Please help construct a proof (propositional logic)

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lostinspace89
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This is a two part question my book gives as practice problem. I, however am struggling to construct logical proofs and the book does not have a key. Thanks in Advance!


2a. Construct a proof, using any method (or rules) you want, that the following argument is valid:
Premises (3): – [A&B], – [B&C], A v C
Conclusion: – B
Be sure to explain your proof procedure.

2b. Construct a proof, using only the 10 basic (primitive) rules, that the same argument is valid.
 
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I do not understand the question enough to make a valid attempt as this is why I posted it in this forum...
 
Ok, thanks for your help.

Is there anyone out there willing to help guide me to finding a solution...
 
This is what I have so far. At this point I am unsure of where to go next:

-[A&B]
A
-[B&C]
A
[A v C]
A
-A
Line 1, &O
-[A v B]
Line 4, vI
-B
Line 2, &O
-[B v C]
Line 5, vI
 
lostinspace89 said:
This is what I have so far. At this point I am unsure of where to go next:

-[A&B]
A
-[B&C]
A
[A v C]
A
-A
Line 1, &O
-[A v B]
Line 4, vI
-B
Line 2, &O
-[B v C]
Line 5, vI
You're tryingn to prove the negation of (A&B) ...
 
Last edited:
Are you asking me if I am trying to prove the negation of (A&B)? I am trying to prove the conclusion -B
 
lostinspace89 said:
Are you asking me if I am trying to prove the negation of (A&B)? I am trying to prove the conclusion -B
OK I didn't understand what you meant.
 
I am not sure that the path I have chosen is correct. I feel like the entire question can be answered with one proof if that proof were to satisfy the requirements of question 2b. It could be applied as the answer to question 2a
 
Thanks for showing an attempt.
lostinspace89 said:
This is what I have so far. At this point I am unsure of where to go next:

-[A&B]
A
-[B&C]
A
[A v C]
A
-A
Line 1, &O
I don't see how this follows from line 1. Line 1 implies (-A v -B), but not necessarily -A.
-[A v B]
Line 4, vI
-B
Line 2, &O
-[B v C]
Line 5, vI

Another approach would be to try proof by contradiction, also referred to as an indirect proof.