# sum of products for that using k-map

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

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+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

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.

EDIT:

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

http://sourceforge.net/projects/gkmap/

It should convince you that your function is not simplifiable.

-
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