0的0次方与0阶乘一样,不是按普通定义“计算”的,而是特别定义。目的是为了让公式简便。
In algebra and combinatorics, the generally agreed upon value is \(0^0 = 1\),
In 1752, Euler in Introductio in analysin infinitorum wrote that \(a^0 = 1\) and explicitly mentioned that \(0^0 = 1\).
参考文献:Introduction to analysis of the infinite, Book 1
In algebra and combinatorics, the generally agreed upon value is \(0^0 = 1\),
In 1752, Euler in Introductio in analysin infinitorum wrote that \(a^0 = 1\) and explicitly mentioned that \(0^0 = 1\).
参考文献:Introduction to analysis of the infinite, Book 1
锟斤拷锟洁辑时锟斤拷: 2022-08-19 23:42:23