# Adding Prime numbers and Fibonacci numbers [duplicate]

prime numbers :

``````P=[2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, …]
``````

fibonacci numbers :

``````F=[0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, …]
``````

i want the user to give a random number between (1,100000) and the program to summarize the result `(F[n]+P[n])`for example if `n=3` `F[3]+P[3]=7+2=9`

i have written the following code :

``````import math
def F(n):
return int(((1+math.sqrt(5))**n-(1-math.sqrt(5))**n)/(2**n*math.sqrt(5)))
L=[]
L.append(2)
L=[]
for n in range(2, 10000):
for x in range(2, n):
if n % x == 0:
break
else:
# loop fell through without finding a factor
L.append(n)

while True:
x = raw_input().strip()
if x == "END" or x == "end":
break
else:
num = int(x)
print F(num)+L[num]
``````

it easy for me to find the Fib numbers just from the def F(n) ,but creating the prime numbers list is really a headache cause as the numbers increase it take some time for the list to be created,and making almost impossible to reach the n into those huge numbers..i tried to make a def not to creating the list butjust calculating the prime number just for the n provided by the user.any ideas??

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The question essentially boils down to stackoverflow.com/questions/1995890/… –  NPE Jan 3 '13 at 21:30
Algorithms to generate prime numbers are older than computers. Did you do any research? –  Phil Frost Jan 3 '13 at 21:33
Use the Sieve of Eratosthenes to get a list of primes. It's a very fast and simple algorithm to implement. –  Marcus Stuhr Jan 3 '13 at 22:14

## marked as duplicate by templatetypedef, gefei, Don Kirkby, CoolBeans, Sjoerd VisscherJan 4 '13 at 20:52

For Prime Numbers, there are several primality tests that you can implement. I like the naive methods, checking up to sqrt(n), there is also the Sieve of Erathostenes as Marcus Stuhr pointed out. You can optimize it a little bit if you check only the primality of odd numbers.

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