import Data.List

primes = 2:3:[x | i<-[1..], j<-[-1,1], let x = 6*i+j, isPrime x]
 where isPrime n = null [i | i<-takeWhile (\x -> x^2 <= n) primes, mod n i == 0]

isPrime x = null [y | y<-[2..floor (sqrt (fromIntegral x))], mod (y+1) 6 /= 0, mod (y-1) 6 /= 0 , mod x y == 0]

main = readLn >>= print . product . map (\fs -> if odd (length fs) then head fs else 1) . group . factorization

factorization :: Integer -> [Integer]
factorization n = unfoldr fact (n, primes)
 where
  q = (floor . sqrt . fromIntegral) n
  fact (n', pps@(p:ps))
   | n' == 1 = Nothing
   | isPrime n' = Just (n',(1,pps))
   | otherwise = let (d,m) = divMod n' p in if m==0 then Just (p,(d,pps)) else fact (n',ps)