Python/project_euler/problem_077/sol1.py

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"""
Project Euler Problem 77: https://projecteuler.net/problem=77
It is possible to write ten as the sum of primes in exactly five different ways:
7 + 3
5 + 5
5 + 3 + 2
3 + 3 + 2 + 2
2 + 2 + 2 + 2 + 2
What is the first value which can be written as the sum of primes in over
five thousand different ways?
"""
from __future__ import annotations
from functools import lru_cache
from math import ceil
NUM_PRIMES = 100
primes = set(range(3, NUM_PRIMES, 2))
primes.add(2)
prime: int
for prime in range(3, ceil(NUM_PRIMES ** 0.5), 2):
if prime not in primes:
continue
primes.difference_update(set(range(prime * prime, NUM_PRIMES, prime)))
@lru_cache(maxsize=100)
def partition(number_to_partition: int) -> set[int]:
"""
Return a set of integers corresponding to unique prime partitions of n.
The unique prime partitions can be represented as unique prime decompositions,
e.g. (7+3) <-> 7*3 = 12, (3+3+2+2) = 3*3*2*2 = 36
>>> partition(10)
{32, 36, 21, 25, 30}
>>> partition(15)
{192, 160, 105, 44, 112, 243, 180, 150, 216, 26, 125, 126}
>>> len(partition(20))
26
"""
if number_to_partition < 0:
return set()
elif number_to_partition == 0:
return {1}
ret: set[int] = set()
prime: int
sub: int
for prime in primes:
if prime > number_to_partition:
continue
for sub in partition(number_to_partition - prime):
ret.add(sub * prime)
return ret
def solution(number_unique_partitions: int = 5000) -> int | None:
"""
Return the smallest integer that can be written as the sum of primes in over
m unique ways.
>>> solution(4)
10
>>> solution(500)
45
>>> solution(1000)
53
"""
for number_to_partition in range(1, NUM_PRIMES):
if len(partition(number_to_partition)) > number_unique_partitions:
return number_to_partition
return None
if __name__ == "__main__":
print(f"{solution() = }")