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Binomial coefficient
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== Combinatorics and statistics == Binomial coefficients are of importance in [[combinatorics]] because they provide ready formulas for certain frequent counting problems: * There are <math>\tbinom n k</math> ways to choose ''k'' elements from a set of ''n'' elements. See [[Combination]]. * There are <math>\tbinom {n+k-1}k</math> ways to choose ''k'' elements from a set of ''n'' elements if repetitions are allowed. See [[Multiset]]. * There are <math> \tbinom {n+k} k</math> [[string (computer science)|strings]] containing ''k'' ones and ''n'' zeros. * There are <math> \tbinom {n+1} k</math> strings consisting of ''k'' ones and ''n'' zeros such that no two ones are adjacent.<ref>{{cite journal|last=Muir|first=Thomas|title=Note on Selected Combinations|journal=Proceedings of the Royal Society of Edinburgh|year=1902|url=https://books.google.com/books?id=EN8vAAAAIAAJ&pg=GBS.PA102}}</ref> * The [[Catalan number]]s are <math>\tfrac{1}{n+1}\tbinom{2n}{n}.</math> * The [[binomial distribution]] in [[statistics]] is <math>\tbinom n k p^k (1-p)^{n-k} .</math>
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