# Program to factorize a number into two smaller prime numbers

I have a very big number, and I want to make a program, that finds two prime numbers, that will give the original number, if multiplied.

``````Ex.
Original_number = 299

// The program should get these two numbers:

q = 13
p = 23
``````

The program runs fine at the start, but at a certain point, it just stops, and I'm not sure what is wrong. The code:

``````import time
import math

def main():
time1 = time.clock()
q  = int(0)
p = int(0)
finalnumber = int(377)

print("in main \n")
print("q = ", q)
print("\n p = ", p)

gotResult = 0

while(gotResult == 0):

p = GetNextPrime(p)

if(p >= finalnumber):
q = GetNextPrime(q)
p = q
p = GetNextPrime(p)

if(q * p == finalnumber):
gotResult == 1
break

print("q = ", q)
print("\n p = ", p)
time2 = time.clock()

ElapsedTime = time2 - time1
print("Elapsed time: ", ElapsedTime)

def GetNextPrime(prime):
print("in GetNextPrime \n")
isPrime = 0

while(isPrime == 0):
prime = prime + 1
if(IsPrime(prime)== 1):
isPrime = 1

return prime

def IsPrime(prime):
print("in IsPrime \n")
isPrime = 0
i = 2

while(i <= math.sqrt(prime)):
if(i % 2 == 0):
i = i+1
if(prime % i == 0):
isPrime = 1
break

return isPrime

#start of program here
main()
``````

I have written the program in python, and I know it probably isn't good, because I'm new to python.(I have been programming C++, and I'm not even good at it) But I hope you can help me find the problem :)

ps. What is the maximum size of the original number? How many ciphers can it have?

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post code here, not on pastebin –  nbt Jun 6 '11 at 15:10
Take note that a prime cannot be the product of two primes. –  blizpasta Jun 6 '11 at 15:14
do you mean relatively prime? –  schwiz Jun 6 '11 at 15:20
`gotResult == 1` compares values, doesn't assign them. –  Wooble Jun 6 '11 at 15:23
Dude... cache your primes (and seed your cache). There is no reason to look at 3 every time you look this up. –  cwallenpoole Jun 6 '11 at 15:40
show 1 more comment

A simple approach is trial division:

``````import math
def factors(number):
return [(x, number / x)  for x in range(int(math.sqrt(number)))[2:] if not number % x]
``````

Then `factors(299)` returns `[(13,23)]`

There are problems with this method for large numbers:

1. Large numbers may exceed the python integer limit (found in `sys.maxint`). A 64-bit machine will be limited to 18 decimal digits.

2. Factoring large numbers is a hard problem, and an open research question. Trial division is about as brute force as it comes, but it will work for smaller numbers. Otherwise, you'll quickly need a more sophisticated algorithm. See wikipedia for a discussion.

3. If you're going to brute-force numerical problems, python is the wrong language. Identical algorithms will run faster in a compiled language like C++.

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In addition to Jochel Ritzel's and DSM's answers, the logic in main() while loop fails to account for cases when the number is not a product of two primes (then it will go into infinite loop).

Also, if you expect to factor really large numbers (say more than 20-30 digits), your approach is probably too slow. You should use Erastothenes sieve at minimum to generate a large enough list of primes in advance if you want to get acceptable results.

There are (pretty sophisticated) algoritms to deal with larger cases, but in general, this is a difficult problem and the solution to it scales very badly with number of digits.

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`isPrime` is wrong. You return 1 when the number is not prime. Also you never test if the number can be divided by 2. I didn't look any further than that.

Protip: Python is not C. There is `True, False` and you don't need all the brackets in `if, while`.

You should really test every function you write, not the whole program - that tells you nothing about where the bugs are.

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In the following logic:

``````while(i <= math.sqrt(prime)):
if(i % 2 == 0):
i = i+1
if(prime % i == 0):
isPrime = 1
break
``````

If i is odd and prime isn't divisible by it, it'll loop forever, and here it gets stuck on 3. [The other obvious problem has already been pointed out.]

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``````some_primes = [2, 3, 5, 7, 11] # you can generate a better list