The number of ways to choose 3 distinct number in increasing GP from the set {1, 2, 3, ……100} is …. And corresponding probability is ………

A natural number k is chosen from the set {l, 2, 3, ... , 100). The probability that it is prime, is

Statement-1: The total number of ways in which three distinct numbers in AP, can be selected from the set {1,2,3, . .,21}, is equal to 100. Statement-2: If a,b,c are inn AP, then a+c=2b.

A number is selected at random from the set {1, 2, 3, …, 50}. The probability that it is a prime, is

Find the number of ways in which 3 distinct numbers can be selected from the set {3^(1),3^(2),3^(3),..,3^(100),3^(101)} so that they form a G.P.

If N is the number of ways in which 3 distinct numbers canbe selected from the set {3^(1),3^(2),3^(3),...,3^(10)} so that they form a G.P. then the value of N/5 is

Statement 1: The number of ways in which three distinct numbers can be selected from the set {3^(1),3^(2),3^(3),3^(100),3^(101)} so that they form a G.P.is 2500. Statement 2: if a,b,c are in A.P.then 3^(a),3^(b),3^(c) are in G.P.

The total number of ways in with three distinct numbers in A.P.can be selected from the set {1,2,3,............24} is equal to a.66 b.132c 198d.none of these

Three numbers are chosen at random, one after another with replacement, from the set S = {1,2,3, … ,100} . Let P_1 be the probability that the maximum of chosen numbers is at least 81 and P_2 be the probability that the minimum of chosen numbers is at most 40. then the vaue of 625/4 P_1 is

Three numbers are chosen at random, one after another with replacement, from the set S = {1,2,3, … ,100} . Let P_1 be the probability that the maximum of chosen numbers is at least 81 and P_2 be the probability that the minimum of chosen numbers is at most 40. then the vaue of 125/4 P_2 is

The number of ways of selecting 4 numbers from the set S={1,2,3,4,5,6,7,8,9} such that they are not consecutive,is