Consider: Statement I: (p wedge ~q) ...

Consider:
Statement I:
`(p wedge ~q) wedge (~p wedge q)` is a fallacy.
Statement II:
`(p rarr q) harr (~q rarr ~p)` is a tautology.

A

Statement I is true, statement II is true, statement II is a correct explanation for statement I.

B

Statement I is true, statement II is true, statement II is not a correct explanation for statement I.

C

Statement I is true, statement II is false

D

Statement I is false, statement II is true.

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The correct Answer is:

B

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Consider: Statement I: `(p wedge ~q) wedge (~p wedge q)` is a fallacy. Statement II: `(p rarr q) harr (~q rarr ~p)` is a tautology.

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Consider:
Statement I:
`(p wedge ~q) wedge (~p wedge q)` is a fallacy.
Statement II:
`(p rarr q) harr (~q rarr ~p)` is a tautology.