Let f(n)=gcd(n6−1,n4−1)f(n) = \text{gcd}(n^6-1, n^4-1)f(n)=gcd(n6−1,n4−1). For how many integers nnn in the range 1≤n≤101 \le n \le 101≤n≤10 is f(n)>1f(n) > 1f(n)>1?
666
777
888
101010