How to prove A + A &#x2032; </msup> B + A &#x2032; </

Marianna Stone

Marianna Stone

Answered question

2022-05-21

How to prove A + A B + A B C + A B C D = A + B + C + D
Prove the above relationship by using the Boolean definition. I tried A + A B = A + B, but end up with A + B + A B ( C + D ), how can I go next?

Answer & Explanation

Alberto Duffy

Alberto Duffy

Beginner2022-05-22Added 5 answers

Step 1
First, A + A B = 1 A B .
Then 1 A B + A B C = 1 A B ( 1 C ) = 1 A B C .
Step 2
Same for the last term, and then 1 A B C D = A + B + C + D
Rocatiwb

Rocatiwb

Beginner2022-05-23Added 2 answers

Step 1
This is morally the same as the answer given by dxiv, but anyway the idea again is to exclusively use the identity suggested by the OP
A + B + C + D = A + B + ( C + D ) = A + B + ( C + C D ) = A + ( B + ( C + C D ) ) = A + ( B + B ( C + C D ) ) = A + ( B + B C + B C D ) = A + A ( B + B C + B C D ) = A + A B + A B C + A B C D
Step 2
Specifically this applies the identity "right to left" whereas the other answer applies the identity "left to right", again morally the same. Maybe some people find it easier to read this way.

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