If p, q and r are integers, is `pq+r` even?
(1) `p+r` is even.
(2) `q+r` is odd.

Let p, q and r be three statements, then (~p to q) to r is equivalent to

The incorrect statement is (A) p →q is logically equivalent to ~p ∨ q. (B) If the truth-values of p, q r are T, F, T respectively, then the truth value of (p ∨ q) ∧ (q ∨ r) is T. (C) ~(p ∨ q ∨ r) = ~p ∧ ~q ∧ ~r (D) The truth-value of p ~ (p ∧ q) is always T

The positive integers p ,q and r are all primes if p^2 − q^2 = r , then possible value of r is 3 (b) 5 (c) 7 (d) 1

The positive integers p ,q and r all are prime if p^2-q^2=r , then possible value of r is 3 (b) 5 (c) 7 (d) 1

if p: q :: r , prove that p : r = p^(2): q^(2) .

If p,q and r are simple propositions such that (p^^q)^^(q^^r) is true, then

If p, q, r are any real numbers, then (A) max (p, q) lt max (p, q, r) (B) min(p,q) =1/2 (p+q-|p-q|) (C) max (p, q) < min(p, q, r) (D) None of these

If P(n) is the statement n^2+n is even, and if P(r) is true then P(r+1) is true.

If p,q,r be three distinct real numbers, then the value of (p+q)(q+r)(r+p), is