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97 lines
2.8 KiB
Python
97 lines
2.8 KiB
Python
# -*- coding: utf-8 -*-
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"""Find the value of d < 1000 for which 1/d contains the longest recurring cycle.A unit fraction contains 1 in the numerator.
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The decimal representation of the unit fractions with denominators 2 to 10 are given:
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1/2 = 0.5
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1/3 = 0.(3)
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1/4 = 0.25
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1/5 = 0.2
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1/6 = 0.1(6)
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1/7 = 0.(142857)
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1/8 = 0.125
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1/9 = 0.(1)
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1/10 = 0.1
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Where 0.1(6) means 0.166666..., and has a 1-digit recurring cycle. It can be seen that 1/7 has a 6-digit recurring cycle.
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Find the value of d < 1000 for which 1/d contains the longest recurring cycle in its decimal fraction part.
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"""
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from decimal import Decimal
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from e003 import pfactor
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def coprime(a, b):
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"""Are integers a and b coprime?"""
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primes_a = pfactor(a)
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primes_b = pfactor(b)
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primes = [p for p in primes_a if p in primes_b]
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return bool(primes)
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def long_division(dividend, divisor):
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dividend = str(dividend).replace('.', '')
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i = -1
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remainder = 0
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while True:
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while remainder < divisor:
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i += 1
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remainder *= 10
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try:
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remainder += int(dividend[i])
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except:
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pass
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if remainder == 0:
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return
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digit = str(remainder // divisor)
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remainder = remainder % divisor
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yield digit, remainder
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def get_cycle_length(numerator, denominator):
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"""Determine the period length of a non-terminating decimal"""
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length = None
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numerator = Decimal(numerator)
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denominator = Decimal(denominator)
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if denominator == 1:
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return 1
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"""
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From Wikipedia:
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Terminating decimals represent rational numbers of the form
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k/2^n5^m
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However, a terminating decimal also has a representation as a
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repeating decimal, obtained by decreasing the final (nonzero)
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digit by one and appending an infinitely repeating sequence of
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nines. 1 = 0.999999... and 1.585 = 1.584999999... are two
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examples of this.
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"""
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if coprime(denominator, 10):
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return 1
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digits = []
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for digit in long_division(numerator, denominator):
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if digit in digits:
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cycle = digits[digits.index(digit):]
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return len(cycle)
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digits.append(digit)
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else:
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raise Exception('Non-reciprocal period detection not yet implemented')
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return length
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def main():
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MAX = 1000
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longest_cycle = (0, 0)
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for i in xrange((MAX), 1, -1):
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# The period of 1/k for integer k is always <= k - 1
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if longest_cycle[1] >= i:
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break
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cycle = get_cycle_length(1, i)
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if longest_cycle[1] < cycle:
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longest_cycle = (i, cycle)
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(i, cycle) = longest_cycle
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print 'Longest cycle length is', cycle, 'for i =', i
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if __name__ == '__main__':
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main()
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