Prove that number of subsets of a set containing n distinct elements is `2^n` , for all `n in N`

The number of elements of the power set of a set containing n elements is

The numbers of proper subset of set A having n elements are…… .

Numbers of proper subsets of the set having n elements are 2^(n+1) -2,(n gt 1 in N)

A set contains 2n+1 elements. The number of subsets of this set containing more than n elements :

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

Fill in the blanks to make each of the following a true statement : The number of subsets of a set A having n elements is "………."

Two finite sets have m and n elements. The total number of subsets of the first set is 56 more than the total number of subsets of the second set. The value of m and n is

Two finite sets have m and n elements. The number of subsets of the first set is 112 more than of the second set. The values of m and n are, respectively.

Two finite sets have m and n elements. The total number of subsets of the first set is 48 more than the total number of subsets of the second set. The value of m - n is