Section 2.5 Self Quiz

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
A ⊃ A

.

Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.

~(~B ∨ B)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
C ∨ (~C ⊃ C)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
D ≡ ~D

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
E ≡ (E ⊃ E)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
F ∨ (F ≡ F)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
(C · D) ≡ (C ⊃ ~D)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
(A ∨ B) ≡ (~B ⊃ A)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
(E · ~F) ∨ (F · ~E)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
(G ⊃ ~H) ∨ (H ⊃ ~G)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
(I · J) ⊃ ~J

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
[(K ∨ L) ⊃ M] ⊃ (M ⊃ K)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
[L ⊃ (M · N)] ⊃ (N ∨ ~L)

. Construct a complete truth table for the following propositions. Then, using the truth table, classify each proposition as a tautology, a contingency, or a contradiction. Justify your answers by appeal to the meanings of those terms.
[P ≡ (Q · R)] ⊃ ~(Q ⊃ ~R)

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
A ⊃ ~B and B ⊃ A

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
~O ⊃ P and O ∨ P

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
C ⊃ (D ∨ C) and C · ~D

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
~[(G ⊃ H) ∨ ~H] and ~G ⊃ G

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
I ≡ ~H and ~(~I ≡ H)

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
E ⊃ (F · E) and ~E · F

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
(G ∨ ~H) ⊃ G and ~G ≡ (~H · G)

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
~(J ∨ K) · L and (L ⊃ J) · K

. Construct a complete truth table for the following pairs of propositions. Then, using the truth tables, determine whether the statements are logically equivalent or contradictory. If neither, determine whether they are consistent or inconsistent. Justify your answers.
(~M ⊃ ~N) ∨ (O ≡ N) and (~M · N) · [(~O ∨ ~N) · (O ∨ N)]

Back to top