Q. Consider the minterm list form of a Boolean function πΉ given below.
πΉ(π, π, π , π) = β π(0, 2, 5, 7, 9, 11) + π(3, 8, 10, 12, 14)
Here, π denotes a minterm and π denotes a donβt care term. The number of essential prime implicants of the function πΉ is_______.
Ans: 3
Sol:
Essential Prime Implicants are those subcubes (groups) which cover atleast one minterm that canβt be covered by any other prime implicant. Essential prime implicants (EPI) are those prime implicants which always appear in final solution.
There are three prime implicants PβQS, PQβ and QβSβ. Also, all of them are essential. Therefore, the number of essential prime implicants of function F is 3.
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