Negation of a statement If P then Q

  • Thread starter Thread starter fk378
  • Start date Start date
fk378
Messages
366
Reaction score
0
"If P then Q"
Why is this logically equivalent to "Either P is false, or Q must be true"?? Can anyone explain this in plain English?

If P is "It is raining" and Q is "you will get wet", then how can Q be true if P is false ("It is not raining, and you will get wet")?
 
Last edited:
Physics news on Phys.org
That's not the negation. It's logically equivalent. If P is false, then saying "If P then Q" has no useful information. To say "If it is raining then you will get wet" doesn't tell you anything about whether you will get wet if it's not raining.
 
Oh sorry, I meant to ask why it is logically equivalent. Disregard the negation part, I will edit it now.
 
fk378 said:
"If P then Q"
Why is this logically equivalent to "Either P is false, or Q must be true"?? Can anyone explain this in plain English?

If P is "It is raining" and Q is "you will get wet", then how can Q be true if P is false ("It is not raining, and you will get wet")?
OR! "either it is not raining OR you get wet".
 
Yes but isn't this the inclusive OR? In which case one of the situations is that BOTH P and Q are true...
 
fk378 said:
Yes but isn't this the inclusive OR? In which case one of the situations is that BOTH P and Q are true...

Yes. In that case both the implication and the or statement are both true. Why is that a problem? Start making truth tables, ok?
 
Well "Either P is false, OR Q must be true"..."If it is not raining, you will get wet"

That is supposed to be true?
 
No! The implication is "P implies Q". NOT "not P implies Q". "If it IS raining, you will get wet." And WHAT is supposed to be true?? Any of these statements can by either true or false. What you are trying to show is that two of them are logically equivalent. Those two are not.
 
Inclusive or means A is true OR B is true OR both are true. As long as anyone of those is true, the statement is true.

Assuming the statement "if it is raining then you will get wet" is true, it certainly also true that "either it is not raining or you will get wet" is true. It happens that here they can't BOTH be true but they don't have to: only one of them has to be true.
 

Similar threads

Direct Proof that every zero of p(T) is an eigenvalue of T
Replies
24
Views
3K
How to Deny Universal and Existential Quantifiers in Logic?
Replies
2
Views
2K
Prove 9 is eigenvalue of ##T^2\iff## 3 or -3 eigenvalue of ##T##.
Replies
5
Views
2K
Discrete Math implications by rules of inference
Replies
3
Views
1K
Logic: proof that [p -> (q ^ r)] <=> [(p ^ -q) -> r]
Replies
3
Views
2K
B Vacuously true statements and why false implies truth
Replies
10
Views
5K
Proofs involving negations and conditionals
Replies
2
Views
2K
Conditional Probability and law of total probability
Replies
6
Views
2K
Proving Proposition: ##\forall x (P(x) \implies Q(x))##
Replies
2
Views
1K
I On the meaning of logical implication within specific context/models
Replies
22
Views
3K

Hot Threads

Recent Insights

Back
Top