Which of the following is true?
(i) If p is a statement then `~p` is not a statement
(ii) If p is a statement then `~p` is also a statement
(iii) Negation of `''p:x` is a positive real number'' is , ''x is a negative real number''

Which of the following is true? (i) If p is a statement then ~p is not a statement (ii) If p is a statement then ~p is also a statement (iii) Negation of p : 0 is a positive number is, 0 is a negative number

If P(n) is the statement n^3+n is divisible 3 is the statement P(3) true ? Is the statement P(4) true?

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

For any statements p and q , the statement ~(~p^^q) is equivalent to

Show that the following statement is true by the method of contrapositive. p: If x is an integer and x^2 is even, then x is also even.

The statement prArr(q^^p) is negation of the statement

Show that he following statement is true by the method of contrapositive: p\ : If\ x is an integer x^2 is even then x is also even.

For the following question, choose the correct answer from the codes (a), (b), (c) and (d) defined as follows: Statement I is true, Statement II is also true; Statement II is the correct explanation of Statement I. Statement I is true, Statement II is also true; Statement II is not the correct explanation of Statement I. Statement I is true; Statement II is false Statement I is false; Statement II is true. Let a , b , c , p , q be the real numbers. Suppose alpha,beta are the roots of the equation x^2+2p x+q=0 and alpha,1/beta are the roots of the equation a x^2+2b x+c=0, where beta^2 !in {-1,0,1}dot Statement I (p^2-q)(b^2-a c)geq0 and Statement II b !in p a or c !in q adot

Write the negation of the following statement: There is a complex number which is not a real number.

For any statements p, show that . (i) p vee ~ p is a tautology , ( ii) p ^^ ~ p is a contradiction