# Nested Loop in Python

I'm trying to find the largest palindrome that is the product of two 3-digit numbers. My guest is that the palindrome will have the form `abccba`, so I will just loop over each digit and stop at the largest number that is the product of two 3-digit numbers.

This piece of code

``````def hasLargeDivisors(n):
"""
Function to determine if a number has two divisors
greater than 99
"""
d = 999
while n / d > 99 and n / d < 999 and d > 99:
if n % d is 0:
return True
d-=1

return False

def compisitePalindrome():
"""
Function to find the largest palindrome
that is the product of 2 three-digit numbers
"""
for a in reversed(xrange(1, 9)):
for b in reversed(xrange(0, 9)):
for c in reversed(xrange(0, 9)):
num = a*100001 + b*10010 + c*1100
if hasLargeDivisors(num):
return num

return 0
``````

produces 888888 = 962 * 924, which is incorrect.

This code

``````def hasLargeDivisors(n):
"""
Function to determine if a number has two divisors
greater than 99
"""
d = 999
while n / d > 99 and n / d < 999 and d > 99:
if n % d is 0:
return True
d-=1

return False

def compisitePalindrome():
"""
Function to find the largest palindrome
that is the product of 2 three-digit numbers
"""
a = 9
for b in reversed(xrange(0, 9)):
for c in reversed(xrange(0, 9)):
num = a*100001 + b*10010 + c*1100
if hasLargeDivisors(num):
return num

return 0
``````

produces 906609 = 993 * 913, which is correct.

I don't know where I went wrong.

-
You can highly simplify the algorithm by considering the fact that, any number which is palindrome will be divisible by `11`. So, start with highest multiple of `11`, which is a multiple of two 3 digits numbers, and then step using `-11`, in `xrange` and check whether the number is palindrome or not. –  Rohit Jain Feb 9 '13 at 9:30
Thanks. I've supplied the answer so they gave me a solution. I'm reading it now and it also suggests what you've mentioned. –  Lim H. Feb 9 '13 at 9:34

``````xrange(1, 9) == (1, 2, 3, 4, 5, 6, 7, 8)
``````

`xrange(start, stop, step)` generates all numbers from `start` to (but not including) `stop`, with a step of `step`.

``````xrange(5) == (0, 1, 2, 3, 4)
xrange(1, 5) == (1, 2, 3, 4)
xrange(1, 5, 2) == (1, 3)
``````

You can do `xrange(1, 10)` to include `9` in the range as well.

-
Thanks. So how can I limit the range from 1 to 9 with xrange()? –  Lim H. Feb 9 '13 at 9:14
``````def palindrome_3products():