one way to get that is for the natural numbers (1,..n) we factorise each and see if they have any repeated prime factors , but that would take a lot of time for large n. So is there any better way to get the squarefree numbers from 1,,n ?

You could use erastophenes sieve's modified version: Take a bool array 1..n; precalc all squares that are less than n; that's O(sqrt(N)); foreach square and its multiples make the bool array entry false... 


From http://mathworld.wolfram.com/Squarefree.html



The most direct thing that comes to mind is to list the primes up to n and select at most one of each. That's not easy for large n (e.g. here's one algorithm), but I'm not sure this problem is either. 


You should probably look into the sieve of Atkin. Of course this eliminates all nonprimes (not just perfect squares) so it might be more work than you need. 


Googling a little bit I've found this page where a J program is explained. A part from the complex syntax, the algorithm allows to check whether a number is squarefree or not:
You could implement the algorithm in your preferred language and iterate it on any number from 1 to n. 


http://www.marmet.org/louis/sqfgap/ Check out the section "Basic algorithm: the sieve of Eratosthenes", which is what Armen suggested. The next section is "Improvements of the algorithm". Also, FWIW, the Moebius function and squarefree numbers are related. 


I have found a better algorithm to calculate how many squarefree numbers in a interval such as [n,m]. We can get prime that less than 

