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Multichoosing is denoted \(\left(\binom{n}{k}\right)\) where \(\left(\binom{n}{k}\right)\) means the amount of ways to  choose lenght \(k\) multisets from a set of \(n\) objects. In general \(\left(\binom{n}{k}\right)\) is where we may  say “\(n\) multichoose \(k\).” Notice this is an analogy with the binomial coefficient  data-equation="\binom{n}{k}.">\(\binom{n}{k}.\)

 data-equation="\binom{n}{k}.">\(\binom{n}{k}.\) \(\left(\binom{n}{k}\right)\) is shown by the formula: