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Truth table:

P-----------Q-----------XOR-----------IMPLIES-----------IFF

T-----------T--------------F---------------T-----------------T

T-----------F--------------T---------------F-----------------F

F-----------T--------------T---------------T-----------------F

F-----------F--------------F---------------T-----------------T

I want to know how to calculate XOR, IMPLIES,IFF using only and,or,not operators. Say for example XOR is - " ( p || Q ) && ! ( a && b ) ".

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up vote 1 down vote accepted

Alright, a general way to solve this.

So, you have a truth table, like this:

P   Q   f(P, Q)
0   0   0
0   1   1
1   0   1
1   1   1

Now, you can start by transcribing each row with a 1 like this:

//Row 2            3            4
      (!P && Q) || (P && !Q) || (P && Q)

Now you have the expression in disjunctive normal form and you need to simplify it. We learned a systematic simplification process in school, but i don't really remember it (maybe you can try to search on the internet for something like DNF expression simplification). You can also try to do it using logical axioms, such as De Morgan's laws, but that wouldn't be completely systematic.

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  • XOR: (p || q) && !(p && q) or p ^ q or p != q
  • IMPLIES: (!p || q)
  • IFF: inverse of XOR?
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actually what is the process ...... is it induction or there are some systematic way to solve this. – Maruf Apr 21 '13 at 14:34

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