If R is the set of real numbers and Q is the set of rational numbers, then what is `R – Q`?

If p, q, r are real numbers then:

R is a relation over the set of real numbers and it is given by mn ge 0 . Then R 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) .

If R is the set of all real numbers, what do the cartesian products R xx R and R xx R xx R represent?

If R denotes the set of all real numbers then the function f: RtoR defined f(x) = |x|

If R denotes the set of all real numbers than the function f : R rarr R defined by f(x) = |\x |

P is the set of factors of 5, Q is the set of factors of 25 and R is the set of factors of 125. Which of the following is false? (A) P subset Q (B) Q subset R (C) R subset P (D) P subset R

Define ** on the set of real number by a ** b = 1 + ab . Then the operation ** is

Define ** on the set of real number by a** b=1 + ab . Then the operation * is

If R, is the set of all non - negative real numbers prove that the function f:R_(+) to [-5, infty]" defined by "f(x)=9x^(2)+6x-5 is invertible. Write also f^(-1)(x) .