The statement ''If `x^(2)` is not even, then x is not even'' is coverse of the statement

The statement ' If x ^ 2 is not even then x is not even ' converse is

If f(x) is an even function , then f'(x) is

Write the converse of the following statements. (i) If a number n is even, then n^(2) is even. (ii) If you do all the exercises in the book, you get an A grade in the class. (iii) If two integers a and b are such that a gt b , then a -b is always a positive integer.

If x = 4 and y = -3 , then 2x-y =11 . The contrapositive of this statement is

The negation of the statement "If x in A nu B then x in A and x in B " is

" If x - 2 = 3 and y = -2 then 2x + y = 3 " The contrapositive of this statement is

Let p be the statement ''x is an irrational number'', q be the statement'' y is a transcendental number'' and r be the statement'' x is a rational number iff y is a transcendental number.'' Statement-1 : r is equivalent to either q or p Statement-2 : r is equivalent to ~(p iff~q) .

For each of the following compound statements first identify the connecting words and then break it into component statements. x = 2 and x = 3 are the roots of the equation 3x^(2)-x-10 = 0.

The negation of the statement "If x in A uu B then x in A and x in B " is