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89 lines
2.1 KiB
Python
89 lines
2.1 KiB
Python
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"""
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It was proposed by Christian Goldbach that every odd composite number can be
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written as the sum of a prime and twice a square.
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9 = 7 + 2 × 12
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15 = 7 + 2 × 22
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21 = 3 + 2 × 32
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25 = 7 + 2 × 32
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27 = 19 + 2 × 22
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33 = 31 + 2 × 12
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It turns out that the conjecture was false.
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What is the smallest odd composite that cannot be written as the sum of a
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prime and twice a square?
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"""
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from typing import List
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seive = [True] * 100001
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i = 2
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while i * i <= 100000:
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if seive[i]:
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for j in range(i * i, 100001, i):
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seive[j] = False
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i += 1
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def is_prime(n: int) -> bool:
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"""
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Returns True if n is prime,
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False otherwise, for 2 <= n <= 100000
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>>> is_prime(87)
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False
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>>> is_prime(23)
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True
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>>> is_prime(25363)
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False
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"""
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return seive[n]
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odd_composites = [num for num in range(3, len(seive), 2) if not is_prime(num)]
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def compute_nums(n: int) -> List[int]:
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"""
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Returns a list of first n odd composite numbers which do
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not follow the conjecture.
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>>> compute_nums(1)
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[5777]
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>>> compute_nums(2)
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[5777, 5993]
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>>> compute_nums(0)
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Traceback (most recent call last):
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...
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ValueError: n must be >= 0
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>>> compute_nums("a")
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Traceback (most recent call last):
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...
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ValueError: n must be an integer
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>>> compute_nums(1.1)
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Traceback (most recent call last):
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...
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ValueError: n must be an integer
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"""
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if not isinstance(n, int):
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raise ValueError("n must be an integer")
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if n <= 0:
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raise ValueError("n must be >= 0")
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list_nums = []
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for num in range(len(odd_composites)):
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i = 0
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while 2 * i * i <= odd_composites[num]:
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rem = odd_composites[num] - 2 * i * i
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if is_prime(rem):
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break
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i += 1
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else:
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list_nums.append(odd_composites[num])
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if len(list_nums) == n:
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return list_nums
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if __name__ == "__main__":
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print(f"{compute_nums(1) = }")
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