``````(ab+cd)(a'b'+c'd') = 1+ abc'd' + a'b'cd +1
``````

so I'm stuck at

``````abc'd'+a'b'cd
``````

``````(a+b)(c+d)+(a'+b')(c'+d')
``````

What am I missing?

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Did you mean to have `0`s there instead? –  Ignacio Vazquez-Abrams Jul 22 '12 at 0:23
where? in my answer or the correct final answer or in the question? –  True Programmer Jul 22 '12 at 0:42
At your first simplification. –  Ignacio Vazquez-Abrams Jul 22 '12 at 0:43
oh yeah, sorry bout that –  True Programmer Jul 22 '12 at 1:01

It seems to me that those two expressions are complementary, i.e. the only two cases where `(a+b)(c+d)+(a'+b')(c'+d')` are false are `abc'd'` and `a'b'cd`.

Edit: Somewhere along the line I think you've lost a `'` and you're actually looking for one of these:

``````((ab+cd)(a'b'+c'd'))'
(ab+cd)'+(a'b'+c'd')'
((ab)'(cd)')+((a'b')'(c'd')')
(a'+b')(c'+d')+(a+b)(c+d)
(a+b)(c+d)+(a'+b')(c'+d')

(ab+cd)(a'b'+c'd')
(a'b'+c'd')(ab+cd)
((a+b)'+(c+d)')((a'+b')'+(c'+d')')
((a+b)(c+d))'((a'+b')(c'+d'))'
((a+b)(c+d)+(a'+b')(c'+d'))'
``````
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huh wait.. i know what the law of complementary is but i dont understand, is my current answer in the wrong track? –  True Programmer Jul 21 '12 at 22:26
I don't know, maybe you you were actually supposed to take the complement of the original expression? –  Neil Jul 21 '12 at 22:29
I was supposed to simplify this (ab+cd)(a'b'+c'd') –  True Programmer Jul 21 '12 at 22:44

you cannot prove that `(ab+cd)(a'b'+c'd') = (a+b)(c+d)+(a'+b')(c'+d')` because it is not true.

take `a=b=1, c=d=0`:

`(ab+cd)(a'b'+c'd') = (1+0)(0+1) = 1`

but

`(a+b)(c+d)+(a'+b')(c'+d') = (1*0)+(0*1) = 0`

(assuming `x'` is "not")

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