# Euler problem number #4

Using Python, I am trying to solve problem #4 of the Project Euler problems. Can someone please tell me what I am doing incorrectly? The problem is to Find the largest palindrome made from the product of two 3-digit numbers. Here is what I have thus far.

``````import math

def main():
for z in range(100, 1000):
for y in range(100, 1000):
for x in range(1, 1000000):
x = str(x)
if x == x[::-1] and x == z*y:
print x

if __name__ == '__main__':
main()
``````
-
What doesn't work? Does it get an error? Please provide the stack trace. Does it seem to run forever? Hmmm... Maybe that's why it's hard. –  S.Lott Feb 17 '09 at 0:02
Do you mean question 4? –  Gregg Lind Feb 17 '09 at 0:09
@Baltimark: or does it not print because it's attempting to iterate over nearly a trillion items? If you can evaluate 10,000 per second, you'll only take about 3 years to finish. –  S.Lott Feb 17 '09 at 3:06
marc, can you please retitle this question to show that it's for #4? –  Gregg Lind Feb 18 '09 at 16:25
sorry you're totally correct its actually qusetion 4 –  marc lincoln Feb 19 '09 at 22:04

Try computing x from the product of z and y rather than checking every number from 1 to a million. Think about it: if you were asked to calculate 500*240, which is more efficient - multiplying them, or counting up from 1 until you find the right answer?

-

Some efficiency issues:

1. start at the top (since we can use this in skipping a lot of calculations)
2. don't double-calculate
``````def is_palindrome(n):
s = str(n)
return s == s[::-1]

def biggest():
big_x, big_y, max_seen = 0,0, 0
for x in xrange(999,99,-1):
for y in xrange(x, 99,-1):  # so we don't double count
if x*y < max_seen: continue  # since we're decreasing,
# nothing else in the row can be bigger
if is_palindrome(x*y):
big_x, big_y, max_seen = x,y, x*y

return big_x,big_y,max_seen

biggest()
# (993, 913, 906609)
``````
-
You could probably write the inner loop as "for y in xrange(x, 99, -1)" and thereby save some computation. –  Nikhil Chelliah Feb 17 '09 at 0:13
oh you're right! I'll edit it! –  Gregg Lind Feb 17 '09 at 0:17
That was mostly a typo. it should be pretty tight now. –  Gregg Lind Feb 17 '09 at 0:17
That also means you can remove "if y > x: continue". But yes, good solution. +1 –  Nikhil Chelliah Feb 17 '09 at 0:21
Woah, misread it this time. Actually "if (x*y) > max_seen:" is the redundant statement now. –  Nikhil Chelliah Feb 17 '09 at 0:25

Here's some general optimizations to keep in mind. The posted code handles all of this, but these are general rules to learn that might help with future problems:

1) if you've already checked z = 995, y = 990, you don't need to check z = 990, y = 995. Greg Lind handles this properly

2) You calculate the product of z*y and then you run x over a huge range and compare that value to y*z. For instance, you just calculated 900*950, and then you run x from 1000 to 1M and see if x = 900*950. DO you see the problem with this?

3) Also, what happens to the following code? (this is why your code is returning nothing, but you shouldn't be doing this anyway)

``````x = str(100)
y = 100
print x == y
``````

4) If you figure out (3), you're going to be printing a lot of information there. You need to figure out a way to store the max value, and only return that value at the end.

5) Here's a nice way to time your Euler problems:

``````if __name__ == "__main__":
import time
tStart = time.time()
print "Answer = " + main()
print "Run time = " + str(time.time() - tStart)
``````
-
oh, yeah. . .there's also a way to handle palindrome mathematically, but my method doesn't seem to be any faster than converting to string, and checking. Still, it's a good exercise. –  Baltimark Feb 17 '09 at 1:12
+1 good answer. Also, there is a built-in library for accurate timing, as of Python 2.5: `import cProfile; cProfile.run('biggest()', None, 'cumulative')` –  LarsH Jan 3 '13 at 20:42

rather than enumerating all products of 3-digit numbers (~900^2 iterations), enumerate all 6- and 5-digit palyndromes (this takes ~1000 iterations); then for each palyndrome decide whether it can be represented by a product of two 3-digit numbers (if it can't, it should have a 4-digit prime factor, so this is kind of easy to test).

-
it's more tedious to write a memoizing factorizer than to just seive the numbers, in this case. –  Gregg Lind Feb 17 '09 at 0:46
And the factorization is not free either, so you don't gain that much, if anything at all. –  starblue Feb 19 '09 at 22:11

comparing string with an integer in

``````x == z*y
``````

there are also logical errors

start in reverse order `range(999, 99, -1)`. that'll be more efficient. remove third loop and second comparison altogether.

-

The question states:

``````What is the largest prime factor of the number 600851475143?
``````

I solved this using C#, but the algorithm itself is language-agnostic.

1. Create a method for determining if a number is prime or not. This can be brute-force (rather than using a much more efficient sieving algorithm) and looks like this:

``````private static long IsPrime(long input)
{
if ((input % 2) == 0)
{
return 2;
}
else if ((input == 1))
{
return 1;
}
else
{
long threshold = (Convert.ToInt64(Math.Sqrt(input)));
long tryDivide = 3;
while (tryDivide < threshold)
{
if ((input % tryDivide) == 0)
{
Console.WriteLine("Found a factor: " + tryDivide);
return tryDivide;
}
tryDivide += 2;
}
Console.WriteLine("Found a factor: " + input);
return -1;
}
}
``````
1. Once I have a function to determine primality, I can use this function to find the highest prime factor

``````private static long HighestPrimeFactor(long input)
{
bool searching = true;
long highestFactor = 0;
while (searching)
{
long factor = IsPrime(input);
if (factor != -1)
{
input = input / factor;
}
if (factor == -1)
{
highestFactor = theFactors.Max();
searching = false;
}
}
return highestFactor;
}
``````

I hope this helps without giving too much away.

-
I believe the OP means question 4 –  Gregg Lind Feb 17 '09 at 0:10
The algorithm may be agnostic, but a C# implementation can be difficult to follow if you don't know the language. Psuedocode would have been nicer. –  John Fouhy Feb 17 '09 at 0:24
Original poster did typo and say 3 when he meant 4; later edited. –  Jenn D. Feb 19 '09 at 22:28

The other advice here is great. This code also works. I start with 999 because we know the largest combination possible is 999*999. Not python, but some quickly done pseudo code.

``````public static int problem4()
{
int biggestSoFar=0;
for(int i = 999; i>99;i--){
for(int j=999; j>99;j--){
if(i*j>biggestSoFar)
biggestSoFar=i*j;
}
}
return biggestSoFar;
}
``````
-

This adds a couple of optimizations to @GreggLind's good solution, cutting the run time in half:

``````def is_palindrome(n):
s = str(n)
return s == s[::-1]

def biggest():
big_x, big_y, max_seen = 0,0, 0
for x in xrange(999,99,-1):
# Optim. 1: Nothing in any row from here on can be bigger.
if x*x < max_seen: break

for y in xrange(x, 99,-1):  # so we don't double count
# Optim. 2: break, not continue
if x*y < max_seen: break  # since we're decreasing,
# nothing else in the row can be bigger

if is_palindrome(x*y):
big_x, big_y, max_seen = x,y, x*y

return big_x,big_y,max_seen

biggest()
# (993, 913, 906609)
``````

The line

``````if x*x < max_seen: break
``````

means that once we get to the point where x is less than sqrt of largest palindrome yet seen, not only do we not need to investigate any more factors on that row; we don't even need to investigate any more rows at all, since all remaining rows would start from a number less than the current value of x.

This doesn't reduce the number of times we call `is_palindrome()`, but it means many fewer iterations of the outer loop. The value of `x` that it breaks on is 952, so we've eliminated the checking of 853 rows (albeit the "smaller" ones, thanks to the other `break`).

I also noticed that

``````if x*y < max_seen: continue
``````

should be

``````if x*y < max_seen: break
``````

We are trying to short-circuit the whole row, not just the current iteration of the inner loop.

When I ran this script using cProfile, the cumulative time for `biggest()` was about 56 msec on average, before the optimizations. The optimizations shrank it to about 23 msec. Either optimization alone would deliver most of that improvement, but the first one is slightly more helpful than the second.

-
I would also like to see if we gain anything by running not on rows but on diagonals, where on each diagonal, `x + y` is constant, counting down from 999+999. –  LarsH Jan 3 '13 at 21:07

Wow, this approach improves quite a bit over other implementations on this page, including mine.

• walking down the three-digit factors row by row (first do all y for x = 999, then all y for x = 998, etc.),

we

• walk down the diagonals: first do all x, y such that x + y = 999 + 999; then do all x, y such that x + y = 999 + 998; etc.

It's not hard to prove that on each diagonal, the closer x and y are to each other, the higher the product. So we can start from the middle, `x = y` (or `x = y + 1` for odd diagonals) and still do the same short-circuit optimizations as before. And because we can start from the highest diagonals, which are the shortest ones, we are likely to find the highest qualifying palindrome much sooner.

``````maxFactor = 999
minFactor = 100

def biggest():
big_x, big_y, max_seen, prod = 0, 0, 0, 0

for r in xrange(maxFactor, minFactor-1, -1):
if r * r < max_seen: break

# Iterate along diagonals ("ribs"):

# Do rib x + y = r + r
for i in xrange(0, maxFactor - r + 1):
prod = (r + i) * (r - i)

if prod < max_seen: break

if is_palindrome(prod):
big_x, big_y, max_seen = r+i, r-i, prod

# Do rib x + y = r + r - 1
for i in xrange(0, maxFactor - r + 1):
prod = (r + i) * (r - i - 1)

if prod < max_seen: break

if is_palindrome(prod):
big_x, big_y, max_seen = r+i,r-i-1, prod

return big_x, big_y, max_seen

# biggest()
# (993, 913, 906609)
``````

## A factor-of-almost-3 improvement

Instead of calling is_palindrome() 6124 times, we now only call it 2228 times. And the total accumulated time has gone from about 23 msec down to about 9!

I'm still wondering if there is a perfectly linear (O(n)) way to generate a list of products of two sets of numbers in descending order. But I'm pretty happy with the above algorithm.

-

Here is a solution that you might consider. It could be far more efficient but only takes a little time to run.

``````largest = 0
for a in range(100, 1000):
for b in range(100, 1000):
c = a * b
if str(c) == ''.join(reversed(str(c))):
largest = max(largest, c)
print(largest)
``````
-

Here is an efficient general solution (~5x faster than others I have seen):

``````def pgen(factor):
''' Generates stream of palindromes smaller than factor**2
starting with largest possible palindrome '''
pmax = str(factor**2)
half_palindrome = int(pmax[0:len(pmax)/2]) - 1
for x in xrange(half_palindrome, 0, -1):
yield int(str(x) + str(x)[::-1])

def biggest(factor):
''' Returns largest palindrome and factors '''
for palindrome in pgen(factor):
for f1 in xrange(factor/11*11, factor/10, -11):
f2 = palindrome/f1
if f2 > factor:
break
if f2*f1 == palindrome:
return palindrome, f1, f2

>>> biggest(99)
(9009, 99, 91)
>>> biggest(999)
(906609, 993, 913)
>>> biggest(9999)
(99000099, 9999, 9901)
>>> biggest(99999)
(9966006699L, 99979, 99681L)
>>> biggest(9999999)
(99956644665999L, 9998017, 9997647L)
>>> biggest(99999999)
(9999000000009999L, 99999999, 99990001L)
>>> biggest(999999999)
(999900665566009999L, 999920317, 999980347L)
``````
-

If your program is running slow, and you have nested loops like this:

``````for z in range(100, 1000):
for y in range(100, 1000):
for x in range(1, 1000000):
``````

Then a question you should ask yourself is: "How many times will the body of the innermost loop execute?" (the body of your innermost loop is the code that starts with: `x = str(x)`)

In this case, it's easy to figure out. The outer loop will execute 900 times. For each iteration the middle loop will also execute 900 times – that makes 900×900, or 810,000, times. Then, for each of those 810,000 iterations, the inner loop will itself execute 999,999 times. I think I need a long to calculate that:

``````>>> 900*900*999999
809999190000L
``````

In other words, you're doing your palindrome check almost 810 billion times. If you want to make it into the Project Euler recommended limit of 1 minute per problem, you might want to optimise a little :-) (see David's comment)

-

This is what I did in Java:

``````public class Euler0004
{
//assumes positive int
static boolean palindrome(int p)
{
//if there's only one char, then it's
//  automagically a palindrome
if(p < 10)
return true;

char[] c = String.valueOf(p).toCharArray();

//loop over the char array to check that
//  the chars are an in a palindromic manner
for(int i = 0; i < c.length / 2; i++)
if(c[i] != c[c.length-1 - i])
return false;

return true;
}

public static void main(String args[]) throws Exception
{
int num;
int max = 0;

//testing all multiples of two 3 digit numbers.
// we want the biggest palindrome, so we
// iterate backwards
for(int i = 999; i > 99; i--)
{
// start at j == i, so that we
//  don't calc 999 * 998 as well as
//  998 * 999...
for(int j = i; j > 99; j--)
{
num = i*j;

//if the number we calculate is smaller
//  than the current max, then it can't
//  be a solution, so we start again
if(num < max)
break;

//if the number is a palindrome, and it's
//  bigger than our previous max, it
if(palindrome(num) && num > max)
max = num;
}
}

//once we've gone over all of the numbers
//  the number remaining is our answer
System.out.println(max);

}
}
``````
-

Here is my solution:

``````polindroms = [(x, y, x * y) for x in range(100, 999) for y in range(100, 999) if str(x * y) == str(x * y)[::-1]]
print max(polindroms, key = lambda item : item[2])
``````
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