# Right algorithm for finding largest prime factor

I am trying to find out the largest prime factor of any number. I am doing the program for this problem in python, but there seems to be something wrong with the algorithm that I am following. It seems to fall into an infinite loop. The program goes like this:

``````def prime(n):
i=0;
while(n!=2):
for i in range(2,n):
if(n%i==0):
prime(n/i);
else:
continue;
print("The highest prime factor is: "),n;

print("Enter a number to find its highest prime factor");
n=input();
prime(n);
``````

Just point out what are the problems here and also mention if there are any other better algorithm than this one for solving this.

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fix the indentation of your code and make sure that you do not mix up whitespace and tabs. – Andreas Jung Oct 3 '13 at 10:53
while(n!=2): When will n be equal to 2? You are not changing n anywhere. – user1990169 Oct 3 '13 at 10:55
As (n/i) is used in each step and when that's returned to n in the (def prime)value of n is going to decrease. That is why I had given n!=2@AbhishekBansal. Is this not allowed in python? – Dibakar Mitra Oct 3 '13 at 11:04
That's fine, but then when it comes out of the recursive call n is n*i as before. – doctorlove Oct 3 '13 at 11:06
In that part should I approach like this n=n/i and then call as prime(n)@doctorlove – Dibakar Mitra Oct 3 '13 at 11:14

EDIT : It feels like I can't manage to be clear without some code, so here it is, with a few modification from yours :

``````def prime(n):
i=2
while (n%i != 0 and i < n):
i += 1
if (i < n):
return prime (n/i)
else:
print("The highest prime factor is: "),n

print("Enter a number to find its highest prime factor")
n=input()
prime(n)
``````

However, your algorithm is not very efficient. For example, you might consider using Pollard's Rho if you want something better and not long to code. And even if you want to stick with your idea, you shouldn't do your divisibility tests like this. You may want to run an Erathostene sieve first to only test divisibility by prime factors. Or even only remember the last divisor you found in order to restart the algorithm from there, not from 2.

For example, a little bit better code would be :

``````def prime(n,a):
i = a
while (n%i != 0 and i*i < n):
i += 1
if (i*i < n):
return prime (n/i, i)
else:
print("The highest prime factor is: "),n

print("Enter a number to find its highest prime factor")
n=input()
prime(n,2)
``````
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That still gets stuck in a loop – doctorlove Oct 3 '13 at 11:06
Even if I'm using n!=1,the problem persists – Dibakar Mitra Oct 3 '13 at 11:07
That's what I'm asking@doctorlove,how to come out of that loop? – Dibakar Mitra Oct 3 '13 at 11:09
Ok,I will try that @Traklon – Dibakar Mitra Oct 3 '13 at 11:15
Ok@Traklon, the first code that you gave among the last 2 works – Dibakar Mitra Oct 3 '13 at 11:47

Avoiding recursive calls:

``````def largest_prime_factor(number):
if number == 1:
return 1

test = 2
while number > 1:
if number % test == 0:
number /= test
else:
test += 1

return test
``````
-

One simple (but highly inefficient) approach without recursion would be: (please excuse my python syntax).

Assuming isPrime(k) is a function that returns true if k is prime. It can be implemented using sieve of Erastosenes.

``````def prime(n):
i=0;
largestPrimeFactor = -1;
for i in range(2,n/2):
if( isPrime(i) && n%i==0 ) :
largestPrimeFactor = i;
print("The highest prime factor is: "),largestPrimeFactor
``````
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Where are u taking a number as input@Abhishek Bansal and is isPrime any predefined function or the function prime that you taken is same as isPrime? – Dibakar Mitra Oct 3 '13 at 11:39
I had skipped the input part for simplicity. isPrime is another function that you will have to implement. There are numerous ways of doing so. The sieve of Erastothenes is considered one the most efficient ways. Checkout stackoverflow.com/questions/4114167/… – user1990169 Oct 3 '13 at 11:43
Ok@Abhishek ..I will definitely try out – Dibakar Mitra Oct 3 '13 at 11:50

I can stop your code getting tuck in a loop as follows.
The main problem with the stuck in a loop is the `while(n!=2)` (or 1 or whatever) is that you don't change `n`.
Note - it still won't give you prime numbers

``````def prime(n):
i=0
if(n==2):
print "The highest prime factor is 2"
return
for i in range(2,n):
if(n%i==0):
prime(n/i)
else:
continue
print("The highest prime factor is: "),n

print("Enter a number to find its highest prime factor");
n=input()
prime(n)
``````

Search SO with '[python] primes' for lots of ways to do this properly.

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My solution is rather simple and deals well with huge numbers that would cause memory error in most of the solutions above.

``````import math

def prime(n):
for x in range(2, int(math.sqrt(n)) + 1):
if n % x == 0:
print n / x
return prime(n / x)

if __name__ == '__main__':
prime(898563214300)
``````

The last printed number is the largest prime factor.

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consider this code snippet in C, this is a very efficient algorithm for finding the largest prime factor of a number.

The functions are self-explanatory.

``````int isPrime(long long int n)
{
long long int i;
for(i=2;i*i<=n;i++)
if(n%i==0)
return 0;
return 1;
}

long long int findLargestPrimeFactor(long long int n)
{
long long int counter=2;
while(n!=1)
{
if(isPrime(n))
return n;
while(n%counter==0)
n/=counter;
counter++;
}
return counter-1;
}
``````
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