# Fermat's little Theorem python

i am trying to implement Ferment's little Theorem via python. The value that returns does not give me a prime however. Any help is appreciated. Apologies, the theorem states that in which for a random number of of times if a number is prime then any number generated less then it would give pow(a,value,x) == 1. The code below is an implementation of it.

The purpose of the code would be for function generate bit to create a 16 bit integer and run it via the theorem to prove if its a prime or not, if its a prime,return the value, if not call the function generatebit() again. Thank you for your time taken

``````import random
def generatebit():
x = random.getrandbits(16)
x = int(x)
if little(x):
return x

def little(x):
value = x -1
for i in xrange(50000):
# check for a total of 50000 times to reduce chances
a = random.getrandbits(15)
if pow(a,value,x) != 1:
generatebit()
break

return True

a=generatebit()
print a
``````
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I think you'd greatly extend your target audience if you'd insert a small paragraph about what Ferment's little Theorem does, what you'd therefore expect, and what you get instead... –  Nicolas78 May 18 at 18:05
please fix the indentation so that your code is at least runnable –  Pavel May 18 at 18:07
you mean Fermat's little theorem, don't you? –  Pavel May 18 at 18:08
ok even knowing the theorem now, it's not clear to me what you're trying to do here. I'm not voting to close but there's a gap between the theorem and how you're trying to prove(?) it - that's important information. –  Nicolas78 May 18 at 18:12

• you first call `generatebits`, which generates a random number. then if `little(x)`, you return that value. Since however `little(x)` is always true, what this code does is create a random value and return it
• Whatever happens within you `for` loop is totally without effect. all you do is assign a value to a variable `a` that never gets read, and call a function that returns a value you don't read