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| factorial_basis [2026/04/02 20:37] – [Factorial basis] danetiska | factorial_basis [2026/04/02 20:39] (current) – [Factorial basis] danetiska |
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| ===== Factorial basis ===== | ===== Factorial basis ===== |
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| [[https://en.wikipedia.org/wiki/Factorial_number_system|Factorial basis]] esti djombovos systema en joteri digitoi prostistanti multiplons factorialiom. Pro exemplom, $3:4:0:1:0 = 3(4!) + 4(3!) + 1(1!)$. Visjoinos digitos delgeti esni minor ive equal djomboi josio factorialym jom prostistati. Esti relatzionaiostos sjom Lehmerove codice i permutatzionbi. | [[https://en.wikipedia.org/wiki/Factorial_number_system|Factorial basis]] esti djombovos systema en joteri digitoi prostistanti multiplons factorialiom. Pro exemplom, $3:3:0:1:0 = 3(4!) + 3(3!) + 1(1!)$. Visjoinos digitos delgeti esni minor ive equal djomboi josio factorialym jom prostistati. Esti relatzionaiostos sjom Lehmerovois codiceis i permutatzionbi. |
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| ===== Factorial basis ===== | ===== Factorial basis ===== |
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| The [[https://en.wikipedia.org/wiki/Factorial_number_system|factorial basis]] is a number system in which the digits represent multiples of factorials. For example, $3:4:0:1:0 = 3(4!) + 4(3!) + 1(1!)$. Each digit must be less than or equal to the number whose factorial it represents. It is related to Lehmer code and permutations. | The [[https://en.wikipedia.org/wiki/Factorial_number_system|factorial basis]] is a number system in which the digits represent multiples of factorials. For example, $3:3:0:1:0 = 3(4!) + 3(3!) + 1(1!)$. Each digit must be less than or equal to the number whose factorial it represents. It is related to Lehmer codes and permutations. |
