Definitions from Wikipedia (Jordan's totient function)
▸ noun: In number theory, Jordan's totient function, denoted as , where is a positive integer, is a function of a positive integer, , that equals the number of -tuples of positive integers that are less than or equal to and that together with form a coprime set of integers.
▸ Words similar to Jordan's totient function
▸ Usage examples for Jordan's totient function
▸ Idioms related to Jordan's totient function
▸ Wikipedia articles (New!)
▸ Words that often appear near Jordan's totient function
▸ Rhymes of Jordan's totient function
▸ Invented words related to Jordan's totient function
▸ noun: In number theory, Jordan's totient function, denoted as , where is a positive integer, is a function of a positive integer, , that equals the number of -tuples of positive integers that are less than or equal to and that together with form a coprime set of integers.
▸ Words similar to Jordan's totient function
▸ Usage examples for Jordan's totient function
▸ Idioms related to Jordan's totient function
▸ Wikipedia articles (New!)
▸ Words that often appear near Jordan's totient function
▸ Rhymes of Jordan's totient function
▸ Invented words related to Jordan's totient function