that using only AND (^) and NOT (~)? I don't want the answer, just how I would go about doing it.

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Google deMorgan's Law (and, possibly, "functional completeness")? And what does this have to do with assembly? –  Wooble Jan 24 at 16:05
It's the beginning part of an Assembly course online. –  Doug Smith Jan 24 at 16:09
With DeMorgan's Law, I could apply ~~ to both, right? Is that what I should be doing? I tried that and it came out awfully long. –  Doug Smith Jan 24 at 16:10
`(A v B) == ~(~A ^ ~B)` is the transformation you're looking for. –  Wooble Jan 24 at 16:13
You can make use of De Morgan's laws as shown here: en.wikipedia.org/wiki/De_Morgan's_laws –  Neha Sharma Feb 25 at 14:41
Since this question is showing up as unanswered, I'll echo the others and say that De Morgan's law `(A v B) == ~(~A ^ ~B)` will work.