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I have a logic question:

If I have: f(A,B,C,D) = M(4,7,8,11).D(1,2,13,14)

what would be the sum of products for that using k-map (please note that this is big-m and you have to find the answer in the sum of products)

I drew the k-map, the problem is, I can't find a way to cover the zeros without having to state 4 terms each with 4 boolean terms (A,B,C,and D) without using the D terms, is that right?

Note: this is a homework question, i don't want the answer as much as i want to be able to solve this myself.

00 | 1 | 0 | 1 | 0 |
01 | x | 1 | x | 1 |
11 | 1 | 0 | 1 | 0 |
10 | x | 1 | x | 1 |
     00  01  11  10

I edited the map because it was made for little m and this is big m

share|improve this question
+1: for the note – Kornel Kisielewicz Jan 19 '10 at 0:11
I am just guessing that M lists when it should be 1 and Ds are dont-cares? Please do elaborate! – Hamish Grubijan Jan 19 '10 at 0:15
yeah it is Karnaugh Map and M is big-M while Ds are don't cares (big-M is where the result is represented in product of sums) – user220755 Jan 19 '10 at 0:37
How about showing us your Karnaugh map? You show us yours and we'll... well, you know. Make up an answer. – Wayne Conrad Jan 19 '10 at 1:13
The Karnaugh map looks like a quarter of a chessboard. With labels 00, 01, 11, 10 along the x and y axis, it looks like this: 0101\nx0x0\n0101\nx0x0 Here the origin is in the top left corner, x runs from left to right, and y runs from top to bottom. – Hamish Grubijan Jan 19 '10 at 1:16
up vote 2 down vote accepted

It looks like this:

\ AB 00 01  11  10
CD +---+---+---+---+
00 | 0 | 1 | 0 | 1 |
01 | x | 0 | x | 0 |
11 | 0 | 1 | 0 | 1 |
10 | x | 0 | x | 0 |

Simplest answer = OR(AND(*,*,*,*), AND(*,*,*,*), AND(*,*,*,*), AND(*,*,*,*)) where
You can use A, B, C, D, NOT(A), NOT(B), NOT(C), NOT(D) instead of *

Haha, this questions is constructed like that on purpose!

They asked you for worst case imaginable.

The don't-cares do not help AT ALL and the ones aren't next to each other.

When you have the (at most 4x4 because you can visualize that) K-map drawn out, do not bother to cover zeroes instead of ones hoping that it will be simpler.

When in k-map, it should be all there in front of you.

This was a trick question. For extra points you can reason why the circuit is not simplifiable, perhaps look it up in the literature. Also, there is a great deal of symmetry here, so perhaps you can get creative when you draw out the corresponding circuit. If you do it right, the picture should look very nice.


You can install this software for Linux and play with it:

It should convince you that your function is not simplifiable.

share|improve this answer
I edited the map because it was made for little m and this is big m – user220755 Jan 19 '10 at 8:02
I do not understand the difference between M and m, I had to guess. Please do not assume that we used the same notation 5-50 years ago when learning this subject. – Hamish Grubijan Jan 19 '10 at 15:05
Actually, I take it back - the formula is NOT(OR(AB, nAnB, CnD, nCD)), which is pretty simple, but is not the standard form. Here nA = NOT(A). When you switch between m and M, you either keep the first NOT or not. I am not sure what sort of answer your teacher expects. Do play with the software please. – Hamish Grubijan Jan 19 '10 at 15:10

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