The statement (p⇒∼ p)∧(∼ p⇒p) is a:
Fallacy
p⇒q is false only if p is true and q is false. p∧q is true only if p and q are true. The truth table for (p⇒∼p)∧(∼p⇒p) is given below.
p∼pp⇒∼p∼p⇒p(p⇒∼p)∧(∼p⇒p)TFFTFFTTFF
The staement is always false. Hence, it is a fallacy.