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

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,

If three distinct numbers are chosen randomly from the first 100 natural numbers , then the probability that all three of them are divisible by 2 and 3 is :

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

One number is selected from the first 50 natural numbers. What is the probability that it is a root of x+(256)/(x)gt40 ?

Activity : Ask all the students in your class to write a 3 - digit number. Choose any student from the room at random. What is the probability that the number written by her/him is divisible by 3 ? Remember that a number is divisible by 3 , if the sum of its digits is divisible by 3.

Taking the set of natural numbers as the universal set, write down the complements of the following sets: { x : x is a natural number divisible by 3 and 5}

The function f : N rarr N , Where N is the set of natural numbers, defined by f(x) = 3x+4 is

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

A card is drawn at random from a box containing 21 cards numbered 1 to 21. Find the probability that the card drawn is a) Prime number b) Divisible by 3.