(P_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_‚ÄÖ√Ñ√∂‚ÀÖ‚Ä†¬¨√Ü_(Q_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_IS_LOGICALLY_EQUIVALENT_TO:?$#

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r

(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r

(p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r

(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r

¬¨¬®¬¨¬Æ_(p_‚Äö√Ñ√∂‚àö√∫‚àö√Ü_q)_is_logically_equivalent_to:$#

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q

p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æq

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æq

¬¨¬®¬¨¬Æq ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æp

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r) is logically equivalent to?#

p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)

p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º r)

p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)

p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)

p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º r)

p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q is logically equivalent to:#

(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º p)

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)

(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º p)

¬¨¬®¬¨¬Æ (p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q) is logically equivalent to:$

¬¨¬®¬¨¬Æp‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq

q‚Äö√Ñ√∂‚àö√∫‚àö√Üp

p‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq

¬¨¬®¬¨¬Æp‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq

¬¨¬®¬¨¬Æq‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æp

p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q is logically equivalent to:$

¬¨¬®¬¨¬Æq ‚Äö√Ñ√∂‚àö√∫‚àö‚â† ¬¨¬®¬¨¬Æp

q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö‚â† ¬¨¬®¬¨¬Æq

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q

The compound propositions p and q are called logically equivalent if ________ is a tautology.

p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q

p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q

p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q

¬¨¬®¬¨¬Æ (p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q)

¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü ¬¨¬®¬¨¬Æq

14 + Mcqs in Logical Equivalences in Discrete Mathematics Page 1 McqOptions

1.	(p → r) ∨ (q → r) is logically equivalent to ________
A.	(p ∧ q) ∨ r
B.	(p ∨ q) → r
C.	(p ∧ q) → r
D.	(p → q) → r
Answer» D. (p → q) → r

Discussion

2.	(p → q) ∧ (p → r) is logically equivalent to ________
A.	p → (q ∧ r)
B.	p → (q ∨ r)
C.	p ∧ (q ∨ r)
D.	p ∨ (q ∧ r)
Answer» B. p → (q ∨ r)

Discussion

3.	p ↔ q is logically equivalent to ________
A.	(p → q) → (q → p)
B.	(p → q) ∨ (q → p)
C.	(p → q) ∧ (q → p)
D.	(p ∧ q) → (q ∧ p)
Answer» D. (p ∧ q) → (q ∧ p)

Discussion

4.	p ∧ q is logically equivalent to ________
A.	¬ (p → ¬q)
B.	(p → ¬q)
C.	(¬p → ¬q)
D.	(¬p → q)
Answer» B. (p → ¬q)

Discussion

5.	¬ (p ↔ q) is logically equivalent to ________
A.	q↔p
B.	p↔¬q
C.	¬p↔¬q
D.	¬q↔¬p
Answer» C. ¬p↔¬q

Discussion

6.	p ∨ q is logically equivalent to ________
A.	¬q → ¬p
B.	q → p
C.	¬p → ¬q
D.	¬p → q
Answer» E.

Discussion

7.	p → q is logically equivalent to ________
A.	¬p ∨ ¬q
B.	p ∨ ¬q
C.	¬p ∨ q
D.	¬p ∧ q
Answer» D. ¬p ∧ q

Discussion

8.	(P_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_‚ÄÖ√Ñ√∂‚ÀÖ‚Ä†¬¨√Ü_(Q_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_IS_LOGICALLY_EQUIVALENT_TO:?$#
A.	(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r
B.	(p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r
C.	(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r
D.	(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r
Answer» D. (p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r

Discussion

9.	¬¨¬®¬¨¬Æ_(p_‚Äö√Ñ√∂‚àö√∫‚àö√Ü_q)_is_logically_equivalent_to:$#
A.	p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æq
B.	¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q
C.	¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æq
D.	¬¨¬®¬¨¬Æq ‚Äö√Ñ√∂‚àö√∫‚àö√Ü ¬¨¬®¬¨¬Æp
Answer» B. ¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q

Discussion

10.	(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r) is logically equivalent to?#
A.	p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º r)
B.	p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)
C.	p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)
D.	p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º r)
Answer» B. p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü r)

Discussion

11.	p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q is logically equivalent to:#
A.	(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)
B.	(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)
C.	(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p)
D.	(p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º p)
Answer» D. (p ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º q) ‚Äö√Ñ√∂‚àö√∫‚àö‚â† (q ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º p)

Discussion

12.	¬¨¬®¬¨¬Æ (p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q) is logically equivalent to:$
A.	q‚Äö√Ñ√∂‚àö√∫‚àö√Üp
B.	p‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq
C.	¬¨¬®¬¨¬Æp‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq
D.	¬¨¬®¬¨¬Æq‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æp
Answer» C. ¬¨¬®¬¨¬Æp‚Äö√Ñ√∂‚àö√∫‚àö√Ü¬¨¬®¬¨¬Æq

Discussion

13.	p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q is logically equivalent to:$
A.	¬¨¬®¬¨¬Æq ‚Äö√Ñ√∂‚àö√∫‚àö‚â† ¬¨¬®¬¨¬Æp
B.	q ‚Äö√Ñ√∂‚àö√∫‚àö‚â† p
C.	¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö‚â† ¬¨¬®¬¨¬Æq
D.	¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q
Answer» E.

Discussion

14.	The compound propositions p and q are called logically equivalent if ________ is a tautology.
A.	p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q
B.	p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q
C.	¬¨¬®¬¨¬Æ (p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q)
D.	¬¨¬®¬¨¬Æp ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü ¬¨¬®¬¨¬Æq
Answer» B. p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q

Discussion

Explore topic-wise MCQs in Discrete Mathematics.

(p → r) ∨ (q → r) is logically equivalent to ________

(p → q) ∧ (p → r) is logically equivalent to ________

p ↔ q is logically equivalent to ________

p ∧ q is logically equivalent to ________

¬ (p ↔ q) is logically equivalent to ________

p ∨ q is logically equivalent to ________

p → q is logically equivalent to ________

(P_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_‚ÄÖ√Ñ√∂‚ÀÖ‚Ä†¬¨√Ü_(Q_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚ÀÖ‚Â†_R)_IS_LOGICALLY_EQUIVALENT_TO:?$#

¬¨¬®¬¨¬Æ_(p_‚Äö√Ñ√∂‚àö√∫‚àö√Ü_q)_is_logically_equivalent_to:$#

(p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† q) ‚Äö√Ñ√∂‚àö‚Ä†‚àö√º (p ‚Äö√Ñ√∂‚àö√∫‚àö‚â† r) is logically equivalent to?#

p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q is logically equivalent to:#

¬¨¬®¬¨¬Æ (p ‚Äö√Ñ√∂‚àö√∫‚àö√Ü q) is logically equivalent to:$

p ‚Äö√Ñ√∂‚àö‚Ä†¬¨√Ü q is logically equivalent to:$

The compound propositions p and q are called logically equivalent if ________ is a tautology.