A k-subset is a subset of a set on n elements containing exactly k elements. The number of k-subsets on n elements is therefore given by the binomial coefficient (n k). For example, there are (3 2) = 3 2-subsets of {1, 2, 3}, namely {1, 2}, {1, 3}, and {2, 3}. The k-subsets of a list can be enumerated in the Wolfram Language as Subsets[list, {k}]. The total number of distinct k-subsets on a set of n elements (i.e., the number of subsets) is given by sum_(k = 0)^n(n k) = 2^n.
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Jonathan is doing really well in all of his classes this semester, 5 A’s & 2 B’s (he has a computer essentials class instead of PLC). In his Algebra class that Nathan is helping him with he has an A+.
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