The statement` ~(pharr~q)` is

Prove that the statement - ~(pharr q) harr {(p^^~q) vv (~p^^q)} is a tautology.

Statements -1 : ~(pharr~q) is equivalent to p harr q Statement-2: ~( p harr ~q) is a tautology.

If p and q are two component statement then the negation of the compound statement phArrq is -

If p: 'Ram is tall' and q: 'Ram is intelligent' , then the statement ~p vvq is

In the truth table for the statements ( p to q) harr(~p vvq) , the last column has the truth value in the following order

The conditional statement (p^^q) to p is

Let p and q be two component statement of the compound statement phArrq . If the truth value of phArrq be " T" then the truth value of p and q are respectively -

If the statements (p^^~r) to (qvvr) , q and r are all false, then p

Consider the statements p , q and r Statement - I : Negation of statement p^^(qvvr) " is " ~pvv(~q^^~r) Statement - II : Negation of pvvq" is "(~p)^^(~q), and " negation of "p ^^q " is " (~p)vv(~q)