-1

This is the answer to the equation, but I do not understand why. Please help!

  • Try expanding B + NOT(B*C). – Light Nov 20 '20 at 11:32
  • 2
    I’m voting to close this question because it's about boolean algebra, not programming. – Nick Nov 21 '20 at 11:43
  • But I tagged boolean algebra into the question so obviously it's about that?! – Programmer46234 Nov 22 '20 at 1:27
0

If you apply the Laws of Boolean Algebra one by one, the solution is a direct result:

  1. de Morgan´s Theorem: The complement of two terms joined together by OR is the same as the complements of two terms joined by AND, and vice versa (i.e. NOT(A + B) = NOT(A) * NOT(B) and NOT(A * B) = NOT(A) + NOT(B)).
  2. Commutative Law: The order of joining two separate terms with AND or OR is not important.
  3. Complement Law: A term joined with its complement with AND equals 0 respectively with OR equals 1 (i.e. A * NOT(A) = 0 and A + NOT(A) = 1).
  4. Annulment Law: A term joined with AND with 0 equals 0 and joined with OR with a 1 equals 1 (i.e. A * 0 = 0 and A + 1 = 1).
  5. Identity Law: A term joined with 1 by AND or with 0 by OR is equal to itself (i.e. A * 1 = A and A + 0 = A).

(there are more, but you don't need them here)

Applied to your term:

              (A + NOT(B*C))        * (B + NOT(B*C))        * (C + NOT(B*C)) 
[with 1.]   = (A + NOT(B) + NOT(C)) * (B + NOT(B) + NOT(C)) * (C + NOT(B) + NOT(C))
[with 2.]   = (A + NOT(B) + NOT(C)) * (B + NOT(B) + NOT(C)) * (C + NOT(C) + NOT(B))
[with 3.]   = (A + NOT(B) + NOT(C)) * (1          + NOT(C)) * (1          + NOT(B))      
[with 4.]   = (A + NOT(B) + NOT(C)) *  1                    *  1      
[with 5.]   = (A + NOT(B) + NOT(C))  
[with 1.]   = (A + NOT(B*C))                                 

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