2 votes 2 votes A minimum sum-of-products expression of the function $F(w, x, y,z) = \Sigma m ( 0, 2, 5, 8, 10, 13, 14 )$ using Karnaugh map is: $x'z+xy+yxz$ $x'z' + xy'z + wyz'$ $x'z' + xy'z + wyz$ $x'z' + xy'z' + wyz$ Digital Logic tbb-digital-logic-2 + – Bikram asked Nov 26, 2016 edited Aug 19, 2019 by Counsellor Bikram 315 views answer comment Share Follow See all 0 reply Please log in or register to add a comment.
Best answer 1 votes 1 votes (B) is the correct option as shown follows: Vijay Thakur answered Jan 30, 2017 selected Jan 30, 2017 by Bikram Vijay Thakur comment Share Follow See all 0 reply Please log in or register to add a comment.
1 votes 1 votes Answer -- > F(w, x, y,z) = x ' z ' +xy' z+wyz' which is option B . Bikram answered Nov 26, 2016 Bikram comment Share Follow See all 3 Comments See all 3 3 Comments reply Abhinav93 commented Jan 11, 2017 reply Follow Share Sir I don,t think the answer is correct here terms 3,7,11 and 15 are present which gives w'x'yz+w'xyz+wx'yz+wxyz which minimizes to yz which is nowhere in the answer 1 votes 1 votes Bikram commented Jan 13, 2017 reply Follow Share plz check your calculation, given answer is correct , if possible post your complete solution. 0 votes 0 votes Bikram commented Jan 29, 2017 reply Follow Share @Abhinav93 Previously i did a mistake in the question itself , now corrected that mistake, this question is correct . Please solve it, draw the K-map for given minterms 0,2,5,8,10,13,14 . From the map, you will get F(w, x, y,z) = x′ z′ + xy′ z+ wyz′ . 0 votes 0 votes Please log in or register to add a comment.