Let `s` be the set of integers `x` such that (i) `100<=x<=200` (ii) `x` is odd (iii) `x` is divisible by 3 not by 7. How many elements are there in set `s`

Let f(x)=(x)/(1+x) and let g(x)=(rx)/(1-x) Let S be the set off all real numbers r such that f(g(x))=g(f(x)) for infinitely many real number x. The number of elements in set s is

Let S be the set of integers which are divisible by 5, and let T be the set of integer which are divisible by 7. Find the number of positive integers less than 1000 and not in (S uu T) .

Let S be the set of integers.For a,b in S relation R is defined by aRb If |a-b|<1 then R is

Let Z be the set of integers and f:Z rarr Z is a bijective function then

Let N be the set of integers. A relation R or N is defined as R={(x,y):xygt0, x,y,inN} . Then, which one of the following is correct?

LEt f(x)=2^(100)x+1 and g(x)=3^(100)x+1 Then the set of real numbers x such that f(g(x))=x is

Let S be the set of all alpha in R such that the equation, cos 2x + alpha sin x = 2alpha -7 has a solution. The S, is equal to

Let Z be the set of all integers and let a*b =a-b+ab . Then * is