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

Form the biconditional statement p hArr q , given, p: The unit digits of an interger is zero. q: It is divisible by 5.

The statement ~(p ^^ q) vv q

The logical statement (p to q) vv (q to ~ p) is :

The compound statement p to ( ~ p ^^ q) is false, then the truth values of p and q are respectively.

The following statement (p to q) to [(~p to q) to q] is

Let p be "x is a fruit, " and let q be " x is ripe." Under what conditions is the statement p implies q false ?

Construct the truth table for the followings statements : (a) (p^^q) to ~ p " " (b) (p^^q) to (pvvq) (c) (p^^q) to r " " (d) [p^^(~r)] to (qvvr)

Statements (p to q) harr (q to p)

The statement p vv q is

Construst truth tables for the following statements : ~(p ^^-q) " "(ii) ~[(~p) vee(~q)] " "(iii) (p ^^q) ^^ (~p)