STATEMENT-1 : (phArrq)=~ p hArr q and...

STATEMENT-1 : `(phArrq)=~ p hArr q`
and
STATEMENT-2 : `(phArrq) =~p hArr ~q`

A

Statement-1 is True, Statement-2 is True, Statement-2 is a correct explanation for Statement-1

B

Statement-1 is True, Statement-2 is True, Statement-2 is NOT a correct explanation for Statement-1

C

Statement-1 is True, Statement-2 is False

D

Statement-1 is False, Statement-2 is True

Text Solution

Verified by Experts

The correct Answer is:

A

Promotional Banner

Promotional Banner

Topper's Solved these Questions

MATHEMATICAL REASONING
AAKASH INSTITUTE|Exercise Assignment (SECTION-C) (Linked Comprehension Type Questions) (Comprehension-I)|3 Videos
LIMITS AND DERIVATIVES
AAKASH INSTITUTE|Exercise Section - j|3 Videos
MATRICES
AAKASH INSTITUTE|Exercise Assignment (Section - J) Aakash Challengers Questions|3 Videos

Similar Questions

Explore conceptually related problems

STATEMENT-1 : ~(phArrq)=~phArrq=phArr~q and STATEMENT-2 : (phArrq)hArrr=p hArr(q hArrr)

~(p hArr q) is

STATEMENT-1 : ~(prArrq)=p^^~q and STATEMENT-2 : p rArr q = ~p vvq

~(p harr q) is a

STATEMENT-1 : (p rArr q) hArr (~q rArr~p) and STATEMENT-2 : p rArr q is logically equivalent to ~q rArr ~p

~ ( p hArr q) is-

STATEMENT-1 : (p^^~q)^^(~p^^q) and STATEMENT-2 : (pvv~q) vv (~p ^^q)

STATEMENT-1 : p hArr ~q is true, when pis false and q is true. and STATEMENT-2 : p rArr ~q is true, when pis true and q is false, and -q ⇒ p is true, when q is false and p is true.

STATEMENT-1 : (p rArr ~q) ^^ (~q rArr q) is a contradication and STATEMENT-2 : The inverse of p rArr ~p " is " ~p rArr p

~(prArr q)hArr ~pvv p) is a

AAKASH INSTITUTE-MATHEMATICAL REASONING-Assignment (SECTION-D) (Assertion-Reason Type Questions)

Let p be the statement "It rains"! and q be the statement "It is cold"...
Text Solution
|
If p, q, r be anY three. statements STATEMENT-1 : pvv(q^^r)hArr(pvvq...
Text Solution
|
STATEMENT-1 : The converse of p rArr q " is " q rArr p and STAT...
Text Solution
|
STATEMENT-1 : ~(prArrq)=p^^~q and STATEMENT-2 : p rArr q = ~p ...
Text Solution
|
STATEMENT-1 : (phArrq)=~ p hArr q and STATEMENT-2 : (phArrq) ...
Text Solution
|
Let p be the statement "x is divisible b, 4" and q be the statement "x...
Text Solution
|
STATEMENT-1 : The inverse of (p^^~q) rArrr " is "~pvvqrArr ~r and ...
Text Solution
|
STATEMENT-1 : If (p^^~r)rArr(qvvr) is false and q and r are false , th...
Text Solution
|
STATEMENT-1 : p hArr ~q is true, when pis false and q is true. and ...
Text Solution
|
STATEMENT-1 : (p^^~q)^^(~p^^q) and STATEMENT-2 : (pvv~q) vv (~p...
Text Solution
|
STATEMENT-1 : (p rArr q) hArr (~q rArr~p) and STATEMENT-2 : p rA...
Text Solution
|
STATEMENT-1 : (p rArr ~q) ^^ (~q rArr q) is a contradication and ...
Text Solution
|
STATEMENT-1 : The dual statement of "xis a perfect square or xis a pri...
Text Solution
|
STATEMENT-1 : [p^^(pvvq)]vv[q^^(qvvp)]=pvvq and STATEMENT-2 : p...
Text Solution
|
STATEMENT-1 : ~(phArrq)=~phArrq=phArr~q and STATEMENT-2 : (phArr...
Text Solution
|