The set `A={x: a^(x)=1, a gt 0, xin R}` can never be

Domain and range of the realtion R={(x,y) : [x]+[y]=2, x gt 0, y gt 0} are

Let Q be the set of all rational numbers and R be the relation defined as: R={(x,y) : 1+xy gt 0, x,y in Q} Then relation R is

Which of the following is/are not true ? (A) P = {x:x=2y+1 "and" y in N} is a finite set. (B) Q= {x : x in R "and" x^(2) + 1 = 0} is a null set. (C ) R = {x : x^(3) +1 = 0 "and" x^(2) + 1= 0} is a single-ton set. (D) S = {x:8 lt x lt 13, x in R) is an infinite set.

Minimum value at a^(ax) + a^(1-a x); a gt 0 and x in R , is

Solve: (x-3)/(x+4)gt0,x in R

Let N be the set of integers. A relation R on N is defined as R = {(x, y) | xy gt 0, xy in N} . Then, which one of the following is correct?