Python/project_euler/problem_187/sol1.py

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"""
Project Euler Problem 187: https://projecteuler.net/problem=187
A composite is a number containing at least two prime factors.
For example, 15 = 3 x 5; 9 = 3 x 3; 12 = 2 x 2 x 3.
There are ten composites below thirty containing precisely two,
not necessarily distinct, prime factors: 4, 6, 9, 10, 14, 15, 21, 22, 25, 26.
How many composite integers, n < 10^8, have precisely two,
not necessarily distinct, prime factors?
"""
from math import isqrt
def slow_calculate_prime_numbers(max_number: int) -> list[int]:
"""
Returns prime numbers below max_number.
See: https://en.wikipedia.org/wiki/Sieve_of_Eratosthenes
>>> slow_calculate_prime_numbers(10)
[2, 3, 5, 7]
>>> slow_calculate_prime_numbers(2)
[]
"""
# List containing a bool value for every number below max_number/2
is_prime = [True] * max_number
for i in range(2, isqrt(max_number - 1) + 1):
if is_prime[i]:
# Mark all multiple of i as not prime
for j in range(i**2, max_number, i):
is_prime[j] = False
return [i for i in range(2, max_number) if is_prime[i]]
def calculate_prime_numbers(max_number: int) -> list[int]:
"""
Returns prime numbers below max_number.
See: https://en.wikipedia.org/wiki/Sieve_of_Eratosthenes
>>> calculate_prime_numbers(10)
[2, 3, 5, 7]
>>> calculate_prime_numbers(2)
[]
"""
if max_number <= 2:
return []
# List containing a bool value for every odd number below max_number/2
is_prime = [True] * (max_number // 2)
for i in range(3, isqrt(max_number - 1) + 1, 2):
if is_prime[i // 2]:
# Mark all multiple of i as not prime using list slicing
is_prime[i**2 // 2 :: i] = [False] * (
# Same as: (max_number - (i**2)) // (2 * i) + 1
# but faster than len(is_prime[i**2 // 2 :: i])
len(range(i**2 // 2, max_number // 2, i))
)
return [2] + [2 * i + 1 for i in range(1, max_number // 2) if is_prime[i]]
def slow_solution(max_number: int = 10**8) -> int:
"""
Returns the number of composite integers below max_number have precisely two,
not necessarily distinct, prime factors.
>>> slow_solution(30)
10
"""
prime_numbers = slow_calculate_prime_numbers(max_number // 2)
semiprimes_count = 0
left = 0
right = len(prime_numbers) - 1
while left <= right:
while prime_numbers[left] * prime_numbers[right] >= max_number:
right -= 1
semiprimes_count += right - left + 1
left += 1
return semiprimes_count
def while_solution(max_number: int = 10**8) -> int:
"""
Returns the number of composite integers below max_number have precisely two,
not necessarily distinct, prime factors.
>>> while_solution(30)
10
"""
prime_numbers = calculate_prime_numbers(max_number // 2)
semiprimes_count = 0
left = 0
right = len(prime_numbers) - 1
while left <= right:
while prime_numbers[left] * prime_numbers[right] >= max_number:
right -= 1
semiprimes_count += right - left + 1
left += 1
return semiprimes_count
def solution(max_number: int = 10**8) -> int:
"""
Returns the number of composite integers below max_number have precisely two,
not necessarily distinct, prime factors.
>>> solution(30)
10
"""
prime_numbers = calculate_prime_numbers(max_number // 2)
semiprimes_count = 0
right = len(prime_numbers) - 1
for left in range(len(prime_numbers)):
if left > right:
break
for r in range(right, left - 2, -1):
if prime_numbers[left] * prime_numbers[r] < max_number:
break
right = r
semiprimes_count += right - left + 1
return semiprimes_count
def benchmark() -> None:
"""
Benchmarks
"""
# Running performance benchmarks...
# slow_solution : 108.50874730000032
# while_sol : 28.09581200000048
# solution : 25.063097400000515
from timeit import timeit
print("Running performance benchmarks...")
print(f"slow_solution : {timeit('slow_solution()', globals=globals(), number=10)}")
print(f"while_sol : {timeit('while_solution()', globals=globals(), number=10)}")
print(f"solution : {timeit('solution()', globals=globals(), number=10)}")
if __name__ == "__main__":
print(f"Solution: {solution()}")
benchmark()