The number of sets of three distinct elemetns that can be chosen from the set `{2^(1),2^(2),2^(3),…….,2^(200)}` such that the three elements form an increasing geometric progression

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.

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.

If two distinct numbers a and be are selected from the set {5^(1), 5^(2), 5^(3)……….5^(9)} , then the probability that log_(a)b is an integer is

The number of distinct values of a2xx2 determinant whose entries are from the set {-1,0,1}, is

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 ______.

The number of ways three different natural numbers cab be drawn from the set {1, 2, 3, 4,……….., 10} , if minimum of the chosen numbers is smaller than 4, 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.

The number of commutative binary operations that can be defined on a set of 2 elements is

If one quarter of all three element subsete of the set A={a_(1),a_(2),a_(3),......,a_(n)} contains the element a_(3) , then n=

The triple (x,y,z) is chosen from the set {1,2,3,………,n} , such that x le y < z . The number of such triples is