Euler's totient function

The first thousand values of $φ (n)$ . The points on the top line represent $φ (p)$ when $p$ is a prime number, which is $p - 1.$ ^[1]

In number theory, Euler's totient function counts the positive integers up to a given integer $n$ that are relatively prime to $n$ . It is written using the Greek letter phi as $\varphi (n)$ or $\phi (n)$ , and may also be called Euler's phi function. In other words, it is the number of integers $k$ in the range $1 \leq k \leq n$ for which the greatest common divisor $gcd(n, k)$ is equal to 1.^[2]^[3] The integers $k$ of this form are sometimes referred to as totatives of $n$ .

For example, the totatives of $n = 9$ are the six numbers 1, 2, 4, 5, 7 and 8. They are all relatively prime to 9, but the other three numbers in this range, 3, 6, and 9 are not, since $gcd(9, 3) = gcd(9, 6) = 3$ and $gcd(9, 9) = 9$ . Therefore, $φ (9) = 6$ . As another example, $φ (1) = 1$ since for $n = 1$ the only integer in the range from 1 to $n$ is 1 itself, and $gcd(1, 1) = 1$ .

Euler's totient function is a multiplicative function, meaning that if two numbers $m$ and $n$ are relatively prime, then $φ (mn) = φ (m) φ (n)$ .^[4]^[5] This function gives the order of the multiplicative group of integers modulo $n$ (the group of units of the ring $\mathbb {Z} /n\mathbb {Z}$ ).^[6] It is also used for defining the RSA encryption system.

^ "Euler's totient function". Khan Academy. Retrieved 2016-02-26.
^ Long (1972, p. 85)
^ Pettofrezzo & Byrkit (1970, p. 72)
^ Long (1972, p. 162)
^ Pettofrezzo & Byrkit (1970, p. 80)
^ See Euler's theorem.

[1] "Euler's totient function". Khan Academy. Retrieved 2016-02-26.

[2] Long (1972, p. 85)

[3] Pettofrezzo & Byrkit (1970, p. 72)

[4] Long (1972, p. 162)

[5] Pettofrezzo & Byrkit (1970, p. 80)

[6] See Euler's theorem.

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