Removed redundant greatest_common_divisor code (#9358)

* Deleted greatest_common_divisor def from many files and instead imported the method from Maths folder * Deleted greatest_common_divisor def from many files and instead imported the method from Maths folder, also fixed comments * [pre-commit.ci] auto fixes from pre-commit.com hooks for more information, see https://pre-commit.ci * Deleted greatest_common_divisor def from many files and instead imported the method from Maths folder, also fixed comments * Imports organized * recursive gcd function implementation rolledback * more gcd duplicates removed * more gcd duplicates removed * Update maths/carmichael_number.py * updated files * moved a file to another location --------- Co-authored-by: pre-commit-ci[bot] <66853113+pre-commit-ci[bot]@users.noreply.github.com> Co-authored-by: Tianyi Zheng <tianyizheng02@gmail.com>
2024-11-23 21:11:08 +00:00 · 2023-10-09 17:49:12 +05:30 · 2023-10-09 17:49:12 +05:30 · 583a614fef
commit 583a614fef
parent 876087be99
9 changed files with 24 additions and 131 deletions
--- a/blockchain/diophantine_equation.py
+++ b/blockchain/diophantine_equation.py
@ -1,11 +1,13 @@
 from __future__ import annotations
 from maths.greatest_common_divisor import greatest_common_divisor
 def diophantine(a: int, b: int, c: int) -> tuple[float, float]:
    """
    Diophantine Equation : Given integers a,b,c ( at least one of a and b != 0), the
    diophantine equation a*x + b*y = c has a solution (where x and y are integers)
-    iff gcd(a,b) divides c.
+    iff greatest_common_divisor(a,b) divides c.
    GCD ( Greatest Common Divisor ) or HCF ( Highest Common Factor )
@ -22,7 +24,7 @@ def diophantine(a: int, b: int, c: int) -> tuple[float, float]:
    assert (
        c % greatest_common_divisor(a, b) == 0
-    )  # greatest_common_divisor(a,b) function implemented below
+    )  # greatest_common_divisor(a,b) is in maths directory
    (d, x, y) = extended_gcd(a, b)  # extended_gcd(a,b) function implemented below
    r = c / d
    return (r * x, r * y)
@ -69,32 +71,6 @@ def diophantine_all_soln(a: int, b: int, c: int, n: int = 2) -> None:
        print(x, y)
 def greatest_common_divisor(a: int, b: int) -> int:
    """
    Euclid's Lemma :  d divides a and b, if and only if d divides a-b and b
    Euclid's Algorithm
    >>> greatest_common_divisor(7,5)
    1
    Note : In number theory, two integers a and b are said to be relatively prime,
           mutually prime, or co-prime if the only positive integer (factor) that
           divides both of them is 1  i.e., gcd(a,b) = 1.
    >>> greatest_common_divisor(121, 11)
    11
    """
    if a < b:
        a, b = b, a
    while a % b != 0:
        a, b = b, a % b
    return b
 def extended_gcd(a: int, b: int) -> tuple[int, int, int]:
    """
    Extended Euclid's Algorithm : If d divides a and b and d = a*x + b*y for integers
--- a/ciphers/affine_cipher.py
+++ b/ciphers/affine_cipher.py
@ -1,6 +1,8 @@
 import random
 import sys
 from maths.greatest_common_divisor import gcd_by_iterative
 from . import cryptomath_module as cryptomath
 SYMBOLS = (
@ -26,7 +28,7 @@ def check_keys(key_a: int, key_b: int, mode: str) -> None:
            "Key A must be greater than 0 and key B must "
            f"be between 0 and {len(SYMBOLS) - 1}."
        )
-    if cryptomath.gcd(key_a, len(SYMBOLS)) != 1:
+    if gcd_by_iterative(key_a, len(SYMBOLS)) != 1:
        sys.exit(
            f"Key A {key_a} and the symbol set size {len(SYMBOLS)} "
            "are not relatively prime. Choose a different key."
@ -76,7 +78,7 @@ def get_random_key() -> int:
    while True:
        key_b = random.randint(2, len(SYMBOLS))
        key_b = random.randint(2, len(SYMBOLS))
-        if cryptomath.gcd(key_b, len(SYMBOLS)) == 1 and key_b % len(SYMBOLS) != 0:
+        if gcd_by_iterative(key_b, len(SYMBOLS)) == 1 and key_b % len(SYMBOLS) != 0:
            return key_b * len(SYMBOLS) + key_b
--- a/ciphers/cryptomath_module.py
+++ b/ciphers/cryptomath_module.py
@ -1,11 +1,8 @@
-def gcd(a: int, b: int) -> int:
+from maths.greatest_common_divisor import gcd_by_iterative
    while a != 0:
        a, b = b % a, a
    return b
 def find_mod_inverse(a: int, m: int) -> int:
-    if gcd(a, m) != 1:
+    if gcd_by_iterative(a, m) != 1:
        msg = f"mod inverse of {a!r} and {m!r} does not exist"
        raise ValueError(msg)
    u1, u2, u3 = 1, 0, a
--- a/ciphers/hill_cipher.py
+++ b/ciphers/hill_cipher.py
@ -39,19 +39,7 @@ import string
 import numpy
-
+from maths.greatest_common_divisor import greatest_common_divisor
 def greatest_common_divisor(a: int, b: int) -> int:
    """
    >>> greatest_common_divisor(4, 8)
    4
    >>> greatest_common_divisor(8, 4)
    4
    >>> greatest_common_divisor(4, 7)
    1
    >>> greatest_common_divisor(0, 10)
    10
    """
    return b if a == 0 else greatest_common_divisor(b % a, a)
 class HillCipher:
--- a/ciphers/rsa_key_generator.py
+++ b/ciphers/rsa_key_generator.py
@ -2,6 +2,8 @@ import os
 import random
 import sys
 from maths.greatest_common_divisor import gcd_by_iterative
 from . import cryptomath_module, rabin_miller
@ -27,7 +29,7 @@ def generate_key(key_size: int) -> tuple[tuple[int, int], tuple[int, int]]:
    # Generate e that is relatively prime to (p - 1) * (q - 1)
    while True:
        e = random.randrange(2 ** (key_size - 1), 2 ** (key_size))
-        if cryptomath_module.gcd(e, (p - 1) * (q - 1)) == 1:
+        if gcd_by_iterative(e, (p - 1) * (q - 1)) == 1:
            break
    # Calculate d that is mod inverse of e
--- a/maths/carmichael_number.py
+++ b/maths/carmichael_number.py
@ -10,14 +10,7 @@ satisfies the following modular arithmetic condition:
 Examples of Carmichael Numbers: 561, 1105, ...
 https://en.wikipedia.org/wiki/Carmichael_number
 """
-
+from maths.greatest_common_divisor import greatest_common_divisor
 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:
@ -33,7 +26,7 @@ def power(x: int, y: int, mod: int) -> int:
 def is_carmichael_number(n: int) -> bool:
    b = 2
    while b < n:
-        if gcd(b, n) == 1 and power(b, n - 1, n) != 1:
+        if greatest_common_divisor(b, n) == 1 and power(b, n - 1, n) != 1:
            return False
        b += 1
    return True
--- a/maths/least_common_multiple.py
+++ b/maths/least_common_multiple.py
@ -1,6 +1,8 @@
 import unittest
 from timeit import timeit
 from maths.greatest_common_divisor import greatest_common_divisor
 def least_common_multiple_slow(first_num: int, second_num: int) -> int:
    """
@ -20,26 +22,6 @@ def least_common_multiple_slow(first_num: int, second_num: int) -> int:
    return common_mult
 def greatest_common_divisor(a: int, b: int) -> int:
    """
    Calculate Greatest Common Divisor (GCD).
    see greatest_common_divisor.py
    >>> greatest_common_divisor(24, 40)
    8
    >>> greatest_common_divisor(1, 1)
    1
    >>> greatest_common_divisor(1, 800)
    1
    >>> greatest_common_divisor(11, 37)
    1
    >>> greatest_common_divisor(3, 5)
    1
    >>> greatest_common_divisor(16, 4)
    4
    """
    return b if a == 0 else greatest_common_divisor(b % a, a)
 def least_common_multiple_fast(first_num: int, second_num: int) -> int:
    """
    Find the least common multiple of two numbers.
--- a/maths/primelib.py
+++ b/maths/primelib.py
@ -21,7 +21,6 @@ get_primes_between(pNumber1, pNumber2)
 is_even(number)
 is_odd(number)
 gcd(number1, number2)  // greatest common divisor
 kg_v(number1, number2)  // least common multiple
 get_divisors(number)    // all divisors of 'number' inclusive 1, number
 is_perfect_number(number)
@ -40,6 +39,8 @@ goldbach(number)  // Goldbach's assumption
 from math import sqrt
 from maths.greatest_common_divisor import gcd_by_iterative
 def is_prime(number: int) -> bool:
    """
@ -317,39 +318,6 @@ def goldbach(number):
 # ----------------------------------------------
 def gcd(number1, number2):
    """
    Greatest common divisor
    input: two positive integer 'number1' and 'number2'
    returns the greatest common divisor of 'number1' and 'number2'
    """
    # precondition
    assert (
        isinstance(number1, int)
        and isinstance(number2, int)
        and (number1 >= 0)
        and (number2 >= 0)
    ), "'number1' and 'number2' must been positive integer."
    rest = 0
    while number2 != 0:
        rest = number1 % number2
        number1 = number2
        number2 = rest
    # precondition
    assert isinstance(number1, int) and (
        number1 >= 0
    ), "'number' must been from type int and positive"
    return number1
 # ----------------------------------------------------
 def kg_v(number1, number2):
    """
    Least common multiple
@ -567,14 +535,14 @@ def simplify_fraction(numerator, denominator):
    ), "The arguments must been from type int and 'denominator' != 0"
    # build the greatest common divisor of numerator and denominator.
-    gcd_of_fraction = gcd(abs(numerator), abs(denominator))
+    gcd_of_fraction = gcd_by_iterative(abs(numerator), abs(denominator))
    # precondition
    assert (
        isinstance(gcd_of_fraction, int)
        and (numerator % gcd_of_fraction == 0)
        and (denominator % gcd_of_fraction == 0)
-    ), "Error in function gcd(...,...)"
+    ), "Error in function gcd_by_iterative(...,...)"
    return (numerator // gcd_of_fraction, denominator // gcd_of_fraction)
--- a/project_euler/problem_005/sol2.py
+++ b/project_euler/problem_005/sol2.py
@ -1,3 +1,5 @@
 from maths.greatest_common_divisor import greatest_common_divisor
 """
 Project Euler Problem 5: https://projecteuler.net/problem=5
@ -16,23 +18,6 @@ References:
 """
 def greatest_common_divisor(x: int, y: int) -> int:
    """
    Euclidean Greatest Common Divisor algorithm
    >>> greatest_common_divisor(0, 0)
    0
    >>> greatest_common_divisor(23, 42)
    1
    >>> greatest_common_divisor(15, 33)
    3
    >>> greatest_common_divisor(12345, 67890)
    15
    """
    return x if y == 0 else greatest_common_divisor(y, x % y)
 def lcm(x: int, y: int) -> int:
    """
    Least Common Multiple.