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I'm trying to solve Project Euler problem #55, which states:

If we take 47, reverse and add, 47 + 74 = 121, which is palindromic.

Not all numbers produce palindromes so quickly. For example,

349 + 943 = 1292, 1292 + 2921 = 4213, 4213 + 3124 = 7337

That is, 349 took three iterations to arrive at a palindrome.

Although no one has proved it yet, it is thought that some numbers, like 196, never produce a palindrome. A number that never forms a palindrome through the reverse and add process is called a Lychrel number. Due to the theoretical nature of these numbers, and for the purpose of this problem, we shall assume that a number is Lychrel until proven otherwise. In addition you are given that for every number below ten-thousand, it will either (i) become a palindrome in less than fifty iterations, or, (ii) no one, with all the computing power that exists, has managed so far to map it to a palindrome. In fact, 10677 is the first number to be shown to require over fifty iterations before producing a palindrome: 4668731596684224866951378664 (53 iterations, 28-digits).

Surprisingly, there are palindromic numbers that are themselves Lychrel numbers; the first example is 4994.

How many Lychrel numbers are there below ten-thousand?

TL;DR: If a number is not a palindrome, add it to the reverse of itself. Still no? Repeat. ...50 iterations later... It's a Lychrel number.

My code:

def isPalindrome(n):
    return str(n)[::-1] == str(n)

lychrels = 0

for i in range(1,10000):
    lychrel = True
    for j in range(50):
        if isPalindrome(i):
            lychrel = False
            break

        else:
            i += int(str(i)[::-1])

    if lychrel:
        lychrels += 1

print(lychrels)

It works correctly for the test cases of 349 (non-Lychrel) and 196 (Lychrel), but Project Euler is rejecting the answers I'm getting.

I have not yet solved the problem, so I would prefer hints over a direct solution.

What am I doing wrong?

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The first number that your function fails for is 4994. –  Blender May 3 '13 at 20:00

1 Answer 1

up vote 3 down vote accepted

You make an incorrect assumption about a number that starts off as a palindrome not being lychrel. I think that's your only error.

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Got it! Thanks! :D –  John May 3 '13 at 19:59

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