1rBTX 07. PROBABILITAT/1.7.1 Recomptes 1.7.1.16Q V Classificació corredors Si es classifiquen els #b corredors d'una cursa on participen #a corredors, quantes classificacions diferents es poden produir?

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 És una variació simple de #a elements agafats de #b en #b. Lògicament, no es poden repetir:V_#a,#b

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