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""" |
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Project Euler Problem 14: Longest Collatz Sequence |
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================================================== |
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.. module:: solutions.problem14 |
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:synopsis: My solution to problem #14. |
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The source code for this problem can be |
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`found here <https://bitbucket.org/nekedome/project-euler/src/master/solutions/problem14.py>`_. |
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Problem Statement |
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################# |
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13
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14
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The following iterative sequence is defined for the set of positive integers: |
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16
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.. math:: |
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n &\\rightarrow \\frac{n}{2} \\; \\; \\; & \\mbox{(n is even)} \\\\ |
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n &\\rightarrow 3n + 1 \\; \\; \\; & \\mbox{(n is odd)} |
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Using the rule above and starting with :math:`13`, we generate the following sequence: |
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:math:`13 \\rightarrow 40 \\rightarrow 20 \\rightarrow 10 \\rightarrow 5 \\rightarrow 16 \\rightarrow 8` |
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:math:`\\rightarrow 4 \\rightarrow 2 \\rightarrow 1` |
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It can be seen that this sequence (starting at :math:`13` and finishing at :math:`1`) contains :math:`10` terms. |
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Although it has not been proved yet (Collatz Problem), it is thought that all starting numbers finish at :math:`1`. |
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28
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Which starting number, under one million, produces the longest chain? |
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.. note:: once the chain starts the terms are allowed to go above one million. |
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32
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Solution Discussion |
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################### |
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35
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This solution simply uses an exhaust coupled with memoisation to avoid re-computing the same value over and over. |
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The search space is iterated, and any partial results (that may form the tail of subsequent sequences) will be cached |
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along with the associated chain length. |
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40
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Upon completion, search for the largest chain. |
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Solution Implementation |
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####################### |
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.. literalinclude:: ../../solutions/problem14.py |
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:language: python |
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:lines: 50- |
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""" |
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50
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from typing import Dict |
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from lib.numbertheory import is_even |
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54
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def collatz(n: int, d: Dict[int, int]) -> int: |
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""" Compute the Collatz sequence starting at :math:`n` |
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The length of a Collatz sequence starting at :math:`n` can be computed by iterating the Collatz map until it reaches |
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59
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:math:`1`. While this would be sensible for a single :math:`n`, performing this for many values of :math:`n` will |
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60
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result in a lot of redundant calculations. |
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61
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62
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Consider the following two overlapping Collatz sequence: |
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64
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.. math:: |
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66
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64 \\rightarrow 32 \\rightarrow 16 \\rightarrow 8 \\rightarrow 4 \\rightarrow 2 \\rightarrow 1 \\\\ |
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10 \\rightarrow 5 \\rightarrow 16 \\rightarrow 8 \\rightarrow 4 \\rightarrow 2 \\rightarrow 1 |
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69
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Observe the coalescence of these two sequences when they both reach the value :math:`16`. These two sequences |
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70
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provide the lengths of Collatz sequences starting at: :math:`1,2,4,5,8,10,16,32` and :math:`64`. |
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72
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By caching all results as we go we can avoid re-computing the tail of any coalescing sequences. |
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:param n: the start of the Collatz sequence |
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:param d: a dictionary of existing solutions |
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:return: the length of the Collatz sequence starting at :math:`n` |
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78
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.. note:: the dictionary :math:`d` will be updated with any partial results computed. |
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""" |
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try: |
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return d[n] |
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except KeyError: |
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if is_even(n): |
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d[n] = 1 + collatz(n // 2, d) |
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else: |
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d[n] = 1 + collatz(3 * n + 1, d) |
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return d[n] |
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90
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91
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def solve(): |
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""" Compute the answer to Project Euler's problem #14 """ |
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upper_bound = 1000000 # search limit |
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96
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# Apply the recursive to find the maximal length chain |
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d = {1: 1} |
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for i in range(1, upper_bound, 1): |
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collatz(i, d) |
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# Identify the largest chain |
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v = list(d.values()) |
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k = list(d.keys()) |
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answer = k[v.index(max(v))] |
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return answer |
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108
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109
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expected_answer = 837799 |
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110
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Bill
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