proof that Euler $\varphi$ function is multiplicative

Suppose that $t=mn$ where $m, n$ are coprime. The Chinese remainder theorem (http://planetmath.org/ChineseRemainderTheorem) states that $\gcd(a,t)=1$ if and only if $\gcd(a,m)=1$ and $\gcd(a,n)=1$ .

In other words, there is a bijective correspondence between these two sets:

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$\{a:a\equiv 1\pmod{t}\}$
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$\{a:a\equiv 1\pmod{m}\text{ and }a\equiv 1\pmod{n}\}$

Now the number of positive integers not greater than $t$ and coprime with $t$ is precisely $\varphi(t)$ , but it is also the number of pairs $(u,v)$ , where $u$ not greater than $m$ and coprime with $m$ , and $v$ not greater than $n$ and coprime with $n$ . Thus, $\varphi(mn)=\varphi(m)\varphi(n)$ .

Title	proof that Euler $\varphi$ function is multiplicative
Canonical name	ProofThatEulervarphiFunctionIsMultiplicative
Date of creation	2013-03-22 15:03:40
Last modified on	2013-03-22 15:03:40
Owner	Wkbj79 (1863)
Last modified by	Wkbj79 (1863)
Numerical id	12
Author	Wkbj79 (1863)
Entry type	Proof
Classification	msc 11A25
Related topic	EulerPhiFunction
Related topic	MultiplicativeFunction
Related topic	EulerPhifunction

proof that Euler φ<math id="m1" class="ltx_Math" alttext="\varphi" display="inline"><mi>φ</mi></math> function is multiplicative

proof that Euler $\varphi$ function is multiplicative