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I have a task that's driving me crazy because i have no clue where to start.

The task is the following: Convert the given boolean expression so that it only contains NAND operations and no negations.

c * b * a + /c * b * /a

I assume that it's possible, :D but i have no idea how to do it and spent several hours just for spinning in circles.

Could someone please point me in the right direction?

Best regards,
askin

Update:

thanks to the answers I think I found the solution:

c*b*a = /(/(c*b*a)*/(c*b*a)) = A; 

/c*b*/a = /(/(/(a*a)*b*/(c*c))*/(/(a*a)*b*/(c*c))) = B; 

c*b*a+/c*b*/a = A + B = /(/(A*A)*/(B*B))
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You should build /A and /B because you need inverter for OR anyway. Two inverter in series could replaced by "nothing". This will save you 4 NAND-gates –  stefan bachert Mar 24 '12 at 11:11

3 Answers 3

up vote 1 down vote accepted

This has a breakdown of how to build other logic gates via NAND. Should be a straightforward application:

http://en.wikipedia.org/wiki/NAND_logic

E.g. C = A AND B is equivalent to

C = NOT (A NAND B)  
or
C' = (A NAND B)
C = C' NAND C'   (effectively NOT'ing A NAND B)
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many thanks! "NAND logic" thats it I think :) ...lets see if I get the task solved :) –  Askin Geeks Mar 23 '12 at 20:25

For a good in-depth discussion of how to build boolean expressions with only one kind of function/logic gate (in this case, NOR, but changing it to NAND is straightforward), have a look at

The Pragmatic Programmer Magazine 2012-03: The NOR Machine

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many thanks for the link! :) –  Askin Geeks Mar 23 '12 at 20:26
c * b * a + /c * b * /a

only NAND

/( /(c * b * a)  *  /( /(c * c) * b * /(a * a) ) )

NAND( NAND(c,b,a) , NAND( NAND(c,c), b, NAND (a, a)))

So you need, two 3 gate NAND, three 2 gate NAND.

NOT (A) = NAND (A,A)

A OR B = NAND (NAND (A, A), NAND(B, B))

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many thanks in the meantime i tried it myself and my resulting expression looks a bit more blown-up: c*b*a = /(/(c*b*a)*/(c*b*a)) = A; /c*b*/a = /(/(/(a*a)*b*/(c*c))*/(/(a*a)*b*/(c*c))) = B; A + B = /(/(AA)*/(BB)) –  Askin Geeks Mar 23 '12 at 21:07

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