Python/maths/eulers_totient.py

# Eulers Totient function finds the number of relative primes of a number n from 1 to n
def totient(n: int) -> list:
    """
    >>> n = 10
    >>> totient_calculation = totient(n)
    >>> for i in range(1, n):
    ...     print(f"{i} has {totient_calculation[i]} relative primes.")
    1 has 0 relative primes.
    2 has 1 relative primes.
    3 has 2 relative primes.
    4 has 2 relative primes.
    5 has 4 relative primes.
    6 has 2 relative primes.
    7 has 6 relative primes.
    8 has 4 relative primes.
    9 has 6 relative primes.
    """
    is_prime = [True for i in range(n + 1)]
    totients = [i - 1 for i in range(n + 1)]
    primes = []
    for i in range(2, n + 1):
        if is_prime[i]:
            primes.append(i)
        for j in range(0, len(primes)):
            if i * primes[j] >= n:
                break
            is_prime[i * primes[j]] = False

            if i % primes[j] == 0:
                totients[i * primes[j]] = totients[i] * primes[j]
                break

            totients[i * primes[j]] = totients[i] * (primes[j] - 1)

    return totients


if __name__ == "__main__":
    import doctest

    doctest.testmod()
Code for Eulers Totient function (#1229) * Create eulersTotient.py * Rename eulersTotient.py to eulers_totient.py * Update eulers_totient.py 2019-12-01 05:58:25 +00:00			`# Eulers Totient function finds the number of relative primes of a number n from 1 to n`
			`def totient(n: int) -> list:`
Replace bandit, flake8, isort, and pyupgrade with ruff (#8178) * Replace bandit, flake8, isort, and pyupgrade with ruff * Comment on ruff rules * updating DIRECTORY.md --------- Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com> 2023-03-15 12:58:25 +00:00			`"""`
			`>>> n = 10`
			`>>> totient_calculation = totient(n)`
			`>>> for i in range(1, n):`
			`... print(f"{i} has {totient_calculation[i]} relative primes.")`
			`1 has 0 relative primes.`
			`2 has 1 relative primes.`
			`3 has 2 relative primes.`
			`4 has 2 relative primes.`
			`5 has 4 relative primes.`
			`6 has 2 relative primes.`
			`7 has 6 relative primes.`
			`8 has 4 relative primes.`
			`9 has 6 relative primes.`
			`"""`
Code for Eulers Totient function (#1229) * Create eulersTotient.py * Rename eulersTotient.py to eulers_totient.py * Update eulers_totient.py 2019-12-01 05:58:25 +00:00			`is_prime = [True for i in range(n + 1)]`
			`totients = [i - 1 for i in range(n + 1)]`
			`primes = []`
			`for i in range(2, n + 1):`
			`if is_prime[i]:`
			`primes.append(i)`
			`for j in range(0, len(primes)):`
			`if i * primes[j] >= n:`
			`break`
			`is_prime[i * primes[j]] = False`

			`if i % primes[j] == 0:`
			`totients[i * primes[j]] = totients[i] * primes[j]`
			`break`

			`totients[i * primes[j]] = totients[i] * (primes[j] - 1)`

			`return totients`


			`if __name__ == "__main__":`
			`import doctest`

			`doctest.testmod()`