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* Added solution for Project Euler problem 180 * Fixed minor details in Project Euler problem 180 * updating DIRECTORY.md Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com>
175 lines
5.6 KiB
Python
175 lines
5.6 KiB
Python
"""
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Project Euler Problem 234: https://projecteuler.net/problem=234
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For any integer n, consider the three functions
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f1,n(x,y,z) = x^(n+1) + y^(n+1) - z^(n+1)
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f2,n(x,y,z) = (xy + yz + zx)*(x^(n-1) + y^(n-1) - z^(n-1))
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f3,n(x,y,z) = xyz*(xn-2 + yn-2 - zn-2)
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and their combination
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fn(x,y,z) = f1,n(x,y,z) + f2,n(x,y,z) - f3,n(x,y,z)
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We call (x,y,z) a golden triple of order k if x, y, and z are all rational numbers
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of the form a / b with 0 < a < b ≤ k and there is (at least) one integer n,
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so that fn(x,y,z) = 0.
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Let s(x,y,z) = x + y + z.
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Let t = u / v be the sum of all distinct s(x,y,z) for all golden triples
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(x,y,z) of order 35.
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All the s(x,y,z) and t must be in reduced form.
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Find u + v.
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Solution:
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By expanding the brackets it is easy to show that
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fn(x, y, z) = (x + y + z) * (x^n + y^n - z^n).
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Since x,y,z are positive, the requirement fn(x, y, z) = 0 is fulfilled if and
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only if x^n + y^n = z^n.
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By Fermat's Last Theorem, this means that the absolute value of n can not
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exceed 2, i.e. n is in {-2, -1, 0, 1, 2}. We can eliminate n = 0 since then the
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equation would reduce to 1 + 1 = 1, for which there are no solutions.
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So all we have to do is iterate through the possible numerators and denominators
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of x and y, calculate the corresponding z, and check if the corresponding numerator and
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denominator are integer and satisfy 0 < z_num < z_den <= 0. We use a set "uniquq_s"
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to make sure there are no duplicates, and the fractions.Fraction class to make sure
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we get the right numerator and denominator.
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Reference:
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https://en.wikipedia.org/wiki/Fermat%27s_Last_Theorem
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"""
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from fractions import Fraction
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from math import gcd, sqrt
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from typing import Tuple
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def is_sq(number: int) -> bool:
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"""
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Check if number is a perfect square.
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>>> is_sq(1)
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True
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>>> is_sq(1000001)
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False
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>>> is_sq(1000000)
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True
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"""
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sq: int = int(number ** 0.5)
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return number == sq * sq
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def add_three(
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x_num: int, x_den: int, y_num: int, y_den: int, z_num: int, z_den: int
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) -> Tuple[int, int]:
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"""
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Given the numerators and denominators of three fractions, return the
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numerator and denominator of their sum in lowest form.
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>>> add_three(1, 3, 1, 3, 1, 3)
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(1, 1)
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>>> add_three(2, 5, 4, 11, 12, 3)
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(262, 55)
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"""
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top: int = x_num * y_den * z_den + y_num * x_den * z_den + z_num * x_den * y_den
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bottom: int = x_den * y_den * z_den
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hcf: int = gcd(top, bottom)
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top //= hcf
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bottom //= hcf
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return top, bottom
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def solution(order: int = 35) -> int:
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"""
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Find the sum of the numerator and denominator of the sum of all s(x,y,z) for
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golden triples (x,y,z) of the given order.
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>>> solution(5)
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296
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>>> solution(10)
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12519
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>>> solution(20)
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19408891927
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"""
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unique_s: set = set()
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hcf: int
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total: Fraction = Fraction(0)
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fraction_sum: Tuple[int, int]
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for x_num in range(1, order + 1):
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for x_den in range(x_num + 1, order + 1):
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for y_num in range(1, order + 1):
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for y_den in range(y_num + 1, order + 1):
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# n=1
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z_num = x_num * y_den + x_den * y_num
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z_den = x_den * y_den
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hcf = gcd(z_num, z_den)
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z_num //= hcf
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z_den //= hcf
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if 0 < z_num < z_den <= order:
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fraction_sum = add_three(
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x_num, x_den, y_num, y_den, z_num, z_den
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)
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unique_s.add(fraction_sum)
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# n=2
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z_num = (
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x_num * x_num * y_den * y_den + x_den * x_den * y_num * y_num
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)
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z_den = x_den * x_den * y_den * y_den
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if is_sq(z_num) and is_sq(z_den):
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z_num = int(sqrt(z_num))
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z_den = int(sqrt(z_den))
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hcf = gcd(z_num, z_den)
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z_num //= hcf
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z_den //= hcf
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if 0 < z_num < z_den <= order:
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fraction_sum = add_three(
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x_num, x_den, y_num, y_den, z_num, z_den
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)
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unique_s.add(fraction_sum)
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# n=-1
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z_num = x_num * y_num
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z_den = x_den * y_num + x_num * y_den
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hcf = gcd(z_num, z_den)
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z_num //= hcf
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z_den //= hcf
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if 0 < z_num < z_den <= order:
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fraction_sum = add_three(
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x_num, x_den, y_num, y_den, z_num, z_den
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)
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unique_s.add(fraction_sum)
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# n=2
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z_num = x_num * x_num * y_num * y_num
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z_den = (
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x_den * x_den * y_num * y_num + x_num * x_num * y_den * y_den
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)
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if is_sq(z_num) and is_sq(z_den):
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z_num = int(sqrt(z_num))
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z_den = int(sqrt(z_den))
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hcf = gcd(z_num, z_den)
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z_num //= hcf
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z_den //= hcf
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if 0 < z_num < z_den <= order:
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fraction_sum = add_three(
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x_num, x_den, y_num, y_den, z_num, z_den
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)
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unique_s.add(fraction_sum)
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for num, den in unique_s:
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total += Fraction(num, den)
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return total.denominator + total.numerator
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if __name__ == "__main__":
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print(f"{solution() = }")
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