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In problem 4 from http://projecteuler.net/ it says:

A palindromic number reads the same both ways. The largest palindrome made from the product of two 2-digit numbers is 9009 = 91 * 99.

Find the largest palindrome made from the product of two 3-digit numbers.

I have this code here

def isPalindrome(num):
    return str(num) == str(num)[::-1]
def largest(bot, top):
    for x in range(top, bot, -1):
        for y in range(top,bot, -1):
            if isPalindrome(x*y):
                return x*y
print largest(100,999)

It should find the largest palindrome, it spits out 580085 which I believe to be correct, but project euler doesn't think so, do I have something wrong here?

When I revered the for loop I didn't think it through, I removed the thing that checks for the biggest, silly me. Heres the working code

def isPalindrome(num):
    return str(num) == str(num)[::-1]
def largest(bot, top):
    z = 0
    for x in range(top, bot, -1):
        for y in range(top,bot, -1):
            if isPalindrome(x*y):
                if x*y > z:
                    z = x*y
    return z
print largest(100,999)

it spits out 906609

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FYI the answer is 906609 –  Ashwini Chaudhary Oct 1 '12 at 13:37
By what numbers? –  FabianCook Oct 1 '12 at 13:38
Because I got 995 * 583 = 580085 –  FabianCook Oct 1 '12 at 13:40
There we go, silly me –  FabianCook Oct 1 '12 at 13:46

7 Answers 7

up vote 6 down vote accepted

Iterating in reverse doesn't find the largest x*y, it finds the palindrome with the largest x. There's a larger answer than 580085; it has a smaller x but a larger y.

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Hmm, lets change this around a bit, brb. –  FabianCook Oct 1 '12 at 13:41
Agreed. Rather than returning as soon as you find a palindrome, you need to test every combination and keep track of the largest. –  japreiss Oct 1 '12 at 13:41
Balls. Here we go –  FabianCook Oct 1 '12 at 13:42
Check my edit, it works now –  FabianCook Oct 1 '12 at 13:43

This would more efficiently be written as:

from itertools import product

def is_palindrome(num):
    return str(num) == str(num)[::-1]

multiples = ( (a, b) for a, b in product(xrange(100,999), repeat=2) if is_palindrome(a*b) )
print max(multiples, key=lambda (a,b): a*b)
# (913, 993)

You'll find itertools and generators very useful if you're doing Euler in Python.

share|improve this answer
My simple code works fast enough for me :) –  FabianCook Oct 1 '12 at 13:49
Im only using python for this because it is an interpreted language, otherwise I would use java –  FabianCook Oct 1 '12 at 13:50
@SmartLemon fair enough - Haskell's very useful as well though ;) –  Jon Clements Oct 1 '12 at 13:50
Is it worth learning? –  FabianCook Oct 1 '12 at 13:51
@SmartLemon For these kind of things - definitely - look at the haskell solutions on the Euler answer board for the ones you've already solved - you'll find code snippet (I think there's also a website which has the code written for the first 'n' many problems in Haskell as well) –  Jon Clements Oct 1 '12 at 13:54

Not the most efficient answer but I do like that it's compact enough to fit on one line.

print max(i*j for i in xrange(1,1000) for j in xrange(1,1000) if str(i*j) == str(i*j)[::-1])
share|improve this answer

Tried making it more efficient, while keeping it legible:

def is_palindrome(num):
    return str(num) == str(num)[::-1]

def fn(n):
    max_palindrome = 1
    for x in range(n,1,-1):
        for y in range(n,x-1,-1):
            if is_palindrome(x*y) and x*y > max_palindrome:
                max_palindrome = x*y
            elif x * y < max_palindrome:
    return max_palindrome

print fn(999)
share|improve this answer

ReThink: efficiency and performance

def palindrome(n):    

    maxNumberWithNDigits = int('9' * n) #find the max number with n digits

    product = maxNumberWithNDigits * maxNumberWithNDigits 

    #Since we are looking the max, stop on the first match

    while True:        
        if str(product) == str(product)[::-1]: break;


    return product


palindrome...: 997799, 0.000138998031616 secs

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Here I added two 'break' to improve the speed of this program.

def is_palindrome(num):
    return str(num) == str(num)[::-1]
def max_palindrome(n):
    max_palindrome = 1
    for i in range(10**n-1,10**(n-1)-1,-1):
        for j in range(10**n-1,i-1,-1):
            if is_palindrome(i*j) and i*j > max_palindrome:
                max_palindrome = i * j
            elif i*j < max_palindrome:
    return max_palindrome
print max_palindrome(n)
share|improve this answer
Comments to clarify your code are highly appreciated –  olyv Jan 20 at 15:13


def is_pallindrome(n):
    s = str(n)
    for n in xrange(1, len(s)/2 + 1):
        if s[n-1] != s[-n]:
            return False    
    return True

largest = 0
for j in xrange(100, 1000):
    for k in xrange(j, 1000):
        if is_pallindrome(j*k):
            if (j*k) > largest: largest = j*k
print largest
share|improve this answer

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