Let S={1, 2, 3,4}. The total number of unordered pairs of disjoint subsets of S is equal to :

The total number of lone pairs of elections in N_2O_3 is

The total number of lone pairs of elections in N_2O_3 is

Let A = {1, 2}, B= {3, 4}, then the number of relations from A to B will be:

The total number of ordered pairs (x , y) satisfying |x|+|y|=2,sin((pix^2)/3)=1, is equal to 2 (b) 3 (c) 4 (d) 6

Let S={1,2,3, . . .,n} . If X denotes the set of all subsets of S containing exactly two elements, then the value of sum_(A in X) (min. A) is given by

Let z=(-1+sqrt(3)i)/(2) , where i=sqrt(-1) , and r, s in {1, 2, 3} . Let P=[((-z)^(r),z^(2s)),(z^(2s),z^(r))] and I be the identity matrix of order 2. Then the total number of ordered pairs (r, s) for which P^(2)=-I is ______.

The number of subsets of the set{1,2,4} is: