Given two integers N and M, count the number of integers x between 2 and N! , having the property that all prime factors of x are greater than M. Where 1≤M≤N<10000001 and (N-M)≤100000. Can anyone help me with the logic?
Struggling with a number theory problem
Given two integers N and M, count the number of integers x between 2 and N! , having the property that all prime factors of x are greater than M. Where 1≤M≤N<10000001 and (N-M)≤100000. Can anyone help me with the logic?
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