p | ~P | ~P V P | ~P ᴧ P | (~P V P) V (~P ᴧ P) |
T | F | T | F | T |
F | T | T | F | T |
It is true in both th cases so answer is
Tautology
Construct a truth table for the following statement. Determine if the statement is a tautology, contradiction,...
Construct a truth table for the given statement. Identify if it is a tautology, contradiction, or neither. Fill in the truth table. -q Is the statement a tautology, contradiction, or neither? Contradiction O Tautology O Neither
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If p and q are statement variables. T is a tautology and c a contradiction. Applying properties simply statements 1 )~(pvq) 2) ~(~p) 3) P^(~pvq)
6 and 7 Question Completion Status: QUESTION 6 Determine whether the following compound proposition is a tautology, a contradiction, or a contingency. Ilo )(q )] + (0 ) o O A. All of the above OB. Tautology C. Contradiction D. Contingency QUESTION 7 Using the truth table determine if the following proposition is a tautology, a contradiction, or a contingency. [(p ) Ap] Tautology Contingency Contradiction None of the above QUESTIONS Fill out the truth table and decide if the...
Please generate a truth table and answer "Is the compound statement a tautology?" (p ↔ q) ↔ [ (q → p) ∨ (p → ~ q) ]
(d) Determine if the compound proposition is a tautology, contradiction or a contingency ( -1 (p + q) + np. Clearly justify your answer.