1
Question
Consider
Statement I: (p∧∼q)∧(∼p∧q) is a fallacy.
Statement II: (p→q)↔(∼q→∼p) is a tautology.
Consider
Statement I: (p∧∼q)∧(∼p∧q) is a fallacy.
Statement II: (p→q)↔(∼q→∼p) is a tautology.
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Solution
The correct option is B Statement I is true, Statement II is true; Statement II is not a correct explanation for Statement I
Statement I: (p∧∼q)∧(∼p∧q)≡p∧∼q∧∼p∧q≡p∧∼p∧∼q∧q≡f∧f≡f
Hence, it is a fallacy statement.
So, Statement I is true.
Statement II
(p→q)↔(∼q→∼p)≡(p→q)↔(p→q) Which is always true, so Statement II is true.
Alternate Solution
Statement I (p∧∼q)∧(∼p∧q)
pq∼p∼qp∧∼q∼p∧q(p∧∼q)∧(∼p∧q)TTFFFF F TFFTTF F FTTFFT F FFTTFF F
Hence, it is a fallacy.
Statement II (p→q)↔(∼q→∼p)
∼q→∼p is contrapositive of p→q. Hence,
(p→q)↔(p→q) will be a tautology
Statement I: (p∧∼q)∧(∼p∧q)≡p∧∼q∧∼p∧q≡p∧∼p∧∼q∧q≡f∧f≡f
Hence, it is a fallacy statement.
So, Statement I is true.
Statement II
(p→q)↔(∼q→∼p)≡(p→q)↔(p→q)
Which is always true, so Statement II is true.
Alternate Solution
Statement I (p∧∼q)∧(∼p∧q)
pq∼p∼qp∧∼q∼p∧q(p∧∼q)∧(∼p∧q)TTFFFF F TFFTTF F FTTFFT F FFTTFF F
Hence, it is a fallacy.
Statement II (p→q)↔(∼q→∼p)
∼q→∼p is contrapositive of p→q. Hence,
(p→q)↔(p→q) will be a tautology
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