`Q uu Z = Q`, where Q is the set of rational numbers and Z is the set of integers.

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

If the relation f(x)={(1",",x in Q),(2",",x notin Q):} where Q is set of rational numbers, then find the value f(pi)+f((22)/(7)) .

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

Which of the following sets of real numbers is such that if x is an element of the set and y is an element of the set, then the sum of x and y is an element of the set ? I. The set of negative integers II. The set of rational numbers III. The set of irrational numbers

(i) Let A={1,2,3,4} and B={1,2,3,4,5} . Since every member of A is also a member of B, A subset B (ii) The set Q of rational numbers is a subset of set R of real number and we write as Q subset R

If Q is the set of rational numbers and a function f:Q to Q is defined as f(x)=5x-4, x in Q , then show that f is one-one and onto.

Which of the following statements are always correct (where Q denotes the set of rationals)? (a) cos2theta in Q and sin2theta in Q rArr tantheta in Q (if defined), (b) tantheta in Q rArr sin2theta,cos2theta and tan2theta in Q (if defined) (c) if sintheta in Q and costheta in Q rArr tan3theta in Q (if defined) (d)if sintheta in Q rArr cos3theta in Q

If Q is the set of rational numbers, then prove that a function f: Q to Q defined as f(x)=5x-3, x in Q is one -one and onto function.

Let Q be the set of rational numbers and R be a relation on Q defined by R {":"x,y inQ,x^2+y^2=5} is

The binary operation * is defined by a*b= (a b)/7 on the set Q of all rational numbers. Show that * is associative.