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I need to reduce this boolean expression to its simplest form. Its given that the simplest form contains 3 terms and 7 literals.

The expression is:

x'yz + w'x'z + x'y + wxy + w'y'z

We tried this in class, and even our recitation teacher could not figure it out.

Any help would be appreciated.

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What does x' mean vs. just x? Is it a derivative? Or something else? – RBarryYoung Apr 14 '10 at 0:55
@RBarryYoung: It's ¬x. – Ignacio Vazquez-Abrams Apr 14 '10 at 0:58
in boolean algebra, x' is not(x). as in, if x=0, then x' = 1. – xbonez Apr 14 '10 at 1:07
Sorry, I learned using Copi-type notation (Not A = "~A") rather than Church ("¬A") or the post-apostrophe style (" A' "). – RBarryYoung Apr 14 '10 at 11:31
up vote 1 down vote accepted

I'm a bit rusty with boolean algebra, but I think I've worked out how to do this. I'll let you do the working, but here are the basic steps:

1) Group the terms with y and eliminate what you can inside the brackets. Once expanded again, this will leave you with four terms and ten literals.

2) Eliminate the redundant term, leaving you with three terms and seven literals.

Hint: I first worked out the answer with a Karnaugh map, and then used regular boolean algebra to get to the solution :-)

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Agreed! "Cheat" by using the K-map first. ;-) +1 for ethical "cheating". – Peter K. Apr 14 '10 at 17:48

Try putting it into a Karnaugh Map.

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+1 K-Maps are really simple, and once you get used to them you can easily reduce any boolean function of four or less variables. – BlueRaja - Danny Pflughoeft Apr 14 '10 at 1:33
Karnaugh maps are great for this. I just worked this problem out myself, and it does simplify down a bit. – David Johnstone Apr 14 '10 at 2:07
yeah, we're just starting to learn K-maps, but this HW requires us to use boolean algebra and not K-maps – xbonez Apr 14 '10 at 2:51
@xbonez: But K-maps ARE boolean algebra, or at least another way of visualizing it. Aha! HW = HomeWork, not HW = HardWare. I see. Well, I advise looking at what the K-map is telling you about how to do the algebra. – Peter K. Apr 14 '10 at 17:47

Quine-McCluskey reduction is one of the strongest tools for this, although it can be labor-intensive.

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Like this:

x'y + wxy + w'y'z

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We generally don't just give answers to homework questions, but I guess this is okay, because you can actually simplify it more than this (assuming I didn't make a mistake, which is not always a safe assumption to make) :-) – David Johnstone Apr 14 '10 at 2:30
Yes, I am pretty sure that my answer is still one step away from done. :-) – RBarryYoung Apr 14 '10 at 2:39
Wow I really f'-ed my answer up - I made a mistake in my K-map. This answer is correct, but it can be reduced by removing exactly one literal, leaving 3 terms and 7 literals as required. – BlueRaja - Danny Pflughoeft Apr 14 '10 at 2:40
yep. _ _ (stupid char min!) – RBarryYoung Apr 14 '10 at 2:48
sadly, we're not allowed to use K-maps in this particular HW. we have to use boolean algebra. and I understand you guys dont give out answers to HW questions, and that is reasonable, but I actually tried working this one out for hours, and we even asked our recitation TA and she could not figure it out too – xbonez Apr 14 '10 at 2:53

Can we use groups?

w'z(x' + y') + y(x' + w)
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(Let me know if you want to know how I got there) – 500 - Internal Server Error Apr 15 '10 at 1:10
X'YZ + W'X'Z + X'Y + WXY + W'Y'Z
=  X'Y+W'X'Z+WXY+W'Y'Z      by absorption
=  WY+X'Y+W'X'Z+W'Y'Z       by absorption
=  W'Y'Z+WY+X'YZ+X'Y        by consensus
=  W'Y'Z+WY+X'Y         by absorption

Using tool at

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