# Palindromic prime number in python

So I'm trying to figure out how to find all the palindrome prime numbers between 2 numbers. So far my code can find the palindrome but when I check for a prime number, it prints out the non-primes as well. And there are numbers which are printed multiple times.

Thanks.

``````a = 0
b = 500
a += 1
for i in range(a,b):
if(str(i) == str(i)[::-1]):
if(i>2):
for a in range(2,i):
y = True
if(i%a==0):
y = False
break
if y:
print(i)
``````
• It might be helpful to modularize your code more, i.e. add a `is_prime()` function and `is_palindrome()` function. This will definitely make it more readable the hallmark of python
– C.B.
Commented Mar 27, 2014 at 21:32
• You `print(i)` immediately after the palindrome check
– wim
Commented Mar 27, 2014 at 21:33
• And never set `y` to `True` again, either.
– a p
Commented Mar 27, 2014 at 21:34
• You use a print right after the test for palundromes happen, without considering primality Commented Mar 27, 2014 at 21:34
• Also, could you please explain what the last line is used for? Commented Mar 27, 2014 at 21:36

Based on your most recent code, you simply need to make sure that you reset `y`, which serves as your positive indicator of primality, for each number you test. Otherwise, it will stay `False` when you get to the number 4, the first composite number.

``````>>> a = 0
>>> b = 500
>>> a += 1
>>> for i in range(a,b):
y = True
if(str(i) == str(i)[::-1]):
if(i>2):
for a in range(2,i):
if(i%a==0):
y = False
break
if y:
print(i)

3
5
7
11
101
131
151
181
191
313
353
373
383
``````

As you can see, all of these are prime. You can check the list of primes wolframalpha provides to be sure that no palindromic primes have been omitted. If you want to include 2, add a special case for that.

• I got exactly the same thing. I though some were missing because I forgot for some time it was palindromic prime I was looking for. Thanks a lot. Commented Mar 27, 2014 at 23:13
• I still cannot see, why the condition `if(i>2)` is necessary. This is what prevents number 2 to be printed, so it should be changed to `if(i>1)`, or for even better efficiency, completely removed, and the line `a = max(a+1, 2)` used instead of the line `a += 1`. Commented Mar 28, 2014 at 12:22

``````a = 0
b = 500
a += 1
y = True
for i in range(a,b):
if(str(i) == str(i)[::-1]):
print (i)      # <--- You print every number that is a palindrome
if(i>2):
for a in range(2,i):
if(i%a==0):
y = False   # <--- This never gets set back to True
break
if y:
print(i)

i+=i   # <--- This is doing nothing useful, because it's a "for" loop
``````

Look at my code below, we don't need to initialize Y as well. A For-Else block works well.

``````a = 0
b = 500
a += 1
for i in range(a,b):
if(str(i) == str(i)[::-1]):
if(i>1):
for a in range(2,i):
if(i%a==0):
y = False
break
else:
print(i)
``````

To get 2 included in the answer, just be sure to check the if condition as (i>1) as mentioned by @elias

Here is the pretty fast implementation based on "Sieve of Atkin" algorithm. I calculate all primes numbers up to the end and then filter only palindromic ones where number is greater or equal to start.

``````import math
import sys

def pal_primes(start,end):
return list(filter(lambda x: str(x)==str(x)[::-1] and x>=start, sieveOfAtkin(end)))

def sieveOfAtkin(limit):
P = [1,2,3]
sql = int(math.sqrt(limit))
r = range(1,sql+1)
sieve=[False]*(limit+1)
for x in r:
for y in r:
xx=x*x
yy=y*y
xx3 = 3*xx
n = 4*xx + yy
if n<=limit and (n%12==1 or n%12==5) : sieve[n] = not sieve[n]
n = xx3 + yy
if n<=limit and n%12==7 : sieve[n] = not sieve[n]
n = xx3 - yy
if x>y and n<=limit and n%12==11 : sieve[n] = not sieve[n]
for x in range(5,sql):
if sieve[x]:
xx=x*x
for y in range(xx,limit+1,xx):
sieve[y] = False
for p in range(5,limit):
if sieve[p] : P.append(p)
return P

if __name__=="__main__":
print(pal_primes(int(sys.argv[1]),int(sys.argv[2])))
``````