# How do I obtain all primes from a certain set?

``````def all_primes(start,end):
list_nonprimes = []
list_primes = []

for i in range(start,end):
for a in range(2,i):
if i % a == 1 and i not in list_nonprimes:
if i not in list_primes:
list_primes.append(i)
else:
list_nonprimes.append(i)

return list_primes
``````

Why is this giving me an an incorrect output?

``````>>> all_primes(1,10)
[3,5,7,9]
``````

How do I eliminate the 9?

-
2 is considered a prime too –  xbonez Nov 17 '12 at 5:33
Why loop over `range(2,i)` when you already have a list of all of the primes less than `i`? –  Amber Nov 17 '12 at 5:38
Aside: you may be interested in learning about `any` and `all`. I think `if not any(i % a == 0 for a in list_primes): list_primes.append(i)` reads better than the `for-else` version, although YMMV. –  DSM Nov 17 '12 at 5:57

There's a more straightforward way to do this, since you're already inherently generating the list of primes less than the number you're currently checking:

``````def all_primes(start,end):
list_primes = []

for i in range(2,end):
for a in list_primes:
if i % a == 0:
break
else:
list_primes.append(i)

return [x for x in list_primes if x >= start]
``````

Key to understanding this is knowing how the `for...else` construct works in Python. Essentially, a `for` loop can have an `else` statement, which is only executed if no `break` statement was run during the evaluation of the loop.

-
I didn't know this thanks. Could you go over in more detail how to use the else in a for loop and what the last line of code does? –  Jacob Worldly Nov 17 '12 at 5:53
Sure. `for...else` is pretty much what was described - it's like a regular `for` loop, and then the `else` part is run if the `for` loop finishes without a `break`. The last line is what's called a list comprehension. –  Amber Nov 17 '12 at 8:11

I tried going over your code to see where you're going wrong, but ended up making quite some changes and optimizations. I've commented the code so hopefully it explains itself.

``````def all_primes(start,end):
list_nonprimes = []
list_primes = []

for i in range(start,end):
# if already present in non_primes, skip
if i in list_nonprimes: continue

# if already present in primes, skip
if i in list_primes: continue

# if 2, mark it as prime. Special case
if i == 2 :
list_primes.append(i)
continue

# even numbers are not prime
if i%2 == 0:
list_nonprimes.append(i)
continue

# only check divisibility with odd numbers starting at 3
# and ending at sqrt(i)
for a in range(3,int(i**0,5)+1,2):
if i % a == 0 :
list_nonprimes.append(i)
break

# if we got here, and the number wasn;t added to non_primes
# it must be a prime
if i not in list_nonprimes: list_primes.append(i)

return list_primes

start = 2
end = 10
print all_primes(start, end)
``````

Demo

-

Change it from :

``````        if i % a == 1 and i not in list_nonprimes:
if i not in list_primes:
list_primes.append(i)
else:
list_nonprimes.append(i)
``````

to:

``````        if i % a == 0 and i not in list_primes:
if i not in list_nonprimes:
list_nonprimes.append(i)
else:
list_primes.append(i)
``````

Aside: You can also consider implementing Sieve of Eratosthenes instead. It's fairly straight forward to understand and much more efficient.

-
That doesn't seem right. all_primes(1, 10) now returns [4, 6, 8]. Perhaps 'if i % a != 0 ...'? –  threenplusone Nov 17 '12 at 5:36
@threenplusone, sry, I was still editing. You needed to swap your logic because `i % a == 1` is only one possible condition for a non-prime. You should instead check to see if something IS a prime and eliminate it by checking `if i % a == 0` –  sampson-chen Nov 17 '12 at 5:40