The Boolean expression `(p wedge r) rarr (p vee r)` is equivalent to

If the Boolean expression (p oplusq)wedge (~p Theta q) is equivalent to p wedge q , where oplus, Theta in {vee, wedge} , then the ordered pair ( oplus, Theta ) is

The Boolean expression ~(pvvq)vv(~p^^q) is equivalent to (1) ~p (2) p (3) q (4) ~q

The Boolean Expression (p^^~ q)vvqvv(~ p^^q) is equivalent to : (1) ~ p^^q (2) p^^q (3) pvvq (4) pvv~ q

The boolean expression (p^^~q)vvqvv(~p^^q) is equivalent to

The proposition p to ~ (p^^~ q) is equivalent to

The logical statement [~(~pvvq)vv(p^^r)]^^(~q^^r) is equivalent to

Consider the following relations: R = {(x, y) | x, y are real numbers and x = wy for some rational number w}; S={(m/n , p/q)"m , n , pandqa r ei n t e g e r ss u c ht h a tn ,q"!="0andq m = p n"} . Then (1) neither R nor S is an equivalence relation (2) S is an equivalence relation but R is not an equivalence relation (3) R and S both are equivalence relations (4) R is an equivalence relation but S is not an equivalence relation

Let's find the L.C.M of the following algebraic expressions. (p+q) (q+r), (q+r)(r+p), (r+p)(p+q)

Write the following implications (p implies q) in the form (~P vee q) and hence write the negation of it. "If it rains, the humidity increases"

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