Proving Modus Tollens with Logical Equivalences. How would you prove modus tollens is a tautology using logical equivalences?

tashiiexb0o5c

tashiiexb0o5c

Answered question

2022-09-04

Proving Modus Tollens with Logical Equivalences
How would you prove modus tollens is a tautology using logical equivalences?
So far, I have reduced it using implication logical equivalence, demorgan's law, and double negation and got it to the form of:
q or ( p   a n d   q )   o r   n o t   p = T
From there, I can't figure out how to make it always imply T. Because I tried it distributing it, but then it became something like
(q or p) and ( q   o r   p ) o r p which should be become (q or p) and p but that doesn't result in a tautology. What mistake am I making?

Answer & Explanation

Karla Bautista

Karla Bautista

Beginner2022-09-05Added 16 answers

Explanation:
( ( p q ) ¬ q ) ¬ p ( ( ¬ p q ) ¬ q ) ¬ p ¬ ( ( ¬ p q ) ¬ q ) ¬ p ( ¬ ( ¬ p q ) q ) ¬ p ¬ ( ¬ p q ) ( q ¬ p ) ¬ ( ¬ p q ) ( ¬ p q )

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