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Diff — Combination

Revision #76 → #1087 · back to history

addedCombination495f95818854
addedk-combinationd9cc924eb567
addedEquality of combinationsdd6e5e3f2003
addedNumber of k-combinations is binomial coefficientfe1777a081f2
addedFactorial formula for k-combinations5f5bb5230759
addedCombination without repetition69eeab47622f
addedCombination with repetition2a1c16aec5db
addedPoker hand as 5-combination89b538a5bee4
addedBinomial coefficient via defining relationad47b29bebf4
addedCoefficients count k-combinations9db925bd1de6
addedPascal's recursion relation1129e913b283
addedFormula for individual binomial coefficient5331dac43ed9
addedSymmetry of binomial coefficientsc5e49b2999a9
addedSymmetric factorial formuladd367bc7e522
addedAdjacent relations in Pascal's triangle178b9d92892e
addedCounting five-card hands22d9ee098c47
addedCombinatorial number system bijectionbad467f0f3c9
addedEnumeration algorithm for k-combinations45af6291eff0
addedk-combination with repetition (multisubset)504ff79c2b58
addedMultisubsets count Diophantine solutionsc29c6c602d4b
addedn multichoose k notation8f3af808ffaa
addedMultichoose in terms of binomial coefficientsc37a07122588
addedStars and bars proofbdae3c37ddd2
addedMultichoose identitydba80d15e767
addedCounting donut multisubsets8b8ead2cc1ef
addedTotal number of subsets is 2^nb917df4ea83e
addedEight subsets of three cardsb9a2b69d1488
addedSampling a random combination0a766101b0ef
addedObjects into bins is multinomial coefficienteb1bdbf3e727
addedBinomial coefficient as two-bin special casec32e814c9707