I am teaching myself Boolean Algebra.
I was hoping someone could correct the following if I'm wrong.
Question:
Using Boolean Algebra prove that A(A+B)=A.
A(A+B) would mean A and ( A or B).
My Answer:
A(A+B) = A(A(1+B)) = A(A1) = AA = A.
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1This is just the absorption law btw.– haroldJan 17, 2016 at 19:38
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I realise that but I have been asked to prove it's correct– user5802378Jan 17, 2016 at 19:41
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Could you annotate the steps? I don't see what rule you used in the first step– haroldJan 17, 2016 at 19:42
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cdf.toronto.edu/~ajr/258/notes/absorption-proofs.html so where's the problem?– timgebJan 17, 2016 at 19:44
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2That doesn't look right, A(1+B) doesn't even depend on B, but A+B does.– haroldJan 17, 2016 at 19:50
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2 Answers
Distribute A first, as such:
A(A+B)=A
AA+AB=A
A+AB=A
A(1+B)=A
A(1)=A
A=A
You seemed to skip a couple steps within your first step: you essentially stated A+B=1+B, which is not always correct.
Let me introduce you to propositional logic. We use the notions below to denote and, or, and logically equivalent respectively:
Below is your equation rewritten to use this notion:
To complete the proof, 3 laws are applied. At line 2, the distributed law is applied for reduction, the idempotent law is applied at line 3, and the absorption law is applied at line 4:
And this completes the proof.
