I am trying to implement the algorithm of Sieve of Atkin given in Wikipedia Link as below:

What I've tried so far is the implementation in Python given by following Code:

```
import math
is_prime = list()
limit = 100
for i in range(5,limit):
is_prime.append(False)
for x in range(1,int(math.sqrt(limit))+1):
for y in range(1,int(math.sqrt(limit))+1):
n = 4*x**2 + y**2
if n<=limit and (n%12==1 or n%12==5):
# print "1st if"
is_prime[n] = not is_prime[n]
n = 3*x**2+y**2
if n<= limit and n%12==7:
# print "Second if"
is_prime[n] = not is_prime[n]
n = 3*x**2 - y**2
if x>y and n<=limit and n%12==11:
# print "third if"
is_prime[n] = not is_prime[n]
for n in range(5,int(math.sqrt(limit))):
if is_prime[n]:
for k in range(n**2,limit+1,n**2):
is_prime[k] = False
print 2,3
for n in range(5,limit):
if is_prime[n]: print n
```

Now I get error as

```
is_prime[n] = not is_prime[n]
IndexError: list index out of range
```

this means that I am accessing the value in list where the index is greater than length of List. Consider the Condition when x,y = 100, then of-course the condition n=4x^2+y^2 will give value which is greater than length of list. Am I doing something wrong here? Please help.

**EDIT 1**
As suggested by Gabe, using

```
is_prime = [False] * (limit + 1)
```

insted of :

```
for i in range(5,limit):
is_prime.append(False)
```

did solved the problem.