Let S be the set of the first 21 natural numbers, then the probability of
Choosing `{x,y,z}subeS`, such that x,y,z are in AP, is

Let S be the set of the first 21 natural numbers, then the probability of Choosing {x,y,z}subeS , such that x,y,z are not consecutive is,

Let S be the set of the first 21 natural numbers, then the probability of choosing {x, y}inS , such that x^3+y^3 is divisible by 3, is

The number of three digit numbers of the form xyz such that x lt y , z le y and x ne0 , is

A natural number x is chosen at random from the first 100 natural number. The probability that x+100/x gt 50 is

Let all the elements of the following sets: A={x:x"is an odd natural number"}

Let R be a relation on the set Z of all integers defined by:(x,y) in R implies(x-y) is divisible by n.Prove that (b) (x,y) in R implies(y,x) in R for all x,y,z in Z .

Let a relation R in the set of natural number be defined by (x,y) in R iff x^(2)-4xy+3y^(2)=0 for all x,y in N . Then the relation R is :

If A = (x: x = (1)/(y), y in N ), where N is the set of natural numbers , then

If [1X 2Y 6Z] is a number divisible by 9,then the least value of X+Y+Z is:

If (x+y)/(2),y,(y+z)/(2) are in HP, then x,y, z are in