(b)~[(~p)^q] is logically equivalent to

~[(~p) ^^q] is logically equivalent to a) ~ (p vv q) b) ~ [p ^^ (~q)] c) p ^^ (~q) d) p vv (~q)

For any two statements p and q, ~(p vv q) vv (~p ^^ q) is logically equivalent to a)p b)-p c)q d)-q

Which of the following is logically equivalent to ~(~p rArr q) ?

The statement "~"(p rarrq) is equivalent to : a) p wedge(~q) b) ~p wedgeq c) p wedge q d) ~ p wedge ~q

Which of the following is true for any two statements p and q? a) ~(pv~q)=~p^q b)~p^q is a fallacy c) (pv~q) is a tautology d)pv~p is a contradiction

Let p, q, r be three simple statements. Then, ~(p vv q) vv ~ (p vv r) is equal to a) (~p) ^^ (~q vv ~ r) b) (~p) ^^ (q ^^ r) c) p ^^ (q vv r) d) p vv (q ^^ r)

Show that the relation R. in the set A of all points in a place given by R = {(P,Q): the distance of the points P from the point Q from the origin }, is an equivalence relation. Further show that the set of all points related to a point p != (0,0) is the circle passing through P with origin as centre.

Given a non empty set X , consider P(X) which is the set of all subsets of X . Define the relation R in P(X) as follows. For subsets A, B in P(X) , A R B if and only of A sub B . Is R an equivalence relation on P(X) . Justify your answer.

~[p vee (-q)] is equal to