Difference between revisions of "Euler's Totient Theorem"
(→Proof) |
Atmath2011 (talk | contribs) |
||
Line 11: | Line 11: | ||
Consider the set of numbers <math>A = </math>{<math>n_1, n_2, ... n_{\phi(m)} </math>} (mod m) such that the elements of the set are the numbers relatively prime to each other. It will now be proved that this set is the same as the set <math>B = </math>{<math>an_1, an_2, ... an_{\phi(m)} </math>} (mod m) where <math> (a, m) = 1</math>. All elements of <math>B</math> are relatively prime to <math>m</math> so if all elements of <math>B</math> are distinct, then <math>B</math> has the same elements as <math>A</math>. This means that <math> n_1 n_2 ... n_{\phi(m)} \equiv an_1 \cdot an_2 ... an_{\phi(m)}</math>(mod m) => <math>a^{\phi (m)} \cdot (n_1 n_2 ... n_{\phi(m)}) \equiv n_1 n_2 ... n_{\phi(m)}</math> (mod m) => <math>a^{\phi (m)} \equiv 1</math> (mod m) as desired. | Consider the set of numbers <math>A = </math>{<math>n_1, n_2, ... n_{\phi(m)} </math>} (mod m) such that the elements of the set are the numbers relatively prime to each other. It will now be proved that this set is the same as the set <math>B = </math>{<math>an_1, an_2, ... an_{\phi(m)} </math>} (mod m) where <math> (a, m) = 1</math>. All elements of <math>B</math> are relatively prime to <math>m</math> so if all elements of <math>B</math> are distinct, then <math>B</math> has the same elements as <math>A</math>. This means that <math> n_1 n_2 ... n_{\phi(m)} \equiv an_1 \cdot an_2 ... an_{\phi(m)}</math>(mod m) => <math>a^{\phi (m)} \cdot (n_1 n_2 ... n_{\phi(m)}) \equiv n_1 n_2 ... n_{\phi(m)}</math> (mod m) => <math>a^{\phi (m)} \equiv 1</math> (mod m) as desired. | ||
+ | |||
+ | its by pandey... | ||
== See also == | == See also == |
Revision as of 14:53, 7 May 2013
Euler's Totient Theorem is a theorem closely related to his function of the same name.
Contents
Theorem
Let be Euler's totient function. If is an integer and is a positive integer relatively prime to , then .
Credit
This theorem is credited to Leonhard Euler. It is a generalization of Fermat's Little Theorem, which specifies that is prime. For this reason it is known as Euler's generalization and Fermat-Euler as well.
Proof
Consider the set of numbers {} (mod m) such that the elements of the set are the numbers relatively prime to each other. It will now be proved that this set is the same as the set {} (mod m) where . All elements of are relatively prime to so if all elements of are distinct, then has the same elements as . This means that (mod m) => (mod m) => (mod m) as desired.
its by pandey...