Python/maths/carmichael_number.py

"""
== Carmichael Numbers ==
A number n is said to be a Carmichael number if it
satisfies the following modular arithmetic condition:

    power(b, n-1) MOD n = 1,
    for all b ranging from 1 to n such that b and
    n are relatively prime, i.e, gcd(b, n) = 1

Examples of Carmichael Numbers: 561, 1105, ...
https://en.wikipedia.org/wiki/Carmichael_number
"""


def gcd(a: int, b: int) -> int:
    if a < b:
        return gcd(b, a)
    if a % b == 0:
        return b
    return gcd(b, a % b)


def power(x: int, y: int, mod: int) -> int:
    if y == 0:
        return 1
    temp = power(x, y // 2, mod) % mod
    temp = (temp * temp) % mod
    if y % 2 == 1:
        temp = (temp * x) % mod
    return temp


def isCarmichaelNumber(n: int) -> bool:
    b = 2
    while b < n:
        if gcd(b, n) == 1 and power(b, n - 1, n) != 1:
            return False
        b += 1
    return True


if __name__ == "__main__":
    number = int(input("Enter number: ").strip())
    if isCarmichaelNumber(number):
        print(f"{number} is a Carmichael Number.")
    else:
        print(f"{number} is not a Carmichael Number.")
Python program for Carmicheal Number (#6864) * Add files via upload Python program to determine whether a number is Carmichael Number or not. * Rename Carmichael Number.py to carmichael number.py * Rename carmichael number.py to carmichael_number.py * [pre-commit.ci] auto fixes from pre-commit.com hooks for more information, see https://pre-commit.ci * Update carmichael_number.py * [pre-commit.ci] auto fixes from pre-commit.com hooks for more information, see https://pre-commit.ci * Create carmichael_number.py * [pre-commit.ci] auto fixes from pre-commit.com hooks for more information, see https://pre-commit.ci * Update maths/carmichael_number.py Co-authored-by: pre-commit-ci[bot] <66853113+pre-commit-ci[bot]@users.noreply.github.com> Co-authored-by: Christian Clauss <cclauss@me.com> 2022-10-12 07:22:23 +00:00			`"""`
			`== Carmichael Numbers ==`
			`A number n is said to be a Carmichael number if it`
			`satisfies the following modular arithmetic condition:`

			`power(b, n-1) MOD n = 1,`
			`for all b ranging from 1 to n such that b and`
			`n are relatively prime, i.e, gcd(b, n) = 1`

			`Examples of Carmichael Numbers: 561, 1105, ...`
			`https://en.wikipedia.org/wiki/Carmichael_number`
			`"""`


			`def gcd(a: int, b: int) -> int:`
			`if a < b:`
			`return gcd(b, a)`
			`if a % b == 0:`
			`return b`
			`return gcd(b, a % b)`


			`def power(x: int, y: int, mod: int) -> int:`
			`if y == 0:`
			`return 1`
			`temp = power(x, y // 2, mod) % mod`
			`temp = (temp * temp) % mod`
			`if y % 2 == 1:`
			`temp = (temp * x) % mod`
			`return temp`


			`def isCarmichaelNumber(n: int) -> bool:`
			`b = 2`
			`while b < n:`
			`if gcd(b, n) == 1 and power(b, n - 1, n) != 1:`
			`return False`
			`b += 1`
			`return True`


			`if __name__ == "__main__":`
			`number = int(input("Enter number: ").strip())`
			`if isCarmichaelNumber(number):`
			`print(f"{number} is a Carmichael Number.")`
			`else:`
			`print(f"{number} is not a Carmichael Number.")`